{ "cells": [ { "cell_type": "code", "execution_count": 12, "id": "48d53388", "metadata": {}, "outputs": [], "source": [ "# !pip install jupyter_dash\n", "import jupyter_dash\n", "from jupyter_dash import JupyterDash\n", "import pandas as pd\n", "import geopandas as gpd\n", "import geoplot\n", "import geoplot.crs as gcrs\n", "import plotly.express as px" ] }, { "cell_type": "code", "execution_count": 13, "id": "c283b315", "metadata": {}, "outputs": [], "source": [ "df = pd.read_excel('data/data/qp.xlsx')\n", "geojson = gpd.read_file(\"data/data/qp.geojson\")" ] }, { "cell_type": "code", "execution_count": 14, "id": "36501aec", "metadata": {}, "outputs": [], "source": [ "# set(df[\"nom_commune\"])" ] }, { "cell_type": "code", "execution_count": 15, "id": "377682b7", "metadata": {}, "outputs": [], "source": [ "def tieks(dataframe, latitude, longitude, colored_var, title=None, zoom=11.5):\n", " fig = px.choropleth_mapbox(dataframe, geojson=geojson, color=colored_var,\n", " locations=\"nom_qp\", featureidkey=\"properties.nom_qp\",\n", " center={\"lat\": latitude, \"lon\": longitude},\n", " mapbox_style=\"carto-positron\", zoom=zoom,\n", " hover_name=\"nom_qp\", hover_data=['tx_f_empl', 'tx_tot_eprec'],\n", " title=title,\n", " labels={'nom_qp': 'Quartier Prioritaire', 'tx_f_empl': \"Taux d'Activité des Femmes\",\n", " \"tx_et_empl\": \"Taux d'Activité des Etrangers\", \"tx_tot_empl\": \"Taux d'Activité Total\",\n", " \"tx_et_eprec\": \"Taux d'Etrangers en Emploi Précaire\",\n", " \"tx_tot_eprec\": \"Taux Total en Emploi Précaire\",\n", " \"tx_f_eprec\": \"Taux de Femmes en Emploi Précaire\",\n", " }\n", " )\n", " fig.update_layout(margin={\"r\":0,\"t\":25,\"l\":0,\"b\":0})\n", " \n", " return fig" ] }, { "cell_type": "code", "execution_count": 16, "id": "555a449d", "metadata": {}, "outputs": [], "source": [ "df_toulouse = df[df[\"nom_commune\"]==\"Toulouse\"]\n" ] }, { "cell_type": "code", "execution_count": 17, "id": "410c88d4", "metadata": {}, "outputs": [ { "data": { "text/html": [ " \n", " " ] }, "metadata": {}, "output_type": "display_data" }, { "data": { "application/vnd.plotly.v1+json": { "config": { "plotlyServerURL": "https://plot.ly" }, "data": [ { "coloraxis": "coloraxis", "customdata": [ [ 44.8, 30 ], [ 32.5, 25.7 ], [ 38, 24.7 ], [ 41.1, null ], [ 38.2, 28.5 ], [ 42.1, 20.9 ], [ 34.1, null ], [ 58.5, 19.8 ], [ 56.1, 15.9 ], [ 25.2, 38.7 ], [ 53.6, 24 ], [ 52.6, 22.3 ] ], "featureidkey": "properties.nom_qp", "geojson": { "bbox": [ -0.0437, 42.5983, 4.6525, 44.4672 ], "features": [ { "bbox": [ 2.8882, 42.7035, 2.9005, 42.7101 ], "geometry": { "coordinates": [ [ [ 2.9005, 42.7081 ], [ 2.9004, 42.7077 ], [ 2.9004, 42.7075 ], [ 2.9003, 42.7074 ], [ 2.9003, 42.7069 ], [ 2.9, 42.7069 ], [ 2.9001, 42.7067 ], [ 2.9002, 42.7065 ], [ 2.9002, 42.7064 ], [ 2.9002, 42.7063 ], [ 2.9002, 42.7062 ], [ 2.9001, 42.7062 ], [ 2.9001, 42.7061 ], [ 2.8994, 42.7059 ], [ 2.8979, 42.7055 ], [ 2.8976, 42.7054 ], [ 2.8972, 42.7053 ], [ 2.8964, 42.7051 ], [ 2.8961, 42.705 ], [ 2.8957, 42.7049 ], [ 2.8957, 42.7049 ], [ 2.8953, 42.7047 ], [ 2.8949, 42.7046 ], [ 2.8948, 42.7045 ], [ 2.8946, 42.7045 ], [ 2.8944, 42.7044 ], [ 2.8941, 42.7044 ], [ 2.8938, 42.7043 ], [ 2.8934, 42.7042 ], [ 2.8933, 42.7042 ], [ 2.8932, 42.7042 ], [ 2.8931, 42.7041 ], [ 2.8927, 42.7042 ], [ 2.8926, 42.7043 ], [ 2.8923, 42.7043 ], [ 2.8916, 42.7041 ], [ 2.8915, 42.7041 ], [ 2.8906, 42.7039 ], [ 2.8905, 42.7039 ], [ 2.8896, 42.7037 ], [ 2.8889, 42.7035 ], [ 2.8887, 42.7039 ], [ 2.8886, 42.7042 ], [ 2.8891, 42.7044 ], [ 2.8898, 42.7046 ], [ 2.8904, 42.7049 ], [ 2.8904, 42.705 ], [ 2.8905, 42.7049 ], [ 2.8907, 42.705 ], [ 2.8908, 42.705 ], [ 2.8914, 42.7053 ], [ 2.8916, 42.7053 ], [ 2.8914, 42.7056 ], [ 2.8912, 42.7056 ], [ 2.891, 42.7056 ], [ 2.8905, 42.7056 ], [ 2.8898, 42.7056 ], [ 2.8893, 42.7056 ], [ 2.8892, 42.7056 ], [ 2.889, 42.7057 ], [ 2.8888, 42.7059 ], [ 2.8887, 42.7059 ], [ 2.8887, 42.706 ], [ 2.8885, 42.706 ], [ 2.8884, 42.706 ], [ 2.8884, 42.706 ], [ 2.8883, 42.7061 ], [ 2.8882, 42.7064 ], [ 2.8887, 42.7065 ], [ 2.8888, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8893, 42.7062 ], [ 2.8893, 42.7061 ], [ 2.8893, 42.7061 ], [ 2.8905, 42.7062 ], [ 2.891, 42.7062 ], [ 2.8911, 42.7063 ], [ 2.8918, 42.7064 ], [ 2.8918, 42.7065 ], [ 2.892, 42.7065 ], [ 2.8925, 42.7066 ], [ 2.8925, 42.7067 ], [ 2.8926, 42.7067 ], [ 2.8928, 42.7069 ], [ 2.8932, 42.7072 ], [ 2.8931, 42.7073 ], [ 2.893, 42.7076 ], [ 2.8929, 42.7079 ], [ 2.8923, 42.7077 ], [ 2.892, 42.7077 ], [ 2.8919, 42.7077 ], [ 2.8919, 42.7077 ], [ 2.8918, 42.7077 ], [ 2.8918, 42.7077 ], [ 2.8916, 42.7077 ], [ 2.8916, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8914, 42.7076 ], [ 2.8913, 42.7075 ], [ 2.8912, 42.7078 ], [ 2.8911, 42.7081 ], [ 2.8911, 42.7082 ], [ 2.8909, 42.7086 ], [ 2.8907, 42.7092 ], [ 2.8906, 42.7093 ], [ 2.8906, 42.7095 ], [ 2.8905, 42.7096 ], [ 2.8908, 42.7096 ], [ 2.8909, 42.7096 ], [ 2.891, 42.7095 ], [ 2.8913, 42.7097 ], [ 2.8916, 42.7098 ], [ 2.8917, 42.7099 ], [ 2.8921, 42.71 ], [ 2.8921, 42.71 ], [ 2.8921, 42.7101 ], [ 2.8924, 42.7101 ], [ 2.8924, 42.71 ], [ 2.8924, 42.71 ], [ 2.8925, 42.7097 ], [ 2.8926, 42.7095 ], [ 2.8926, 42.7094 ], [ 2.8926, 42.7094 ], [ 2.8927, 42.7093 ], [ 2.8929, 42.7093 ], [ 2.893, 42.7094 ], [ 2.893, 42.7094 ], [ 2.893, 42.7094 ], [ 2.8933, 42.7088 ], [ 2.8936, 42.7082 ], [ 2.8938, 42.7081 ], [ 2.8937, 42.7081 ], [ 2.894, 42.7079 ], [ 2.894, 42.7079 ], [ 2.8946, 42.7083 ], [ 2.8946, 42.7083 ], [ 2.8948, 42.7083 ], [ 2.8952, 42.7084 ], [ 2.8955, 42.7084 ], [ 2.8958, 42.7085 ], [ 2.8958, 42.7085 ], [ 2.8959, 42.7084 ], [ 2.8964, 42.7082 ], [ 2.8967, 42.7081 ], [ 2.8965, 42.7078 ], [ 2.8965, 42.7078 ], [ 2.8963, 42.7076 ], [ 2.8962, 42.7075 ], [ 2.896, 42.7072 ], [ 2.8958, 42.707 ], [ 2.8957, 42.7068 ], [ 2.8959, 42.7068 ], [ 2.8959, 42.7068 ], [ 2.8957, 42.7066 ], [ 2.8957, 42.7065 ], [ 2.8958, 42.7065 ], [ 2.8962, 42.7063 ], [ 2.8963, 42.7063 ], [ 2.8964, 42.7062 ], [ 2.8965, 42.7062 ], [ 2.8967, 42.7062 ], [ 2.8968, 42.7063 ], [ 2.8968, 42.7063 ], [ 2.8969, 42.7066 ], [ 2.897, 42.7069 ], [ 2.8973, 42.7071 ], [ 2.8973, 42.7072 ], [ 2.8977, 42.7073 ], [ 2.898, 42.707 ], [ 2.899, 42.7074 ], [ 2.8992, 42.7075 ], [ 2.8992, 42.7075 ], [ 2.8992, 42.7076 ], [ 2.8995, 42.7077 ], [ 2.8995, 42.7077 ], [ 2.8999, 42.7079 ], [ 2.9005, 42.7081 ] ] ], "type": "Polygon" }, "id": "0", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066007", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Bas-Vernet Nouveau QPV" }, "type": "Feature" }, { "bbox": [ 4.0233, 44.2076, 4.0343, 44.2164 ], "geometry": { "coordinates": [ [ [ 4.0343, 44.2092 ], [ 4.0343, 44.2091 ], [ 4.0343, 44.209 ], [ 4.0342, 44.209 ], [ 4.0328, 44.2087 ], [ 4.0319, 44.2084 ], [ 4.0303, 44.208 ], [ 4.0298, 44.2079 ], [ 4.0294, 44.2077 ], [ 4.0288, 44.2076 ], [ 4.0285, 44.2076 ], [ 4.0282, 44.2076 ], [ 4.028, 44.2076 ], [ 4.0278, 44.2076 ], [ 4.0276, 44.2076 ], [ 4.0274, 44.2076 ], [ 4.027, 44.2077 ], [ 4.0267, 44.2078 ], [ 4.0265, 44.2079 ], [ 4.026, 44.2081 ], [ 4.0255, 44.2084 ], [ 4.0254, 44.2085 ], [ 4.0256, 44.2089 ], [ 4.0258, 44.2092 ], [ 4.0258, 44.2093 ], [ 4.0258, 44.2095 ], [ 4.0258, 44.2095 ], [ 4.0257, 44.2096 ], [ 4.0255, 44.2098 ], [ 4.0252, 44.21 ], [ 4.0251, 44.2102 ], [ 4.0245, 44.2103 ], [ 4.0247, 44.2105 ], [ 4.0247, 44.2105 ], [ 4.0246, 44.2106 ], [ 4.0245, 44.2106 ], [ 4.0243, 44.2107 ], [ 4.0245, 44.2108 ], [ 4.0245, 44.2108 ], [ 4.0249, 44.2111 ], [ 4.0249, 44.2111 ], [ 4.0251, 44.2114 ], [ 4.0248, 44.2115 ], [ 4.0245, 44.2117 ], [ 4.0242, 44.2119 ], [ 4.0238, 44.2122 ], [ 4.0237, 44.2123 ], [ 4.0233, 44.2126 ], [ 4.0239, 44.213 ], [ 4.0244, 44.2125 ], [ 4.0241, 44.2123 ], [ 4.024, 44.2123 ], [ 4.024, 44.2123 ], [ 4.0241, 44.2121 ], [ 4.0241, 44.2122 ], [ 4.0242, 44.2121 ], [ 4.0243, 44.212 ], [ 4.0244, 44.212 ], [ 4.0244, 44.212 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0246, 44.2118 ], [ 4.0246, 44.2118 ], [ 4.0246, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0248, 44.2118 ], [ 4.025, 44.2118 ], [ 4.0251, 44.2119 ], [ 4.0252, 44.212 ], [ 4.0252, 44.212 ], [ 4.0253, 44.212 ], [ 4.0253, 44.2119 ], [ 4.0254, 44.2119 ], [ 4.0255, 44.212 ], [ 4.0257, 44.2118 ], [ 4.0257, 44.2118 ], [ 4.0258, 44.2118 ], [ 4.0258, 44.2118 ], [ 4.0259, 44.2118 ], [ 4.026, 44.2119 ], [ 4.0261, 44.2119 ], [ 4.0262, 44.2119 ], [ 4.0262, 44.2119 ], [ 4.0263, 44.2118 ], [ 4.0264, 44.2118 ], [ 4.0265, 44.2118 ], [ 4.0266, 44.2118 ], [ 4.0267, 44.2118 ], [ 4.0269, 44.2118 ], [ 4.027, 44.2119 ], [ 4.0276, 44.212 ], [ 4.028, 44.2121 ], [ 4.0282, 44.2121 ], [ 4.0284, 44.2125 ], [ 4.0284, 44.2126 ], [ 4.0284, 44.2128 ], [ 4.0284, 44.2128 ], [ 4.0284, 44.2132 ], [ 4.0285, 44.2134 ], [ 4.0286, 44.2136 ], [ 4.0288, 44.2136 ], [ 4.0288, 44.2136 ], [ 4.0288, 44.2137 ], [ 4.0289, 44.2137 ], [ 4.029, 44.2139 ], [ 4.0291, 44.2141 ], [ 4.0292, 44.2142 ], [ 4.0292, 44.2142 ], [ 4.0291, 44.2143 ], [ 4.029, 44.2144 ], [ 4.029, 44.2144 ], [ 4.0289, 44.2145 ], [ 4.0289, 44.2146 ], [ 4.0286, 44.2146 ], [ 4.0281, 44.2147 ], [ 4.0278, 44.2147 ], [ 4.0278, 44.2148 ], [ 4.0278, 44.2148 ], [ 4.0278, 44.2151 ], [ 4.0278, 44.2153 ], [ 4.0278, 44.2154 ], [ 4.0276, 44.2154 ], [ 4.0276, 44.2156 ], [ 4.0273, 44.2156 ], [ 4.0273, 44.216 ], [ 4.0273, 44.216 ], [ 4.0275, 44.216 ], [ 4.0283, 44.216 ], [ 4.0283, 44.216 ], [ 4.0284, 44.216 ], [ 4.0284, 44.216 ], [ 4.0285, 44.2161 ], [ 4.0286, 44.2161 ], [ 4.0287, 44.2162 ], [ 4.0288, 44.2162 ], [ 4.0295, 44.2162 ], [ 4.0296, 44.2162 ], [ 4.0299, 44.2162 ], [ 4.0305, 44.216 ], [ 4.0306, 44.2159 ], [ 4.031, 44.2158 ], [ 4.0311, 44.2158 ], [ 4.0312, 44.216 ], [ 4.0312, 44.216 ], [ 4.0315, 44.2164 ], [ 4.0318, 44.2164 ], [ 4.0321, 44.2163 ], [ 4.0325, 44.2161 ], [ 4.0321, 44.2157 ], [ 4.0331, 44.2154 ], [ 4.0331, 44.2152 ], [ 4.0331, 44.2152 ], [ 4.033, 44.215 ], [ 4.033, 44.2146 ], [ 4.0329, 44.2144 ], [ 4.0336, 44.2145 ], [ 4.034, 44.2143 ], [ 4.0336, 44.2139 ], [ 4.0336, 44.2139 ], [ 4.0337, 44.2139 ], [ 4.0339, 44.2138 ], [ 4.0339, 44.2138 ], [ 4.034, 44.2135 ], [ 4.034, 44.2135 ], [ 4.0341, 44.2135 ], [ 4.0342, 44.2135 ], [ 4.0342, 44.2135 ], [ 4.0343, 44.2135 ], [ 4.0343, 44.2135 ], [ 4.0343, 44.2134 ], [ 4.0343, 44.2134 ], [ 4.0342, 44.2133 ], [ 4.034, 44.2131 ], [ 4.0339, 44.2131 ], [ 4.0339, 44.213 ], [ 4.0338, 44.2128 ], [ 4.0337, 44.2127 ], [ 4.0336, 44.2127 ], [ 4.0334, 44.2126 ], [ 4.0332, 44.2124 ], [ 4.0327, 44.2121 ], [ 4.0326, 44.212 ], [ 4.0325, 44.2119 ], [ 4.0323, 44.2119 ], [ 4.0316, 44.2114 ], [ 4.0315, 44.2113 ], [ 4.0315, 44.2112 ], [ 4.0314, 44.2109 ], [ 4.0317, 44.2109 ], [ 4.032, 44.2105 ], [ 4.0323, 44.2104 ], [ 4.0325, 44.2103 ], [ 4.033, 44.2101 ], [ 4.0331, 44.2101 ], [ 4.0333, 44.21 ], [ 4.0334, 44.2097 ], [ 4.0336, 44.2097 ], [ 4.0337, 44.2096 ], [ 4.0339, 44.2095 ], [ 4.0339, 44.2095 ], [ 4.0342, 44.2093 ], [ 4.0343, 44.2092 ] ] ], "type": "Polygon" }, "id": "1", "properties": { "code_commune": "30132", "code_departement": "30", "code_qp": "QP030016", "commune_qp": "La Grand-Combe", "nom_commune": "La Grand-Combe", "nom_qp": "Centre Ville - Arboux" }, "type": "Feature" }, { "bbox": [ 4.4296, 43.6741, 4.438, 43.6845 ], "geometry": { "coordinates": [ [ [ 4.438, 43.6827 ], [ 4.438, 43.6826 ], [ 4.438, 43.6826 ], [ 4.4376, 43.6824 ], [ 4.4375, 43.6823 ], [ 4.4374, 43.6823 ], [ 4.4373, 43.6823 ], [ 4.4371, 43.6819 ], [ 4.4367, 43.6817 ], [ 4.4362, 43.6815 ], [ 4.4353, 43.6813 ], [ 4.4351, 43.6809 ], [ 4.4351, 43.6804 ], [ 4.4353, 43.6801 ], [ 4.4363, 43.68 ], [ 4.4362, 43.6799 ], [ 4.4361, 43.6796 ], [ 4.436, 43.6794 ], [ 4.4359, 43.6794 ], [ 4.4359, 43.6793 ], [ 4.4359, 43.6792 ], [ 4.4358, 43.6791 ], [ 4.4358, 43.6791 ], [ 4.4356, 43.679 ], [ 4.4355, 43.679 ], [ 4.4353, 43.679 ], [ 4.4349, 43.679 ], [ 4.4343, 43.6791 ], [ 4.4341, 43.6791 ], [ 4.4336, 43.679 ], [ 4.4337, 43.6789 ], [ 4.4336, 43.6788 ], [ 4.4336, 43.6787 ], [ 4.4336, 43.6786 ], [ 4.4336, 43.6786 ], [ 4.4335, 43.6784 ], [ 4.4335, 43.6783 ], [ 4.4335, 43.6782 ], [ 4.4335, 43.6781 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6777 ], [ 4.4336, 43.6776 ], [ 4.4336, 43.6776 ], [ 4.4335, 43.6775 ], [ 4.4335, 43.6774 ], [ 4.4334, 43.6772 ], [ 4.4334, 43.6772 ], [ 4.4336, 43.6771 ], [ 4.4338, 43.6771 ], [ 4.4338, 43.677 ], [ 4.4337, 43.6766 ], [ 4.4336, 43.6765 ], [ 4.4336, 43.6763 ], [ 4.4336, 43.6761 ], [ 4.4336, 43.6761 ], [ 4.4333, 43.6757 ], [ 4.4332, 43.6756 ], [ 4.4326, 43.6752 ], [ 4.4324, 43.6751 ], [ 4.4325, 43.6748 ], [ 4.4325, 43.6748 ], [ 4.4324, 43.6747 ], [ 4.4324, 43.6746 ], [ 4.4325, 43.6746 ], [ 4.4325, 43.6744 ], [ 4.4324, 43.6743 ], [ 4.4324, 43.6742 ], [ 4.4324, 43.6741 ], [ 4.4322, 43.6743 ], [ 4.4317, 43.6748 ], [ 4.4312, 43.6752 ], [ 4.4309, 43.6755 ], [ 4.4306, 43.6759 ], [ 4.4304, 43.6761 ], [ 4.4299, 43.6765 ], [ 4.4298, 43.6766 ], [ 4.4297, 43.6768 ], [ 4.4297, 43.6771 ], [ 4.4296, 43.6772 ], [ 4.4296, 43.6779 ], [ 4.4298, 43.6779 ], [ 4.4299, 43.678 ], [ 4.4299, 43.678 ], [ 4.4299, 43.6781 ], [ 4.43, 43.6781 ], [ 4.4301, 43.6782 ], [ 4.4303, 43.6783 ], [ 4.4305, 43.6784 ], [ 4.4306, 43.6784 ], [ 4.4307, 43.6785 ], [ 4.4309, 43.6785 ], [ 4.4309, 43.6786 ], [ 4.431, 43.6786 ], [ 4.4311, 43.6788 ], [ 4.4311, 43.6788 ], [ 4.4312, 43.6788 ], [ 4.4312, 43.679 ], [ 4.4312, 43.679 ], [ 4.4314, 43.6791 ], [ 4.4318, 43.6791 ], [ 4.432, 43.6792 ], [ 4.4322, 43.6792 ], [ 4.4326, 43.6792 ], [ 4.4327, 43.6792 ], [ 4.4331, 43.6801 ], [ 4.4332, 43.6801 ], [ 4.4332, 43.6802 ], [ 4.4333, 43.6804 ], [ 4.4334, 43.6805 ], [ 4.4326, 43.6811 ], [ 4.433, 43.6812 ], [ 4.4327, 43.6813 ], [ 4.4326, 43.6814 ], [ 4.4325, 43.6815 ], [ 4.4325, 43.6815 ], [ 4.4322, 43.6816 ], [ 4.4321, 43.6815 ], [ 4.4319, 43.6815 ], [ 4.4318, 43.6816 ], [ 4.4318, 43.6816 ], [ 4.4318, 43.6816 ], [ 4.4319, 43.6817 ], [ 4.432, 43.6818 ], [ 4.4319, 43.6818 ], [ 4.4319, 43.6819 ], [ 4.4315, 43.6821 ], [ 4.4315, 43.6821 ], [ 4.4315, 43.6822 ], [ 4.4316, 43.6822 ], [ 4.4313, 43.6825 ], [ 4.4331, 43.6825 ], [ 4.4336, 43.6825 ], [ 4.4336, 43.6825 ], [ 4.4337, 43.6826 ], [ 4.4339, 43.6826 ], [ 4.4342, 43.6826 ], [ 4.4342, 43.6826 ], [ 4.4343, 43.6827 ], [ 4.4346, 43.6828 ], [ 4.4349, 43.6828 ], [ 4.4354, 43.6831 ], [ 4.4356, 43.6832 ], [ 4.4359, 43.6833 ], [ 4.4361, 43.6835 ], [ 4.4362, 43.6836 ], [ 4.4366, 43.6839 ], [ 4.4369, 43.6841 ], [ 4.4372, 43.6842 ], [ 4.4376, 43.6845 ], [ 4.4378, 43.6844 ], [ 4.4376, 43.6841 ], [ 4.4376, 43.6841 ], [ 4.4378, 43.684 ], [ 4.4379, 43.6839 ], [ 4.4379, 43.6835 ], [ 4.438, 43.6827 ] ] ], "type": "Polygon" }, "id": "2", "properties": { "code_commune": "30258", "code_departement": "30", "code_qp": "QP030009", "commune_qp": "Saint-Gilles", "nom_commune": "Saint-Gilles", "nom_qp": "Sabatot - Centre Ancien" }, "type": "Feature" }, { "bbox": [ 2.3637, 43.2054, 2.3794, 43.2191 ], "geometry": { "coordinates": [ [ [ 2.3743, 43.218 ], [ 2.3742, 43.2177 ], [ 2.3741, 43.2174 ], [ 2.3741, 43.2174 ], [ 2.374, 43.2175 ], [ 2.3738, 43.2173 ], [ 2.3732, 43.2176 ], [ 2.3725, 43.2179 ], [ 2.3723, 43.218 ], [ 2.3717, 43.2173 ], [ 2.3714, 43.2171 ], [ 2.3713, 43.2171 ], [ 2.3712, 43.217 ], [ 2.3708, 43.2165 ], [ 2.3704, 43.2162 ], [ 2.3702, 43.2163 ], [ 2.3702, 43.2163 ], [ 2.3699, 43.2165 ], [ 2.3693, 43.2156 ], [ 2.3697, 43.2155 ], [ 2.37, 43.2153 ], [ 2.3689, 43.2141 ], [ 2.3688, 43.214 ], [ 2.3693, 43.2138 ], [ 2.3697, 43.2136 ], [ 2.3702, 43.2133 ], [ 2.3705, 43.2132 ], [ 2.3709, 43.213 ], [ 2.3711, 43.2129 ], [ 2.3716, 43.213 ], [ 2.3721, 43.2131 ], [ 2.3736, 43.2144 ], [ 2.3753, 43.2136 ], [ 2.3778, 43.2125 ], [ 2.3782, 43.2123 ], [ 2.3788, 43.212 ], [ 2.379, 43.2118 ], [ 2.3789, 43.2116 ], [ 2.3794, 43.2114 ], [ 2.3792, 43.2112 ], [ 2.3792, 43.2111 ], [ 2.3792, 43.2105 ], [ 2.3791, 43.2099 ], [ 2.3788, 43.21 ], [ 2.3786, 43.2097 ], [ 2.3783, 43.2088 ], [ 2.3782, 43.2088 ], [ 2.3781, 43.2082 ], [ 2.3777, 43.2083 ], [ 2.3776, 43.2079 ], [ 2.3776, 43.2079 ], [ 2.3776, 43.2075 ], [ 2.3774, 43.2075 ], [ 2.3774, 43.2073 ], [ 2.3774, 43.2073 ], [ 2.3774, 43.2072 ], [ 2.3776, 43.2072 ], [ 2.3775, 43.2069 ], [ 2.3775, 43.2068 ], [ 2.3783, 43.2068 ], [ 2.3783, 43.2068 ], [ 2.3786, 43.2068 ], [ 2.3787, 43.2067 ], [ 2.3788, 43.2062 ], [ 2.379, 43.2055 ], [ 2.3786, 43.2055 ], [ 2.3784, 43.2055 ], [ 2.3764, 43.2057 ], [ 2.3757, 43.2058 ], [ 2.3752, 43.2057 ], [ 2.3747, 43.2057 ], [ 2.3739, 43.2056 ], [ 2.373, 43.2054 ], [ 2.3728, 43.2054 ], [ 2.3724, 43.2061 ], [ 2.3723, 43.2064 ], [ 2.372, 43.2071 ], [ 2.3727, 43.207 ], [ 2.3734, 43.2069 ], [ 2.374, 43.2068 ], [ 2.3744, 43.2067 ], [ 2.3745, 43.2067 ], [ 2.3749, 43.2065 ], [ 2.3751, 43.2073 ], [ 2.3758, 43.2072 ], [ 2.3758, 43.2072 ], [ 2.3763, 43.2071 ], [ 2.3765, 43.2071 ], [ 2.3769, 43.207 ], [ 2.3768, 43.2072 ], [ 2.3769, 43.2075 ], [ 2.3767, 43.2076 ], [ 2.3768, 43.2082 ], [ 2.377, 43.2082 ], [ 2.377, 43.2087 ], [ 2.377, 43.2088 ], [ 2.3778, 43.2088 ], [ 2.3781, 43.2095 ], [ 2.378, 43.2096 ], [ 2.3782, 43.2098 ], [ 2.3781, 43.2098 ], [ 2.3784, 43.2102 ], [ 2.3776, 43.2105 ], [ 2.3773, 43.2106 ], [ 2.3768, 43.2108 ], [ 2.3757, 43.2112 ], [ 2.3721, 43.2126 ], [ 2.3718, 43.2126 ], [ 2.3717, 43.2126 ], [ 2.3713, 43.2124 ], [ 2.3712, 43.2124 ], [ 2.3717, 43.212 ], [ 2.3711, 43.2114 ], [ 2.3711, 43.2114 ], [ 2.3709, 43.2112 ], [ 2.3709, 43.2112 ], [ 2.3706, 43.211 ], [ 2.3701, 43.2113 ], [ 2.3701, 43.2113 ], [ 2.37, 43.2113 ], [ 2.3692, 43.2117 ], [ 2.3691, 43.2117 ], [ 2.3693, 43.2119 ], [ 2.3694, 43.212 ], [ 2.3691, 43.2121 ], [ 2.3686, 43.2123 ], [ 2.3685, 43.2124 ], [ 2.3685, 43.2124 ], [ 2.3683, 43.2123 ], [ 2.3683, 43.2123 ], [ 2.3683, 43.2123 ], [ 2.3681, 43.2123 ], [ 2.3678, 43.2124 ], [ 2.3676, 43.2124 ], [ 2.3669, 43.2126 ], [ 2.3668, 43.2126 ], [ 2.3664, 43.2127 ], [ 2.3666, 43.2131 ], [ 2.3667, 43.2133 ], [ 2.3662, 43.2136 ], [ 2.3661, 43.2136 ], [ 2.3665, 43.2144 ], [ 2.3665, 43.2145 ], [ 2.3666, 43.2147 ], [ 2.3668, 43.2149 ], [ 2.3664, 43.215 ], [ 2.3654, 43.2152 ], [ 2.3654, 43.2155 ], [ 2.3653, 43.2156 ], [ 2.3651, 43.2157 ], [ 2.365, 43.2157 ], [ 2.3646, 43.2158 ], [ 2.3645, 43.2158 ], [ 2.3645, 43.2158 ], [ 2.3644, 43.2158 ], [ 2.3644, 43.2159 ], [ 2.3644, 43.2159 ], [ 2.3644, 43.216 ], [ 2.3644, 43.2161 ], [ 2.3637, 43.2161 ], [ 2.3638, 43.2162 ], [ 2.3639, 43.2167 ], [ 2.3642, 43.2165 ], [ 2.3646, 43.2164 ], [ 2.3647, 43.2163 ], [ 2.3652, 43.2162 ], [ 2.3654, 43.2164 ], [ 2.3656, 43.2165 ], [ 2.3659, 43.2163 ], [ 2.3661, 43.2164 ], [ 2.3663, 43.2164 ], [ 2.3669, 43.2161 ], [ 2.3672, 43.2168 ], [ 2.3675, 43.2175 ], [ 2.3676, 43.2177 ], [ 2.3676, 43.2178 ], [ 2.368, 43.2184 ], [ 2.3681, 43.2185 ], [ 2.3679, 43.2188 ], [ 2.3678, 43.2188 ], [ 2.368, 43.2188 ], [ 2.3683, 43.2189 ], [ 2.3688, 43.2189 ], [ 2.3697, 43.2189 ], [ 2.3701, 43.219 ], [ 2.3709, 43.219 ], [ 2.3713, 43.219 ], [ 2.3719, 43.2191 ], [ 2.3722, 43.2191 ], [ 2.3722, 43.219 ], [ 2.3725, 43.2188 ], [ 2.3735, 43.2184 ], [ 2.3743, 43.218 ] ] ], "type": "Polygon" }, "id": "3", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011002", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "La Conte - Ozanam" }, "type": "Feature" }, { "bbox": [ 4.2702, 43.6938, 4.2823, 43.701 ], "geometry": { "coordinates": [ [ [ 4.2819, 43.7001 ], [ 4.2818, 43.7 ], [ 4.2818, 43.6999 ], [ 4.2817, 43.6999 ], [ 4.2817, 43.6998 ], [ 4.2818, 43.6996 ], [ 4.2818, 43.6996 ], [ 4.2818, 43.6996 ], [ 4.2819, 43.6995 ], [ 4.2823, 43.6994 ], [ 4.2822, 43.6994 ], [ 4.2821, 43.6993 ], [ 4.282, 43.6993 ], [ 4.2815, 43.6992 ], [ 4.2818, 43.6986 ], [ 4.2815, 43.6985 ], [ 4.2813, 43.6985 ], [ 4.2813, 43.6984 ], [ 4.2817, 43.6974 ], [ 4.2817, 43.6974 ], [ 4.281, 43.6972 ], [ 4.2808, 43.6972 ], [ 4.2806, 43.6971 ], [ 4.2804, 43.6971 ], [ 4.2802, 43.697 ], [ 4.28, 43.697 ], [ 4.2793, 43.6971 ], [ 4.2786, 43.6972 ], [ 4.2785, 43.6974 ], [ 4.2785, 43.6975 ], [ 4.2783, 43.6974 ], [ 4.2782, 43.6974 ], [ 4.2782, 43.6974 ], [ 4.2782, 43.6972 ], [ 4.2782, 43.6971 ], [ 4.2782, 43.6969 ], [ 4.2782, 43.6969 ], [ 4.2782, 43.6968 ], [ 4.2772, 43.6966 ], [ 4.2771, 43.6968 ], [ 4.2769, 43.6973 ], [ 4.2759, 43.6971 ], [ 4.2758, 43.6971 ], [ 4.2759, 43.6969 ], [ 4.2759, 43.6968 ], [ 4.2756, 43.6967 ], [ 4.2757, 43.6964 ], [ 4.2758, 43.6963 ], [ 4.2752, 43.6962 ], [ 4.2753, 43.6961 ], [ 4.2754, 43.696 ], [ 4.2748, 43.6958 ], [ 4.2745, 43.6963 ], [ 4.2742, 43.6967 ], [ 4.2741, 43.697 ], [ 4.274, 43.6971 ], [ 4.2739, 43.697 ], [ 4.2737, 43.697 ], [ 4.2734, 43.6969 ], [ 4.2735, 43.6966 ], [ 4.2736, 43.6965 ], [ 4.2737, 43.6964 ], [ 4.2739, 43.696 ], [ 4.2738, 43.696 ], [ 4.2739, 43.6959 ], [ 4.2737, 43.6956 ], [ 4.2738, 43.6956 ], [ 4.2734, 43.695 ], [ 4.273, 43.6951 ], [ 4.2728, 43.6947 ], [ 4.2731, 43.6946 ], [ 4.273, 43.6946 ], [ 4.2729, 43.6943 ], [ 4.2731, 43.6942 ], [ 4.2729, 43.6938 ], [ 4.2722, 43.6941 ], [ 4.2721, 43.6942 ], [ 4.2707, 43.6947 ], [ 4.2702, 43.695 ], [ 4.2703, 43.6953 ], [ 4.2702, 43.6953 ], [ 4.2705, 43.696 ], [ 4.2705, 43.6961 ], [ 4.2707, 43.6965 ], [ 4.271, 43.697 ], [ 4.2711, 43.6974 ], [ 4.2715, 43.6975 ], [ 4.2716, 43.6976 ], [ 4.272, 43.6976 ], [ 4.2725, 43.6977 ], [ 4.2726, 43.6977 ], [ 4.2728, 43.6978 ], [ 4.2729, 43.6978 ], [ 4.2732, 43.6979 ], [ 4.2733, 43.698 ], [ 4.2733, 43.698 ], [ 4.2734, 43.698 ], [ 4.2734, 43.698 ], [ 4.2735, 43.698 ], [ 4.2735, 43.698 ], [ 4.2737, 43.6976 ], [ 4.2753, 43.6981 ], [ 4.2755, 43.6982 ], [ 4.2765, 43.6985 ], [ 4.2763, 43.6988 ], [ 4.2763, 43.6989 ], [ 4.2763, 43.699 ], [ 4.2772, 43.6992 ], [ 4.2772, 43.6993 ], [ 4.2775, 43.6993 ], [ 4.2775, 43.6994 ], [ 4.2775, 43.6994 ], [ 4.2775, 43.6995 ], [ 4.2777, 43.6995 ], [ 4.278, 43.6996 ], [ 4.2783, 43.6996 ], [ 4.2783, 43.6997 ], [ 4.2797, 43.7 ], [ 4.2798, 43.7001 ], [ 4.2798, 43.7001 ], [ 4.2798, 43.7001 ], [ 4.2797, 43.7004 ], [ 4.2802, 43.7005 ], [ 4.2803, 43.7005 ], [ 4.2805, 43.7007 ], [ 4.2809, 43.7009 ], [ 4.2811, 43.701 ], [ 4.2811, 43.701 ], [ 4.2812, 43.701 ], [ 4.2814, 43.701 ], [ 4.2817, 43.7009 ], [ 4.2818, 43.7009 ], [ 4.2818, 43.7007 ], [ 4.2818, 43.7006 ], [ 4.2818, 43.7006 ], [ 4.2819, 43.7004 ], [ 4.282, 43.7003 ], [ 4.282, 43.7001 ], [ 4.2819, 43.7001 ] ] ], "type": "Polygon" }, "id": "4", "properties": { "code_commune": "30341", "code_departement": "30", "code_qp": "QP030015", "commune_qp": "Vauvert", "nom_commune": "Vauvert", "nom_qp": "Les Costières" }, "type": "Feature" }, { "bbox": [ 3.6599, 43.4106, 3.667, 43.4154 ], "geometry": { "coordinates": [ [ [ 3.667, 43.4154 ], [ 3.667, 43.4145 ], [ 3.667, 43.4143 ], [ 3.6669, 43.4141 ], [ 3.6668, 43.4139 ], [ 3.6665, 43.4137 ], [ 3.666, 43.4133 ], [ 3.6653, 43.4128 ], [ 3.6652, 43.4127 ], [ 3.6653, 43.4126 ], [ 3.6654, 43.4124 ], [ 3.6653, 43.4122 ], [ 3.6653, 43.4121 ], [ 3.6653, 43.412 ], [ 3.6644, 43.4114 ], [ 3.6638, 43.4118 ], [ 3.6635, 43.4115 ], [ 3.664, 43.4111 ], [ 3.6637, 43.4109 ], [ 3.6631, 43.4113 ], [ 3.6623, 43.4106 ], [ 3.6619, 43.4109 ], [ 3.6613, 43.4114 ], [ 3.6606, 43.4119 ], [ 3.6606, 43.4119 ], [ 3.6602, 43.4121 ], [ 3.6601, 43.4121 ], [ 3.66, 43.4121 ], [ 3.66, 43.4122 ], [ 3.6599, 43.4124 ], [ 3.6599, 43.4125 ], [ 3.6608, 43.4131 ], [ 3.661, 43.4132 ], [ 3.6623, 43.4141 ], [ 3.6624, 43.4141 ], [ 3.6625, 43.4142 ], [ 3.6626, 43.4142 ], [ 3.6627, 43.4143 ], [ 3.6628, 43.4145 ], [ 3.6632, 43.4144 ], [ 3.6635, 43.4142 ], [ 3.6636, 43.4142 ], [ 3.6637, 43.4143 ], [ 3.6642, 43.4146 ], [ 3.6644, 43.4145 ], [ 3.6648, 43.4143 ], [ 3.665, 43.4144 ], [ 3.6652, 43.4142 ], [ 3.6669, 43.4154 ], [ 3.667, 43.4154 ], [ 3.667, 43.4154 ] ] ], "type": "Polygon" }, "id": "5", "properties": { "code_commune": "34301", "code_departement": "34", "code_qp": "QP034017", "commune_qp": "Sète", "nom_commune": "Sète", "nom_qp": "Ile De Thau" }, "type": "Feature" }, { "bbox": [ 2.8805, 42.7129, 2.902, 42.7278 ], "geometry": { "coordinates": [ [ [ 2.902, 42.7151 ], [ 2.902, 42.7149 ], [ 2.902, 42.7148 ], [ 2.9019, 42.7146 ], [ 2.9019, 42.7145 ], [ 2.9018, 42.7144 ], [ 2.9018, 42.7143 ], [ 2.9016, 42.7141 ], [ 2.9016, 42.7139 ], [ 2.9014, 42.7137 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9012, 42.7135 ], [ 2.9011, 42.7134 ], [ 2.9009, 42.7133 ], [ 2.9008, 42.7132 ], [ 2.9006, 42.713 ], [ 2.9005, 42.713 ], [ 2.9005, 42.7129 ], [ 2.9005, 42.7129 ], [ 2.9004, 42.713 ], [ 2.9002, 42.7131 ], [ 2.8998, 42.7135 ], [ 2.8993, 42.714 ], [ 2.8993, 42.714 ], [ 2.8991, 42.7144 ], [ 2.8987, 42.7143 ], [ 2.8984, 42.7142 ], [ 2.8983, 42.7142 ], [ 2.898, 42.7141 ], [ 2.8978, 42.714 ], [ 2.8974, 42.7139 ], [ 2.8972, 42.7139 ], [ 2.897, 42.7138 ], [ 2.8967, 42.7138 ], [ 2.8966, 42.7138 ], [ 2.8965, 42.7137 ], [ 2.8963, 42.7137 ], [ 2.8961, 42.7137 ], [ 2.8959, 42.7137 ], [ 2.8958, 42.7138 ], [ 2.8958, 42.7139 ], [ 2.8958, 42.714 ], [ 2.8957, 42.7142 ], [ 2.8957, 42.7145 ], [ 2.8956, 42.7146 ], [ 2.8956, 42.715 ], [ 2.8955, 42.7153 ], [ 2.8955, 42.7155 ], [ 2.8955, 42.7157 ], [ 2.8955, 42.7159 ], [ 2.8956, 42.7162 ], [ 2.8956, 42.7164 ], [ 2.8957, 42.7165 ], [ 2.8957, 42.7167 ], [ 2.8953, 42.7167 ], [ 2.8951, 42.7168 ], [ 2.8948, 42.7169 ], [ 2.8946, 42.7168 ], [ 2.8943, 42.7168 ], [ 2.8939, 42.7169 ], [ 2.8934, 42.7171 ], [ 2.8931, 42.7172 ], [ 2.8927, 42.7173 ], [ 2.8924, 42.7174 ], [ 2.8918, 42.7174 ], [ 2.8913, 42.7175 ], [ 2.8909, 42.7175 ], [ 2.8908, 42.7174 ], [ 2.8909, 42.7173 ], [ 2.8908, 42.7173 ], [ 2.8908, 42.7173 ], [ 2.8906, 42.7173 ], [ 2.8902, 42.7174 ], [ 2.8893, 42.7175 ], [ 2.8881, 42.7176 ], [ 2.8881, 42.7178 ], [ 2.8881, 42.718 ], [ 2.888, 42.7182 ], [ 2.8881, 42.7183 ], [ 2.8882, 42.7184 ], [ 2.8882, 42.7185 ], [ 2.8882, 42.7185 ], [ 2.8882, 42.7186 ], [ 2.8883, 42.7188 ], [ 2.8882, 42.7188 ], [ 2.8882, 42.7189 ], [ 2.8882, 42.7189 ], [ 2.8881, 42.719 ], [ 2.888, 42.7198 ], [ 2.8875, 42.7198 ], [ 2.8874, 42.7198 ], [ 2.8873, 42.7198 ], [ 2.8873, 42.7198 ], [ 2.8872, 42.7199 ], [ 2.8868, 42.7198 ], [ 2.8865, 42.7197 ], [ 2.8863, 42.7204 ], [ 2.8861, 42.7208 ], [ 2.886, 42.7208 ], [ 2.8858, 42.7208 ], [ 2.8857, 42.7208 ], [ 2.8857, 42.7208 ], [ 2.8856, 42.7207 ], [ 2.8853, 42.7205 ], [ 2.8852, 42.7206 ], [ 2.8849, 42.7209 ], [ 2.8848, 42.721 ], [ 2.8842, 42.721 ], [ 2.8843, 42.721 ], [ 2.8842, 42.721 ], [ 2.8836, 42.7212 ], [ 2.8834, 42.7213 ], [ 2.8831, 42.7213 ], [ 2.8834, 42.7213 ], [ 2.8835, 42.7213 ], [ 2.8837, 42.7214 ], [ 2.8837, 42.7215 ], [ 2.8836, 42.7219 ], [ 2.8835, 42.7219 ], [ 2.8835, 42.7221 ], [ 2.8834, 42.7222 ], [ 2.8834, 42.7224 ], [ 2.8827, 42.7224 ], [ 2.8825, 42.7224 ], [ 2.8823, 42.7224 ], [ 2.8818, 42.7224 ], [ 2.8817, 42.7224 ], [ 2.8815, 42.7224 ], [ 2.8811, 42.7224 ], [ 2.8811, 42.7227 ], [ 2.8811, 42.7229 ], [ 2.8811, 42.7231 ], [ 2.8811, 42.7231 ], [ 2.881, 42.7231 ], [ 2.881, 42.7233 ], [ 2.8809, 42.7234 ], [ 2.8811, 42.7234 ], [ 2.881, 42.7237 ], [ 2.8811, 42.7237 ], [ 2.8813, 42.7237 ], [ 2.8814, 42.7237 ], [ 2.8813, 42.7238 ], [ 2.8813, 42.724 ], [ 2.8815, 42.724 ], [ 2.8813, 42.7245 ], [ 2.8812, 42.7246 ], [ 2.8819, 42.7247 ], [ 2.8816, 42.725 ], [ 2.881, 42.7255 ], [ 2.8806, 42.7258 ], [ 2.8807, 42.7259 ], [ 2.8807, 42.7259 ], [ 2.8806, 42.726 ], [ 2.8806, 42.7261 ], [ 2.8805, 42.7261 ], [ 2.8805, 42.7262 ], [ 2.8805, 42.7262 ], [ 2.8805, 42.7263 ], [ 2.8806, 42.7264 ], [ 2.8806, 42.7265 ], [ 2.8806, 42.7266 ], [ 2.8806, 42.7267 ], [ 2.8807, 42.727 ], [ 2.8807, 42.7273 ], [ 2.8813, 42.7272 ], [ 2.8814, 42.7272 ], [ 2.8817, 42.7272 ], [ 2.8818, 42.7272 ], [ 2.8822, 42.7271 ], [ 2.8823, 42.7271 ], [ 2.8825, 42.727 ], [ 2.8827, 42.727 ], [ 2.8827, 42.727 ], [ 2.8829, 42.7271 ], [ 2.883, 42.727 ], [ 2.8831, 42.7271 ], [ 2.8836, 42.7274 ], [ 2.8836, 42.7274 ], [ 2.8838, 42.7275 ], [ 2.8841, 42.7277 ], [ 2.8842, 42.7277 ], [ 2.8844, 42.7277 ], [ 2.8849, 42.7278 ], [ 2.885, 42.7278 ], [ 2.8851, 42.7278 ], [ 2.8854, 42.7277 ], [ 2.8854, 42.7276 ], [ 2.8854, 42.7275 ], [ 2.8854, 42.7269 ], [ 2.8861, 42.7268 ], [ 2.8859, 42.7267 ], [ 2.8858, 42.7266 ], [ 2.8859, 42.7264 ], [ 2.886, 42.7261 ], [ 2.886, 42.7261 ], [ 2.8861, 42.7261 ], [ 2.886, 42.7259 ], [ 2.886, 42.7258 ], [ 2.886, 42.7258 ], [ 2.886, 42.7258 ], [ 2.8859, 42.7257 ], [ 2.8858, 42.7254 ], [ 2.8858, 42.7252 ], [ 2.8858, 42.7252 ], [ 2.8857, 42.7249 ], [ 2.8857, 42.7247 ], [ 2.8856, 42.7244 ], [ 2.8856, 42.7242 ], [ 2.8855, 42.7241 ], [ 2.8855, 42.7241 ], [ 2.8853, 42.7242 ], [ 2.8849, 42.7242 ], [ 2.8841, 42.7243 ], [ 2.884, 42.7243 ], [ 2.884, 42.7243 ], [ 2.8838, 42.7231 ], [ 2.8837, 42.723 ], [ 2.884, 42.7228 ], [ 2.8843, 42.7225 ], [ 2.8848, 42.7221 ], [ 2.885, 42.7219 ], [ 2.8851, 42.7219 ], [ 2.8853, 42.722 ], [ 2.8853, 42.722 ], [ 2.8854, 42.722 ], [ 2.8855, 42.7221 ], [ 2.8855, 42.7221 ], [ 2.8856, 42.7221 ], [ 2.8856, 42.7221 ], [ 2.8857, 42.7222 ], [ 2.8858, 42.7222 ], [ 2.886, 42.7222 ], [ 2.8861, 42.7222 ], [ 2.8862, 42.7222 ], [ 2.8863, 42.7223 ], [ 2.8866, 42.7222 ], [ 2.8866, 42.7222 ], [ 2.8869, 42.7222 ], [ 2.8871, 42.7223 ], [ 2.8871, 42.7224 ], [ 2.8875, 42.7224 ], [ 2.8877, 42.7224 ], [ 2.888, 42.7224 ], [ 2.8883, 42.7225 ], [ 2.8883, 42.7223 ], [ 2.8884, 42.7222 ], [ 2.8885, 42.722 ], [ 2.8886, 42.7219 ], [ 2.8888, 42.7216 ], [ 2.8888, 42.7216 ], [ 2.8886, 42.7215 ], [ 2.8885, 42.7214 ], [ 2.8883, 42.7214 ], [ 2.8882, 42.7213 ], [ 2.8879, 42.7212 ], [ 2.8879, 42.7211 ], [ 2.8881, 42.721 ], [ 2.8882, 42.7209 ], [ 2.8883, 42.7209 ], [ 2.8885, 42.7209 ], [ 2.8888, 42.7208 ], [ 2.889, 42.7208 ], [ 2.8891, 42.7208 ], [ 2.8892, 42.7207 ], [ 2.8892, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8895, 42.7207 ], [ 2.8895, 42.7206 ], [ 2.8897, 42.7205 ], [ 2.8897, 42.7204 ], [ 2.8898, 42.7204 ], [ 2.89, 42.7204 ], [ 2.8901, 42.7203 ], [ 2.8904, 42.7202 ], [ 2.8907, 42.7201 ], [ 2.8909, 42.7201 ], [ 2.891, 42.7201 ], [ 2.8911, 42.7201 ], [ 2.8911, 42.72 ], [ 2.8912, 42.72 ], [ 2.8913, 42.72 ], [ 2.8918, 42.7198 ], [ 2.8919, 42.7197 ], [ 2.8923, 42.7196 ], [ 2.8923, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8925, 42.7196 ], [ 2.8928, 42.7194 ], [ 2.893, 42.7192 ], [ 2.8924, 42.7189 ], [ 2.8924, 42.7188 ], [ 2.8923, 42.7188 ], [ 2.8922, 42.7188 ], [ 2.892, 42.7188 ], [ 2.8918, 42.7188 ], [ 2.8918, 42.7187 ], [ 2.8917, 42.7184 ], [ 2.8918, 42.7184 ], [ 2.8921, 42.7183 ], [ 2.8925, 42.7182 ], [ 2.8933, 42.7181 ], [ 2.8933, 42.7182 ], [ 2.8942, 42.7184 ], [ 2.8953, 42.7186 ], [ 2.8953, 42.7184 ], [ 2.8955, 42.718 ], [ 2.8956, 42.7176 ], [ 2.8956, 42.7176 ], [ 2.8956, 42.7173 ], [ 2.8956, 42.7173 ], [ 2.8957, 42.7173 ], [ 2.8959, 42.7174 ], [ 2.8961, 42.7174 ], [ 2.8963, 42.7175 ], [ 2.8967, 42.7176 ], [ 2.8972, 42.7177 ], [ 2.8975, 42.7178 ], [ 2.8978, 42.7178 ], [ 2.898, 42.7179 ], [ 2.8984, 42.7179 ], [ 2.8987, 42.718 ], [ 2.8988, 42.7175 ], [ 2.8993, 42.7177 ], [ 2.8995, 42.7174 ], [ 2.8997, 42.7172 ], [ 2.9, 42.7169 ], [ 2.9001, 42.7168 ], [ 2.9002, 42.7167 ], [ 2.9003, 42.7166 ], [ 2.9011, 42.7167 ], [ 2.9011, 42.7165 ], [ 2.901, 42.7165 ], [ 2.9011, 42.7164 ], [ 2.9011, 42.7162 ], [ 2.9011, 42.716 ], [ 2.901, 42.7159 ], [ 2.9007, 42.7156 ], [ 2.9004, 42.7153 ], [ 2.9005, 42.7151 ], [ 2.9006, 42.7152 ], [ 2.9008, 42.7153 ], [ 2.9011, 42.7154 ], [ 2.9015, 42.7153 ], [ 2.9016, 42.7153 ], [ 2.9018, 42.7152 ], [ 2.902, 42.7152 ], [ 2.902, 42.7151 ] ] ], "type": "Polygon" }, "id": "6", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066005", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Diagonale Du Haut - Moyen-Vernet" }, "type": "Feature" }, { "bbox": [ 2.8756, 42.6876, 2.8837, 42.7006 ], "geometry": { "coordinates": [ [ [ 2.8837, 42.6899 ], [ 2.8836, 42.6899 ], [ 2.8831, 42.6897 ], [ 2.8827, 42.6896 ], [ 2.8826, 42.6896 ], [ 2.8825, 42.6895 ], [ 2.8824, 42.6896 ], [ 2.8818, 42.6896 ], [ 2.8816, 42.6895 ], [ 2.8816, 42.6894 ], [ 2.8816, 42.6893 ], [ 2.8816, 42.6893 ], [ 2.8817, 42.6893 ], [ 2.8816, 42.6891 ], [ 2.8816, 42.689 ], [ 2.8816, 42.6889 ], [ 2.8816, 42.6888 ], [ 2.8816, 42.6888 ], [ 2.8816, 42.6885 ], [ 2.8816, 42.6884 ], [ 2.8816, 42.6883 ], [ 2.8818, 42.6882 ], [ 2.8818, 42.6881 ], [ 2.8818, 42.6878 ], [ 2.8814, 42.6878 ], [ 2.8813, 42.6878 ], [ 2.8813, 42.6876 ], [ 2.8809, 42.6876 ], [ 2.8809, 42.6877 ], [ 2.8809, 42.6881 ], [ 2.8806, 42.688 ], [ 2.8805, 42.688 ], [ 2.8804, 42.6883 ], [ 2.8804, 42.6884 ], [ 2.8794, 42.6881 ], [ 2.8794, 42.6882 ], [ 2.879, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6882 ], [ 2.8789, 42.6883 ], [ 2.8786, 42.6882 ], [ 2.8782, 42.6881 ], [ 2.8781, 42.6883 ], [ 2.878, 42.6885 ], [ 2.8779, 42.6888 ], [ 2.8777, 42.6891 ], [ 2.8777, 42.6891 ], [ 2.8782, 42.6893 ], [ 2.8787, 42.6896 ], [ 2.8792, 42.6898 ], [ 2.8797, 42.6901 ], [ 2.88, 42.6902 ], [ 2.8804, 42.6904 ], [ 2.8808, 42.6906 ], [ 2.881, 42.6908 ], [ 2.8812, 42.6909 ], [ 2.8815, 42.691 ], [ 2.8815, 42.6911 ], [ 2.8813, 42.6915 ], [ 2.8813, 42.6916 ], [ 2.8812, 42.6916 ], [ 2.8808, 42.6917 ], [ 2.8806, 42.6917 ], [ 2.8804, 42.6918 ], [ 2.8803, 42.6919 ], [ 2.8802, 42.692 ], [ 2.8801, 42.6921 ], [ 2.8799, 42.6924 ], [ 2.8796, 42.6926 ], [ 2.8794, 42.6927 ], [ 2.8791, 42.6927 ], [ 2.8789, 42.6928 ], [ 2.8789, 42.6928 ], [ 2.8788, 42.6928 ], [ 2.8788, 42.6928 ], [ 2.8787, 42.6929 ], [ 2.8786, 42.6929 ], [ 2.8788, 42.6931 ], [ 2.8787, 42.6932 ], [ 2.8785, 42.6935 ], [ 2.878, 42.6934 ], [ 2.8771, 42.6931 ], [ 2.8769, 42.693 ], [ 2.8768, 42.6931 ], [ 2.8767, 42.6931 ], [ 2.8767, 42.6932 ], [ 2.8766, 42.6933 ], [ 2.8765, 42.6934 ], [ 2.8765, 42.6934 ], [ 2.8765, 42.6935 ], [ 2.8765, 42.6938 ], [ 2.8765, 42.694 ], [ 2.8765, 42.6941 ], [ 2.8765, 42.6944 ], [ 2.8763, 42.6943 ], [ 2.8763, 42.6944 ], [ 2.8762, 42.6946 ], [ 2.8761, 42.6949 ], [ 2.876, 42.6953 ], [ 2.876, 42.6955 ], [ 2.876, 42.6956 ], [ 2.8761, 42.6956 ], [ 2.8763, 42.6956 ], [ 2.8764, 42.6956 ], [ 2.8764, 42.6956 ], [ 2.8765, 42.6957 ], [ 2.8766, 42.6957 ], [ 2.8767, 42.6958 ], [ 2.8769, 42.6959 ], [ 2.8768, 42.696 ], [ 2.8768, 42.6964 ], [ 2.8768, 42.6968 ], [ 2.8768, 42.6969 ], [ 2.8768, 42.697 ], [ 2.8767, 42.6972 ], [ 2.8766, 42.6973 ], [ 2.8766, 42.6973 ], [ 2.8765, 42.6974 ], [ 2.8763, 42.6974 ], [ 2.876, 42.6974 ], [ 2.876, 42.6977 ], [ 2.876, 42.698 ], [ 2.8759, 42.6983 ], [ 2.8759, 42.6985 ], [ 2.8759, 42.6986 ], [ 2.8758, 42.6986 ], [ 2.8757, 42.699 ], [ 2.8756, 42.6991 ], [ 2.8761, 42.6991 ], [ 2.8766, 42.6992 ], [ 2.8771, 42.6993 ], [ 2.8772, 42.6993 ], [ 2.8774, 42.6993 ], [ 2.8778, 42.6994 ], [ 2.8778, 42.6994 ], [ 2.878, 42.6995 ], [ 2.8782, 42.6996 ], [ 2.8785, 42.6996 ], [ 2.8789, 42.6998 ], [ 2.8791, 42.6999 ], [ 2.8794, 42.7 ], [ 2.8799, 42.7001 ], [ 2.8808, 42.7004 ], [ 2.8815, 42.7006 ], [ 2.8817, 42.7006 ], [ 2.8817, 42.7003 ], [ 2.8814, 42.7003 ], [ 2.8814, 42.7003 ], [ 2.8809, 42.7001 ], [ 2.881, 42.6996 ], [ 2.8811, 42.6993 ], [ 2.8811, 42.6992 ], [ 2.8803, 42.6991 ], [ 2.8798, 42.6991 ], [ 2.8794, 42.699 ], [ 2.8789, 42.6989 ], [ 2.8785, 42.6989 ], [ 2.8781, 42.6988 ], [ 2.878, 42.6988 ], [ 2.8778, 42.6988 ], [ 2.8778, 42.6987 ], [ 2.8778, 42.6985 ], [ 2.8778, 42.6982 ], [ 2.8779, 42.698 ], [ 2.8779, 42.6976 ], [ 2.878, 42.6977 ], [ 2.8783, 42.6977 ], [ 2.8784, 42.6972 ], [ 2.8787, 42.6967 ], [ 2.8798, 42.6968 ], [ 2.8798, 42.6968 ], [ 2.8799, 42.6968 ], [ 2.8801, 42.6968 ], [ 2.8804, 42.6968 ], [ 2.8805, 42.6968 ], [ 2.881, 42.6969 ], [ 2.8812, 42.6969 ], [ 2.8812, 42.6969 ], [ 2.8814, 42.6969 ], [ 2.8815, 42.6969 ], [ 2.8815, 42.6969 ], [ 2.8815, 42.6971 ], [ 2.8816, 42.6971 ], [ 2.8816, 42.6972 ], [ 2.8822, 42.6973 ], [ 2.8822, 42.6972 ], [ 2.8823, 42.6969 ], [ 2.8823, 42.6969 ], [ 2.8826, 42.697 ], [ 2.8829, 42.6965 ], [ 2.8831, 42.6963 ], [ 2.8831, 42.6962 ], [ 2.8833, 42.696 ], [ 2.8832, 42.6959 ], [ 2.8828, 42.6958 ], [ 2.8829, 42.6956 ], [ 2.8832, 42.6957 ], [ 2.8833, 42.6955 ], [ 2.8832, 42.6955 ], [ 2.8832, 42.6954 ], [ 2.883, 42.6953 ], [ 2.8823, 42.6952 ], [ 2.8823, 42.6952 ], [ 2.8821, 42.6951 ], [ 2.882, 42.6953 ], [ 2.8813, 42.6952 ], [ 2.8811, 42.6951 ], [ 2.8812, 42.6946 ], [ 2.8813, 42.6942 ], [ 2.8814, 42.6939 ], [ 2.8815, 42.6937 ], [ 2.8808, 42.6936 ], [ 2.8805, 42.6935 ], [ 2.881, 42.6922 ], [ 2.8816, 42.6921 ], [ 2.8817, 42.6921 ], [ 2.8817, 42.692 ], [ 2.8818, 42.6919 ], [ 2.8824, 42.6917 ], [ 2.8826, 42.6917 ], [ 2.8827, 42.6915 ], [ 2.8827, 42.6916 ], [ 2.8831, 42.691 ], [ 2.883, 42.691 ], [ 2.8833, 42.6905 ], [ 2.8835, 42.6901 ], [ 2.8836, 42.69 ], [ 2.8837, 42.6899 ] ] ], "type": "Polygon" }, "id": "7", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066003", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Gare" }, "type": "Feature" }, { "bbox": [ 2.3465, 43.2102, 2.3579, 43.2164 ], "geometry": { "coordinates": [ [ [ 2.3579, 43.2105 ], [ 2.3578, 43.2103 ], [ 2.3577, 43.2102 ], [ 2.3571, 43.2102 ], [ 2.3567, 43.2102 ], [ 2.3562, 43.2102 ], [ 2.356, 43.2103 ], [ 2.3558, 43.2103 ], [ 2.3552, 43.2104 ], [ 2.3552, 43.2105 ], [ 2.3473, 43.2105 ], [ 2.3472, 43.2105 ], [ 2.347, 43.211 ], [ 2.3468, 43.2118 ], [ 2.3466, 43.2118 ], [ 2.3465, 43.2124 ], [ 2.3466, 43.2125 ], [ 2.3465, 43.2126 ], [ 2.3465, 43.2127 ], [ 2.3466, 43.2128 ], [ 2.3468, 43.2128 ], [ 2.3471, 43.2134 ], [ 2.3471, 43.2134 ], [ 2.3475, 43.2142 ], [ 2.3474, 43.2142 ], [ 2.348, 43.2151 ], [ 2.348, 43.2151 ], [ 2.3479, 43.2151 ], [ 2.3483, 43.2157 ], [ 2.3487, 43.2164 ], [ 2.3489, 43.2164 ], [ 2.3489, 43.2164 ], [ 2.353, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3536, 43.2163 ], [ 2.3539, 43.2156 ], [ 2.3544, 43.2148 ], [ 2.3544, 43.2148 ], [ 2.3548, 43.2141 ], [ 2.355, 43.2138 ], [ 2.3554, 43.213 ], [ 2.3554, 43.2126 ], [ 2.3555, 43.2126 ], [ 2.3554, 43.2126 ], [ 2.3552, 43.2118 ], [ 2.3555, 43.2119 ], [ 2.3556, 43.2119 ], [ 2.3558, 43.2118 ], [ 2.3573, 43.2116 ], [ 2.3575, 43.2116 ], [ 2.3575, 43.2117 ], [ 2.3576, 43.2116 ], [ 2.3576, 43.2114 ], [ 2.3579, 43.2105 ] ] ], "type": "Polygon" }, "id": "8", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011004", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Bastide Pont-Vieux" }, "type": "Feature" }, { "bbox": [ 2.9955, 43.1804, 3.0095, 43.1877 ], "geometry": { "coordinates": [ [ [ 3.0095, 43.1855 ], [ 3.0095, 43.1854 ], [ 3.0095, 43.1853 ], [ 3.0095, 43.1853 ], [ 3.0094, 43.1852 ], [ 3.0094, 43.1851 ], [ 3.0093, 43.185 ], [ 3.0091, 43.1848 ], [ 3.009, 43.1846 ], [ 3.0089, 43.1845 ], [ 3.0082, 43.1847 ], [ 3.0082, 43.1847 ], [ 3.0078, 43.1848 ], [ 3.0077, 43.1848 ], [ 3.0076, 43.1847 ], [ 3.0075, 43.1846 ], [ 3.0075, 43.1845 ], [ 3.0074, 43.1844 ], [ 3.0076, 43.1844 ], [ 3.0075, 43.1843 ], [ 3.0075, 43.1842 ], [ 3.0074, 43.1841 ], [ 3.0073, 43.1841 ], [ 3.0072, 43.184 ], [ 3.0072, 43.1839 ], [ 3.007, 43.1838 ], [ 3.007, 43.1837 ], [ 3.0068, 43.1837 ], [ 3.0067, 43.1835 ], [ 3.0066, 43.1834 ], [ 3.0066, 43.1834 ], [ 3.0065, 43.1833 ], [ 3.0065, 43.1833 ], [ 3.0064, 43.1833 ], [ 3.0059, 43.1834 ], [ 3.0058, 43.1834 ], [ 3.0057, 43.1835 ], [ 3.0056, 43.1833 ], [ 3.0056, 43.1833 ], [ 3.0055, 43.1833 ], [ 3.0055, 43.1833 ], [ 3.0054, 43.1832 ], [ 3.0054, 43.1832 ], [ 3.0054, 43.1832 ], [ 3.0053, 43.1831 ], [ 3.0053, 43.1832 ], [ 3.0053, 43.1831 ], [ 3.0052, 43.1831 ], [ 3.0051, 43.1831 ], [ 3.005, 43.1829 ], [ 3.004, 43.1823 ], [ 3.0039, 43.1822 ], [ 3.0037, 43.1819 ], [ 3.0036, 43.1819 ], [ 3.0036, 43.1819 ], [ 3.0035, 43.1819 ], [ 3.0034, 43.1819 ], [ 3.0032, 43.1817 ], [ 3.0032, 43.1817 ], [ 3.0031, 43.1818 ], [ 3.003, 43.1817 ], [ 3.0029, 43.1817 ], [ 3.0029, 43.1817 ], [ 3.0028, 43.1816 ], [ 3.0027, 43.1815 ], [ 3.0026, 43.1816 ], [ 3.0023, 43.1817 ], [ 3.0023, 43.1816 ], [ 3.0021, 43.1813 ], [ 3.0018, 43.181 ], [ 3.0015, 43.1808 ], [ 3.0014, 43.1807 ], [ 3.0013, 43.1807 ], [ 3.001, 43.1807 ], [ 3.001, 43.1808 ], [ 3.0011, 43.1812 ], [ 3.0008, 43.1813 ], [ 3.0004, 43.1813 ], [ 3.0001, 43.1814 ], [ 2.9999, 43.1814 ], [ 2.9996, 43.1813 ], [ 2.9995, 43.1814 ], [ 2.9993, 43.1814 ], [ 2.9993, 43.1814 ], [ 2.9992, 43.1814 ], [ 2.9992, 43.1813 ], [ 2.9992, 43.1812 ], [ 2.9991, 43.1812 ], [ 2.999, 43.1808 ], [ 2.9987, 43.1809 ], [ 2.9983, 43.181 ], [ 2.9977, 43.1812 ], [ 2.9976, 43.181 ], [ 2.9975, 43.1807 ], [ 2.9973, 43.1804 ], [ 2.997, 43.1804 ], [ 2.9966, 43.1804 ], [ 2.9968, 43.1808 ], [ 2.9971, 43.1812 ], [ 2.997, 43.1813 ], [ 2.9968, 43.1813 ], [ 2.9961, 43.1814 ], [ 2.9955, 43.1815 ], [ 2.9956, 43.1818 ], [ 2.9955, 43.1819 ], [ 2.9955, 43.1823 ], [ 2.9957, 43.1823 ], [ 2.9957, 43.1828 ], [ 2.9957, 43.183 ], [ 2.9958, 43.183 ], [ 2.9959, 43.183 ], [ 2.9959, 43.1832 ], [ 2.9959, 43.1832 ], [ 2.9959, 43.1832 ], [ 2.9963, 43.1833 ], [ 2.9965, 43.1834 ], [ 2.9967, 43.1835 ], [ 2.9968, 43.1836 ], [ 2.9969, 43.1836 ], [ 2.9971, 43.1836 ], [ 2.9971, 43.1836 ], [ 2.9972, 43.1836 ], [ 2.9977, 43.1835 ], [ 2.9978, 43.1836 ], [ 2.9989, 43.1844 ], [ 2.9992, 43.1847 ], [ 2.9995, 43.1849 ], [ 2.9996, 43.1848 ], [ 2.9997, 43.1847 ], [ 2.9998, 43.1847 ], [ 2.9999, 43.1847 ], [ 3.0001, 43.1846 ], [ 3.0002, 43.1846 ], [ 3.0005, 43.1844 ], [ 3.0008, 43.1843 ], [ 3.0012, 43.1841 ], [ 3.0016, 43.184 ], [ 3.0017, 43.1839 ], [ 3.0019, 43.1839 ], [ 3.0023, 43.1837 ], [ 3.0026, 43.1839 ], [ 3.0027, 43.184 ], [ 3.0028, 43.1841 ], [ 3.0028, 43.1842 ], [ 3.0032, 43.1852 ], [ 3.0033, 43.1852 ], [ 3.0033, 43.1853 ], [ 3.0037, 43.1851 ], [ 3.0037, 43.1852 ], [ 3.0038, 43.1854 ], [ 3.0039, 43.1855 ], [ 3.004, 43.1857 ], [ 3.004, 43.1858 ], [ 3.0041, 43.1858 ], [ 3.0042, 43.1859 ], [ 3.0043, 43.1859 ], [ 3.0044, 43.1859 ], [ 3.0045, 43.1859 ], [ 3.0045, 43.186 ], [ 3.0045, 43.1862 ], [ 3.0045, 43.1863 ], [ 3.0046, 43.1864 ], [ 3.0046, 43.1864 ], [ 3.0047, 43.1865 ], [ 3.0048, 43.1866 ], [ 3.0049, 43.1867 ], [ 3.0049, 43.1868 ], [ 3.005, 43.1869 ], [ 3.0051, 43.187 ], [ 3.0052, 43.1871 ], [ 3.0053, 43.1873 ], [ 3.0056, 43.187 ], [ 3.0064, 43.1873 ], [ 3.0072, 43.1877 ], [ 3.0073, 43.1877 ], [ 3.0074, 43.1876 ], [ 3.0075, 43.1873 ], [ 3.0076, 43.1872 ], [ 3.0078, 43.1871 ], [ 3.0079, 43.1871 ], [ 3.008, 43.1871 ], [ 3.008, 43.1871 ], [ 3.0082, 43.1871 ], [ 3.0087, 43.1864 ], [ 3.0093, 43.1858 ], [ 3.0094, 43.1856 ], [ 3.0095, 43.1855 ] ] ], "type": "Polygon" }, "id": "9", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011008", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Centre" }, "type": "Feature" }, { "bbox": [ 3.0116, 43.192, 3.0172, 43.1962 ], "geometry": { "coordinates": [ [ [ 3.0167, 43.1938 ], [ 3.0165, 43.1936 ], [ 3.0165, 43.1934 ], [ 3.0163, 43.1933 ], [ 3.0159, 43.1928 ], [ 3.0157, 43.1927 ], [ 3.0155, 43.1924 ], [ 3.0152, 43.192 ], [ 3.0141, 43.1924 ], [ 3.014, 43.1925 ], [ 3.0139, 43.1924 ], [ 3.0137, 43.1921 ], [ 3.013, 43.1924 ], [ 3.0123, 43.1926 ], [ 3.0129, 43.1937 ], [ 3.0126, 43.1938 ], [ 3.0126, 43.1938 ], [ 3.0128, 43.1944 ], [ 3.0131, 43.195 ], [ 3.0126, 43.1952 ], [ 3.0126, 43.1952 ], [ 3.0126, 43.1954 ], [ 3.0116, 43.1956 ], [ 3.0123, 43.1962 ], [ 3.0123, 43.1962 ], [ 3.0133, 43.196 ], [ 3.0131, 43.1954 ], [ 3.0135, 43.1953 ], [ 3.0143, 43.1952 ], [ 3.0144, 43.1952 ], [ 3.0145, 43.1952 ], [ 3.0149, 43.1951 ], [ 3.0149, 43.1951 ], [ 3.0149, 43.1954 ], [ 3.015, 43.1957 ], [ 3.015, 43.1957 ], [ 3.0158, 43.1952 ], [ 3.0159, 43.1952 ], [ 3.0162, 43.195 ], [ 3.0166, 43.1947 ], [ 3.017, 43.1945 ], [ 3.0171, 43.1944 ], [ 3.0172, 43.1943 ], [ 3.0172, 43.1941 ], [ 3.0171, 43.194 ], [ 3.017, 43.1939 ], [ 3.0169, 43.1938 ], [ 3.0167, 43.1938 ] ] ], "type": "Polygon" }, "id": "10", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011009", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Est" }, "type": "Feature" }, { "bbox": [ 4.3233, 43.8189, 4.342, 43.8338 ], "geometry": { "coordinates": [ [ [ 4.3277, 43.8276 ], [ 4.3268, 43.8273 ], [ 4.3267, 43.8274 ], [ 4.3259, 43.8287 ], [ 4.3256, 43.8292 ], [ 4.3252, 43.8299 ], [ 4.3251, 43.8301 ], [ 4.3249, 43.8301 ], [ 4.3245, 43.8303 ], [ 4.3242, 43.8303 ], [ 4.3238, 43.8305 ], [ 4.3235, 43.8307 ], [ 4.3233, 43.8308 ], [ 4.3233, 43.8311 ], [ 4.3234, 43.8312 ], [ 4.3239, 43.8319 ], [ 4.324, 43.8321 ], [ 4.324, 43.8323 ], [ 4.3242, 43.8324 ], [ 4.3244, 43.8325 ], [ 4.3246, 43.8326 ], [ 4.3251, 43.8329 ], [ 4.3253, 43.8329 ], [ 4.3254, 43.8329 ], [ 4.3256, 43.8329 ], [ 4.3257, 43.8328 ], [ 4.3258, 43.8327 ], [ 4.326, 43.8325 ], [ 4.3263, 43.8321 ], [ 4.3263, 43.832 ], [ 4.3264, 43.8321 ], [ 4.3268, 43.8322 ], [ 4.3269, 43.832 ], [ 4.327, 43.832 ], [ 4.3273, 43.832 ], [ 4.3273, 43.832 ], [ 4.3278, 43.8322 ], [ 4.3283, 43.8324 ], [ 4.3283, 43.8323 ], [ 4.3285, 43.8324 ], [ 4.3287, 43.8329 ], [ 4.3284, 43.833 ], [ 4.3289, 43.8333 ], [ 4.3286, 43.8336 ], [ 4.3291, 43.8338 ], [ 4.3293, 43.8336 ], [ 4.3301, 43.8334 ], [ 4.3308, 43.8331 ], [ 4.3306, 43.8329 ], [ 4.3307, 43.8325 ], [ 4.3308, 43.8325 ], [ 4.3309, 43.8324 ], [ 4.331, 43.8323 ], [ 4.3317, 43.8326 ], [ 4.3317, 43.8325 ], [ 4.3317, 43.8325 ], [ 4.3317, 43.8324 ], [ 4.3316, 43.8323 ], [ 4.3316, 43.8322 ], [ 4.3319, 43.8322 ], [ 4.332, 43.8322 ], [ 4.3321, 43.8322 ], [ 4.3323, 43.8322 ], [ 4.3329, 43.8321 ], [ 4.3329, 43.8321 ], [ 4.3329, 43.832 ], [ 4.3329, 43.8319 ], [ 4.3332, 43.8315 ], [ 4.3333, 43.8314 ], [ 4.3334, 43.8312 ], [ 4.3337, 43.8307 ], [ 4.3332, 43.8306 ], [ 4.3333, 43.8305 ], [ 4.333, 43.8304 ], [ 4.3323, 43.8301 ], [ 4.333, 43.8291 ], [ 4.3331, 43.8288 ], [ 4.3332, 43.8286 ], [ 4.3332, 43.8285 ], [ 4.3334, 43.8288 ], [ 4.3335, 43.8289 ], [ 4.3335, 43.8289 ], [ 4.3336, 43.829 ], [ 4.3337, 43.8291 ], [ 4.3339, 43.8291 ], [ 4.334, 43.8292 ], [ 4.3341, 43.8292 ], [ 4.3344, 43.8292 ], [ 4.3345, 43.8292 ], [ 4.335, 43.8291 ], [ 4.3356, 43.8289 ], [ 4.3356, 43.8288 ], [ 4.3356, 43.8287 ], [ 4.3358, 43.8284 ], [ 4.3365, 43.8285 ], [ 4.3367, 43.8285 ], [ 4.3368, 43.8286 ], [ 4.3369, 43.8287 ], [ 4.3377, 43.8292 ], [ 4.338, 43.8289 ], [ 4.338, 43.8288 ], [ 4.3381, 43.8287 ], [ 4.3382, 43.8288 ], [ 4.3383, 43.8286 ], [ 4.3384, 43.8287 ], [ 4.3384, 43.8287 ], [ 4.3379, 43.8284 ], [ 4.338, 43.828 ], [ 4.3383, 43.828 ], [ 4.3386, 43.8281 ], [ 4.3387, 43.8282 ], [ 4.3387, 43.8281 ], [ 4.3386, 43.8278 ], [ 4.3386, 43.8278 ], [ 4.3387, 43.8275 ], [ 4.3388, 43.8275 ], [ 4.3388, 43.8272 ], [ 4.3384, 43.8274 ], [ 4.3381, 43.8275 ], [ 4.3379, 43.8275 ], [ 4.3378, 43.8274 ], [ 4.3381, 43.8268 ], [ 4.3382, 43.8265 ], [ 4.3372, 43.8262 ], [ 4.3363, 43.8259 ], [ 4.3363, 43.8258 ], [ 4.337, 43.8246 ], [ 4.3375, 43.8247 ], [ 4.3377, 43.8249 ], [ 4.3387, 43.8252 ], [ 4.3389, 43.8253 ], [ 4.3391, 43.8252 ], [ 4.3395, 43.8251 ], [ 4.3398, 43.8251 ], [ 4.3401, 43.8251 ], [ 4.3403, 43.8251 ], [ 4.3404, 43.8252 ], [ 4.3407, 43.8253 ], [ 4.3413, 43.8252 ], [ 4.3419, 43.8251 ], [ 4.342, 43.825 ], [ 4.3419, 43.8248 ], [ 4.3414, 43.8247 ], [ 4.3418, 43.8243 ], [ 4.3414, 43.8242 ], [ 4.3413, 43.8241 ], [ 4.341, 43.824 ], [ 4.3414, 43.8235 ], [ 4.341, 43.8234 ], [ 4.3406, 43.8233 ], [ 4.3402, 43.8232 ], [ 4.3404, 43.8229 ], [ 4.3407, 43.8225 ], [ 4.3408, 43.8221 ], [ 4.3411, 43.8217 ], [ 4.3413, 43.8214 ], [ 4.3417, 43.821 ], [ 4.3417, 43.8209 ], [ 4.3412, 43.8207 ], [ 4.3406, 43.8205 ], [ 4.3403, 43.8203 ], [ 4.34, 43.8202 ], [ 4.3394, 43.8199 ], [ 4.3388, 43.8196 ], [ 4.3385, 43.8195 ], [ 4.3382, 43.8193 ], [ 4.3379, 43.8191 ], [ 4.3375, 43.8189 ], [ 4.337, 43.8193 ], [ 4.3368, 43.8195 ], [ 4.3364, 43.8198 ], [ 4.3362, 43.82 ], [ 4.3361, 43.8202 ], [ 4.3359, 43.8203 ], [ 4.3356, 43.8202 ], [ 4.3353, 43.8202 ], [ 4.3347, 43.8202 ], [ 4.3342, 43.8203 ], [ 4.3327, 43.8205 ], [ 4.3322, 43.8206 ], [ 4.3316, 43.8208 ], [ 4.331, 43.821 ], [ 4.3306, 43.8211 ], [ 4.3303, 43.8212 ], [ 4.3299, 43.8215 ], [ 4.3295, 43.8218 ], [ 4.3289, 43.8223 ], [ 4.3285, 43.8228 ], [ 4.3282, 43.8233 ], [ 4.3283, 43.8235 ], [ 4.3284, 43.8236 ], [ 4.3289, 43.8238 ], [ 4.3295, 43.8241 ], [ 4.3305, 43.8248 ], [ 4.3313, 43.8255 ], [ 4.3321, 43.826 ], [ 4.3323, 43.8261 ], [ 4.3326, 43.8263 ], [ 4.3328, 43.8265 ], [ 4.333, 43.8267 ], [ 4.3332, 43.8268 ], [ 4.3336, 43.8271 ], [ 4.334, 43.8265 ], [ 4.3343, 43.8259 ], [ 4.3346, 43.826 ], [ 4.3347, 43.826 ], [ 4.3349, 43.8258 ], [ 4.335, 43.8257 ], [ 4.335, 43.8257 ], [ 4.3352, 43.8256 ], [ 4.3358, 43.8258 ], [ 4.3361, 43.8259 ], [ 4.3362, 43.826 ], [ 4.3362, 43.8261 ], [ 4.3358, 43.8268 ], [ 4.3356, 43.8267 ], [ 4.3355, 43.8268 ], [ 4.3357, 43.8269 ], [ 4.3358, 43.827 ], [ 4.3358, 43.8271 ], [ 4.3351, 43.8273 ], [ 4.3352, 43.8274 ], [ 4.3353, 43.8276 ], [ 4.3355, 43.8278 ], [ 4.3356, 43.828 ], [ 4.3356, 43.8282 ], [ 4.3352, 43.8283 ], [ 4.3349, 43.8281 ], [ 4.3347, 43.8279 ], [ 4.3335, 43.8272 ], [ 4.3337, 43.8276 ], [ 4.3338, 43.8278 ], [ 4.3339, 43.8278 ], [ 4.3339, 43.8279 ], [ 4.3339, 43.8279 ], [ 4.3338, 43.828 ], [ 4.3334, 43.8279 ], [ 4.3332, 43.8278 ], [ 4.3331, 43.8279 ], [ 4.333, 43.828 ], [ 4.3329, 43.828 ], [ 4.3331, 43.8282 ], [ 4.3329, 43.8283 ], [ 4.3327, 43.8282 ], [ 4.3325, 43.8281 ], [ 4.3321, 43.8279 ], [ 4.3319, 43.8286 ], [ 4.3317, 43.8289 ], [ 4.3316, 43.829 ], [ 4.3315, 43.8289 ], [ 4.3314, 43.8289 ], [ 4.3314, 43.829 ], [ 4.3313, 43.8292 ], [ 4.3313, 43.8292 ], [ 4.3313, 43.8293 ], [ 4.3312, 43.8293 ], [ 4.3312, 43.8293 ], [ 4.3311, 43.8293 ], [ 4.331, 43.8293 ], [ 4.3309, 43.8294 ], [ 4.3308, 43.8294 ], [ 4.3308, 43.8294 ], [ 4.3308, 43.8295 ], [ 4.3307, 43.8295 ], [ 4.3306, 43.8295 ], [ 4.3305, 43.8296 ], [ 4.3304, 43.8296 ], [ 4.3304, 43.8296 ], [ 4.3309, 43.8298 ], [ 4.3309, 43.8299 ], [ 4.3308, 43.83 ], [ 4.3307, 43.8301 ], [ 4.3307, 43.8304 ], [ 4.3306, 43.8306 ], [ 4.3304, 43.8308 ], [ 4.3304, 43.8309 ], [ 4.3303, 43.8309 ], [ 4.3292, 43.8305 ], [ 4.3293, 43.8303 ], [ 4.3287, 43.8291 ], [ 4.33, 43.8287 ], [ 4.3301, 43.8287 ], [ 4.3303, 43.8288 ], [ 4.3304, 43.8285 ], [ 4.3304, 43.8285 ], [ 4.3305, 43.8284 ], [ 4.3307, 43.8281 ], [ 4.3307, 43.828 ], [ 4.3307, 43.8278 ], [ 4.331, 43.8274 ], [ 4.3308, 43.8273 ], [ 4.3304, 43.8275 ], [ 4.3301, 43.8276 ], [ 4.3299, 43.8276 ], [ 4.3298, 43.8279 ], [ 4.3292, 43.8279 ], [ 4.3292, 43.8274 ], [ 4.3281, 43.827 ], [ 4.3277, 43.8276 ] ] ], "type": "Polygon" }, "id": "11", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030003", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Pissevin - Valdegour" }, "type": "Feature" }, { "bbox": [ 3.9824, 44.0535, 3.9873, 44.0594 ], "geometry": { "coordinates": [ [ [ 3.9824, 44.0536 ], [ 3.9825, 44.0537 ], [ 3.9828, 44.0539 ], [ 3.9829, 44.054 ], [ 3.983, 44.0541 ], [ 3.9831, 44.0543 ], [ 3.9833, 44.0544 ], [ 3.9833, 44.0544 ], [ 3.9833, 44.0545 ], [ 3.9834, 44.0545 ], [ 3.9836, 44.0548 ], [ 3.9835, 44.0548 ], [ 3.9836, 44.0549 ], [ 3.9834, 44.055 ], [ 3.9836, 44.0552 ], [ 3.9838, 44.0551 ], [ 3.9838, 44.0553 ], [ 3.9839, 44.0554 ], [ 3.9839, 44.0554 ], [ 3.9838, 44.0555 ], [ 3.9838, 44.0556 ], [ 3.9838, 44.0556 ], [ 3.9839, 44.0558 ], [ 3.984, 44.0558 ], [ 3.9841, 44.0559 ], [ 3.9843, 44.0559 ], [ 3.9843, 44.056 ], [ 3.9843, 44.056 ], [ 3.9842, 44.0561 ], [ 3.9844, 44.0562 ], [ 3.9845, 44.0564 ], [ 3.9846, 44.0565 ], [ 3.9846, 44.0566 ], [ 3.9846, 44.0567 ], [ 3.9846, 44.0568 ], [ 3.9847, 44.0569 ], [ 3.9847, 44.0569 ], [ 3.9849, 44.0568 ], [ 3.9849, 44.0568 ], [ 3.985, 44.0568 ], [ 3.985, 44.0569 ], [ 3.985, 44.0569 ], [ 3.985, 44.057 ], [ 3.9851, 44.057 ], [ 3.9851, 44.0571 ], [ 3.9852, 44.0572 ], [ 3.9852, 44.0573 ], [ 3.9853, 44.0574 ], [ 3.9853, 44.0574 ], [ 3.9853, 44.0575 ], [ 3.9853, 44.0575 ], [ 3.9848, 44.0575 ], [ 3.9848, 44.0576 ], [ 3.9848, 44.0577 ], [ 3.985, 44.0578 ], [ 3.9851, 44.0578 ], [ 3.9853, 44.0578 ], [ 3.9851, 44.0582 ], [ 3.985, 44.0583 ], [ 3.9849, 44.0584 ], [ 3.9849, 44.0585 ], [ 3.9848, 44.0585 ], [ 3.9847, 44.0587 ], [ 3.9845, 44.0589 ], [ 3.9845, 44.0593 ], [ 3.9847, 44.0594 ], [ 3.9851, 44.0591 ], [ 3.9852, 44.059 ], [ 3.9853, 44.0589 ], [ 3.9852, 44.0588 ], [ 3.9854, 44.0587 ], [ 3.9856, 44.0584 ], [ 3.9858, 44.0583 ], [ 3.9859, 44.0581 ], [ 3.986, 44.058 ], [ 3.9861, 44.0578 ], [ 3.9862, 44.0576 ], [ 3.9863, 44.0574 ], [ 3.9865, 44.057 ], [ 3.9867, 44.0564 ], [ 3.9868, 44.0562 ], [ 3.9869, 44.056 ], [ 3.9869, 44.0559 ], [ 3.987, 44.0557 ], [ 3.987, 44.0556 ], [ 3.987, 44.0554 ], [ 3.9872, 44.0554 ], [ 3.9872, 44.0551 ], [ 3.9871, 44.055 ], [ 3.9871, 44.0548 ], [ 3.9871, 44.0546 ], [ 3.9871, 44.0546 ], [ 3.9872, 44.0545 ], [ 3.9873, 44.0542 ], [ 3.9873, 44.054 ], [ 3.9873, 44.054 ], [ 3.987, 44.0538 ], [ 3.9863, 44.0536 ], [ 3.9859, 44.0535 ], [ 3.9861, 44.0536 ], [ 3.9859, 44.0536 ], [ 3.9856, 44.0536 ], [ 3.9854, 44.0536 ], [ 3.9853, 44.0536 ], [ 3.9851, 44.0536 ], [ 3.9849, 44.0537 ], [ 3.9848, 44.0537 ], [ 3.9847, 44.0536 ], [ 3.9846, 44.0535 ], [ 3.9846, 44.0535 ], [ 3.9845, 44.0535 ], [ 3.984, 44.0537 ], [ 3.9839, 44.0537 ], [ 3.9839, 44.0537 ], [ 3.9837, 44.0537 ], [ 3.983, 44.0537 ], [ 3.983, 44.0537 ], [ 3.9829, 44.0537 ], [ 3.9824, 44.0535 ], [ 3.9824, 44.0536 ] ] ], "type": "Polygon" }, "id": "12", "properties": { "code_commune": "30010", "code_departement": "30", "code_qp": "QP030002", "commune_qp": "Anduze", "nom_commune": "Anduze", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 4.1241, 43.6696, 4.1407, 43.6799 ], "geometry": { "coordinates": [ [ [ 4.1386, 43.6762 ], [ 4.1385, 43.676 ], [ 4.1383, 43.6759 ], [ 4.1382, 43.6759 ], [ 4.1379, 43.6755 ], [ 4.138, 43.6751 ], [ 4.138, 43.6749 ], [ 4.138, 43.6745 ], [ 4.1378, 43.6741 ], [ 4.1374, 43.6734 ], [ 4.1373, 43.6732 ], [ 4.1369, 43.6728 ], [ 4.1367, 43.6726 ], [ 4.1366, 43.6725 ], [ 4.1366, 43.6725 ], [ 4.1366, 43.6722 ], [ 4.1371, 43.6721 ], [ 4.1373, 43.6721 ], [ 4.1383, 43.6722 ], [ 4.1396, 43.6723 ], [ 4.1404, 43.6724 ], [ 4.1405, 43.6715 ], [ 4.1407, 43.6705 ], [ 4.1402, 43.6705 ], [ 4.1402, 43.6706 ], [ 4.1391, 43.6705 ], [ 4.1391, 43.6705 ], [ 4.1383, 43.6704 ], [ 4.1383, 43.6704 ], [ 4.1379, 43.6704 ], [ 4.1378, 43.6705 ], [ 4.1378, 43.6709 ], [ 4.1379, 43.6709 ], [ 4.1379, 43.6709 ], [ 4.1378, 43.671 ], [ 4.1377, 43.671 ], [ 4.1376, 43.6709 ], [ 4.1376, 43.6709 ], [ 4.1375, 43.6709 ], [ 4.1375, 43.6709 ], [ 4.1368, 43.6708 ], [ 4.1367, 43.671 ], [ 4.1367, 43.6711 ], [ 4.1367, 43.6713 ], [ 4.1367, 43.6715 ], [ 4.1367, 43.6716 ], [ 4.1367, 43.6717 ], [ 4.1367, 43.672 ], [ 4.1367, 43.6721 ], [ 4.1366, 43.6722 ], [ 4.1365, 43.6722 ], [ 4.1365, 43.6722 ], [ 4.1363, 43.6722 ], [ 4.1363, 43.6724 ], [ 4.1361, 43.6726 ], [ 4.136, 43.6726 ], [ 4.136, 43.6727 ], [ 4.136, 43.6728 ], [ 4.1359, 43.6737 ], [ 4.1356, 43.6737 ], [ 4.1356, 43.6736 ], [ 4.1356, 43.6736 ], [ 4.1356, 43.6736 ], [ 4.1354, 43.6734 ], [ 4.1347, 43.6734 ], [ 4.1342, 43.6734 ], [ 4.1342, 43.6734 ], [ 4.1342, 43.6732 ], [ 4.1339, 43.6732 ], [ 4.1337, 43.6732 ], [ 4.1334, 43.6732 ], [ 4.1334, 43.6732 ], [ 4.1332, 43.6733 ], [ 4.1332, 43.6732 ], [ 4.133, 43.6734 ], [ 4.1328, 43.6733 ], [ 4.133, 43.6728 ], [ 4.1327, 43.6727 ], [ 4.1325, 43.6731 ], [ 4.1323, 43.6732 ], [ 4.1322, 43.6732 ], [ 4.1322, 43.6733 ], [ 4.1321, 43.6735 ], [ 4.1321, 43.6736 ], [ 4.132, 43.6737 ], [ 4.132, 43.674 ], [ 4.1321, 43.674 ], [ 4.1321, 43.674 ], [ 4.1325, 43.674 ], [ 4.1325, 43.6741 ], [ 4.1325, 43.6743 ], [ 4.1324, 43.6744 ], [ 4.1324, 43.6745 ], [ 4.1324, 43.6746 ], [ 4.1323, 43.6747 ], [ 4.1323, 43.6748 ], [ 4.1321, 43.6748 ], [ 4.1318, 43.6747 ], [ 4.1315, 43.6747 ], [ 4.1314, 43.6746 ], [ 4.1312, 43.6746 ], [ 4.1313, 43.6742 ], [ 4.1299, 43.6743 ], [ 4.1298, 43.6743 ], [ 4.1298, 43.6744 ], [ 4.1299, 43.6744 ], [ 4.13, 43.6744 ], [ 4.1299, 43.6746 ], [ 4.1297, 43.6751 ], [ 4.1294, 43.6749 ], [ 4.1294, 43.6752 ], [ 4.1288, 43.6753 ], [ 4.1287, 43.6751 ], [ 4.1281, 43.6752 ], [ 4.1278, 43.6754 ], [ 4.1273, 43.675 ], [ 4.1273, 43.6749 ], [ 4.1278, 43.6745 ], [ 4.1281, 43.6743 ], [ 4.1282, 43.6743 ], [ 4.1282, 43.6742 ], [ 4.1284, 43.6739 ], [ 4.1282, 43.6738 ], [ 4.1284, 43.6738 ], [ 4.1285, 43.6737 ], [ 4.1288, 43.6733 ], [ 4.129, 43.6729 ], [ 4.1291, 43.6727 ], [ 4.1293, 43.6724 ], [ 4.1296, 43.672 ], [ 4.1295, 43.672 ], [ 4.1294, 43.672 ], [ 4.129, 43.6718 ], [ 4.1286, 43.6716 ], [ 4.1284, 43.6716 ], [ 4.1277, 43.6714 ], [ 4.1276, 43.6713 ], [ 4.1272, 43.6713 ], [ 4.127, 43.6712 ], [ 4.1271, 43.671 ], [ 4.1271, 43.6709 ], [ 4.1273, 43.6708 ], [ 4.1275, 43.6708 ], [ 4.1276, 43.6708 ], [ 4.1278, 43.6704 ], [ 4.1281, 43.6701 ], [ 4.1282, 43.67 ], [ 4.1272, 43.6698 ], [ 4.1258, 43.6696 ], [ 4.1254, 43.671 ], [ 4.1254, 43.6711 ], [ 4.1253, 43.6711 ], [ 4.1251, 43.6711 ], [ 4.1249, 43.6711 ], [ 4.1246, 43.6711 ], [ 4.1243, 43.671 ], [ 4.1243, 43.6712 ], [ 4.1242, 43.6715 ], [ 4.1242, 43.6719 ], [ 4.1243, 43.6721 ], [ 4.1244, 43.6721 ], [ 4.1244, 43.6721 ], [ 4.1251, 43.672 ], [ 4.1263, 43.6724 ], [ 4.1262, 43.6726 ], [ 4.1265, 43.6727 ], [ 4.1276, 43.673 ], [ 4.1281, 43.6731 ], [ 4.1279, 43.6736 ], [ 4.1278, 43.6739 ], [ 4.1276, 43.674 ], [ 4.1274, 43.674 ], [ 4.1271, 43.6739 ], [ 4.1269, 43.674 ], [ 4.1267, 43.6741 ], [ 4.1263, 43.6743 ], [ 4.1262, 43.6744 ], [ 4.1266, 43.6746 ], [ 4.1261, 43.675 ], [ 4.1256, 43.6754 ], [ 4.1252, 43.6757 ], [ 4.1252, 43.6758 ], [ 4.1247, 43.6756 ], [ 4.1244, 43.6754 ], [ 4.1241, 43.6755 ], [ 4.1243, 43.6757 ], [ 4.1241, 43.6758 ], [ 4.1244, 43.6761 ], [ 4.1246, 43.676 ], [ 4.1251, 43.6764 ], [ 4.1252, 43.6764 ], [ 4.1265, 43.6761 ], [ 4.1283, 43.6758 ], [ 4.1285, 43.6758 ], [ 4.1291, 43.6757 ], [ 4.1301, 43.6754 ], [ 4.1303, 43.6754 ], [ 4.1315, 43.6755 ], [ 4.1317, 43.6756 ], [ 4.1319, 43.6758 ], [ 4.1322, 43.676 ], [ 4.1324, 43.6762 ], [ 4.1329, 43.6764 ], [ 4.1333, 43.6766 ], [ 4.1337, 43.6769 ], [ 4.1335, 43.6772 ], [ 4.1333, 43.6774 ], [ 4.1332, 43.6776 ], [ 4.1331, 43.6779 ], [ 4.1342, 43.6781 ], [ 4.1342, 43.6781 ], [ 4.1344, 43.6781 ], [ 4.1342, 43.6784 ], [ 4.1341, 43.6787 ], [ 4.1339, 43.6786 ], [ 4.1338, 43.6787 ], [ 4.1337, 43.6787 ], [ 4.1336, 43.6789 ], [ 4.1335, 43.6788 ], [ 4.1332, 43.6791 ], [ 4.133, 43.6792 ], [ 4.1328, 43.6791 ], [ 4.1327, 43.6794 ], [ 4.1326, 43.6794 ], [ 4.1326, 43.6794 ], [ 4.1324, 43.6797 ], [ 4.1334, 43.6799 ], [ 4.1334, 43.6797 ], [ 4.1334, 43.6797 ], [ 4.1335, 43.6795 ], [ 4.1339, 43.6796 ], [ 4.134, 43.6794 ], [ 4.1341, 43.6791 ], [ 4.1343, 43.6792 ], [ 4.1344, 43.679 ], [ 4.1348, 43.6792 ], [ 4.1349, 43.6789 ], [ 4.1351, 43.679 ], [ 4.1354, 43.6782 ], [ 4.1355, 43.6778 ], [ 4.1365, 43.678 ], [ 4.1365, 43.6779 ], [ 4.1366, 43.6779 ], [ 4.1367, 43.6773 ], [ 4.1369, 43.6774 ], [ 4.1371, 43.6774 ], [ 4.1375, 43.6776 ], [ 4.1379, 43.6777 ], [ 4.1378, 43.6776 ], [ 4.1378, 43.6776 ], [ 4.1382, 43.677 ], [ 4.1382, 43.677 ], [ 4.1386, 43.6762 ] ] ], "type": "Polygon" }, "id": "13", "properties": { "code_commune": "34145", "code_departement": "34", "code_qp": "QP034021", "commune_qp": "Lunel", "nom_commune": "Lunel", "nom_qp": "Centre Et Périphérie" }, "type": "Feature" }, { "bbox": [ 4.6254, 43.8078, 4.6319, 43.8124 ], "geometry": { "coordinates": [ [ [ 4.6319, 43.8112 ], [ 4.6319, 43.8111 ], [ 4.6318, 43.8107 ], [ 4.6317, 43.8107 ], [ 4.6317, 43.8107 ], [ 4.6317, 43.8106 ], [ 4.6313, 43.8103 ], [ 4.6311, 43.8094 ], [ 4.6311, 43.8093 ], [ 4.6311, 43.8085 ], [ 4.6304, 43.8084 ], [ 4.6304, 43.8084 ], [ 4.6296, 43.8082 ], [ 4.6297, 43.8079 ], [ 4.6293, 43.8078 ], [ 4.6287, 43.8078 ], [ 4.6286, 43.8078 ], [ 4.6278, 43.8078 ], [ 4.6274, 43.8078 ], [ 4.6273, 43.8078 ], [ 4.6273, 43.8079 ], [ 4.6272, 43.8079 ], [ 4.6272, 43.808 ], [ 4.6271, 43.8081 ], [ 4.627, 43.8083 ], [ 4.6269, 43.8085 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8087 ], [ 4.6271, 43.8088 ], [ 4.6272, 43.8088 ], [ 4.6274, 43.8089 ], [ 4.6275, 43.809 ], [ 4.6278, 43.809 ], [ 4.6279, 43.8091 ], [ 4.628, 43.809 ], [ 4.6281, 43.8093 ], [ 4.6279, 43.8093 ], [ 4.6277, 43.8094 ], [ 4.6274, 43.8095 ], [ 4.6268, 43.8095 ], [ 4.6268, 43.8096 ], [ 4.6267, 43.8096 ], [ 4.6267, 43.8097 ], [ 4.6266, 43.8098 ], [ 4.6266, 43.8098 ], [ 4.6266, 43.8098 ], [ 4.6265, 43.8098 ], [ 4.6265, 43.8098 ], [ 4.6264, 43.8098 ], [ 4.6263, 43.8098 ], [ 4.6261, 43.8098 ], [ 4.6259, 43.8098 ], [ 4.6254, 43.8098 ], [ 4.6254, 43.8105 ], [ 4.6255, 43.811 ], [ 4.6255, 43.811 ], [ 4.6256, 43.811 ], [ 4.6266, 43.811 ], [ 4.6271, 43.811 ], [ 4.6275, 43.8109 ], [ 4.6275, 43.8111 ], [ 4.6276, 43.8116 ], [ 4.6276, 43.8119 ], [ 4.6283, 43.8118 ], [ 4.6286, 43.8118 ], [ 4.6288, 43.8119 ], [ 4.6289, 43.8124 ], [ 4.6295, 43.8122 ], [ 4.6294, 43.8122 ], [ 4.6298, 43.8121 ], [ 4.6305, 43.8119 ], [ 4.6318, 43.8116 ], [ 4.6318, 43.8116 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8112 ] ] ], "type": "Polygon" }, "id": "14", "properties": { "code_commune": "30032", "code_departement": "30", "code_qp": "QP030012", "commune_qp": "Beaucaire", "nom_commune": "Beaucaire", "nom_qp": "La Moulinelle" }, "type": "Feature" }, { "bbox": [ 2.7551, 43.1974, 2.7711, 43.2053 ], "geometry": { "coordinates": [ [ [ 2.7564, 43.2037 ], [ 2.7557, 43.2044 ], [ 2.7554, 43.2049 ], [ 2.7551, 43.2052 ], [ 2.7557, 43.2053 ], [ 2.7559, 43.2052 ], [ 2.7567, 43.2051 ], [ 2.7571, 43.205 ], [ 2.7586, 43.2044 ], [ 2.7599, 43.204 ], [ 2.7605, 43.2038 ], [ 2.7615, 43.2034 ], [ 2.7621, 43.2032 ], [ 2.7625, 43.2031 ], [ 2.7631, 43.203 ], [ 2.7638, 43.2029 ], [ 2.7642, 43.2029 ], [ 2.765, 43.2027 ], [ 2.7659, 43.2025 ], [ 2.7658, 43.2023 ], [ 2.7655, 43.2023 ], [ 2.7647, 43.2014 ], [ 2.7654, 43.201 ], [ 2.766, 43.2005 ], [ 2.7666, 43.2008 ], [ 2.7671, 43.2005 ], [ 2.7677, 43.201 ], [ 2.7681, 43.2008 ], [ 2.7683, 43.2009 ], [ 2.7685, 43.201 ], [ 2.7688, 43.2007 ], [ 2.7696, 43.2011 ], [ 2.7703, 43.2014 ], [ 2.7709, 43.2015 ], [ 2.7711, 43.2014 ], [ 2.7711, 43.2013 ], [ 2.7709, 43.2009 ], [ 2.7709, 43.2007 ], [ 2.77, 43.2005 ], [ 2.7689, 43.2002 ], [ 2.7686, 43.2001 ], [ 2.7687, 43.1999 ], [ 2.7681, 43.1997 ], [ 2.768, 43.1996 ], [ 2.767, 43.1994 ], [ 2.767, 43.1994 ], [ 2.7667, 43.1993 ], [ 2.7647, 43.199 ], [ 2.7634, 43.1987 ], [ 2.7632, 43.1986 ], [ 2.7609, 43.1981 ], [ 2.7604, 43.198 ], [ 2.7577, 43.1974 ], [ 2.758, 43.1982 ], [ 2.7581, 43.1983 ], [ 2.7586, 43.1994 ], [ 2.7578, 43.1997 ], [ 2.7569, 43.2001 ], [ 2.7566, 43.2002 ], [ 2.7558, 43.2006 ], [ 2.7558, 43.2005 ], [ 2.7556, 43.2006 ], [ 2.7555, 43.2006 ], [ 2.7552, 43.2008 ], [ 2.7551, 43.2009 ], [ 2.7553, 43.201 ], [ 2.7552, 43.2019 ], [ 2.7552, 43.202 ], [ 2.7552, 43.202 ], [ 2.7552, 43.2021 ], [ 2.7551, 43.2027 ], [ 2.7551, 43.2028 ], [ 2.7551, 43.2029 ], [ 2.7558, 43.2027 ], [ 2.7564, 43.2037 ] ] ], "type": "Polygon" }, "id": "15", "properties": { "code_commune": "11203", "code_departement": "11", "code_qp": "QP011010", "commune_qp": "Lézignan-Corbières", "nom_commune": "Lézignan-Corbières", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.2331, 43.3431, 3.2394, 43.3527 ], "geometry": { "coordinates": [ [ [ 3.2393, 43.3502 ], [ 3.2394, 43.3501 ], [ 3.2393, 43.3495 ], [ 3.239, 43.3494 ], [ 3.2389, 43.3493 ], [ 3.2379, 43.3491 ], [ 3.2377, 43.3492 ], [ 3.2374, 43.3494 ], [ 3.2372, 43.3497 ], [ 3.2371, 43.3497 ], [ 3.237, 43.3498 ], [ 3.2369, 43.3497 ], [ 3.2368, 43.3496 ], [ 3.2366, 43.3496 ], [ 3.2361, 43.3492 ], [ 3.2365, 43.3488 ], [ 3.2365, 43.3488 ], [ 3.2366, 43.3487 ], [ 3.2367, 43.3486 ], [ 3.2368, 43.3486 ], [ 3.237, 43.3483 ], [ 3.2372, 43.3481 ], [ 3.2367, 43.3479 ], [ 3.2366, 43.3478 ], [ 3.2369, 43.3476 ], [ 3.2371, 43.3474 ], [ 3.2367, 43.3471 ], [ 3.2365, 43.3471 ], [ 3.2363, 43.3473 ], [ 3.2363, 43.3472 ], [ 3.2361, 43.3471 ], [ 3.2362, 43.347 ], [ 3.2355, 43.3466 ], [ 3.2359, 43.3462 ], [ 3.2364, 43.3455 ], [ 3.2366, 43.3453 ], [ 3.2364, 43.3452 ], [ 3.2362, 43.3451 ], [ 3.2359, 43.3451 ], [ 3.2358, 43.345 ], [ 3.2359, 43.3448 ], [ 3.2363, 43.3443 ], [ 3.2365, 43.3444 ], [ 3.2366, 43.3444 ], [ 3.2367, 43.3441 ], [ 3.2368, 43.3439 ], [ 3.2368, 43.3436 ], [ 3.237, 43.3434 ], [ 3.2368, 43.3434 ], [ 3.2363, 43.3432 ], [ 3.2362, 43.3432 ], [ 3.2354, 43.3431 ], [ 3.2348, 43.3431 ], [ 3.2346, 43.3431 ], [ 3.2344, 43.3431 ], [ 3.2343, 43.3432 ], [ 3.234, 43.3433 ], [ 3.2338, 43.3433 ], [ 3.2337, 43.3434 ], [ 3.2338, 43.3435 ], [ 3.2338, 43.3436 ], [ 3.2339, 43.3438 ], [ 3.234, 43.3442 ], [ 3.2341, 43.3447 ], [ 3.2341, 43.3448 ], [ 3.234, 43.3454 ], [ 3.2339, 43.3456 ], [ 3.2339, 43.3457 ], [ 3.2338, 43.3459 ], [ 3.2338, 43.3461 ], [ 3.2335, 43.3465 ], [ 3.2331, 43.347 ], [ 3.2335, 43.3471 ], [ 3.2342, 43.3474 ], [ 3.2343, 43.3475 ], [ 3.2355, 43.348 ], [ 3.2354, 43.3481 ], [ 3.2352, 43.3483 ], [ 3.235, 43.3486 ], [ 3.2348, 43.349 ], [ 3.2344, 43.3497 ], [ 3.2341, 43.35 ], [ 3.2338, 43.3504 ], [ 3.2335, 43.3508 ], [ 3.2334, 43.351 ], [ 3.2335, 43.3511 ], [ 3.2333, 43.3514 ], [ 3.2333, 43.3514 ], [ 3.2333, 43.3515 ], [ 3.2333, 43.3515 ], [ 3.2337, 43.3517 ], [ 3.2338, 43.3517 ], [ 3.2339, 43.3517 ], [ 3.234, 43.3517 ], [ 3.2342, 43.3514 ], [ 3.2343, 43.3514 ], [ 3.235, 43.3517 ], [ 3.2351, 43.3517 ], [ 3.2352, 43.3518 ], [ 3.2353, 43.352 ], [ 3.2355, 43.3521 ], [ 3.2356, 43.3519 ], [ 3.2362, 43.3522 ], [ 3.237, 43.3525 ], [ 3.2374, 43.3527 ], [ 3.2374, 43.3527 ], [ 3.2375, 43.3526 ], [ 3.2377, 43.3523 ], [ 3.2379, 43.3521 ], [ 3.2378, 43.352 ], [ 3.2371, 43.3517 ], [ 3.2373, 43.3515 ], [ 3.2378, 43.3508 ], [ 3.2383, 43.3502 ], [ 3.2389, 43.3504 ], [ 3.239, 43.3504 ], [ 3.2392, 43.3504 ], [ 3.2392, 43.3504 ], [ 3.2393, 43.3502 ] ] ], "type": "Polygon" }, "id": "16", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034002", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Iranget Grangette" }, "type": "Feature" }, { "bbox": [ 4.6382, 43.8051, 4.6484, 43.8134 ], "geometry": { "coordinates": [ [ [ 4.6387, 43.8096 ], [ 4.6393, 43.8096 ], [ 4.6398, 43.8096 ], [ 4.64, 43.8096 ], [ 4.6401, 43.8096 ], [ 4.6403, 43.8096 ], [ 4.6404, 43.8097 ], [ 4.6407, 43.8097 ], [ 4.6413, 43.8097 ], [ 4.6415, 43.8097 ], [ 4.6424, 43.8097 ], [ 4.6429, 43.8097 ], [ 4.6431, 43.8097 ], [ 4.6432, 43.8102 ], [ 4.6432, 43.8103 ], [ 4.6433, 43.8105 ], [ 4.6426, 43.8105 ], [ 4.6421, 43.8104 ], [ 4.6418, 43.8104 ], [ 4.6417, 43.8104 ], [ 4.6416, 43.8105 ], [ 4.6414, 43.8107 ], [ 4.6411, 43.8108 ], [ 4.641, 43.8109 ], [ 4.6409, 43.8109 ], [ 4.6408, 43.8109 ], [ 4.6407, 43.8109 ], [ 4.6405, 43.8108 ], [ 4.6404, 43.8108 ], [ 4.6404, 43.8108 ], [ 4.6407, 43.8111 ], [ 4.6413, 43.8115 ], [ 4.6414, 43.8117 ], [ 4.6413, 43.8119 ], [ 4.6413, 43.8121 ], [ 4.6413, 43.8122 ], [ 4.6411, 43.8126 ], [ 4.6409, 43.8128 ], [ 4.6408, 43.8129 ], [ 4.6408, 43.813 ], [ 4.6408, 43.8131 ], [ 4.6411, 43.8132 ], [ 4.6411, 43.8132 ], [ 4.6412, 43.8132 ], [ 4.6413, 43.8132 ], [ 4.6414, 43.8132 ], [ 4.6414, 43.8133 ], [ 4.6414, 43.8133 ], [ 4.6415, 43.8133 ], [ 4.6417, 43.8134 ], [ 4.6418, 43.8134 ], [ 4.642, 43.8132 ], [ 4.642, 43.8128 ], [ 4.642, 43.8128 ], [ 4.6421, 43.8126 ], [ 4.6422, 43.8126 ], [ 4.6422, 43.8126 ], [ 4.6417, 43.8122 ], [ 4.6416, 43.8122 ], [ 4.6417, 43.8122 ], [ 4.6414, 43.8121 ], [ 4.6414, 43.8119 ], [ 4.6415, 43.8117 ], [ 4.6417, 43.812 ], [ 4.6418, 43.812 ], [ 4.6423, 43.8123 ], [ 4.6426, 43.8125 ], [ 4.6427, 43.8125 ], [ 4.6428, 43.8125 ], [ 4.6429, 43.8126 ], [ 4.644, 43.8115 ], [ 4.6442, 43.8113 ], [ 4.6444, 43.8112 ], [ 4.6456, 43.81 ], [ 4.6457, 43.8099 ], [ 4.6458, 43.8099 ], [ 4.6462, 43.8097 ], [ 4.6461, 43.8096 ], [ 4.6462, 43.8096 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8094 ], [ 4.6465, 43.8088 ], [ 4.6466, 43.8085 ], [ 4.6466, 43.8084 ], [ 4.6467, 43.8082 ], [ 4.6467, 43.8082 ], [ 4.6475, 43.8075 ], [ 4.6475, 43.8075 ], [ 4.6477, 43.8074 ], [ 4.6477, 43.8073 ], [ 4.6478, 43.8072 ], [ 4.6481, 43.8066 ], [ 4.6482, 43.8063 ], [ 4.6483, 43.806 ], [ 4.6484, 43.8056 ], [ 4.6483, 43.8051 ], [ 4.6472, 43.8052 ], [ 4.6469, 43.8053 ], [ 4.6468, 43.8053 ], [ 4.6467, 43.8052 ], [ 4.6465, 43.8053 ], [ 4.6461, 43.8053 ], [ 4.6453, 43.8055 ], [ 4.6445, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6422, 43.8059 ], [ 4.6419, 43.806 ], [ 4.6418, 43.806 ], [ 4.6417, 43.806 ], [ 4.6416, 43.806 ], [ 4.6415, 43.806 ], [ 4.641, 43.8061 ], [ 4.6403, 43.8062 ], [ 4.6395, 43.8063 ], [ 4.6388, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6386, 43.8064 ], [ 4.6385, 43.8065 ], [ 4.6385, 43.8065 ], [ 4.6384, 43.8066 ], [ 4.6384, 43.8066 ], [ 4.6384, 43.8067 ], [ 4.6383, 43.8068 ], [ 4.6383, 43.8068 ], [ 4.6383, 43.8069 ], [ 4.6382, 43.807 ], [ 4.6382, 43.8071 ], [ 4.6383, 43.8076 ], [ 4.6383, 43.8081 ], [ 4.6385, 43.809 ], [ 4.6386, 43.8094 ], [ 4.6386, 43.8096 ], [ 4.6387, 43.8096 ] ] ], "type": "Polygon" }, "id": "17", "properties": { "code_commune": "30032", "code_departement": "30", "code_qp": "QP030013", "commune_qp": "Beaucaire", "nom_commune": "Beaucaire", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 4.0674, 44.1171, 4.0918, 44.1538 ], "geometry": { "coordinates": [ [ [ 4.0918, 44.1425 ], [ 4.0916, 44.1424 ], [ 4.0914, 44.1423 ], [ 4.0912, 44.1421 ], [ 4.091, 44.142 ], [ 4.0908, 44.1419 ], [ 4.0907, 44.1418 ], [ 4.0906, 44.1417 ], [ 4.0903, 44.1414 ], [ 4.0898, 44.1409 ], [ 4.0895, 44.1406 ], [ 4.089, 44.1403 ], [ 4.0886, 44.14 ], [ 4.0886, 44.14 ], [ 4.0884, 44.1399 ], [ 4.0883, 44.1398 ], [ 4.088, 44.1397 ], [ 4.0879, 44.1396 ], [ 4.0869, 44.1391 ], [ 4.0864, 44.1389 ], [ 4.0856, 44.1384 ], [ 4.0854, 44.1382 ], [ 4.0851, 44.138 ], [ 4.0847, 44.1377 ], [ 4.0846, 44.1377 ], [ 4.0845, 44.1377 ], [ 4.0843, 44.1377 ], [ 4.084, 44.1375 ], [ 4.084, 44.1373 ], [ 4.084, 44.1372 ], [ 4.084, 44.1371 ], [ 4.0838, 44.1364 ], [ 4.0837, 44.1363 ], [ 4.0837, 44.1362 ], [ 4.0835, 44.1355 ], [ 4.0835, 44.1354 ], [ 4.0836, 44.1353 ], [ 4.0835, 44.1351 ], [ 4.0841, 44.1351 ], [ 4.084, 44.135 ], [ 4.0841, 44.135 ], [ 4.0841, 44.1349 ], [ 4.0842, 44.1348 ], [ 4.0843, 44.1347 ], [ 4.0844, 44.1347 ], [ 4.0845, 44.1346 ], [ 4.0846, 44.1346 ], [ 4.0849, 44.1345 ], [ 4.085, 44.1344 ], [ 4.0851, 44.1343 ], [ 4.0851, 44.1342 ], [ 4.0852, 44.1341 ], [ 4.0853, 44.1341 ], [ 4.0853, 44.1341 ], [ 4.0853, 44.134 ], [ 4.0854, 44.134 ], [ 4.0854, 44.134 ], [ 4.0854, 44.1339 ], [ 4.0855, 44.1339 ], [ 4.0856, 44.1338 ], [ 4.0856, 44.1337 ], [ 4.0858, 44.1335 ], [ 4.0856, 44.1335 ], [ 4.0858, 44.1333 ], [ 4.0856, 44.1331 ], [ 4.0856, 44.133 ], [ 4.0854, 44.1328 ], [ 4.0854, 44.1328 ], [ 4.0855, 44.1328 ], [ 4.0852, 44.1324 ], [ 4.0849, 44.1325 ], [ 4.0845, 44.1326 ], [ 4.0841, 44.1327 ], [ 4.084, 44.1327 ], [ 4.0839, 44.1327 ], [ 4.0837, 44.1327 ], [ 4.0831, 44.1326 ], [ 4.083, 44.1326 ], [ 4.083, 44.1325 ], [ 4.0829, 44.1324 ], [ 4.0829, 44.1323 ], [ 4.0828, 44.1323 ], [ 4.0826, 44.132 ], [ 4.0825, 44.1319 ], [ 4.0824, 44.1318 ], [ 4.0824, 44.1318 ], [ 4.0823, 44.1318 ], [ 4.0821, 44.1317 ], [ 4.0819, 44.1316 ], [ 4.0818, 44.1315 ], [ 4.0818, 44.1316 ], [ 4.0816, 44.1316 ], [ 4.0814, 44.1317 ], [ 4.0814, 44.1317 ], [ 4.0813, 44.1316 ], [ 4.0812, 44.1316 ], [ 4.0812, 44.1316 ], [ 4.0811, 44.1316 ], [ 4.081, 44.1314 ], [ 4.0808, 44.1313 ], [ 4.0807, 44.1312 ], [ 4.0807, 44.1311 ], [ 4.0806, 44.131 ], [ 4.0806, 44.1308 ], [ 4.0805, 44.1307 ], [ 4.0805, 44.1304 ], [ 4.0805, 44.1303 ], [ 4.0805, 44.1302 ], [ 4.0804, 44.1301 ], [ 4.0804, 44.13 ], [ 4.0802, 44.1299 ], [ 4.0803, 44.1298 ], [ 4.0803, 44.1296 ], [ 4.0804, 44.1295 ], [ 4.0804, 44.1294 ], [ 4.0804, 44.1294 ], [ 4.0802, 44.1295 ], [ 4.0802, 44.1295 ], [ 4.0798, 44.1292 ], [ 4.0797, 44.1291 ], [ 4.0796, 44.1291 ], [ 4.0796, 44.129 ], [ 4.0794, 44.1289 ], [ 4.0793, 44.1288 ], [ 4.0793, 44.1287 ], [ 4.0792, 44.1286 ], [ 4.0792, 44.1285 ], [ 4.0791, 44.1285 ], [ 4.0791, 44.1283 ], [ 4.079, 44.1281 ], [ 4.0791, 44.1279 ], [ 4.0792, 44.1274 ], [ 4.0792, 44.1274 ], [ 4.0792, 44.1273 ], [ 4.0795, 44.1269 ], [ 4.0797, 44.1267 ], [ 4.0797, 44.1266 ], [ 4.0798, 44.1265 ], [ 4.0799, 44.1263 ], [ 4.0799, 44.1262 ], [ 4.0801, 44.125 ], [ 4.0802, 44.1246 ], [ 4.0802, 44.1245 ], [ 4.0803, 44.124 ], [ 4.0804, 44.1239 ], [ 4.0805, 44.1238 ], [ 4.0806, 44.1237 ], [ 4.0816, 44.1236 ], [ 4.0819, 44.1236 ], [ 4.0821, 44.1236 ], [ 4.0822, 44.1236 ], [ 4.0823, 44.1236 ], [ 4.0825, 44.1236 ], [ 4.0828, 44.1236 ], [ 4.0829, 44.1236 ], [ 4.083, 44.1234 ], [ 4.0832, 44.1229 ], [ 4.0834, 44.1225 ], [ 4.0846, 44.1228 ], [ 4.0847, 44.1227 ], [ 4.0847, 44.1219 ], [ 4.0847, 44.1213 ], [ 4.0845, 44.1213 ], [ 4.0845, 44.1213 ], [ 4.0843, 44.1213 ], [ 4.0841, 44.1213 ], [ 4.0839, 44.1212 ], [ 4.0836, 44.1212 ], [ 4.0834, 44.1212 ], [ 4.0831, 44.1212 ], [ 4.0828, 44.1212 ], [ 4.0825, 44.1212 ], [ 4.0822, 44.1212 ], [ 4.0819, 44.1212 ], [ 4.0816, 44.1212 ], [ 4.0815, 44.1212 ], [ 4.0815, 44.1213 ], [ 4.0809, 44.1214 ], [ 4.0806, 44.1213 ], [ 4.0805, 44.1199 ], [ 4.0805, 44.1196 ], [ 4.0805, 44.1196 ], [ 4.0804, 44.1196 ], [ 4.0803, 44.1196 ], [ 4.0802, 44.1193 ], [ 4.0801, 44.1192 ], [ 4.0802, 44.1191 ], [ 4.0804, 44.1189 ], [ 4.0809, 44.1187 ], [ 4.0807, 44.1184 ], [ 4.0805, 44.1183 ], [ 4.0805, 44.1182 ], [ 4.0804, 44.1182 ], [ 4.0806, 44.1179 ], [ 4.0804, 44.1178 ], [ 4.0804, 44.1178 ], [ 4.0806, 44.1176 ], [ 4.0808, 44.1174 ], [ 4.0807, 44.1173 ], [ 4.0806, 44.1173 ], [ 4.0805, 44.1173 ], [ 4.0802, 44.1174 ], [ 4.0801, 44.1174 ], [ 4.0799, 44.1174 ], [ 4.0798, 44.1173 ], [ 4.0797, 44.1173 ], [ 4.0796, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.079, 44.1171 ], [ 4.0789, 44.1171 ], [ 4.0789, 44.1172 ], [ 4.0788, 44.1174 ], [ 4.0788, 44.1175 ], [ 4.0788, 44.1176 ], [ 4.0788, 44.1176 ], [ 4.0789, 44.1177 ], [ 4.0793, 44.118 ], [ 4.0794, 44.118 ], [ 4.0794, 44.1181 ], [ 4.0795, 44.1183 ], [ 4.0795, 44.1183 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0793, 44.1185 ], [ 4.0792, 44.1185 ], [ 4.0791, 44.1185 ], [ 4.079, 44.1185 ], [ 4.0788, 44.1186 ], [ 4.0787, 44.1186 ], [ 4.0784, 44.1187 ], [ 4.0782, 44.1187 ], [ 4.0782, 44.1189 ], [ 4.0781, 44.119 ], [ 4.0782, 44.1193 ], [ 4.0782, 44.1194 ], [ 4.0783, 44.1195 ], [ 4.0785, 44.1198 ], [ 4.0784, 44.1198 ], [ 4.0785, 44.12 ], [ 4.0782, 44.121 ], [ 4.078, 44.121 ], [ 4.0773, 44.121 ], [ 4.0768, 44.121 ], [ 4.0767, 44.121 ], [ 4.0765, 44.121 ], [ 4.0763, 44.1211 ], [ 4.076, 44.1212 ], [ 4.0756, 44.1214 ], [ 4.075, 44.1217 ], [ 4.0747, 44.1219 ], [ 4.0741, 44.1223 ], [ 4.0737, 44.1225 ], [ 4.0735, 44.1227 ], [ 4.0733, 44.1228 ], [ 4.0731, 44.123 ], [ 4.073, 44.1231 ], [ 4.0729, 44.1232 ], [ 4.0729, 44.1232 ], [ 4.0728, 44.1234 ], [ 4.0713, 44.1232 ], [ 4.0712, 44.123 ], [ 4.071, 44.1231 ], [ 4.0708, 44.1231 ], [ 4.0708, 44.1232 ], [ 4.0702, 44.1232 ], [ 4.07, 44.1232 ], [ 4.0699, 44.1232 ], [ 4.0699, 44.1232 ], [ 4.0698, 44.1233 ], [ 4.0698, 44.1233 ], [ 4.0697, 44.1233 ], [ 4.0696, 44.1233 ], [ 4.0694, 44.1233 ], [ 4.0693, 44.1233 ], [ 4.0693, 44.1234 ], [ 4.0692, 44.1235 ], [ 4.0692, 44.1236 ], [ 4.0692, 44.1237 ], [ 4.0692, 44.1237 ], [ 4.0692, 44.1238 ], [ 4.0692, 44.1239 ], [ 4.0692, 44.1239 ], [ 4.0692, 44.124 ], [ 4.0692, 44.1241 ], [ 4.0692, 44.1241 ], [ 4.0689, 44.1246 ], [ 4.0688, 44.1246 ], [ 4.0685, 44.1245 ], [ 4.0685, 44.1245 ], [ 4.0684, 44.1245 ], [ 4.0683, 44.1247 ], [ 4.0682, 44.1247 ], [ 4.0681, 44.1248 ], [ 4.068, 44.1248 ], [ 4.068, 44.1248 ], [ 4.068, 44.1249 ], [ 4.0679, 44.1249 ], [ 4.0679, 44.1251 ], [ 4.0679, 44.1251 ], [ 4.0679, 44.1252 ], [ 4.0678, 44.1252 ], [ 4.0677, 44.1253 ], [ 4.0676, 44.1253 ], [ 4.0679, 44.1256 ], [ 4.068, 44.1256 ], [ 4.0683, 44.1259 ], [ 4.0683, 44.1259 ], [ 4.0684, 44.1258 ], [ 4.0683, 44.1259 ], [ 4.0682, 44.126 ], [ 4.0682, 44.126 ], [ 4.0681, 44.1261 ], [ 4.0684, 44.1263 ], [ 4.0684, 44.1263 ], [ 4.0683, 44.1264 ], [ 4.0686, 44.1266 ], [ 4.0688, 44.1265 ], [ 4.069, 44.1264 ], [ 4.0693, 44.1261 ], [ 4.0695, 44.1259 ], [ 4.0698, 44.1256 ], [ 4.0699, 44.1256 ], [ 4.0702, 44.1258 ], [ 4.0703, 44.1258 ], [ 4.0703, 44.1259 ], [ 4.0703, 44.126 ], [ 4.0703, 44.126 ], [ 4.0703, 44.1261 ], [ 4.0703, 44.1262 ], [ 4.0703, 44.1262 ], [ 4.0702, 44.1263 ], [ 4.0702, 44.1264 ], [ 4.0703, 44.1265 ], [ 4.0703, 44.1266 ], [ 4.0703, 44.1266 ], [ 4.0702, 44.1266 ], [ 4.0702, 44.1268 ], [ 4.0701, 44.127 ], [ 4.0701, 44.1271 ], [ 4.0701, 44.1272 ], [ 4.0701, 44.1272 ], [ 4.0701, 44.1272 ], [ 4.0702, 44.1273 ], [ 4.0703, 44.1274 ], [ 4.0703, 44.1275 ], [ 4.0703, 44.1276 ], [ 4.0703, 44.1276 ], [ 4.0704, 44.1279 ], [ 4.0703, 44.1279 ], [ 4.0702, 44.128 ], [ 4.0702, 44.1281 ], [ 4.0704, 44.1282 ], [ 4.0704, 44.1282 ], [ 4.0703, 44.1283 ], [ 4.0703, 44.1284 ], [ 4.0702, 44.1284 ], [ 4.0701, 44.1286 ], [ 4.0701, 44.1285 ], [ 4.07, 44.1287 ], [ 4.0701, 44.1288 ], [ 4.0702, 44.1288 ], [ 4.0702, 44.1289 ], [ 4.0701, 44.1289 ], [ 4.07, 44.1292 ], [ 4.0699, 44.1294 ], [ 4.0698, 44.1293 ], [ 4.0695, 44.1294 ], [ 4.0694, 44.1295 ], [ 4.0693, 44.1295 ], [ 4.0691, 44.1295 ], [ 4.069, 44.1296 ], [ 4.069, 44.1296 ], [ 4.0686, 44.1296 ], [ 4.0684, 44.1297 ], [ 4.0682, 44.1297 ], [ 4.068, 44.1297 ], [ 4.0676, 44.1298 ], [ 4.0676, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.13 ], [ 4.0674, 44.1303 ], [ 4.0674, 44.1304 ], [ 4.0674, 44.1304 ], [ 4.0675, 44.1305 ], [ 4.0676, 44.1305 ], [ 4.0676, 44.1305 ], [ 4.0677, 44.1304 ], [ 4.0679, 44.1303 ], [ 4.068, 44.1303 ], [ 4.0683, 44.1303 ], [ 4.069, 44.1304 ], [ 4.0689, 44.1304 ], [ 4.0689, 44.1305 ], [ 4.0689, 44.1306 ], [ 4.069, 44.1307 ], [ 4.069, 44.1309 ], [ 4.069, 44.1313 ], [ 4.069, 44.1318 ], [ 4.0697, 44.1318 ], [ 4.0699, 44.1318 ], [ 4.0699, 44.1318 ], [ 4.0699, 44.1329 ], [ 4.0704, 44.1329 ], [ 4.0707, 44.133 ], [ 4.0707, 44.133 ], [ 4.0707, 44.1331 ], [ 4.0708, 44.1331 ], [ 4.0708, 44.1331 ], [ 4.0708, 44.1332 ], [ 4.0709, 44.1332 ], [ 4.0712, 44.1332 ], [ 4.0713, 44.1332 ], [ 4.0715, 44.1333 ], [ 4.0717, 44.1334 ], [ 4.0719, 44.1335 ], [ 4.0717, 44.1337 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1342 ], [ 4.0716, 44.1344 ], [ 4.0717, 44.1344 ], [ 4.0717, 44.1345 ], [ 4.0716, 44.1345 ], [ 4.0716, 44.1346 ], [ 4.0715, 44.1346 ], [ 4.0714, 44.1346 ], [ 4.0711, 44.1345 ], [ 4.071, 44.1345 ], [ 4.0709, 44.1345 ], [ 4.071, 44.1347 ], [ 4.0711, 44.1348 ], [ 4.0712, 44.135 ], [ 4.0715, 44.1354 ], [ 4.0715, 44.1356 ], [ 4.0716, 44.1357 ], [ 4.0716, 44.1358 ], [ 4.0716, 44.1359 ], [ 4.0717, 44.136 ], [ 4.0718, 44.1362 ], [ 4.0719, 44.1363 ], [ 4.0721, 44.1362 ], [ 4.0723, 44.136 ], [ 4.0725, 44.1359 ], [ 4.0726, 44.1357 ], [ 4.0727, 44.1356 ], [ 4.0729, 44.1356 ], [ 4.073, 44.1353 ], [ 4.0732, 44.1352 ], [ 4.0733, 44.1352 ], [ 4.0736, 44.135 ], [ 4.0737, 44.135 ], [ 4.0737, 44.1351 ], [ 4.0737, 44.1351 ], [ 4.0737, 44.1351 ], [ 4.0738, 44.1352 ], [ 4.0738, 44.1352 ], [ 4.0742, 44.1355 ], [ 4.0743, 44.1356 ], [ 4.0745, 44.1358 ], [ 4.0745, 44.1358 ], [ 4.0747, 44.1359 ], [ 4.0744, 44.1361 ], [ 4.0742, 44.1365 ], [ 4.0741, 44.1369 ], [ 4.074, 44.1372 ], [ 4.0739, 44.1375 ], [ 4.0739, 44.1377 ], [ 4.0739, 44.1381 ], [ 4.074, 44.1385 ], [ 4.0741, 44.1394 ], [ 4.0743, 44.1401 ], [ 4.0744, 44.1407 ], [ 4.0744, 44.1409 ], [ 4.0744, 44.141 ], [ 4.0744, 44.1412 ], [ 4.0745, 44.1414 ], [ 4.0746, 44.1418 ], [ 4.0749, 44.1422 ], [ 4.0749, 44.1424 ], [ 4.0749, 44.1425 ], [ 4.0749, 44.1425 ], [ 4.0747, 44.143 ], [ 4.0744, 44.1437 ], [ 4.0743, 44.1439 ], [ 4.0742, 44.144 ], [ 4.0741, 44.1441 ], [ 4.074, 44.1442 ], [ 4.0739, 44.1443 ], [ 4.0738, 44.1444 ], [ 4.0735, 44.1445 ], [ 4.0732, 44.1447 ], [ 4.073, 44.1449 ], [ 4.0728, 44.1449 ], [ 4.0727, 44.145 ], [ 4.0725, 44.145 ], [ 4.0721, 44.145 ], [ 4.0721, 44.1451 ], [ 4.0723, 44.1451 ], [ 4.0726, 44.1451 ], [ 4.0727, 44.1451 ], [ 4.0728, 44.1451 ], [ 4.0729, 44.1451 ], [ 4.0729, 44.1451 ], [ 4.073, 44.145 ], [ 4.0731, 44.145 ], [ 4.0732, 44.145 ], [ 4.0734, 44.145 ], [ 4.0737, 44.1449 ], [ 4.0739, 44.1448 ], [ 4.0741, 44.1447 ], [ 4.0742, 44.1446 ], [ 4.0743, 44.1447 ], [ 4.0745, 44.1445 ], [ 4.0747, 44.1444 ], [ 4.0747, 44.1444 ], [ 4.0756, 44.1438 ], [ 4.0758, 44.1437 ], [ 4.076, 44.1435 ], [ 4.0762, 44.1433 ], [ 4.0763, 44.1432 ], [ 4.0766, 44.1428 ], [ 4.0769, 44.1423 ], [ 4.0771, 44.1419 ], [ 4.078, 44.1398 ], [ 4.0782, 44.1394 ], [ 4.0779, 44.1395 ], [ 4.0776, 44.1395 ], [ 4.0775, 44.1394 ], [ 4.0775, 44.1393 ], [ 4.0778, 44.1388 ], [ 4.0774, 44.1388 ], [ 4.0774, 44.1385 ], [ 4.0769, 44.1383 ], [ 4.0771, 44.138 ], [ 4.0772, 44.1377 ], [ 4.0773, 44.1375 ], [ 4.0773, 44.1373 ], [ 4.0774, 44.1369 ], [ 4.0773, 44.1365 ], [ 4.0771, 44.1364 ], [ 4.0766, 44.1362 ], [ 4.0764, 44.1362 ], [ 4.0761, 44.136 ], [ 4.0753, 44.1354 ], [ 4.0755, 44.1351 ], [ 4.0758, 44.1349 ], [ 4.0762, 44.1347 ], [ 4.0764, 44.1346 ], [ 4.077, 44.1343 ], [ 4.0783, 44.1337 ], [ 4.0786, 44.134 ], [ 4.0786, 44.1341 ], [ 4.0788, 44.1344 ], [ 4.0792, 44.135 ], [ 4.0795, 44.1355 ], [ 4.0797, 44.1357 ], [ 4.0798, 44.136 ], [ 4.08, 44.1371 ], [ 4.08, 44.1375 ], [ 4.08, 44.1383 ], [ 4.0799, 44.1385 ], [ 4.0798, 44.1389 ], [ 4.0798, 44.1391 ], [ 4.0804, 44.1392 ], [ 4.0808, 44.1396 ], [ 4.0811, 44.1395 ], [ 4.0813, 44.1393 ], [ 4.0813, 44.1393 ], [ 4.0814, 44.1393 ], [ 4.082, 44.1394 ], [ 4.0822, 44.1395 ], [ 4.0825, 44.1397 ], [ 4.0828, 44.1398 ], [ 4.0832, 44.1399 ], [ 4.0835, 44.1401 ], [ 4.0835, 44.1402 ], [ 4.0835, 44.1403 ], [ 4.0837, 44.1403 ], [ 4.084, 44.1405 ], [ 4.0842, 44.1406 ], [ 4.0847, 44.1406 ], [ 4.0847, 44.1407 ], [ 4.0846, 44.1409 ], [ 4.0841, 44.1416 ], [ 4.0838, 44.1418 ], [ 4.0837, 44.1419 ], [ 4.0836, 44.1421 ], [ 4.0833, 44.1429 ], [ 4.0833, 44.143 ], [ 4.0833, 44.1431 ], [ 4.0833, 44.1435 ], [ 4.0833, 44.1436 ], [ 4.0832, 44.1437 ], [ 4.0831, 44.1438 ], [ 4.0829, 44.1441 ], [ 4.0825, 44.1445 ], [ 4.0824, 44.1448 ], [ 4.0823, 44.1449 ], [ 4.0823, 44.1449 ], [ 4.0822, 44.1453 ], [ 4.0822, 44.1454 ], [ 4.0822, 44.1454 ], [ 4.0822, 44.1455 ], [ 4.0822, 44.1455 ], [ 4.082, 44.1458 ], [ 4.0819, 44.1459 ], [ 4.0818, 44.1459 ], [ 4.0811, 44.1462 ], [ 4.0809, 44.1463 ], [ 4.0809, 44.1464 ], [ 4.0807, 44.1471 ], [ 4.0807, 44.1473 ], [ 4.0806, 44.1477 ], [ 4.0807, 44.1477 ], [ 4.0806, 44.148 ], [ 4.0808, 44.148 ], [ 4.0807, 44.1484 ], [ 4.0802, 44.1484 ], [ 4.0801, 44.1489 ], [ 4.0799, 44.1489 ], [ 4.0794, 44.149 ], [ 4.0794, 44.1491 ], [ 4.0795, 44.1492 ], [ 4.0796, 44.1494 ], [ 4.0798, 44.1497 ], [ 4.0803, 44.1496 ], [ 4.0804, 44.1499 ], [ 4.0804, 44.15 ], [ 4.0806, 44.1504 ], [ 4.0809, 44.1504 ], [ 4.0809, 44.1504 ], [ 4.0809, 44.1506 ], [ 4.0809, 44.1509 ], [ 4.0809, 44.1509 ], [ 4.0809, 44.1511 ], [ 4.081, 44.1514 ], [ 4.081, 44.1515 ], [ 4.0813, 44.1514 ], [ 4.0816, 44.1513 ], [ 4.0817, 44.1512 ], [ 4.0817, 44.1513 ], [ 4.0821, 44.1517 ], [ 4.0826, 44.152 ], [ 4.0826, 44.1521 ], [ 4.083, 44.1524 ], [ 4.0831, 44.1524 ], [ 4.0836, 44.1532 ], [ 4.0834, 44.1533 ], [ 4.0836, 44.1537 ], [ 4.0837, 44.1538 ], [ 4.0839, 44.1536 ], [ 4.0841, 44.1535 ], [ 4.0843, 44.1534 ], [ 4.0845, 44.1532 ], [ 4.0848, 44.1531 ], [ 4.0849, 44.153 ], [ 4.0849, 44.153 ], [ 4.085, 44.1529 ], [ 4.0849, 44.1528 ], [ 4.0849, 44.1527 ], [ 4.0848, 44.1527 ], [ 4.0847, 44.1525 ], [ 4.084, 44.1521 ], [ 4.0841, 44.1516 ], [ 4.0838, 44.1515 ], [ 4.0839, 44.151 ], [ 4.0838, 44.1507 ], [ 4.0838, 44.1504 ], [ 4.0836, 44.1502 ], [ 4.0836, 44.1502 ], [ 4.0835, 44.1502 ], [ 4.0835, 44.1502 ], [ 4.0834, 44.1502 ], [ 4.0833, 44.1502 ], [ 4.0832, 44.1498 ], [ 4.0831, 44.1495 ], [ 4.0831, 44.1494 ], [ 4.083, 44.1492 ], [ 4.083, 44.1492 ], [ 4.0829, 44.1492 ], [ 4.0829, 44.1491 ], [ 4.0829, 44.1491 ], [ 4.0828, 44.149 ], [ 4.0823, 44.149 ], [ 4.0821, 44.1491 ], [ 4.0821, 44.149 ], [ 4.0822, 44.1489 ], [ 4.0818, 44.1488 ], [ 4.0816, 44.1488 ], [ 4.0817, 44.1486 ], [ 4.0819, 44.148 ], [ 4.082, 44.1479 ], [ 4.0821, 44.148 ], [ 4.0822, 44.148 ], [ 4.0824, 44.148 ], [ 4.0824, 44.1479 ], [ 4.0825, 44.1475 ], [ 4.0825, 44.1475 ], [ 4.0827, 44.1475 ], [ 4.0828, 44.1475 ], [ 4.0833, 44.1475 ], [ 4.0833, 44.1474 ], [ 4.0833, 44.1474 ], [ 4.0834, 44.1473 ], [ 4.0835, 44.1472 ], [ 4.0837, 44.147 ], [ 4.084, 44.1467 ], [ 4.0843, 44.1465 ], [ 4.0838, 44.1463 ], [ 4.0839, 44.1462 ], [ 4.0839, 44.1462 ], [ 4.0843, 44.1459 ], [ 4.0844, 44.1459 ], [ 4.0845, 44.1458 ], [ 4.0845, 44.1457 ], [ 4.0845, 44.1455 ], [ 4.0851, 44.1455 ], [ 4.0851, 44.1454 ], [ 4.085, 44.1452 ], [ 4.0851, 44.1452 ], [ 4.0851, 44.145 ], [ 4.0851, 44.1446 ], [ 4.0858, 44.1443 ], [ 4.0861, 44.1439 ], [ 4.0865, 44.1439 ], [ 4.087, 44.1439 ], [ 4.0877, 44.1439 ], [ 4.0883, 44.1439 ], [ 4.0886, 44.1439 ], [ 4.0887, 44.1439 ], [ 4.0887, 44.1441 ], [ 4.0887, 44.1445 ], [ 4.0891, 44.1445 ], [ 4.0894, 44.1443 ], [ 4.0894, 44.1442 ], [ 4.0897, 44.1441 ], [ 4.0898, 44.144 ], [ 4.0899, 44.144 ], [ 4.0901, 44.144 ], [ 4.0905, 44.1437 ], [ 4.0905, 44.1437 ], [ 4.0906, 44.1437 ], [ 4.0907, 44.1437 ], [ 4.0909, 44.1436 ], [ 4.091, 44.1436 ], [ 4.091, 44.1436 ], [ 4.0911, 44.1436 ], [ 4.0911, 44.1435 ], [ 4.0912, 44.1435 ], [ 4.0912, 44.1434 ], [ 4.0913, 44.1433 ], [ 4.0913, 44.1433 ], [ 4.0915, 44.143 ], [ 4.0917, 44.1428 ], [ 4.0918, 44.1426 ], [ 4.0918, 44.1425 ] ] ], "type": "Polygon" }, "id": "18", "properties": { "code_commune": "30007", "code_departement": "30", "code_qp": "QP030001", "commune_qp": "Alès", "nom_commune": "Alès", "nom_qp": "Près Saint Jean - Cévennes - Tamaris - Cauvel-la Royale - Rochebelle - Centre ville" }, "type": "Feature" }, { "bbox": [ 4.3733, 43.8361, 4.3789, 43.8394 ], "geometry": { "coordinates": [ [ [ 4.3741, 43.8372 ], [ 4.3741, 43.8372 ], [ 4.374, 43.8372 ], [ 4.3739, 43.8373 ], [ 4.3738, 43.8375 ], [ 4.3737, 43.8377 ], [ 4.3733, 43.8383 ], [ 4.3745, 43.8382 ], [ 4.3752, 43.8381 ], [ 4.3753, 43.838 ], [ 4.3752, 43.8381 ], [ 4.3748, 43.8384 ], [ 4.3745, 43.8387 ], [ 4.3741, 43.839 ], [ 4.3746, 43.8391 ], [ 4.375, 43.8391 ], [ 4.3756, 43.8386 ], [ 4.3757, 43.8386 ], [ 4.3756, 43.838 ], [ 4.376, 43.838 ], [ 4.3762, 43.8376 ], [ 4.3765, 43.8374 ], [ 4.3768, 43.8375 ], [ 4.3767, 43.838 ], [ 4.3768, 43.838 ], [ 4.377, 43.8385 ], [ 4.377, 43.8388 ], [ 4.3771, 43.8394 ], [ 4.3773, 43.8394 ], [ 4.3777, 43.8394 ], [ 4.3777, 43.8391 ], [ 4.3781, 43.839 ], [ 4.3777, 43.8383 ], [ 4.378, 43.8382 ], [ 4.3778, 43.8379 ], [ 4.3779, 43.8379 ], [ 4.3789, 43.8378 ], [ 4.3788, 43.8367 ], [ 4.3784, 43.8369 ], [ 4.3781, 43.8371 ], [ 4.3776, 43.8366 ], [ 4.3774, 43.8363 ], [ 4.3768, 43.8369 ], [ 4.3764, 43.8372 ], [ 4.3759, 43.837 ], [ 4.376, 43.8369 ], [ 4.3761, 43.8368 ], [ 4.3764, 43.8365 ], [ 4.3762, 43.8364 ], [ 4.3758, 43.8361 ], [ 4.3739, 43.8369 ], [ 4.3741, 43.8372 ] ] ], "type": "Polygon" }, "id": "19", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030007", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Route De Beaucaire" }, "type": "Feature" }, { "bbox": [ 1.3974, 43.592, 1.4081, 43.5977 ], "geometry": { "coordinates": [ [ [ 1.4005, 43.5923 ], [ 1.3994, 43.592 ], [ 1.3994, 43.592 ], [ 1.3993, 43.5921 ], [ 1.3992, 43.5922 ], [ 1.3991, 43.5923 ], [ 1.3989, 43.5928 ], [ 1.3984, 43.5935 ], [ 1.3983, 43.5938 ], [ 1.3982, 43.5945 ], [ 1.398, 43.5944 ], [ 1.3979, 43.5947 ], [ 1.3978, 43.5948 ], [ 1.3977, 43.5953 ], [ 1.3977, 43.5954 ], [ 1.3976, 43.5959 ], [ 1.3975, 43.596 ], [ 1.3976, 43.596 ], [ 1.3976, 43.5962 ], [ 1.3976, 43.5963 ], [ 1.3975, 43.5967 ], [ 1.3974, 43.5972 ], [ 1.3974, 43.5977 ], [ 1.3975, 43.5975 ], [ 1.3976, 43.5975 ], [ 1.3977, 43.5974 ], [ 1.3977, 43.5974 ], [ 1.3982, 43.5971 ], [ 1.3987, 43.5969 ], [ 1.3991, 43.5967 ], [ 1.3992, 43.5967 ], [ 1.3993, 43.5967 ], [ 1.4, 43.5968 ], [ 1.4002, 43.5969 ], [ 1.4002, 43.5969 ], [ 1.4004, 43.5966 ], [ 1.4005, 43.5962 ], [ 1.4006, 43.5962 ], [ 1.4006, 43.5962 ], [ 1.4007, 43.5961 ], [ 1.4011, 43.5961 ], [ 1.4012, 43.5961 ], [ 1.4013, 43.5961 ], [ 1.4023, 43.5961 ], [ 1.4025, 43.5961 ], [ 1.403, 43.5965 ], [ 1.4038, 43.5965 ], [ 1.4039, 43.5959 ], [ 1.404, 43.5954 ], [ 1.4042, 43.5954 ], [ 1.4043, 43.5952 ], [ 1.4045, 43.5951 ], [ 1.4047, 43.5949 ], [ 1.4054, 43.5945 ], [ 1.4058, 43.5944 ], [ 1.4058, 43.5944 ], [ 1.4069, 43.5939 ], [ 1.4077, 43.5938 ], [ 1.4078, 43.5937 ], [ 1.4078, 43.5937 ], [ 1.4081, 43.5936 ], [ 1.4079, 43.5936 ], [ 1.407, 43.5934 ], [ 1.4043, 43.5929 ], [ 1.402, 43.5925 ], [ 1.4019, 43.5925 ], [ 1.4016, 43.5925 ], [ 1.4005, 43.5923 ] ] ], "type": "Polygon" }, "id": "20", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031012", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Cépière Beauregard" }, "type": "Feature" }, { "bbox": [ 4.3709, 43.825, 4.3853, 43.834 ], "geometry": { "coordinates": [ [ [ 4.3811, 43.8269 ], [ 4.3805, 43.8276 ], [ 4.3816, 43.8281 ], [ 4.3818, 43.8282 ], [ 4.3826, 43.8285 ], [ 4.3822, 43.8289 ], [ 4.3813, 43.8285 ], [ 4.3809, 43.829 ], [ 4.3805, 43.8294 ], [ 4.3802, 43.8298 ], [ 4.3798, 43.8297 ], [ 4.3795, 43.8295 ], [ 4.3793, 43.8293 ], [ 4.379, 43.8292 ], [ 4.3785, 43.8288 ], [ 4.3783, 43.8286 ], [ 4.378, 43.8288 ], [ 4.3776, 43.8287 ], [ 4.3772, 43.8285 ], [ 4.3771, 43.8285 ], [ 4.3771, 43.8284 ], [ 4.3773, 43.8283 ], [ 4.3776, 43.8279 ], [ 4.3768, 43.8273 ], [ 4.3771, 43.8271 ], [ 4.3768, 43.8267 ], [ 4.3766, 43.8268 ], [ 4.3765, 43.8266 ], [ 4.3764, 43.8267 ], [ 4.3763, 43.8267 ], [ 4.3761, 43.8265 ], [ 4.376, 43.8266 ], [ 4.3752, 43.827 ], [ 4.375, 43.8273 ], [ 4.3745, 43.8273 ], [ 4.3743, 43.8272 ], [ 4.3741, 43.827 ], [ 4.3735, 43.8266 ], [ 4.3745, 43.8257 ], [ 4.3734, 43.8251 ], [ 4.3733, 43.8251 ], [ 4.3732, 43.8251 ], [ 4.3731, 43.8253 ], [ 4.3722, 43.826 ], [ 4.3721, 43.826 ], [ 4.3719, 43.8261 ], [ 4.3717, 43.8264 ], [ 4.3717, 43.8265 ], [ 4.3718, 43.8266 ], [ 4.3718, 43.8267 ], [ 4.3717, 43.8268 ], [ 4.3717, 43.8268 ], [ 4.3717, 43.8268 ], [ 4.3719, 43.8269 ], [ 4.372, 43.827 ], [ 4.3719, 43.8271 ], [ 4.3719, 43.8272 ], [ 4.3718, 43.8273 ], [ 4.3716, 43.8274 ], [ 4.3716, 43.8274 ], [ 4.3713, 43.8275 ], [ 4.3711, 43.8276 ], [ 4.3709, 43.8277 ], [ 4.3712, 43.8279 ], [ 4.3715, 43.8277 ], [ 4.3717, 43.8278 ], [ 4.3719, 43.8278 ], [ 4.3721, 43.8276 ], [ 4.3724, 43.8278 ], [ 4.3732, 43.8283 ], [ 4.3742, 43.8277 ], [ 4.3743, 43.8276 ], [ 4.3743, 43.8275 ], [ 4.3744, 43.8275 ], [ 4.3748, 43.8275 ], [ 4.3752, 43.8275 ], [ 4.3756, 43.8277 ], [ 4.376, 43.828 ], [ 4.3787, 43.8296 ], [ 4.3793, 43.8299 ], [ 4.3801, 43.8304 ], [ 4.3796, 43.8309 ], [ 4.379, 43.8306 ], [ 4.3783, 43.8312 ], [ 4.3803, 43.8323 ], [ 4.3802, 43.8325 ], [ 4.3801, 43.8326 ], [ 4.3799, 43.833 ], [ 4.3798, 43.8331 ], [ 4.3809, 43.8337 ], [ 4.3815, 43.834 ], [ 4.3828, 43.8331 ], [ 4.3837, 43.8336 ], [ 4.384, 43.8332 ], [ 4.3834, 43.8328 ], [ 4.3823, 43.8321 ], [ 4.3825, 43.8319 ], [ 4.3818, 43.8316 ], [ 4.3812, 43.8313 ], [ 4.3811, 43.8312 ], [ 4.3817, 43.8308 ], [ 4.3819, 43.8306 ], [ 4.3825, 43.8299 ], [ 4.3827, 43.8297 ], [ 4.3819, 43.8294 ], [ 4.382, 43.8293 ], [ 4.382, 43.8293 ], [ 4.3826, 43.8291 ], [ 4.3831, 43.8288 ], [ 4.3832, 43.8287 ], [ 4.3836, 43.8284 ], [ 4.384, 43.8279 ], [ 4.3844, 43.8273 ], [ 4.3849, 43.8268 ], [ 4.3853, 43.8264 ], [ 4.385, 43.8264 ], [ 4.3848, 43.8264 ], [ 4.3845, 43.8263 ], [ 4.384, 43.8261 ], [ 4.3835, 43.8259 ], [ 4.3827, 43.8255 ], [ 4.3818, 43.8251 ], [ 4.3816, 43.825 ], [ 4.3814, 43.825 ], [ 4.3813, 43.8251 ], [ 4.3813, 43.8253 ], [ 4.3814, 43.8253 ], [ 4.3821, 43.8257 ], [ 4.382, 43.8258 ], [ 4.3816, 43.8264 ], [ 4.3811, 43.8269 ] ] ], "type": "Polygon" }, "id": "21", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030008", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Némausus-Jonquilles - Haute Magaille - Oliviers" }, "type": "Feature" }, { "bbox": [ 2.3249, 43.2066, 2.3357, 43.2114 ], "geometry": { "coordinates": [ [ [ 2.3351, 43.21 ], [ 2.335, 43.2098 ], [ 2.335, 43.2095 ], [ 2.3357, 43.2094 ], [ 2.3357, 43.2092 ], [ 2.3356, 43.2089 ], [ 2.3351, 43.2089 ], [ 2.335, 43.2089 ], [ 2.335, 43.2088 ], [ 2.335, 43.2087 ], [ 2.335, 43.2085 ], [ 2.335, 43.2081 ], [ 2.3349, 43.208 ], [ 2.3339, 43.2081 ], [ 2.3332, 43.2083 ], [ 2.3324, 43.2084 ], [ 2.3321, 43.2085 ], [ 2.3321, 43.2081 ], [ 2.3317, 43.2082 ], [ 2.3305, 43.2082 ], [ 2.3303, 43.2082 ], [ 2.3302, 43.2082 ], [ 2.3296, 43.2083 ], [ 2.3289, 43.2083 ], [ 2.3289, 43.2081 ], [ 2.3287, 43.208 ], [ 2.3285, 43.208 ], [ 2.3283, 43.2079 ], [ 2.3279, 43.2076 ], [ 2.3279, 43.2075 ], [ 2.3277, 43.2075 ], [ 2.3276, 43.2075 ], [ 2.3276, 43.2074 ], [ 2.3275, 43.2074 ], [ 2.3272, 43.2072 ], [ 2.327, 43.2071 ], [ 2.3269, 43.207 ], [ 2.3268, 43.2069 ], [ 2.3268, 43.2066 ], [ 2.3264, 43.2066 ], [ 2.3265, 43.2069 ], [ 2.3265, 43.207 ], [ 2.3265, 43.2071 ], [ 2.3265, 43.2073 ], [ 2.3258, 43.2073 ], [ 2.3249, 43.2073 ], [ 2.3251, 43.2074 ], [ 2.3252, 43.2076 ], [ 2.3255, 43.2078 ], [ 2.3258, 43.208 ], [ 2.3262, 43.2083 ], [ 2.3263, 43.2084 ], [ 2.3266, 43.2087 ], [ 2.3272, 43.2092 ], [ 2.3275, 43.2094 ], [ 2.3278, 43.2096 ], [ 2.3281, 43.2099 ], [ 2.3286, 43.2104 ], [ 2.3287, 43.2104 ], [ 2.3293, 43.2109 ], [ 2.3297, 43.2112 ], [ 2.3299, 43.2114 ], [ 2.3304, 43.2113 ], [ 2.3304, 43.2113 ], [ 2.3305, 43.2113 ], [ 2.3305, 43.211 ], [ 2.3304, 43.2095 ], [ 2.3305, 43.2095 ], [ 2.3313, 43.2094 ], [ 2.332, 43.2094 ], [ 2.3324, 43.2094 ], [ 2.3324, 43.21 ], [ 2.3333, 43.2099 ], [ 2.3333, 43.2101 ], [ 2.3338, 43.2101 ], [ 2.3351, 43.21 ] ] ], "type": "Polygon" }, "id": "22", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011003", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Le Viguier - Saint-Jacques" }, "type": "Feature" }, { "bbox": [ 1.3251, 43.6093, 1.3344, 43.6178 ], "geometry": { "coordinates": [ [ [ 1.3338, 43.6133 ], [ 1.3339, 43.6133 ], [ 1.3339, 43.6132 ], [ 1.3338, 43.6131 ], [ 1.3338, 43.613 ], [ 1.3339, 43.6129 ], [ 1.3344, 43.6128 ], [ 1.3342, 43.6123 ], [ 1.3341, 43.6122 ], [ 1.334, 43.6121 ], [ 1.3338, 43.6116 ], [ 1.3337, 43.6115 ], [ 1.3336, 43.6115 ], [ 1.3333, 43.6116 ], [ 1.3333, 43.6117 ], [ 1.3328, 43.6118 ], [ 1.3326, 43.6117 ], [ 1.3324, 43.6117 ], [ 1.3319, 43.6118 ], [ 1.3319, 43.6119 ], [ 1.332, 43.6122 ], [ 1.3319, 43.6123 ], [ 1.3319, 43.6123 ], [ 1.3317, 43.6123 ], [ 1.3315, 43.6123 ], [ 1.3316, 43.6124 ], [ 1.3311, 43.6125 ], [ 1.331, 43.6125 ], [ 1.331, 43.6124 ], [ 1.3309, 43.6123 ], [ 1.3308, 43.6121 ], [ 1.3306, 43.6119 ], [ 1.3293, 43.6109 ], [ 1.3274, 43.6094 ], [ 1.3273, 43.6093 ], [ 1.3272, 43.6093 ], [ 1.3271, 43.6093 ], [ 1.3269, 43.6094 ], [ 1.3267, 43.6094 ], [ 1.3265, 43.6093 ], [ 1.3263, 43.6093 ], [ 1.3262, 43.6093 ], [ 1.3257, 43.6096 ], [ 1.3256, 43.6097 ], [ 1.3256, 43.6099 ], [ 1.3253, 43.6099 ], [ 1.3251, 43.61 ], [ 1.3254, 43.6105 ], [ 1.3256, 43.6107 ], [ 1.3254, 43.6108 ], [ 1.3256, 43.6111 ], [ 1.3256, 43.6111 ], [ 1.3258, 43.611 ], [ 1.3262, 43.6108 ], [ 1.3264, 43.6111 ], [ 1.3265, 43.6114 ], [ 1.3266, 43.6119 ], [ 1.3266, 43.6121 ], [ 1.3267, 43.6122 ], [ 1.3268, 43.6122 ], [ 1.327, 43.6129 ], [ 1.3273, 43.6129 ], [ 1.3272, 43.613 ], [ 1.3275, 43.6132 ], [ 1.3274, 43.6133 ], [ 1.3273, 43.6134 ], [ 1.3268, 43.6136 ], [ 1.3269, 43.6138 ], [ 1.3271, 43.614 ], [ 1.3272, 43.6141 ], [ 1.3274, 43.6142 ], [ 1.328, 43.6143 ], [ 1.3283, 43.6144 ], [ 1.3281, 43.6145 ], [ 1.3279, 43.6146 ], [ 1.3282, 43.615 ], [ 1.3264, 43.6158 ], [ 1.3263, 43.6159 ], [ 1.3262, 43.616 ], [ 1.3266, 43.6163 ], [ 1.3272, 43.6167 ], [ 1.3273, 43.6169 ], [ 1.3274, 43.6172 ], [ 1.3274, 43.6174 ], [ 1.3272, 43.6176 ], [ 1.3272, 43.6178 ], [ 1.3281, 43.6177 ], [ 1.3288, 43.6175 ], [ 1.3294, 43.6173 ], [ 1.3293, 43.6172 ], [ 1.3292, 43.6169 ], [ 1.3291, 43.6165 ], [ 1.3288, 43.6154 ], [ 1.3287, 43.6151 ], [ 1.3287, 43.615 ], [ 1.3285, 43.6149 ], [ 1.3288, 43.6148 ], [ 1.3309, 43.6145 ], [ 1.3315, 43.6144 ], [ 1.3314, 43.6143 ], [ 1.3312, 43.6139 ], [ 1.3311, 43.6134 ], [ 1.3314, 43.6132 ], [ 1.3316, 43.6132 ], [ 1.3318, 43.6129 ], [ 1.3319, 43.6128 ], [ 1.3321, 43.6131 ], [ 1.3323, 43.6137 ], [ 1.3323, 43.6137 ], [ 1.3327, 43.6136 ], [ 1.333, 43.6136 ], [ 1.3333, 43.6135 ], [ 1.3338, 43.6133 ] ] ], "type": "Polygon" }, "id": "23", "properties": { "code_commune": "31149", "code_departement": "31", "code_qp": "QP031005", "commune_qp": "Colomiers", "nom_commune": "Colomiers", "nom_qp": "Val D'Aran - Poitou - Pyrénées" }, "type": "Feature" }, { "bbox": [ 1.0964, 44.098, 1.1024, 44.1054 ], "geometry": { "coordinates": [ [ [ 1.1, 44.1052 ], [ 1.0996, 44.1045 ], [ 1.1001, 44.1044 ], [ 1.1, 44.1041 ], [ 1.1, 44.1041 ], [ 1.0999, 44.104 ], [ 1.1004, 44.104 ], [ 1.1016, 44.1039 ], [ 1.1017, 44.1032 ], [ 1.1017, 44.103 ], [ 1.1021, 44.1007 ], [ 1.1022, 44.1 ], [ 1.1022, 44.1 ], [ 1.1024, 44.0988 ], [ 1.1019, 44.0987 ], [ 1.1017, 44.0989 ], [ 1.1014, 44.0991 ], [ 1.1017, 44.0993 ], [ 1.1013, 44.0997 ], [ 1.1006, 44.0991 ], [ 1.1006, 44.099 ], [ 1.101, 44.0988 ], [ 1.1, 44.098 ], [ 1.0997, 44.0981 ], [ 1.0996, 44.0981 ], [ 1.0995, 44.0982 ], [ 1.0995, 44.0982 ], [ 1.0995, 44.0983 ], [ 1.1015, 44.0999 ], [ 1.1016, 44.1001 ], [ 1.1011, 44.1001 ], [ 1.1002, 44.1004 ], [ 1.0999, 44.1004 ], [ 1.0998, 44.1005 ], [ 1.0994, 44.1006 ], [ 1.0994, 44.1008 ], [ 1.0996, 44.1012 ], [ 1.099, 44.1013 ], [ 1.0986, 44.1014 ], [ 1.0984, 44.1014 ], [ 1.0983, 44.1012 ], [ 1.0983, 44.1011 ], [ 1.0978, 44.1013 ], [ 1.0977, 44.1013 ], [ 1.0967, 44.1017 ], [ 1.0969, 44.102 ], [ 1.098, 44.1018 ], [ 1.0984, 44.1027 ], [ 1.0979, 44.1028 ], [ 1.0978, 44.1029 ], [ 1.0975, 44.1036 ], [ 1.0974, 44.1036 ], [ 1.0974, 44.103 ], [ 1.0974, 44.1029 ], [ 1.0966, 44.1031 ], [ 1.0964, 44.1031 ], [ 1.0965, 44.1045 ], [ 1.0975, 44.1043 ], [ 1.0979, 44.1042 ], [ 1.0982, 44.1042 ], [ 1.0986, 44.1042 ], [ 1.0986, 44.1042 ], [ 1.0986, 44.1044 ], [ 1.0987, 44.1045 ], [ 1.0988, 44.1045 ], [ 1.0989, 44.1046 ], [ 1.099, 44.1047 ], [ 1.0992, 44.1047 ], [ 1.0993, 44.1048 ], [ 1.0994, 44.105 ], [ 1.0995, 44.1052 ], [ 1.0996, 44.1054 ], [ 1.1, 44.1052 ] ] ], "type": "Polygon" }, "id": "24", "properties": { "code_commune": "82112", "code_departement": "82", "code_qp": "QP082004", "commune_qp": "Moissac", "nom_commune": "Moissac", "nom_qp": "Sarlac" }, "type": "Feature" }, { "bbox": [ 1.4363, 43.5742, 1.4452, 43.584 ], "geometry": { "coordinates": [ [ [ 1.4389, 43.5821 ], [ 1.4392, 43.5824 ], [ 1.4394, 43.5832 ], [ 1.4396, 43.584 ], [ 1.4415, 43.5839 ], [ 1.4437, 43.5838 ], [ 1.4441, 43.5839 ], [ 1.4444, 43.5839 ], [ 1.4444, 43.5833 ], [ 1.4445, 43.5833 ], [ 1.4445, 43.5832 ], [ 1.4445, 43.5832 ], [ 1.4445, 43.5831 ], [ 1.4445, 43.5829 ], [ 1.4444, 43.5829 ], [ 1.4444, 43.5828 ], [ 1.4445, 43.5828 ], [ 1.4444, 43.5827 ], [ 1.4444, 43.5826 ], [ 1.4443, 43.5826 ], [ 1.4443, 43.5824 ], [ 1.4446, 43.5825 ], [ 1.4446, 43.5824 ], [ 1.4443, 43.5824 ], [ 1.4443, 43.5822 ], [ 1.4444, 43.5822 ], [ 1.4444, 43.5821 ], [ 1.4445, 43.5821 ], [ 1.4446, 43.5819 ], [ 1.4446, 43.5816 ], [ 1.4447, 43.5814 ], [ 1.4448, 43.5813 ], [ 1.4443, 43.5812 ], [ 1.4448, 43.5807 ], [ 1.4452, 43.5803 ], [ 1.4449, 43.5803 ], [ 1.4446, 43.5802 ], [ 1.4445, 43.5803 ], [ 1.4443, 43.5803 ], [ 1.4443, 43.5806 ], [ 1.444, 43.5806 ], [ 1.4436, 43.5806 ], [ 1.4435, 43.58 ], [ 1.4434, 43.5796 ], [ 1.4432, 43.5787 ], [ 1.4432, 43.5784 ], [ 1.4429, 43.578 ], [ 1.4431, 43.5778 ], [ 1.4435, 43.5777 ], [ 1.4441, 43.5771 ], [ 1.4446, 43.5765 ], [ 1.444, 43.576 ], [ 1.4439, 43.576 ], [ 1.443, 43.5761 ], [ 1.443, 43.5761 ], [ 1.4429, 43.5763 ], [ 1.4428, 43.5774 ], [ 1.4426, 43.5774 ], [ 1.4408, 43.5777 ], [ 1.4408, 43.5772 ], [ 1.4418, 43.5769 ], [ 1.4416, 43.5766 ], [ 1.4415, 43.5766 ], [ 1.4414, 43.5764 ], [ 1.4411, 43.5762 ], [ 1.4413, 43.5761 ], [ 1.4407, 43.5756 ], [ 1.4406, 43.5754 ], [ 1.4402, 43.5751 ], [ 1.4387, 43.5742 ], [ 1.438, 43.5744 ], [ 1.4374, 43.5746 ], [ 1.4377, 43.575 ], [ 1.4363, 43.5755 ], [ 1.4363, 43.5771 ], [ 1.4366, 43.5785 ], [ 1.4369, 43.5792 ], [ 1.4376, 43.5802 ], [ 1.4385, 43.5813 ], [ 1.4389, 43.5821 ] ] ], "type": "Polygon" }, "id": "25", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031010", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Empalot" }, "type": "Feature" }, { "bbox": [ 2.8651, 42.6886, 2.8724, 42.6985 ], "geometry": { "coordinates": [ [ [ 2.8724, 42.6973 ], [ 2.8723, 42.6972 ], [ 2.8721, 42.6972 ], [ 2.8718, 42.6972 ], [ 2.8716, 42.6972 ], [ 2.8714, 42.6972 ], [ 2.8712, 42.6971 ], [ 2.871, 42.6971 ], [ 2.871, 42.6971 ], [ 2.8709, 42.697 ], [ 2.8709, 42.6967 ], [ 2.8709, 42.6966 ], [ 2.8709, 42.6964 ], [ 2.8709, 42.6962 ], [ 2.8709, 42.696 ], [ 2.8709, 42.696 ], [ 2.8705, 42.696 ], [ 2.8705, 42.6959 ], [ 2.8704, 42.6958 ], [ 2.8704, 42.6956 ], [ 2.8704, 42.6955 ], [ 2.8703, 42.6953 ], [ 2.8703, 42.6952 ], [ 2.8702, 42.6949 ], [ 2.8703, 42.6948 ], [ 2.8703, 42.6946 ], [ 2.8703, 42.6945 ], [ 2.8704, 42.6945 ], [ 2.8705, 42.6944 ], [ 2.8706, 42.6944 ], [ 2.8707, 42.6944 ], [ 2.8707, 42.6943 ], [ 2.8708, 42.6943 ], [ 2.8709, 42.6942 ], [ 2.8709, 42.6942 ], [ 2.8709, 42.6941 ], [ 2.8708, 42.694 ], [ 2.8708, 42.694 ], [ 2.8707, 42.6938 ], [ 2.8705, 42.6935 ], [ 2.8704, 42.6933 ], [ 2.8703, 42.6932 ], [ 2.8703, 42.6932 ], [ 2.8703, 42.6932 ], [ 2.8702, 42.693 ], [ 2.8703, 42.6926 ], [ 2.8702, 42.6924 ], [ 2.8702, 42.692 ], [ 2.8703, 42.6921 ], [ 2.8706, 42.6918 ], [ 2.8705, 42.6918 ], [ 2.8697, 42.6914 ], [ 2.8693, 42.6912 ], [ 2.8695, 42.6908 ], [ 2.8698, 42.6904 ], [ 2.8702, 42.6901 ], [ 2.8702, 42.69 ], [ 2.8701, 42.69 ], [ 2.8701, 42.6899 ], [ 2.8698, 42.6897 ], [ 2.8693, 42.6894 ], [ 2.8681, 42.6889 ], [ 2.8665, 42.6886 ], [ 2.8659, 42.6892 ], [ 2.8657, 42.6891 ], [ 2.8651, 42.6897 ], [ 2.8661, 42.6902 ], [ 2.8663, 42.6902 ], [ 2.8665, 42.69 ], [ 2.8673, 42.6904 ], [ 2.8671, 42.6906 ], [ 2.867, 42.6907 ], [ 2.8667, 42.6908 ], [ 2.8664, 42.6908 ], [ 2.8669, 42.6917 ], [ 2.8668, 42.6917 ], [ 2.867, 42.6919 ], [ 2.867, 42.692 ], [ 2.8675, 42.692 ], [ 2.8676, 42.6922 ], [ 2.8677, 42.6923 ], [ 2.8679, 42.693 ], [ 2.8679, 42.693 ], [ 2.868, 42.693 ], [ 2.8681, 42.693 ], [ 2.8683, 42.6933 ], [ 2.8685, 42.6938 ], [ 2.8685, 42.6939 ], [ 2.8687, 42.6943 ], [ 2.8687, 42.6944 ], [ 2.8688, 42.6944 ], [ 2.8688, 42.6945 ], [ 2.869, 42.6944 ], [ 2.8692, 42.6949 ], [ 2.8693, 42.6951 ], [ 2.869, 42.6952 ], [ 2.8691, 42.6955 ], [ 2.8691, 42.6955 ], [ 2.8691, 42.6958 ], [ 2.869, 42.6958 ], [ 2.869, 42.696 ], [ 2.869, 42.696 ], [ 2.8684, 42.6961 ], [ 2.8685, 42.6963 ], [ 2.8685, 42.6963 ], [ 2.8685, 42.6967 ], [ 2.8685, 42.697 ], [ 2.8686, 42.6972 ], [ 2.8686, 42.6972 ], [ 2.8687, 42.6973 ], [ 2.8687, 42.6974 ], [ 2.8691, 42.6975 ], [ 2.8693, 42.6976 ], [ 2.8696, 42.6976 ], [ 2.8704, 42.6978 ], [ 2.8704, 42.6978 ], [ 2.8702, 42.6983 ], [ 2.8708, 42.6984 ], [ 2.8714, 42.6984 ], [ 2.8717, 42.6985 ], [ 2.8719, 42.6985 ], [ 2.872, 42.6982 ], [ 2.8723, 42.698 ], [ 2.8724, 42.6973 ] ] ], "type": "Polygon" }, "id": "26", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066002", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Saint Assiscle" }, "type": "Feature" }, { "bbox": [ 1.4277, 43.6221, 1.4323, 43.6243 ], "geometry": { "coordinates": [ [ [ 1.4277, 43.6222 ], [ 1.4277, 43.6225 ], [ 1.4278, 43.6233 ], [ 1.4277, 43.6235 ], [ 1.4277, 43.6236 ], [ 1.4277, 43.6237 ], [ 1.4277, 43.6238 ], [ 1.4282, 43.624 ], [ 1.4285, 43.6237 ], [ 1.4294, 43.624 ], [ 1.4295, 43.6235 ], [ 1.4305, 43.6238 ], [ 1.4305, 43.624 ], [ 1.4304, 43.6242 ], [ 1.4309, 43.6243 ], [ 1.431, 43.6242 ], [ 1.4311, 43.624 ], [ 1.4318, 43.6241 ], [ 1.432, 43.6237 ], [ 1.4322, 43.6233 ], [ 1.4323, 43.6232 ], [ 1.431, 43.6229 ], [ 1.4311, 43.6228 ], [ 1.4313, 43.6224 ], [ 1.4312, 43.6223 ], [ 1.4307, 43.6221 ], [ 1.4304, 43.6223 ], [ 1.4303, 43.6223 ], [ 1.4301, 43.6223 ], [ 1.43, 43.6223 ], [ 1.4298, 43.6223 ], [ 1.4298, 43.6223 ], [ 1.4288, 43.6223 ], [ 1.4277, 43.6222 ] ] ], "type": "Polygon" }, "id": "27", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031009", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Bourbaki" }, "type": "Feature" }, { "bbox": [ 2.8755, 42.7021, 2.8828, 42.7073 ], "geometry": { "coordinates": [ [ [ 2.8763, 42.7073 ], [ 2.8766, 42.7073 ], [ 2.8774, 42.7072 ], [ 2.8781, 42.7068 ], [ 2.8783, 42.7067 ], [ 2.8788, 42.7065 ], [ 2.879, 42.7064 ], [ 2.8803, 42.7064 ], [ 2.8804, 42.7064 ], [ 2.8803, 42.7065 ], [ 2.8803, 42.7066 ], [ 2.8814, 42.707 ], [ 2.8815, 42.7069 ], [ 2.8815, 42.7069 ], [ 2.8816, 42.7068 ], [ 2.8817, 42.7067 ], [ 2.8818, 42.7066 ], [ 2.8819, 42.7065 ], [ 2.882, 42.7064 ], [ 2.882, 42.7062 ], [ 2.8821, 42.7062 ], [ 2.8822, 42.7062 ], [ 2.8824, 42.7055 ], [ 2.8824, 42.7053 ], [ 2.8828, 42.7053 ], [ 2.8828, 42.7052 ], [ 2.8828, 42.7051 ], [ 2.8827, 42.7051 ], [ 2.8826, 42.705 ], [ 2.8825, 42.7049 ], [ 2.8825, 42.7044 ], [ 2.8823, 42.7043 ], [ 2.8822, 42.7043 ], [ 2.8821, 42.7043 ], [ 2.8821, 42.7042 ], [ 2.8819, 42.7042 ], [ 2.8816, 42.7041 ], [ 2.8815, 42.7041 ], [ 2.8813, 42.7044 ], [ 2.8812, 42.7044 ], [ 2.881, 42.7044 ], [ 2.8804, 42.7044 ], [ 2.8803, 42.7045 ], [ 2.8802, 42.7045 ], [ 2.8802, 42.7044 ], [ 2.8802, 42.7042 ], [ 2.8802, 42.7039 ], [ 2.8802, 42.7029 ], [ 2.8802, 42.7026 ], [ 2.8803, 42.7023 ], [ 2.8803, 42.7021 ], [ 2.88, 42.7021 ], [ 2.8796, 42.7022 ], [ 2.8795, 42.7022 ], [ 2.8794, 42.7023 ], [ 2.8792, 42.7024 ], [ 2.8789, 42.7026 ], [ 2.8786, 42.7027 ], [ 2.8784, 42.7028 ], [ 2.8783, 42.703 ], [ 2.8783, 42.7031 ], [ 2.8781, 42.7041 ], [ 2.8781, 42.7043 ], [ 2.8781, 42.7044 ], [ 2.8781, 42.7046 ], [ 2.8781, 42.7048 ], [ 2.878, 42.7049 ], [ 2.878, 42.7051 ], [ 2.8779, 42.7052 ], [ 2.8778, 42.7054 ], [ 2.8777, 42.7055 ], [ 2.8776, 42.7055 ], [ 2.8775, 42.7055 ], [ 2.8774, 42.7055 ], [ 2.8767, 42.7053 ], [ 2.8764, 42.7053 ], [ 2.8761, 42.7054 ], [ 2.8759, 42.7056 ], [ 2.8758, 42.7056 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7058 ], [ 2.8756, 42.7059 ], [ 2.8755, 42.7062 ], [ 2.8755, 42.7063 ], [ 2.8756, 42.7063 ], [ 2.876, 42.7069 ], [ 2.8763, 42.7073 ], [ 2.8763, 42.7073 ], [ 2.8763, 42.7073 ] ] ], "type": "Polygon" }, "id": "28", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066004", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Bas-Vernet Ancien Zus" }, "type": "Feature" }, { "bbox": [ 3.1999, 43.3319, 3.2299, 43.3509 ], "geometry": { "coordinates": [ [ [ 3.2251, 43.3387 ], [ 3.2251, 43.3386 ], [ 3.2253, 43.3386 ], [ 3.2257, 43.3386 ], [ 3.2259, 43.3385 ], [ 3.2261, 43.3384 ], [ 3.2264, 43.3383 ], [ 3.2264, 43.3382 ], [ 3.2262, 43.3378 ], [ 3.2262, 43.3377 ], [ 3.2262, 43.3377 ], [ 3.2262, 43.3377 ], [ 3.2265, 43.3375 ], [ 3.2265, 43.3375 ], [ 3.2264, 43.3373 ], [ 3.2272, 43.3368 ], [ 3.2273, 43.3368 ], [ 3.2279, 43.3364 ], [ 3.2282, 43.3366 ], [ 3.2287, 43.337 ], [ 3.2294, 43.3365 ], [ 3.2296, 43.3364 ], [ 3.2298, 43.3362 ], [ 3.2299, 43.3361 ], [ 3.2299, 43.3361 ], [ 3.2298, 43.3358 ], [ 3.2295, 43.3352 ], [ 3.2294, 43.3349 ], [ 3.2288, 43.3345 ], [ 3.2272, 43.3355 ], [ 3.227, 43.3355 ], [ 3.2269, 43.3356 ], [ 3.2265, 43.3358 ], [ 3.2264, 43.3359 ], [ 3.2262, 43.336 ], [ 3.2257, 43.3363 ], [ 3.2254, 43.3365 ], [ 3.2249, 43.3368 ], [ 3.2247, 43.3368 ], [ 3.223, 43.3378 ], [ 3.2228, 43.3379 ], [ 3.2219, 43.3384 ], [ 3.2214, 43.3387 ], [ 3.2212, 43.3389 ], [ 3.2206, 43.3392 ], [ 3.2203, 43.3394 ], [ 3.2203, 43.3393 ], [ 3.2202, 43.3391 ], [ 3.2202, 43.3391 ], [ 3.2197, 43.3391 ], [ 3.2196, 43.3391 ], [ 3.2195, 43.3392 ], [ 3.2195, 43.3392 ], [ 3.2195, 43.3392 ], [ 3.2189, 43.339 ], [ 3.2184, 43.3389 ], [ 3.2184, 43.3388 ], [ 3.2188, 43.3384 ], [ 3.2191, 43.338 ], [ 3.2191, 43.338 ], [ 3.2191, 43.3379 ], [ 3.2191, 43.3376 ], [ 3.219, 43.3374 ], [ 3.219, 43.3371 ], [ 3.2189, 43.337 ], [ 3.2189, 43.3352 ], [ 3.2219, 43.3348 ], [ 3.2221, 43.3346 ], [ 3.2222, 43.3344 ], [ 3.2228, 43.3339 ], [ 3.2235, 43.3334 ], [ 3.224, 43.3331 ], [ 3.2239, 43.3331 ], [ 3.2226, 43.3332 ], [ 3.2215, 43.3332 ], [ 3.2191, 43.3327 ], [ 3.2177, 43.3322 ], [ 3.2161, 43.3329 ], [ 3.2158, 43.333 ], [ 3.2153, 43.3335 ], [ 3.2134, 43.3351 ], [ 3.2128, 43.3355 ], [ 3.2117, 43.3349 ], [ 3.2116, 43.3348 ], [ 3.2114, 43.3347 ], [ 3.2113, 43.3346 ], [ 3.211, 43.3345 ], [ 3.2107, 43.3344 ], [ 3.2106, 43.3344 ], [ 3.2105, 43.3345 ], [ 3.2104, 43.3345 ], [ 3.2101, 43.3347 ], [ 3.2101, 43.3346 ], [ 3.2099, 43.3345 ], [ 3.2095, 43.3342 ], [ 3.2092, 43.3345 ], [ 3.2088, 43.3347 ], [ 3.2087, 43.3348 ], [ 3.2081, 43.3349 ], [ 3.2075, 43.3351 ], [ 3.2074, 43.335 ], [ 3.207, 43.3347 ], [ 3.2068, 43.3345 ], [ 3.2064, 43.3342 ], [ 3.2055, 43.3335 ], [ 3.2051, 43.3332 ], [ 3.2047, 43.333 ], [ 3.2039, 43.3325 ], [ 3.2034, 43.3322 ], [ 3.2029, 43.332 ], [ 3.2027, 43.3319 ], [ 3.2026, 43.332 ], [ 3.2027, 43.3321 ], [ 3.2027, 43.3321 ], [ 3.203, 43.3325 ], [ 3.2037, 43.3333 ], [ 3.2036, 43.3333 ], [ 3.2014, 43.3342 ], [ 3.2014, 43.3342 ], [ 3.2012, 43.3343 ], [ 3.2012, 43.3343 ], [ 3.2012, 43.3344 ], [ 3.2011, 43.3345 ], [ 3.2009, 43.3347 ], [ 3.2008, 43.3348 ], [ 3.2004, 43.3351 ], [ 3.2002, 43.3354 ], [ 3.1999, 43.3356 ], [ 3.2007, 43.336 ], [ 3.2008, 43.336 ], [ 3.201, 43.3361 ], [ 3.2023, 43.3367 ], [ 3.2025, 43.3368 ], [ 3.2023, 43.337 ], [ 3.2022, 43.3371 ], [ 3.2019, 43.3374 ], [ 3.2019, 43.3375 ], [ 3.2019, 43.3376 ], [ 3.2018, 43.3376 ], [ 3.2019, 43.3377 ], [ 3.2019, 43.3377 ], [ 3.2019, 43.3377 ], [ 3.202, 43.3378 ], [ 3.2023, 43.3378 ], [ 3.2031, 43.3378 ], [ 3.2034, 43.338 ], [ 3.2035, 43.3382 ], [ 3.2037, 43.3385 ], [ 3.2043, 43.3384 ], [ 3.2044, 43.3384 ], [ 3.2046, 43.3386 ], [ 3.2047, 43.3387 ], [ 3.2052, 43.339 ], [ 3.2053, 43.3391 ], [ 3.2053, 43.3391 ], [ 3.2056, 43.3388 ], [ 3.2058, 43.3386 ], [ 3.2059, 43.3386 ], [ 3.2061, 43.3386 ], [ 3.2063, 43.3387 ], [ 3.2072, 43.3389 ], [ 3.2074, 43.339 ], [ 3.2088, 43.3395 ], [ 3.2088, 43.3396 ], [ 3.2087, 43.3397 ], [ 3.2086, 43.3399 ], [ 3.2086, 43.34 ], [ 3.2085, 43.3401 ], [ 3.2084, 43.3403 ], [ 3.2083, 43.3405 ], [ 3.2081, 43.3408 ], [ 3.208, 43.3411 ], [ 3.2079, 43.3419 ], [ 3.2078, 43.3426 ], [ 3.2082, 43.3426 ], [ 3.2081, 43.343 ], [ 3.2081, 43.3431 ], [ 3.2081, 43.3432 ], [ 3.2082, 43.3434 ], [ 3.2084, 43.3437 ], [ 3.2092, 43.3436 ], [ 3.2092, 43.3438 ], [ 3.2092, 43.344 ], [ 3.2093, 43.3443 ], [ 3.2094, 43.3443 ], [ 3.2096, 43.3443 ], [ 3.2096, 43.3445 ], [ 3.2095, 43.3446 ], [ 3.2096, 43.3447 ], [ 3.2096, 43.3448 ], [ 3.2092, 43.345 ], [ 3.2093, 43.3451 ], [ 3.2096, 43.3454 ], [ 3.2091, 43.3458 ], [ 3.2086, 43.3462 ], [ 3.2083, 43.3464 ], [ 3.2083, 43.3464 ], [ 3.2083, 43.3465 ], [ 3.2083, 43.3466 ], [ 3.2083, 43.3467 ], [ 3.2082, 43.3468 ], [ 3.208, 43.347 ], [ 3.2079, 43.347 ], [ 3.2078, 43.3471 ], [ 3.2082, 43.3475 ], [ 3.2084, 43.3477 ], [ 3.2085, 43.3478 ], [ 3.2086, 43.3479 ], [ 3.2081, 43.348 ], [ 3.208, 43.348 ], [ 3.2077, 43.3481 ], [ 3.2078, 43.3484 ], [ 3.2079, 43.3488 ], [ 3.2079, 43.3491 ], [ 3.2079, 43.3491 ], [ 3.2078, 43.3492 ], [ 3.2077, 43.3492 ], [ 3.2076, 43.3492 ], [ 3.2076, 43.3496 ], [ 3.2076, 43.3497 ], [ 3.2076, 43.35 ], [ 3.2076, 43.3501 ], [ 3.208, 43.35 ], [ 3.2083, 43.35 ], [ 3.2083, 43.3503 ], [ 3.2084, 43.3504 ], [ 3.2084, 43.3506 ], [ 3.2084, 43.3508 ], [ 3.2087, 43.3507 ], [ 3.209, 43.3506 ], [ 3.2093, 43.3506 ], [ 3.2094, 43.3506 ], [ 3.2095, 43.3505 ], [ 3.2096, 43.3505 ], [ 3.2096, 43.3503 ], [ 3.2096, 43.3502 ], [ 3.2096, 43.35 ], [ 3.2096, 43.3498 ], [ 3.2096, 43.3497 ], [ 3.2096, 43.3497 ], [ 3.2096, 43.3494 ], [ 3.2096, 43.3493 ], [ 3.2095, 43.3493 ], [ 3.2093, 43.3493 ], [ 3.209, 43.3492 ], [ 3.209, 43.3489 ], [ 3.2089, 43.3485 ], [ 3.2092, 43.3485 ], [ 3.2094, 43.3485 ], [ 3.2096, 43.3484 ], [ 3.2096, 43.3484 ], [ 3.2096, 43.3483 ], [ 3.2096, 43.3482 ], [ 3.2096, 43.3481 ], [ 3.2096, 43.3479 ], [ 3.2095, 43.3477 ], [ 3.2095, 43.3476 ], [ 3.2098, 43.3472 ], [ 3.2098, 43.3471 ], [ 3.2105, 43.3468 ], [ 3.2107, 43.3467 ], [ 3.2107, 43.3467 ], [ 3.2111, 43.3471 ], [ 3.2113, 43.347 ], [ 3.2115, 43.347 ], [ 3.2115, 43.3471 ], [ 3.2117, 43.347 ], [ 3.2117, 43.347 ], [ 3.2118, 43.3471 ], [ 3.2119, 43.347 ], [ 3.212, 43.3469 ], [ 3.212, 43.3469 ], [ 3.2121, 43.347 ], [ 3.2123, 43.347 ], [ 3.2126, 43.3472 ], [ 3.2127, 43.3472 ], [ 3.2128, 43.3473 ], [ 3.2129, 43.3472 ], [ 3.2133, 43.3471 ], [ 3.2133, 43.3471 ], [ 3.2133, 43.3473 ], [ 3.2134, 43.3472 ], [ 3.2135, 43.3473 ], [ 3.2135, 43.3474 ], [ 3.2136, 43.3474 ], [ 3.2138, 43.3474 ], [ 3.2137, 43.3475 ], [ 3.2139, 43.3475 ], [ 3.214, 43.3476 ], [ 3.214, 43.3476 ], [ 3.214, 43.3477 ], [ 3.2141, 43.3478 ], [ 3.2142, 43.3484 ], [ 3.2148, 43.3483 ], [ 3.2149, 43.3486 ], [ 3.2149, 43.3486 ], [ 3.2149, 43.349 ], [ 3.2151, 43.3489 ], [ 3.2151, 43.349 ], [ 3.2152, 43.349 ], [ 3.2153, 43.349 ], [ 3.2162, 43.3488 ], [ 3.2163, 43.3487 ], [ 3.2163, 43.3488 ], [ 3.2165, 43.3491 ], [ 3.2166, 43.3493 ], [ 3.2167, 43.3495 ], [ 3.2168, 43.3496 ], [ 3.217, 43.3499 ], [ 3.2171, 43.3501 ], [ 3.2173, 43.3502 ], [ 3.2173, 43.3503 ], [ 3.2174, 43.3503 ], [ 3.2174, 43.3504 ], [ 3.2176, 43.3505 ], [ 3.2177, 43.3505 ], [ 3.2185, 43.3507 ], [ 3.219, 43.3509 ], [ 3.2191, 43.3508 ], [ 3.219, 43.3506 ], [ 3.219, 43.3506 ], [ 3.2187, 43.3503 ], [ 3.2189, 43.3502 ], [ 3.2193, 43.3499 ], [ 3.2197, 43.3496 ], [ 3.2198, 43.3495 ], [ 3.22, 43.3493 ], [ 3.2203, 43.3491 ], [ 3.2206, 43.3489 ], [ 3.2207, 43.3489 ], [ 3.2206, 43.3488 ], [ 3.2209, 43.3485 ], [ 3.2212, 43.3483 ], [ 3.2213, 43.3482 ], [ 3.2218, 43.3484 ], [ 3.2218, 43.3485 ], [ 3.222, 43.3485 ], [ 3.2221, 43.3485 ], [ 3.2223, 43.3487 ], [ 3.2227, 43.3489 ], [ 3.2228, 43.3489 ], [ 3.2228, 43.3489 ], [ 3.2229, 43.3488 ], [ 3.2232, 43.3487 ], [ 3.2232, 43.3486 ], [ 3.2231, 43.3486 ], [ 3.223, 43.3485 ], [ 3.2229, 43.3484 ], [ 3.2219, 43.3479 ], [ 3.2215, 43.3477 ], [ 3.221, 43.3475 ], [ 3.2205, 43.3472 ], [ 3.2203, 43.3471 ], [ 3.22, 43.3469 ], [ 3.2197, 43.3468 ], [ 3.2195, 43.3467 ], [ 3.2194, 43.3466 ], [ 3.2191, 43.3465 ], [ 3.219, 43.3464 ], [ 3.219, 43.3463 ], [ 3.2192, 43.346 ], [ 3.2194, 43.3456 ], [ 3.2199, 43.3448 ], [ 3.2201, 43.3444 ], [ 3.2204, 43.344 ], [ 3.2207, 43.3435 ], [ 3.2212, 43.3425 ], [ 3.2213, 43.3424 ], [ 3.2215, 43.3421 ], [ 3.2218, 43.3416 ], [ 3.2219, 43.3414 ], [ 3.2221, 43.3414 ], [ 3.2225, 43.3415 ], [ 3.2225, 43.3415 ], [ 3.2231, 43.3417 ], [ 3.2236, 43.3418 ], [ 3.2237, 43.3418 ], [ 3.2238, 43.3417 ], [ 3.2248, 43.3419 ], [ 3.2248, 43.3418 ], [ 3.2244, 43.3415 ], [ 3.2241, 43.3413 ], [ 3.2243, 43.341 ], [ 3.2244, 43.3407 ], [ 3.224, 43.3404 ], [ 3.2246, 43.3399 ], [ 3.2245, 43.3399 ], [ 3.2242, 43.3397 ], [ 3.2241, 43.3396 ], [ 3.224, 43.3395 ], [ 3.2246, 43.3392 ], [ 3.2247, 43.3391 ], [ 3.2247, 43.339 ], [ 3.225, 43.3388 ], [ 3.2251, 43.3387 ] ] ], "type": "Polygon" }, "id": "29", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034001", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.8106, 43.6198, 3.8251, 43.6441 ], "geometry": { "coordinates": [ [ [ 3.8116, 43.6234 ], [ 3.8115, 43.6235 ], [ 3.8114, 43.6237 ], [ 3.8114, 43.6238 ], [ 3.8114, 43.6239 ], [ 3.8121, 43.6247 ], [ 3.8129, 43.6257 ], [ 3.8137, 43.6265 ], [ 3.8138, 43.6266 ], [ 3.8139, 43.6268 ], [ 3.814, 43.6268 ], [ 3.8143, 43.6269 ], [ 3.8156, 43.627 ], [ 3.8162, 43.627 ], [ 3.8168, 43.627 ], [ 3.8175, 43.627 ], [ 3.8176, 43.6283 ], [ 3.8176, 43.629 ], [ 3.8176, 43.6291 ], [ 3.8177, 43.6292 ], [ 3.8185, 43.6301 ], [ 3.8161, 43.6303 ], [ 3.8163, 43.6307 ], [ 3.8163, 43.6308 ], [ 3.8163, 43.6308 ], [ 3.8164, 43.631 ], [ 3.8164, 43.6313 ], [ 3.8163, 43.6314 ], [ 3.8162, 43.6316 ], [ 3.8159, 43.6318 ], [ 3.8152, 43.6323 ], [ 3.8148, 43.6326 ], [ 3.8144, 43.6329 ], [ 3.8141, 43.633 ], [ 3.8138, 43.6334 ], [ 3.8138, 43.6335 ], [ 3.8136, 43.6337 ], [ 3.8136, 43.6338 ], [ 3.8136, 43.6338 ], [ 3.8134, 43.634 ], [ 3.8131, 43.6342 ], [ 3.813, 43.6343 ], [ 3.8129, 43.6344 ], [ 3.8129, 43.635 ], [ 3.8128, 43.635 ], [ 3.8124, 43.6351 ], [ 3.8122, 43.6351 ], [ 3.8121, 43.6352 ], [ 3.812, 43.6352 ], [ 3.8122, 43.6352 ], [ 3.8124, 43.6352 ], [ 3.8127, 43.6352 ], [ 3.8131, 43.6352 ], [ 3.8133, 43.6352 ], [ 3.8134, 43.6353 ], [ 3.8136, 43.6354 ], [ 3.8137, 43.6355 ], [ 3.8138, 43.6356 ], [ 3.8138, 43.6358 ], [ 3.8139, 43.6364 ], [ 3.8139, 43.6364 ], [ 3.814, 43.6365 ], [ 3.8141, 43.6367 ], [ 3.8143, 43.6373 ], [ 3.8148, 43.6378 ], [ 3.8149, 43.6381 ], [ 3.8145, 43.6384 ], [ 3.8144, 43.6385 ], [ 3.8141, 43.6385 ], [ 3.8138, 43.6386 ], [ 3.8137, 43.6387 ], [ 3.8136, 43.6388 ], [ 3.8135, 43.6389 ], [ 3.8135, 43.639 ], [ 3.8117, 43.639 ], [ 3.8117, 43.6393 ], [ 3.8117, 43.6394 ], [ 3.8115, 43.6394 ], [ 3.8115, 43.6393 ], [ 3.8106, 43.6393 ], [ 3.8106, 43.6396 ], [ 3.8106, 43.6398 ], [ 3.8107, 43.64 ], [ 3.8107, 43.64 ], [ 3.8108, 43.6401 ], [ 3.8109, 43.6403 ], [ 3.8114, 43.6407 ], [ 3.812, 43.6413 ], [ 3.8123, 43.6415 ], [ 3.8129, 43.6418 ], [ 3.8137, 43.6421 ], [ 3.8157, 43.6428 ], [ 3.8156, 43.6429 ], [ 3.8158, 43.643 ], [ 3.8183, 43.644 ], [ 3.8189, 43.6441 ], [ 3.8208, 43.6433 ], [ 3.8215, 43.6433 ], [ 3.8216, 43.6432 ], [ 3.8206, 43.6429 ], [ 3.8205, 43.6429 ], [ 3.8205, 43.6428 ], [ 3.8202, 43.6427 ], [ 3.8201, 43.6427 ], [ 3.8201, 43.6426 ], [ 3.8201, 43.6424 ], [ 3.82, 43.6423 ], [ 3.8199, 43.6422 ], [ 3.8198, 43.6421 ], [ 3.8195, 43.6419 ], [ 3.8192, 43.6421 ], [ 3.8192, 43.6408 ], [ 3.8203, 43.6408 ], [ 3.8203, 43.6387 ], [ 3.8199, 43.6382 ], [ 3.8199, 43.6373 ], [ 3.8197, 43.6373 ], [ 3.8195, 43.6371 ], [ 3.8195, 43.6371 ], [ 3.8192, 43.6368 ], [ 3.8187, 43.6364 ], [ 3.8184, 43.6361 ], [ 3.8183, 43.6361 ], [ 3.8182, 43.6359 ], [ 3.8179, 43.6358 ], [ 3.8177, 43.6358 ], [ 3.8176, 43.6358 ], [ 3.8172, 43.636 ], [ 3.817, 43.6361 ], [ 3.8168, 43.6358 ], [ 3.8167, 43.6357 ], [ 3.8164, 43.6355 ], [ 3.8164, 43.6354 ], [ 3.8163, 43.6353 ], [ 3.8162, 43.6351 ], [ 3.8162, 43.6348 ], [ 3.8163, 43.6347 ], [ 3.8165, 43.6345 ], [ 3.8166, 43.6344 ], [ 3.8168, 43.6343 ], [ 3.8172, 43.6343 ], [ 3.8176, 43.6342 ], [ 3.8192, 43.6342 ], [ 3.8199, 43.6342 ], [ 3.8226, 43.6344 ], [ 3.8232, 43.6344 ], [ 3.8236, 43.6343 ], [ 3.8238, 43.6342 ], [ 3.8243, 43.6339 ], [ 3.8246, 43.6338 ], [ 3.8247, 43.6336 ], [ 3.8247, 43.6334 ], [ 3.8245, 43.6319 ], [ 3.8251, 43.6317 ], [ 3.8251, 43.6305 ], [ 3.8224, 43.6305 ], [ 3.8224, 43.6298 ], [ 3.8221, 43.6284 ], [ 3.8221, 43.6282 ], [ 3.822, 43.6282 ], [ 3.8219, 43.6276 ], [ 3.8217, 43.6269 ], [ 3.8216, 43.6262 ], [ 3.8216, 43.6262 ], [ 3.8214, 43.6259 ], [ 3.8214, 43.6258 ], [ 3.8213, 43.6255 ], [ 3.8203, 43.6239 ], [ 3.8193, 43.6224 ], [ 3.8189, 43.6218 ], [ 3.8186, 43.6215 ], [ 3.8177, 43.6198 ], [ 3.8172, 43.6201 ], [ 3.8154, 43.6212 ], [ 3.8148, 43.6215 ], [ 3.8148, 43.6215 ], [ 3.8131, 43.6226 ], [ 3.8116, 43.6234 ] ] ], "type": "Polygon" }, "id": "30", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034005", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Mosson" }, "type": "Feature" }, { "bbox": [ 3.8217, 43.6117, 3.8279, 43.6151 ], "geometry": { "coordinates": [ [ [ 3.8258, 43.6149 ], [ 3.8259, 43.6149 ], [ 3.8259, 43.6144 ], [ 3.8266, 43.614 ], [ 3.8267, 43.614 ], [ 3.8265, 43.6137 ], [ 3.8267, 43.6136 ], [ 3.8271, 43.6135 ], [ 3.8272, 43.6135 ], [ 3.8273, 43.6135 ], [ 3.8278, 43.6133 ], [ 3.8277, 43.613 ], [ 3.8274, 43.6127 ], [ 3.8272, 43.6125 ], [ 3.8274, 43.6125 ], [ 3.8278, 43.6124 ], [ 3.8279, 43.6124 ], [ 3.8278, 43.6123 ], [ 3.8278, 43.6123 ], [ 3.8277, 43.6122 ], [ 3.8276, 43.6121 ], [ 3.8275, 43.6122 ], [ 3.8274, 43.6121 ], [ 3.8271, 43.6122 ], [ 3.827, 43.6121 ], [ 3.8268, 43.6122 ], [ 3.8266, 43.6124 ], [ 3.8261, 43.6117 ], [ 3.8256, 43.6118 ], [ 3.8252, 43.6118 ], [ 3.8248, 43.6119 ], [ 3.8244, 43.612 ], [ 3.8242, 43.6121 ], [ 3.8238, 43.6123 ], [ 3.8237, 43.6124 ], [ 3.8233, 43.6125 ], [ 3.823, 43.6128 ], [ 3.8228, 43.6129 ], [ 3.8225, 43.6132 ], [ 3.8225, 43.6134 ], [ 3.8222, 43.6138 ], [ 3.8218, 43.6146 ], [ 3.8217, 43.6147 ], [ 3.8217, 43.6148 ], [ 3.8218, 43.6149 ], [ 3.8219, 43.615 ], [ 3.822, 43.6151 ], [ 3.8221, 43.6151 ], [ 3.8222, 43.6151 ], [ 3.8229, 43.615 ], [ 3.8236, 43.615 ], [ 3.8239, 43.6149 ], [ 3.8244, 43.6149 ], [ 3.8246, 43.6148 ], [ 3.8249, 43.6148 ], [ 3.8257, 43.6148 ], [ 3.8258, 43.6149 ] ] ], "type": "Polygon" }, "id": "31", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034004", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Celleneuve" }, "type": "Feature" }, { "bbox": [ 3.8326, 43.6122, 3.841, 43.6202 ], "geometry": { "coordinates": [ [ [ 3.8373, 43.6202 ], [ 3.8374, 43.6201 ], [ 3.8375, 43.62 ], [ 3.8377, 43.6197 ], [ 3.8381, 43.6193 ], [ 3.8382, 43.6192 ], [ 3.8392, 43.6179 ], [ 3.8394, 43.6179 ], [ 3.8399, 43.6172 ], [ 3.8402, 43.6168 ], [ 3.8408, 43.6163 ], [ 3.841, 43.6162 ], [ 3.8404, 43.6158 ], [ 3.8402, 43.6156 ], [ 3.84, 43.6155 ], [ 3.8399, 43.6154 ], [ 3.8398, 43.6152 ], [ 3.8395, 43.6146 ], [ 3.839, 43.6138 ], [ 3.839, 43.6137 ], [ 3.8389, 43.6136 ], [ 3.8388, 43.6128 ], [ 3.8387, 43.6126 ], [ 3.8384, 43.6124 ], [ 3.838, 43.6122 ], [ 3.8354, 43.6137 ], [ 3.8353, 43.6134 ], [ 3.8338, 43.6135 ], [ 3.8337, 43.6135 ], [ 3.8328, 43.6135 ], [ 3.8326, 43.6134 ], [ 3.8327, 43.614 ], [ 3.8327, 43.6147 ], [ 3.8344, 43.6146 ], [ 3.8348, 43.6158 ], [ 3.8348, 43.6159 ], [ 3.8348, 43.6159 ], [ 3.8347, 43.616 ], [ 3.8346, 43.616 ], [ 3.8345, 43.6161 ], [ 3.8342, 43.6165 ], [ 3.8347, 43.6167 ], [ 3.835, 43.6169 ], [ 3.8347, 43.6172 ], [ 3.8347, 43.6173 ], [ 3.8346, 43.6173 ], [ 3.8345, 43.6173 ], [ 3.8345, 43.6173 ], [ 3.8343, 43.6172 ], [ 3.8341, 43.6174 ], [ 3.8342, 43.6175 ], [ 3.8343, 43.6175 ], [ 3.8348, 43.6178 ], [ 3.8343, 43.618 ], [ 3.8355, 43.6188 ], [ 3.8355, 43.6189 ], [ 3.8357, 43.619 ], [ 3.8356, 43.619 ], [ 3.8373, 43.6202 ] ] ], "type": "Polygon" }, "id": "32", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034006", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Petit Bard Pergola" }, "type": "Feature" }, { "bbox": [ 1.3266, 43.4645, 1.3373, 43.4715 ], "geometry": { "coordinates": [ [ [ 1.3327, 43.4714 ], [ 1.3323, 43.4708 ], [ 1.3324, 43.4707 ], [ 1.3324, 43.4707 ], [ 1.335, 43.4698 ], [ 1.3351, 43.4698 ], [ 1.3352, 43.4698 ], [ 1.3356, 43.4705 ], [ 1.3358, 43.4707 ], [ 1.336, 43.4708 ], [ 1.3361, 43.4709 ], [ 1.3365, 43.471 ], [ 1.337, 43.4711 ], [ 1.3373, 43.4711 ], [ 1.337, 43.4704 ], [ 1.3369, 43.4703 ], [ 1.3369, 43.4703 ], [ 1.3363, 43.4689 ], [ 1.3361, 43.4685 ], [ 1.3354, 43.4687 ], [ 1.3351, 43.4682 ], [ 1.335, 43.4681 ], [ 1.3345, 43.4683 ], [ 1.3339, 43.4684 ], [ 1.3337, 43.4686 ], [ 1.3325, 43.469 ], [ 1.3323, 43.4687 ], [ 1.3322, 43.4687 ], [ 1.3318, 43.4686 ], [ 1.332, 43.4679 ], [ 1.332, 43.4678 ], [ 1.3321, 43.4678 ], [ 1.3321, 43.4677 ], [ 1.3321, 43.4677 ], [ 1.3321, 43.4676 ], [ 1.3319, 43.4675 ], [ 1.3319, 43.4673 ], [ 1.3316, 43.4673 ], [ 1.3315, 43.4673 ], [ 1.3313, 43.4671 ], [ 1.3314, 43.467 ], [ 1.3315, 43.4668 ], [ 1.3317, 43.4662 ], [ 1.3317, 43.466 ], [ 1.3318, 43.4657 ], [ 1.3305, 43.4655 ], [ 1.3301, 43.4655 ], [ 1.3299, 43.4654 ], [ 1.3295, 43.4653 ], [ 1.3291, 43.4652 ], [ 1.3303, 43.4649 ], [ 1.3304, 43.4648 ], [ 1.3303, 43.4647 ], [ 1.3303, 43.4647 ], [ 1.3302, 43.4645 ], [ 1.3301, 43.4645 ], [ 1.3293, 43.4647 ], [ 1.3289, 43.4648 ], [ 1.3288, 43.4648 ], [ 1.3286, 43.4646 ], [ 1.3284, 43.4645 ], [ 1.3267, 43.465 ], [ 1.3266, 43.4651 ], [ 1.3266, 43.4652 ], [ 1.3269, 43.4656 ], [ 1.3275, 43.4654 ], [ 1.3288, 43.4651 ], [ 1.3292, 43.4653 ], [ 1.3297, 43.4654 ], [ 1.3299, 43.4656 ], [ 1.33, 43.4658 ], [ 1.3298, 43.4659 ], [ 1.3301, 43.4666 ], [ 1.3303, 43.4671 ], [ 1.3303, 43.4672 ], [ 1.3304, 43.4673 ], [ 1.3304, 43.4673 ], [ 1.3308, 43.4674 ], [ 1.3308, 43.4674 ], [ 1.3306, 43.4682 ], [ 1.3306, 43.4682 ], [ 1.3309, 43.4683 ], [ 1.3308, 43.4688 ], [ 1.3308, 43.469 ], [ 1.3307, 43.4694 ], [ 1.3295, 43.4696 ], [ 1.3294, 43.4697 ], [ 1.3288, 43.4699 ], [ 1.3278, 43.4701 ], [ 1.3278, 43.4702 ], [ 1.3282, 43.4711 ], [ 1.3283, 43.4711 ], [ 1.3288, 43.471 ], [ 1.3298, 43.4708 ], [ 1.33, 43.4707 ], [ 1.33, 43.4706 ], [ 1.3302, 43.4707 ], [ 1.3303, 43.4706 ], [ 1.3304, 43.4708 ], [ 1.3304, 43.4709 ], [ 1.3305, 43.4708 ], [ 1.3306, 43.4707 ], [ 1.3307, 43.4709 ], [ 1.3308, 43.4709 ], [ 1.3311, 43.4715 ], [ 1.3312, 43.4715 ], [ 1.3316, 43.4713 ], [ 1.3317, 43.4713 ], [ 1.3321, 43.4712 ], [ 1.3323, 43.4715 ], [ 1.3327, 43.4714 ] ] ], "type": "Polygon" }, "id": "33", "properties": { "code_commune": "31395", "code_departement": "31", "code_qp": "QP031001", "commune_qp": "Muret", "nom_commune": "Muret", "nom_qp": "Saint Jean" }, "type": "Feature" }, { "bbox": [ 2.2268, 43.5938, 2.234, 43.5983 ], "geometry": { "coordinates": [ [ [ 2.2322, 43.5969 ], [ 2.2331, 43.5963 ], [ 2.2333, 43.5964 ], [ 2.234, 43.5958 ], [ 2.2338, 43.5955 ], [ 2.2337, 43.5955 ], [ 2.2331, 43.5949 ], [ 2.2328, 43.5951 ], [ 2.232, 43.5955 ], [ 2.2306, 43.5962 ], [ 2.2304, 43.5959 ], [ 2.2303, 43.5958 ], [ 2.2306, 43.5956 ], [ 2.2307, 43.5957 ], [ 2.2314, 43.5953 ], [ 2.2313, 43.5952 ], [ 2.2324, 43.5947 ], [ 2.2316, 43.5938 ], [ 2.2305, 43.5944 ], [ 2.2304, 43.5944 ], [ 2.2295, 43.5949 ], [ 2.2278, 43.5958 ], [ 2.2274, 43.5954 ], [ 2.2273, 43.5955 ], [ 2.2276, 43.5958 ], [ 2.2276, 43.5958 ], [ 2.2269, 43.5962 ], [ 2.2268, 43.5963 ], [ 2.2268, 43.5963 ], [ 2.227, 43.5964 ], [ 2.2279, 43.5968 ], [ 2.2282, 43.597 ], [ 2.2285, 43.5971 ], [ 2.2287, 43.5972 ], [ 2.2288, 43.5972 ], [ 2.2291, 43.5975 ], [ 2.2306, 43.5983 ], [ 2.231, 43.5979 ], [ 2.2312, 43.5979 ], [ 2.2312, 43.5978 ], [ 2.2318, 43.5973 ], [ 2.2322, 43.5969 ], [ 2.2322, 43.5969 ] ] ], "type": "Polygon" }, "id": "34", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081002", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Laden Petit Train" }, "type": "Feature" }, { "bbox": [ 2.3542, 43.2246, 2.3595, 43.2285 ], "geometry": { "coordinates": [ [ [ 2.3586, 43.2264 ], [ 2.3582, 43.226 ], [ 2.3575, 43.2254 ], [ 2.3572, 43.2252 ], [ 2.3571, 43.2251 ], [ 2.3565, 43.2255 ], [ 2.3564, 43.2254 ], [ 2.3563, 43.2254 ], [ 2.3561, 43.2252 ], [ 2.3558, 43.225 ], [ 2.3557, 43.2249 ], [ 2.3561, 43.2247 ], [ 2.3557, 43.2246 ], [ 2.3557, 43.2246 ], [ 2.3554, 43.2246 ], [ 2.3554, 43.2246 ], [ 2.3552, 43.2246 ], [ 2.3551, 43.2246 ], [ 2.355, 43.2247 ], [ 2.3546, 43.2246 ], [ 2.3544, 43.2247 ], [ 2.3547, 43.225 ], [ 2.355, 43.2253 ], [ 2.3546, 43.2256 ], [ 2.3544, 43.2258 ], [ 2.3542, 43.226 ], [ 2.3544, 43.2261 ], [ 2.3543, 43.2262 ], [ 2.3542, 43.2263 ], [ 2.3545, 43.2265 ], [ 2.3546, 43.2265 ], [ 2.3545, 43.2268 ], [ 2.3548, 43.2268 ], [ 2.3548, 43.2271 ], [ 2.3547, 43.2275 ], [ 2.3547, 43.2276 ], [ 2.3549, 43.2277 ], [ 2.3552, 43.2277 ], [ 2.3554, 43.2277 ], [ 2.3559, 43.2277 ], [ 2.3568, 43.2278 ], [ 2.3569, 43.2279 ], [ 2.357, 43.2279 ], [ 2.3571, 43.2279 ], [ 2.3579, 43.2284 ], [ 2.358, 43.2284 ], [ 2.3581, 43.2284 ], [ 2.3582, 43.2285 ], [ 2.3583, 43.2285 ], [ 2.3584, 43.2285 ], [ 2.3585, 43.2285 ], [ 2.3585, 43.2285 ], [ 2.3586, 43.2285 ], [ 2.3587, 43.2285 ], [ 2.3588, 43.2285 ], [ 2.359, 43.2285 ], [ 2.3595, 43.2283 ], [ 2.3592, 43.2277 ], [ 2.3589, 43.2271 ], [ 2.3588, 43.2269 ], [ 2.3586, 43.2267 ], [ 2.3586, 43.2265 ], [ 2.3586, 43.2264 ] ] ], "type": "Polygon" }, "id": "35", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011006", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Grazailles" }, "type": "Feature" }, { "bbox": [ 3.8767, 43.6256, 3.8824, 43.6304 ], "geometry": { "coordinates": [ [ [ 3.8817, 43.6275 ], [ 3.8818, 43.6273 ], [ 3.8819, 43.6269 ], [ 3.8821, 43.6265 ], [ 3.8824, 43.626 ], [ 3.8814, 43.6258 ], [ 3.8803, 43.6257 ], [ 3.8795, 43.6256 ], [ 3.8791, 43.6256 ], [ 3.879, 43.6256 ], [ 3.8792, 43.6261 ], [ 3.8792, 43.6262 ], [ 3.8794, 43.6267 ], [ 3.8794, 43.6268 ], [ 3.8795, 43.627 ], [ 3.8795, 43.6271 ], [ 3.8797, 43.6274 ], [ 3.8798, 43.6275 ], [ 3.8799, 43.6275 ], [ 3.8799, 43.6276 ], [ 3.8799, 43.6276 ], [ 3.8797, 43.6277 ], [ 3.8792, 43.6279 ], [ 3.879, 43.628 ], [ 3.8789, 43.628 ], [ 3.8789, 43.6281 ], [ 3.8788, 43.6282 ], [ 3.8787, 43.6282 ], [ 3.8781, 43.6282 ], [ 3.8781, 43.6284 ], [ 3.8781, 43.6285 ], [ 3.878, 43.6285 ], [ 3.8774, 43.6287 ], [ 3.8767, 43.6289 ], [ 3.8768, 43.629 ], [ 3.8771, 43.6296 ], [ 3.8775, 43.6295 ], [ 3.8775, 43.6295 ], [ 3.8776, 43.6295 ], [ 3.8776, 43.6295 ], [ 3.8777, 43.6296 ], [ 3.8779, 43.6295 ], [ 3.878, 43.6299 ], [ 3.8781, 43.63 ], [ 3.8782, 43.6301 ], [ 3.8783, 43.6302 ], [ 3.8785, 43.6303 ], [ 3.8787, 43.6304 ], [ 3.8788, 43.6304 ], [ 3.8789, 43.6303 ], [ 3.8789, 43.6303 ], [ 3.879, 43.6303 ], [ 3.8792, 43.6301 ], [ 3.8794, 43.6299 ], [ 3.8797, 43.6297 ], [ 3.8801, 43.6293 ], [ 3.8802, 43.6292 ], [ 3.8807, 43.6289 ], [ 3.8811, 43.6286 ], [ 3.8812, 43.6285 ], [ 3.8813, 43.6284 ], [ 3.8814, 43.6283 ], [ 3.8815, 43.6282 ], [ 3.8816, 43.6279 ], [ 3.8816, 43.6277 ], [ 3.8817, 43.6275 ] ] ], "type": "Polygon" }, "id": "36", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034014", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Aiguelongue" }, "type": "Feature" }, { "bbox": [ 1.3822, 43.5783, 1.3906, 43.5831 ], "geometry": { "coordinates": [ [ [ 1.3896, 43.5828 ], [ 1.3896, 43.5827 ], [ 1.3895, 43.5826 ], [ 1.3893, 43.5824 ], [ 1.3894, 43.5824 ], [ 1.3906, 43.5819 ], [ 1.3903, 43.5815 ], [ 1.3902, 43.5814 ], [ 1.3898, 43.5808 ], [ 1.3895, 43.5802 ], [ 1.3886, 43.5804 ], [ 1.3885, 43.5805 ], [ 1.3884, 43.5804 ], [ 1.3881, 43.58 ], [ 1.3883, 43.5793 ], [ 1.3884, 43.5792 ], [ 1.3885, 43.5792 ], [ 1.3888, 43.5791 ], [ 1.3889, 43.5791 ], [ 1.3889, 43.579 ], [ 1.3885, 43.5783 ], [ 1.387, 43.5787 ], [ 1.3871, 43.579 ], [ 1.387, 43.579 ], [ 1.3867, 43.5791 ], [ 1.3861, 43.5792 ], [ 1.386, 43.5792 ], [ 1.3859, 43.5792 ], [ 1.3855, 43.5791 ], [ 1.3855, 43.5791 ], [ 1.3854, 43.5791 ], [ 1.3853, 43.5791 ], [ 1.3852, 43.5792 ], [ 1.3851, 43.5794 ], [ 1.3848, 43.5793 ], [ 1.3847, 43.5792 ], [ 1.3847, 43.5792 ], [ 1.3841, 43.579 ], [ 1.3838, 43.5791 ], [ 1.3837, 43.5788 ], [ 1.3834, 43.5787 ], [ 1.3822, 43.579 ], [ 1.3822, 43.5791 ], [ 1.3822, 43.5791 ], [ 1.3823, 43.5792 ], [ 1.3824, 43.5793 ], [ 1.3825, 43.5795 ], [ 1.3826, 43.5796 ], [ 1.3826, 43.5798 ], [ 1.3827, 43.5799 ], [ 1.3828, 43.5799 ], [ 1.3833, 43.5801 ], [ 1.3833, 43.5801 ], [ 1.3835, 43.5801 ], [ 1.3836, 43.5802 ], [ 1.3839, 43.5803 ], [ 1.384, 43.5803 ], [ 1.3841, 43.5804 ], [ 1.3842, 43.5806 ], [ 1.3844, 43.5807 ], [ 1.3846, 43.5808 ], [ 1.3848, 43.5808 ], [ 1.3855, 43.5811 ], [ 1.3857, 43.5811 ], [ 1.3859, 43.5812 ], [ 1.3858, 43.5813 ], [ 1.3858, 43.5814 ], [ 1.3858, 43.5815 ], [ 1.386, 43.5822 ], [ 1.3861, 43.5831 ], [ 1.3896, 43.5828 ] ] ], "type": "Polygon" }, "id": "37", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031006", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Pradettes" }, "type": "Feature" }, { "bbox": [ 1.3909, 43.5583, 1.4183, 43.5864 ], "geometry": { "coordinates": [ [ [ 1.4183, 43.5824 ], [ 1.4174, 43.5806 ], [ 1.4168, 43.5804 ], [ 1.4165, 43.5798 ], [ 1.4173, 43.5796 ], [ 1.4169, 43.5789 ], [ 1.4167, 43.5784 ], [ 1.4171, 43.5783 ], [ 1.4164, 43.5766 ], [ 1.416, 43.5767 ], [ 1.4159, 43.5764 ], [ 1.4158, 43.5764 ], [ 1.4154, 43.5757 ], [ 1.4152, 43.5757 ], [ 1.415, 43.5758 ], [ 1.4147, 43.5753 ], [ 1.4137, 43.5736 ], [ 1.4123, 43.574 ], [ 1.4122, 43.5737 ], [ 1.4116, 43.5725 ], [ 1.4142, 43.5718 ], [ 1.4134, 43.5704 ], [ 1.4155, 43.5698 ], [ 1.4165, 43.5706 ], [ 1.4171, 43.571 ], [ 1.4175, 43.5713 ], [ 1.4176, 43.5714 ], [ 1.4179, 43.5718 ], [ 1.4181, 43.5718 ], [ 1.4182, 43.5717 ], [ 1.418, 43.5712 ], [ 1.4174, 43.5699 ], [ 1.4162, 43.5692 ], [ 1.4158, 43.5691 ], [ 1.4151, 43.5691 ], [ 1.4147, 43.569 ], [ 1.4137, 43.5685 ], [ 1.4122, 43.5674 ], [ 1.4115, 43.5665 ], [ 1.4107, 43.5666 ], [ 1.4107, 43.5668 ], [ 1.4103, 43.5668 ], [ 1.4102, 43.5669 ], [ 1.4075, 43.5674 ], [ 1.4062, 43.5674 ], [ 1.4026, 43.5674 ], [ 1.4026, 43.5666 ], [ 1.4025, 43.5665 ], [ 1.4024, 43.5662 ], [ 1.4021, 43.5662 ], [ 1.4021, 43.5662 ], [ 1.4018, 43.5662 ], [ 1.4018, 43.5656 ], [ 1.4016, 43.5656 ], [ 1.4016, 43.5652 ], [ 1.4026, 43.5652 ], [ 1.4026, 43.5646 ], [ 1.4036, 43.5646 ], [ 1.403, 43.5638 ], [ 1.4027, 43.5635 ], [ 1.4018, 43.5623 ], [ 1.4018, 43.5612 ], [ 1.4017, 43.561 ], [ 1.4027, 43.5606 ], [ 1.4018, 43.5593 ], [ 1.4016, 43.5589 ], [ 1.4011, 43.5583 ], [ 1.4005, 43.5584 ], [ 1.3985, 43.5589 ], [ 1.3961, 43.5594 ], [ 1.3952, 43.5597 ], [ 1.393, 43.5607 ], [ 1.3909, 43.5619 ], [ 1.3937, 43.5658 ], [ 1.3965, 43.5659 ], [ 1.3966, 43.5661 ], [ 1.3971, 43.5668 ], [ 1.3973, 43.5675 ], [ 1.3971, 43.5679 ], [ 1.397, 43.5684 ], [ 1.3963, 43.5684 ], [ 1.3962, 43.5693 ], [ 1.3962, 43.5704 ], [ 1.3959, 43.5704 ], [ 1.3959, 43.5711 ], [ 1.3954, 43.5711 ], [ 1.3954, 43.5712 ], [ 1.3952, 43.5714 ], [ 1.3949, 43.5713 ], [ 1.3949, 43.5717 ], [ 1.3951, 43.5718 ], [ 1.3951, 43.5722 ], [ 1.395, 43.5722 ], [ 1.395, 43.5722 ], [ 1.3949, 43.5722 ], [ 1.3946, 43.5722 ], [ 1.3945, 43.5722 ], [ 1.3944, 43.5722 ], [ 1.3944, 43.5723 ], [ 1.3944, 43.5724 ], [ 1.3943, 43.5726 ], [ 1.3943, 43.573 ], [ 1.3958, 43.5743 ], [ 1.3957, 43.5744 ], [ 1.3957, 43.5746 ], [ 1.3959, 43.5747 ], [ 1.3947, 43.5779 ], [ 1.3947, 43.5787 ], [ 1.3966, 43.5812 ], [ 1.3978, 43.5827 ], [ 1.3992, 43.5838 ], [ 1.3994, 43.5838 ], [ 1.4001, 43.5838 ], [ 1.4004, 43.5837 ], [ 1.4004, 43.583 ], [ 1.4003, 43.5823 ], [ 1.4007, 43.5822 ], [ 1.4012, 43.5818 ], [ 1.401, 43.5813 ], [ 1.3999, 43.5797 ], [ 1.3994, 43.5797 ], [ 1.3997, 43.5803 ], [ 1.3996, 43.5803 ], [ 1.3995, 43.5805 ], [ 1.3992, 43.5804 ], [ 1.399, 43.5803 ], [ 1.3988, 43.5803 ], [ 1.3978, 43.5804 ], [ 1.3975, 43.5804 ], [ 1.3971, 43.5802 ], [ 1.3967, 43.58 ], [ 1.3966, 43.58 ], [ 1.3966, 43.5799 ], [ 1.3965, 43.5798 ], [ 1.3965, 43.5788 ], [ 1.3965, 43.5787 ], [ 1.3964, 43.5786 ], [ 1.3965, 43.5785 ], [ 1.3967, 43.5785 ], [ 1.3976, 43.5785 ], [ 1.397, 43.5765 ], [ 1.3971, 43.5757 ], [ 1.3966, 43.5757 ], [ 1.3959, 43.5754 ], [ 1.3959, 43.5752 ], [ 1.3962, 43.575 ], [ 1.3964, 43.5749 ], [ 1.3966, 43.5748 ], [ 1.397, 43.5747 ], [ 1.399, 43.5746 ], [ 1.401, 43.5745 ], [ 1.4011, 43.5748 ], [ 1.401, 43.5753 ], [ 1.401, 43.5756 ], [ 1.4012, 43.5756 ], [ 1.4012, 43.5761 ], [ 1.402, 43.5761 ], [ 1.402, 43.5761 ], [ 1.4025, 43.5761 ], [ 1.4025, 43.5753 ], [ 1.402, 43.5753 ], [ 1.4021, 43.575 ], [ 1.4021, 43.5749 ], [ 1.4022, 43.5748 ], [ 1.4025, 43.5746 ], [ 1.4026, 43.5745 ], [ 1.4028, 43.5743 ], [ 1.4053, 43.5742 ], [ 1.4058, 43.5738 ], [ 1.4082, 43.5717 ], [ 1.4084, 43.5714 ], [ 1.4086, 43.5713 ], [ 1.4087, 43.5709 ], [ 1.4091, 43.5709 ], [ 1.4093, 43.5708 ], [ 1.4098, 43.5707 ], [ 1.41, 43.5706 ], [ 1.4108, 43.5705 ], [ 1.4111, 43.5712 ], [ 1.4113, 43.5716 ], [ 1.4096, 43.5743 ], [ 1.4092, 43.5749 ], [ 1.4079, 43.5772 ], [ 1.4059, 43.58 ], [ 1.4037, 43.5836 ], [ 1.4052, 43.5836 ], [ 1.4061, 43.5842 ], [ 1.4055, 43.5851 ], [ 1.4062, 43.5853 ], [ 1.4067, 43.5844 ], [ 1.4067, 43.5843 ], [ 1.4067, 43.5843 ], [ 1.4062, 43.5841 ], [ 1.4063, 43.5839 ], [ 1.4067, 43.5835 ], [ 1.4074, 43.5838 ], [ 1.4074, 43.584 ], [ 1.4081, 43.5845 ], [ 1.4084, 43.5846 ], [ 1.409, 43.5848 ], [ 1.41, 43.585 ], [ 1.4097, 43.5857 ], [ 1.4097, 43.5857 ], [ 1.4097, 43.5858 ], [ 1.4099, 43.5858 ], [ 1.4114, 43.5864 ], [ 1.4115, 43.5864 ], [ 1.4116, 43.5864 ], [ 1.412, 43.5854 ], [ 1.4128, 43.5855 ], [ 1.4135, 43.5858 ], [ 1.4145, 43.5862 ], [ 1.4162, 43.5851 ], [ 1.4155, 43.5843 ], [ 1.4149, 43.5834 ], [ 1.4154, 43.5833 ], [ 1.4164, 43.583 ], [ 1.4171, 43.5827 ], [ 1.4179, 43.5825 ], [ 1.4183, 43.5824 ] ] ], "type": "Polygon" }, "id": "38", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031007", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Grand Mirail" }, "type": "Feature" }, { "bbox": [ 2.1293, 43.9124, 2.1414, 43.919 ], "geometry": { "coordinates": [ [ [ 2.1316, 43.917 ], [ 2.1331, 43.9166 ], [ 2.1328, 43.9157 ], [ 2.1332, 43.9156 ], [ 2.1333, 43.9155 ], [ 2.1337, 43.9154 ], [ 2.1338, 43.9153 ], [ 2.1339, 43.9153 ], [ 2.1349, 43.915 ], [ 2.135, 43.915 ], [ 2.1358, 43.9147 ], [ 2.1357, 43.9146 ], [ 2.1355, 43.9138 ], [ 2.1354, 43.9137 ], [ 2.1361, 43.9137 ], [ 2.1369, 43.9152 ], [ 2.137, 43.9152 ], [ 2.1372, 43.9154 ], [ 2.1377, 43.9151 ], [ 2.1383, 43.9154 ], [ 2.1377, 43.9158 ], [ 2.1383, 43.9162 ], [ 2.1387, 43.916 ], [ 2.1389, 43.9159 ], [ 2.1387, 43.9157 ], [ 2.1398, 43.9152 ], [ 2.1389, 43.9145 ], [ 2.1387, 43.9144 ], [ 2.1386, 43.9142 ], [ 2.1385, 43.9141 ], [ 2.1397, 43.9139 ], [ 2.1397, 43.9137 ], [ 2.1401, 43.9137 ], [ 2.1406, 43.9136 ], [ 2.1414, 43.9136 ], [ 2.1414, 43.9133 ], [ 2.1414, 43.9131 ], [ 2.1413, 43.9131 ], [ 2.1413, 43.913 ], [ 2.1391, 43.9124 ], [ 2.139, 43.9126 ], [ 2.139, 43.9127 ], [ 2.139, 43.9128 ], [ 2.1391, 43.9128 ], [ 2.1386, 43.9129 ], [ 2.1383, 43.913 ], [ 2.1382, 43.913 ], [ 2.1383, 43.9132 ], [ 2.138, 43.9133 ], [ 2.1379, 43.9132 ], [ 2.1378, 43.9133 ], [ 2.1378, 43.9131 ], [ 2.1373, 43.9132 ], [ 2.1373, 43.9131 ], [ 2.137, 43.9131 ], [ 2.137, 43.913 ], [ 2.1365, 43.9131 ], [ 2.1365, 43.9129 ], [ 2.1362, 43.9129 ], [ 2.1362, 43.913 ], [ 2.136, 43.9131 ], [ 2.1353, 43.9132 ], [ 2.135, 43.9128 ], [ 2.1333, 43.9135 ], [ 2.1332, 43.9136 ], [ 2.1332, 43.9137 ], [ 2.133, 43.9138 ], [ 2.1332, 43.9143 ], [ 2.1332, 43.9143 ], [ 2.1327, 43.9144 ], [ 2.1326, 43.9145 ], [ 2.1326, 43.9145 ], [ 2.1325, 43.9146 ], [ 2.1323, 43.9148 ], [ 2.1324, 43.9148 ], [ 2.1323, 43.9149 ], [ 2.1319, 43.9154 ], [ 2.1316, 43.9157 ], [ 2.1316, 43.916 ], [ 2.1316, 43.916 ], [ 2.1316, 43.9161 ], [ 2.1315, 43.9161 ], [ 2.1313, 43.9161 ], [ 2.1313, 43.916 ], [ 2.1312, 43.916 ], [ 2.131, 43.9159 ], [ 2.1298, 43.9159 ], [ 2.1298, 43.9159 ], [ 2.1296, 43.9159 ], [ 2.1296, 43.9162 ], [ 2.1295, 43.9162 ], [ 2.1293, 43.9167 ], [ 2.1293, 43.9172 ], [ 2.1293, 43.9176 ], [ 2.1294, 43.918 ], [ 2.1296, 43.9184 ], [ 2.1299, 43.9188 ], [ 2.1301, 43.9189 ], [ 2.1302, 43.919 ], [ 2.1307, 43.919 ], [ 2.1307, 43.9187 ], [ 2.1307, 43.9186 ], [ 2.1307, 43.9184 ], [ 2.1308, 43.9183 ], [ 2.1309, 43.9182 ], [ 2.1312, 43.918 ], [ 2.1313, 43.918 ], [ 2.1314, 43.9179 ], [ 2.1315, 43.9178 ], [ 2.1316, 43.9177 ], [ 2.1316, 43.9176 ], [ 2.1316, 43.9174 ], [ 2.1316, 43.9173 ], [ 2.1316, 43.9171 ], [ 2.1315, 43.9171 ], [ 2.1316, 43.917 ] ] ], "type": "Polygon" }, "id": "39", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081007", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Veyrières Rayssac" }, "type": "Feature" }, { "bbox": [ 2.2374, 43.6027, 2.2451, 43.6086 ], "geometry": { "coordinates": [ [ [ 2.2376, 43.6086 ], [ 2.2378, 43.6086 ], [ 2.2378, 43.6086 ], [ 2.2381, 43.6085 ], [ 2.2383, 43.6085 ], [ 2.2382, 43.6081 ], [ 2.2382, 43.608 ], [ 2.2389, 43.6079 ], [ 2.2389, 43.6078 ], [ 2.2388, 43.6076 ], [ 2.2391, 43.6075 ], [ 2.2391, 43.6076 ], [ 2.2393, 43.608 ], [ 2.2394, 43.6083 ], [ 2.2409, 43.6079 ], [ 2.2418, 43.6076 ], [ 2.2417, 43.6074 ], [ 2.2422, 43.6073 ], [ 2.2424, 43.6067 ], [ 2.2425, 43.6065 ], [ 2.2425, 43.6064 ], [ 2.2425, 43.6059 ], [ 2.2424, 43.6056 ], [ 2.2426, 43.6056 ], [ 2.2426, 43.6052 ], [ 2.2425, 43.6048 ], [ 2.2429, 43.6048 ], [ 2.2429, 43.6052 ], [ 2.243, 43.6054 ], [ 2.243, 43.6058 ], [ 2.243, 43.606 ], [ 2.243, 43.6061 ], [ 2.2431, 43.6061 ], [ 2.2431, 43.6063 ], [ 2.2431, 43.6065 ], [ 2.2431, 43.6064 ], [ 2.2433, 43.6064 ], [ 2.2439, 43.6062 ], [ 2.2446, 43.6059 ], [ 2.2449, 43.6058 ], [ 2.2451, 43.6057 ], [ 2.2451, 43.6056 ], [ 2.2451, 43.6055 ], [ 2.2449, 43.6054 ], [ 2.2446, 43.6043 ], [ 2.2447, 43.6043 ], [ 2.2443, 43.6039 ], [ 2.2436, 43.6033 ], [ 2.2435, 43.6032 ], [ 2.2431, 43.603 ], [ 2.2431, 43.6027 ], [ 2.2429, 43.6027 ], [ 2.243, 43.603 ], [ 2.2428, 43.603 ], [ 2.2428, 43.6032 ], [ 2.2429, 43.6033 ], [ 2.2429, 43.6035 ], [ 2.2429, 43.6047 ], [ 2.2425, 43.6047 ], [ 2.2424, 43.604 ], [ 2.2423, 43.604 ], [ 2.2422, 43.604 ], [ 2.242, 43.604 ], [ 2.2419, 43.604 ], [ 2.2414, 43.604 ], [ 2.2407, 43.6042 ], [ 2.2407, 43.6043 ], [ 2.2408, 43.6048 ], [ 2.2409, 43.6051 ], [ 2.2409, 43.6053 ], [ 2.2408, 43.6053 ], [ 2.2405, 43.6055 ], [ 2.2403, 43.6056 ], [ 2.2401, 43.6058 ], [ 2.2393, 43.6059 ], [ 2.2387, 43.6061 ], [ 2.2384, 43.6062 ], [ 2.2388, 43.607 ], [ 2.2389, 43.6073 ], [ 2.2383, 43.6074 ], [ 2.2379, 43.6075 ], [ 2.2374, 43.6077 ], [ 2.2376, 43.6086 ] ] ], "type": "Polygon" }, "id": "40", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081005", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.8545, 43.6049, 3.8625, 43.6078 ], "geometry": { "coordinates": [ [ [ 3.8551, 43.6078 ], [ 3.8559, 43.6075 ], [ 3.8564, 43.6073 ], [ 3.8565, 43.6072 ], [ 3.8568, 43.6071 ], [ 3.8573, 43.6068 ], [ 3.8568, 43.6064 ], [ 3.857, 43.6063 ], [ 3.8574, 43.606 ], [ 3.8576, 43.6059 ], [ 3.8577, 43.6058 ], [ 3.8578, 43.6058 ], [ 3.8579, 43.6058 ], [ 3.8581, 43.6059 ], [ 3.8582, 43.606 ], [ 3.8587, 43.6062 ], [ 3.8596, 43.6067 ], [ 3.8595, 43.6067 ], [ 3.8596, 43.6068 ], [ 3.8598, 43.6068 ], [ 3.8603, 43.6064 ], [ 3.8609, 43.6069 ], [ 3.8612, 43.6071 ], [ 3.8613, 43.6072 ], [ 3.8614, 43.6073 ], [ 3.8616, 43.6071 ], [ 3.8618, 43.6069 ], [ 3.8619, 43.6067 ], [ 3.8619, 43.6066 ], [ 3.8621, 43.6063 ], [ 3.8622, 43.6064 ], [ 3.8625, 43.6059 ], [ 3.8623, 43.6058 ], [ 3.8619, 43.6057 ], [ 3.8615, 43.6056 ], [ 3.8608, 43.6054 ], [ 3.8604, 43.6053 ], [ 3.8601, 43.6052 ], [ 3.8598, 43.6051 ], [ 3.8596, 43.6051 ], [ 3.8592, 43.605 ], [ 3.859, 43.605 ], [ 3.8588, 43.605 ], [ 3.8586, 43.605 ], [ 3.8585, 43.605 ], [ 3.8584, 43.605 ], [ 3.8581, 43.605 ], [ 3.8576, 43.6049 ], [ 3.8573, 43.6049 ], [ 3.8569, 43.6049 ], [ 3.8564, 43.6049 ], [ 3.8561, 43.6049 ], [ 3.8562, 43.6057 ], [ 3.8551, 43.6062 ], [ 3.855, 43.606 ], [ 3.8545, 43.6062 ], [ 3.8554, 43.6073 ], [ 3.855, 43.6075 ], [ 3.8549, 43.6076 ], [ 3.8551, 43.6078 ] ] ], "type": "Polygon" }, "id": "41", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034009", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Gély" }, "type": "Feature" }, { "bbox": [ 4.194, 44.2582, 4.203, 44.2626 ], "geometry": { "coordinates": [ [ [ 4.197, 44.2616 ], [ 4.1971, 44.2617 ], [ 4.197, 44.2617 ], [ 4.1972, 44.2617 ], [ 4.1972, 44.2617 ], [ 4.1969, 44.2619 ], [ 4.1969, 44.2619 ], [ 4.1968, 44.262 ], [ 4.1966, 44.2619 ], [ 4.1965, 44.2618 ], [ 4.1962, 44.2617 ], [ 4.1961, 44.2617 ], [ 4.1959, 44.2616 ], [ 4.1958, 44.2615 ], [ 4.1957, 44.2615 ], [ 4.1957, 44.2614 ], [ 4.1957, 44.2612 ], [ 4.1956, 44.2613 ], [ 4.1956, 44.2613 ], [ 4.1956, 44.2617 ], [ 4.1956, 44.2617 ], [ 4.1956, 44.2618 ], [ 4.1957, 44.262 ], [ 4.196, 44.2619 ], [ 4.1963, 44.2618 ], [ 4.1964, 44.2619 ], [ 4.1968, 44.2625 ], [ 4.197, 44.2626 ], [ 4.1974, 44.2624 ], [ 4.1972, 44.2623 ], [ 4.1974, 44.2622 ], [ 4.1975, 44.262 ], [ 4.1976, 44.262 ], [ 4.1977, 44.2621 ], [ 4.1978, 44.2621 ], [ 4.198, 44.2622 ], [ 4.1983, 44.2622 ], [ 4.1984, 44.2622 ], [ 4.1984, 44.2622 ], [ 4.1985, 44.2621 ], [ 4.1985, 44.262 ], [ 4.1987, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1989, 44.262 ], [ 4.199, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2622 ], [ 4.1992, 44.2623 ], [ 4.1992, 44.2622 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1995, 44.2623 ], [ 4.1995, 44.2623 ], [ 4.1996, 44.2623 ], [ 4.1997, 44.2623 ], [ 4.2, 44.2624 ], [ 4.2001, 44.2624 ], [ 4.2001, 44.2624 ], [ 4.2002, 44.2624 ], [ 4.2002, 44.2624 ], [ 4.2004, 44.2624 ], [ 4.2004, 44.2624 ], [ 4.2006, 44.2625 ], [ 4.2006, 44.2624 ], [ 4.2007, 44.2624 ], [ 4.2007, 44.2625 ], [ 4.2008, 44.2625 ], [ 4.201, 44.2624 ], [ 4.201, 44.2624 ], [ 4.2011, 44.2624 ], [ 4.2012, 44.2623 ], [ 4.2012, 44.2623 ], [ 4.2013, 44.2623 ], [ 4.2017, 44.2623 ], [ 4.2015, 44.2619 ], [ 4.2012, 44.262 ], [ 4.2011, 44.262 ], [ 4.2011, 44.262 ], [ 4.2011, 44.262 ], [ 4.201, 44.2619 ], [ 4.201, 44.2618 ], [ 4.201, 44.2617 ], [ 4.201, 44.2617 ], [ 4.2013, 44.2613 ], [ 4.2013, 44.2613 ], [ 4.2012, 44.2613 ], [ 4.201, 44.2613 ], [ 4.2004, 44.2612 ], [ 4.2001, 44.2612 ], [ 4.2001, 44.2611 ], [ 4.2002, 44.261 ], [ 4.2004, 44.2606 ], [ 4.1999, 44.2605 ], [ 4.2, 44.2603 ], [ 4.2, 44.2602 ], [ 4.2001, 44.2602 ], [ 4.2006, 44.2603 ], [ 4.2007, 44.2601 ], [ 4.2008, 44.2599 ], [ 4.2009, 44.2599 ], [ 4.2016, 44.2594 ], [ 4.2017, 44.2591 ], [ 4.2017, 44.259 ], [ 4.203, 44.2584 ], [ 4.2029, 44.2582 ], [ 4.2026, 44.2582 ], [ 4.202, 44.2582 ], [ 4.202, 44.2584 ], [ 4.2022, 44.2585 ], [ 4.2021, 44.2585 ], [ 4.202, 44.2585 ], [ 4.202, 44.2585 ], [ 4.2019, 44.2585 ], [ 4.2019, 44.2586 ], [ 4.2019, 44.2586 ], [ 4.202, 44.2586 ], [ 4.202, 44.2587 ], [ 4.2014, 44.2587 ], [ 4.2014, 44.2588 ], [ 4.2011, 44.2588 ], [ 4.2011, 44.2587 ], [ 4.201, 44.2586 ], [ 4.2005, 44.2587 ], [ 4.2004, 44.2584 ], [ 4.2, 44.2584 ], [ 4.1996, 44.2584 ], [ 4.1994, 44.2584 ], [ 4.1994, 44.2584 ], [ 4.1993, 44.2584 ], [ 4.1993, 44.2584 ], [ 4.1992, 44.2584 ], [ 4.199, 44.2584 ], [ 4.1988, 44.2584 ], [ 4.1985, 44.2586 ], [ 4.1984, 44.2586 ], [ 4.1985, 44.259 ], [ 4.1984, 44.2591 ], [ 4.1983, 44.2595 ], [ 4.1975, 44.2593 ], [ 4.1968, 44.2592 ], [ 4.1966, 44.2595 ], [ 4.1965, 44.2595 ], [ 4.1965, 44.2595 ], [ 4.1949, 44.2592 ], [ 4.1946, 44.259 ], [ 4.1944, 44.2592 ], [ 4.1943, 44.2593 ], [ 4.1944, 44.2594 ], [ 4.1943, 44.2595 ], [ 4.194, 44.2599 ], [ 4.1943, 44.26 ], [ 4.1943, 44.26 ], [ 4.1944, 44.2603 ], [ 4.1944, 44.2604 ], [ 4.1947, 44.2604 ], [ 4.1947, 44.2604 ], [ 4.1948, 44.2604 ], [ 4.1949, 44.2605 ], [ 4.1948, 44.2606 ], [ 4.1948, 44.2606 ], [ 4.1947, 44.2607 ], [ 4.1945, 44.2608 ], [ 4.1944, 44.2609 ], [ 4.1944, 44.2609 ], [ 4.1944, 44.261 ], [ 4.1946, 44.2612 ], [ 4.1947, 44.2613 ], [ 4.1952, 44.2611 ], [ 4.1952, 44.2611 ], [ 4.1957, 44.2611 ], [ 4.1957, 44.261 ], [ 4.1956, 44.2609 ], [ 4.1957, 44.2608 ], [ 4.1958, 44.2609 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.196, 44.2607 ], [ 4.1961, 44.2607 ], [ 4.196, 44.2607 ], [ 4.1962, 44.2608 ], [ 4.1963, 44.2607 ], [ 4.1963, 44.2607 ], [ 4.1964, 44.2607 ], [ 4.1965, 44.2607 ], [ 4.1966, 44.2607 ], [ 4.1966, 44.2607 ], [ 4.1966, 44.2608 ], [ 4.1967, 44.2608 ], [ 4.1966, 44.2608 ], [ 4.1967, 44.2609 ], [ 4.1968, 44.261 ], [ 4.1968, 44.2611 ], [ 4.1969, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1969, 44.2612 ], [ 4.1969, 44.2613 ], [ 4.1968, 44.2616 ], [ 4.1969, 44.2616 ], [ 4.1968, 44.2617 ], [ 4.1969, 44.2617 ], [ 4.1969, 44.2616 ], [ 4.197, 44.2616 ], [ 4.197, 44.2616 ] ] ], "type": "Polygon" }, "id": "42", "properties": { "code_commune": "30227", "code_departement": "30", "code_qp": "QP030014", "commune_qp": "Saint-Ambroix", "nom_commune": "Saint-Ambroix", "nom_qp": "L'Ecusson" }, "type": "Feature" }, { "bbox": [ 1.3507, 44.0158, 1.3577, 44.0229 ], "geometry": { "coordinates": [ [ [ 1.3511, 44.0207 ], [ 1.3513, 44.0209 ], [ 1.3508, 44.0212 ], [ 1.3511, 44.0214 ], [ 1.3519, 44.021 ], [ 1.3522, 44.0213 ], [ 1.3526, 44.0217 ], [ 1.3529, 44.022 ], [ 1.3531, 44.0223 ], [ 1.3532, 44.0229 ], [ 1.354, 44.0228 ], [ 1.354, 44.0225 ], [ 1.3543, 44.0226 ], [ 1.3543, 44.0224 ], [ 1.3547, 44.0224 ], [ 1.3548, 44.0227 ], [ 1.3555, 44.0225 ], [ 1.3555, 44.0225 ], [ 1.3555, 44.0223 ], [ 1.3572, 44.0224 ], [ 1.3573, 44.0217 ], [ 1.3566, 44.0217 ], [ 1.356, 44.0218 ], [ 1.356, 44.0215 ], [ 1.3561, 44.0215 ], [ 1.3561, 44.0214 ], [ 1.3561, 44.0212 ], [ 1.3561, 44.021 ], [ 1.3559, 44.0206 ], [ 1.3558, 44.0204 ], [ 1.356, 44.0204 ], [ 1.3558, 44.02 ], [ 1.3559, 44.0199 ], [ 1.3558, 44.0198 ], [ 1.3558, 44.0197 ], [ 1.3559, 44.0195 ], [ 1.3561, 44.0194 ], [ 1.3562, 44.0193 ], [ 1.3562, 44.0193 ], [ 1.3565, 44.019 ], [ 1.357, 44.0194 ], [ 1.3577, 44.0189 ], [ 1.3575, 44.0189 ], [ 1.3571, 44.0192 ], [ 1.3568, 44.0189 ], [ 1.3566, 44.019 ], [ 1.3564, 44.019 ], [ 1.3562, 44.0188 ], [ 1.3561, 44.0188 ], [ 1.356, 44.0188 ], [ 1.3559, 44.0186 ], [ 1.3558, 44.0185 ], [ 1.3557, 44.0184 ], [ 1.3561, 44.0183 ], [ 1.3565, 44.0183 ], [ 1.357, 44.018 ], [ 1.3569, 44.0179 ], [ 1.3569, 44.0178 ], [ 1.3568, 44.0172 ], [ 1.3566, 44.0172 ], [ 1.3565, 44.0166 ], [ 1.3563, 44.0159 ], [ 1.3562, 44.0158 ], [ 1.3557, 44.016 ], [ 1.355, 44.0162 ], [ 1.3537, 44.0168 ], [ 1.3529, 44.0173 ], [ 1.3524, 44.0175 ], [ 1.3521, 44.0173 ], [ 1.3518, 44.0171 ], [ 1.3515, 44.0174 ], [ 1.3514, 44.0174 ], [ 1.3513, 44.0175 ], [ 1.3513, 44.0177 ], [ 1.3512, 44.0179 ], [ 1.3515, 44.0181 ], [ 1.3514, 44.0182 ], [ 1.3511, 44.0185 ], [ 1.3511, 44.0186 ], [ 1.351, 44.0187 ], [ 1.3509, 44.0189 ], [ 1.3507, 44.0191 ], [ 1.351, 44.0193 ], [ 1.3514, 44.0195 ], [ 1.3513, 44.0197 ], [ 1.3519, 44.0202 ], [ 1.3516, 44.0204 ], [ 1.3511, 44.0207 ] ] ], "type": "Polygon" }, "id": "43", "properties": { "code_commune": "82121", "code_departement": "82", "code_qp": "QP082001", "commune_qp": "Montauban", "nom_commune": "Montauban", "nom_qp": "Cœur de Ville" }, "type": "Feature" }, { "bbox": [ 1.6033, 42.9636, 1.6111, 42.9686 ], "geometry": { "coordinates": [ [ [ 1.6046, 42.9644 ], [ 1.6043, 42.9644 ], [ 1.6043, 42.9645 ], [ 1.6042, 42.9645 ], [ 1.604, 42.9647 ], [ 1.6039, 42.9649 ], [ 1.6038, 42.965 ], [ 1.6039, 42.965 ], [ 1.6039, 42.965 ], [ 1.604, 42.9651 ], [ 1.6041, 42.9651 ], [ 1.6042, 42.9651 ], [ 1.6042, 42.9651 ], [ 1.6042, 42.965 ], [ 1.6042, 42.965 ], [ 1.6043, 42.9649 ], [ 1.6043, 42.9649 ], [ 1.6044, 42.9648 ], [ 1.6044, 42.9649 ], [ 1.6044, 42.9648 ], [ 1.6044, 42.9649 ], [ 1.6045, 42.9649 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6047, 42.9651 ], [ 1.6047, 42.9651 ], [ 1.6047, 42.9651 ], [ 1.6048, 42.9651 ], [ 1.6048, 42.9651 ], [ 1.6049, 42.9652 ], [ 1.6049, 42.9652 ], [ 1.6049, 42.9653 ], [ 1.605, 42.9653 ], [ 1.605, 42.9653 ], [ 1.6051, 42.9653 ], [ 1.605, 42.9654 ], [ 1.6051, 42.9655 ], [ 1.6051, 42.9656 ], [ 1.6052, 42.9656 ], [ 1.6052, 42.9656 ], [ 1.6052, 42.9657 ], [ 1.6051, 42.9659 ], [ 1.6052, 42.9659 ], [ 1.6052, 42.966 ], [ 1.6052, 42.9662 ], [ 1.6051, 42.9663 ], [ 1.6051, 42.9663 ], [ 1.6051, 42.9664 ], [ 1.6051, 42.9665 ], [ 1.6051, 42.9666 ], [ 1.6051, 42.9666 ], [ 1.605, 42.9666 ], [ 1.6049, 42.9667 ], [ 1.6049, 42.9667 ], [ 1.6049, 42.9667 ], [ 1.6047, 42.9668 ], [ 1.6047, 42.9668 ], [ 1.6047, 42.9668 ], [ 1.6046, 42.9668 ], [ 1.6046, 42.9668 ], [ 1.6045, 42.967 ], [ 1.6044, 42.967 ], [ 1.6043, 42.9669 ], [ 1.6042, 42.9668 ], [ 1.604, 42.9667 ], [ 1.6038, 42.9667 ], [ 1.6035, 42.9668 ], [ 1.6034, 42.9668 ], [ 1.6033, 42.9669 ], [ 1.6035, 42.9671 ], [ 1.6036, 42.9672 ], [ 1.6039, 42.9673 ], [ 1.604, 42.9673 ], [ 1.604, 42.9674 ], [ 1.6041, 42.9674 ], [ 1.6042, 42.9674 ], [ 1.6042, 42.9674 ], [ 1.6043, 42.9674 ], [ 1.6044, 42.9674 ], [ 1.6045, 42.9674 ], [ 1.6044, 42.9671 ], [ 1.6045, 42.967 ], [ 1.6046, 42.9671 ], [ 1.6047, 42.9671 ], [ 1.6049, 42.9672 ], [ 1.6051, 42.9672 ], [ 1.6052, 42.9672 ], [ 1.6052, 42.9671 ], [ 1.6053, 42.9671 ], [ 1.6055, 42.9672 ], [ 1.6056, 42.9671 ], [ 1.6056, 42.967 ], [ 1.6058, 42.9671 ], [ 1.6058, 42.9671 ], [ 1.606, 42.9669 ], [ 1.6061, 42.9667 ], [ 1.6062, 42.9667 ], [ 1.6063, 42.9667 ], [ 1.6069, 42.9667 ], [ 1.6073, 42.9668 ], [ 1.6072, 42.9669 ], [ 1.6073, 42.967 ], [ 1.6075, 42.9669 ], [ 1.6076, 42.9669 ], [ 1.6076, 42.9669 ], [ 1.6078, 42.9668 ], [ 1.6079, 42.9667 ], [ 1.6079, 42.9667 ], [ 1.6081, 42.9666 ], [ 1.6081, 42.9666 ], [ 1.6081, 42.9666 ], [ 1.6082, 42.9665 ], [ 1.6084, 42.9664 ], [ 1.6084, 42.9663 ], [ 1.6085, 42.9664 ], [ 1.6087, 42.9661 ], [ 1.6092, 42.9664 ], [ 1.6092, 42.9664 ], [ 1.6091, 42.9666 ], [ 1.6088, 42.9669 ], [ 1.6086, 42.9671 ], [ 1.6086, 42.9673 ], [ 1.6084, 42.9672 ], [ 1.6083, 42.9672 ], [ 1.6081, 42.9673 ], [ 1.608, 42.9675 ], [ 1.6077, 42.9677 ], [ 1.6077, 42.9677 ], [ 1.6079, 42.9678 ], [ 1.6079, 42.9678 ], [ 1.6081, 42.9679 ], [ 1.6082, 42.9679 ], [ 1.6082, 42.968 ], [ 1.6082, 42.9686 ], [ 1.6084, 42.9686 ], [ 1.6084, 42.9686 ], [ 1.6086, 42.9686 ], [ 1.6086, 42.9682 ], [ 1.6086, 42.968 ], [ 1.6085, 42.9679 ], [ 1.6086, 42.9678 ], [ 1.6086, 42.9678 ], [ 1.6086, 42.9677 ], [ 1.6087, 42.9676 ], [ 1.6094, 42.9668 ], [ 1.6095, 42.9668 ], [ 1.6095, 42.9668 ], [ 1.6097, 42.9665 ], [ 1.6098, 42.9665 ], [ 1.6098, 42.9664 ], [ 1.6098, 42.9664 ], [ 1.6098, 42.9663 ], [ 1.61, 42.9662 ], [ 1.61, 42.9662 ], [ 1.61, 42.9661 ], [ 1.61, 42.9661 ], [ 1.6101, 42.966 ], [ 1.6102, 42.9659 ], [ 1.6104, 42.9658 ], [ 1.6104, 42.9657 ], [ 1.6105, 42.9656 ], [ 1.6106, 42.9655 ], [ 1.6107, 42.9654 ], [ 1.6107, 42.9654 ], [ 1.611, 42.965 ], [ 1.6109, 42.965 ], [ 1.611, 42.9649 ], [ 1.6111, 42.9647 ], [ 1.6109, 42.9646 ], [ 1.6107, 42.9649 ], [ 1.6104, 42.9651 ], [ 1.6102, 42.9653 ], [ 1.61, 42.9655 ], [ 1.6098, 42.9657 ], [ 1.6096, 42.9661 ], [ 1.6095, 42.9662 ], [ 1.6093, 42.9664 ], [ 1.6092, 42.9663 ], [ 1.6088, 42.9661 ], [ 1.6092, 42.9658 ], [ 1.6093, 42.9656 ], [ 1.6095, 42.9654 ], [ 1.6097, 42.9652 ], [ 1.6094, 42.965 ], [ 1.6094, 42.9651 ], [ 1.609, 42.9653 ], [ 1.609, 42.9653 ], [ 1.6089, 42.9651 ], [ 1.6089, 42.9649 ], [ 1.6089, 42.9648 ], [ 1.6089, 42.9648 ], [ 1.6089, 42.9647 ], [ 1.6089, 42.9645 ], [ 1.6089, 42.9643 ], [ 1.6089, 42.9643 ], [ 1.6086, 42.9642 ], [ 1.6086, 42.9641 ], [ 1.6085, 42.964 ], [ 1.6083, 42.964 ], [ 1.6081, 42.964 ], [ 1.6074, 42.9639 ], [ 1.6072, 42.9639 ], [ 1.6068, 42.9638 ], [ 1.6066, 42.9638 ], [ 1.6064, 42.9638 ], [ 1.6058, 42.9637 ], [ 1.6054, 42.9636 ], [ 1.6046, 42.9636 ], [ 1.6046, 42.9641 ], [ 1.6046, 42.9644 ] ] ], "type": "Polygon" }, "id": "44", "properties": { "code_commune": "09122", "code_departement": "09", "code_qp": "QP009002", "commune_qp": "Foix", "nom_commune": "Foix", "nom_qp": "Centre Ancien" }, "type": "Feature" }, { "bbox": [ 2.244, 43.5904, 2.2551, 43.5952 ], "geometry": { "coordinates": [ [ [ 2.244, 43.593 ], [ 2.2441, 43.5931 ], [ 2.2442, 43.5932 ], [ 2.2446, 43.593 ], [ 2.2452, 43.5927 ], [ 2.2458, 43.5925 ], [ 2.2464, 43.5924 ], [ 2.2467, 43.5924 ], [ 2.2471, 43.5924 ], [ 2.2475, 43.5925 ], [ 2.2481, 43.5927 ], [ 2.2483, 43.5927 ], [ 2.2484, 43.5927 ], [ 2.249, 43.5927 ], [ 2.249, 43.5926 ], [ 2.2491, 43.5925 ], [ 2.2496, 43.5925 ], [ 2.2497, 43.5926 ], [ 2.2497, 43.5929 ], [ 2.2499, 43.5931 ], [ 2.2503, 43.5929 ], [ 2.2503, 43.5928 ], [ 2.2505, 43.5927 ], [ 2.2505, 43.5926 ], [ 2.2506, 43.5925 ], [ 2.2501, 43.5921 ], [ 2.2501, 43.592 ], [ 2.2502, 43.5919 ], [ 2.2516, 43.5919 ], [ 2.2517, 43.5919 ], [ 2.2519, 43.5921 ], [ 2.252, 43.5928 ], [ 2.2525, 43.5933 ], [ 2.2523, 43.5934 ], [ 2.2528, 43.5938 ], [ 2.2529, 43.5937 ], [ 2.253, 43.5937 ], [ 2.2533, 43.594 ], [ 2.2536, 43.5943 ], [ 2.2532, 43.5946 ], [ 2.2531, 43.5946 ], [ 2.2531, 43.5947 ], [ 2.2531, 43.5952 ], [ 2.2537, 43.5951 ], [ 2.2539, 43.5951 ], [ 2.2543, 43.5949 ], [ 2.2544, 43.5948 ], [ 2.2546, 43.5947 ], [ 2.2546, 43.5945 ], [ 2.2548, 43.5941 ], [ 2.2551, 43.5934 ], [ 2.2545, 43.5928 ], [ 2.2542, 43.5929 ], [ 2.2542, 43.5928 ], [ 2.2542, 43.5928 ], [ 2.254, 43.5926 ], [ 2.2536, 43.5928 ], [ 2.2533, 43.5926 ], [ 2.2535, 43.5925 ], [ 2.2532, 43.5922 ], [ 2.2528, 43.5924 ], [ 2.2527, 43.5923 ], [ 2.2527, 43.5923 ], [ 2.253, 43.5921 ], [ 2.2531, 43.592 ], [ 2.2533, 43.5919 ], [ 2.2537, 43.5916 ], [ 2.254, 43.5915 ], [ 2.2542, 43.5913 ], [ 2.2542, 43.5913 ], [ 2.2542, 43.5912 ], [ 2.2542, 43.5911 ], [ 2.2534, 43.5907 ], [ 2.2528, 43.5905 ], [ 2.2524, 43.5904 ], [ 2.2521, 43.5906 ], [ 2.2523, 43.5909 ], [ 2.2522, 43.591 ], [ 2.2521, 43.5911 ], [ 2.2518, 43.5908 ], [ 2.2517, 43.5907 ], [ 2.2517, 43.5906 ], [ 2.2509, 43.5907 ], [ 2.2508, 43.5905 ], [ 2.2497, 43.5906 ], [ 2.2497, 43.5907 ], [ 2.2494, 43.5908 ], [ 2.2488, 43.591 ], [ 2.2485, 43.5912 ], [ 2.2483, 43.5913 ], [ 2.2483, 43.5913 ], [ 2.2482, 43.5914 ], [ 2.2482, 43.5916 ], [ 2.248, 43.5916 ], [ 2.2477, 43.5916 ], [ 2.2472, 43.5916 ], [ 2.247, 43.5916 ], [ 2.247, 43.5915 ], [ 2.2468, 43.5913 ], [ 2.2464, 43.5914 ], [ 2.2464, 43.5914 ], [ 2.2457, 43.5916 ], [ 2.2458, 43.5917 ], [ 2.2452, 43.5918 ], [ 2.2448, 43.5919 ], [ 2.2447, 43.5919 ], [ 2.2446, 43.5918 ], [ 2.2443, 43.5919 ], [ 2.2442, 43.592 ], [ 2.2441, 43.5921 ], [ 2.244, 43.5923 ], [ 2.244, 43.5924 ], [ 2.244, 43.5927 ], [ 2.244, 43.593 ] ] ], "type": "Polygon" }, "id": "45", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081003", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Lameilhé" }, "type": "Feature" }, { "bbox": [ 1.4792, 43.5738, 1.4848, 43.5778 ], "geometry": { "coordinates": [ [ [ 1.4801, 43.5777 ], [ 1.4802, 43.5778 ], [ 1.4804, 43.5778 ], [ 1.4815, 43.5772 ], [ 1.4816, 43.5772 ], [ 1.4818, 43.5772 ], [ 1.4818, 43.5772 ], [ 1.482, 43.5771 ], [ 1.482, 43.5771 ], [ 1.4821, 43.5769 ], [ 1.4822, 43.5769 ], [ 1.4822, 43.5768 ], [ 1.4827, 43.5765 ], [ 1.483, 43.5764 ], [ 1.4833, 43.5764 ], [ 1.4834, 43.5764 ], [ 1.4838, 43.5761 ], [ 1.484, 43.576 ], [ 1.4842, 43.5758 ], [ 1.4844, 43.5757 ], [ 1.4845, 43.5756 ], [ 1.4846, 43.5754 ], [ 1.4846, 43.5754 ], [ 1.4847, 43.5753 ], [ 1.4848, 43.5753 ], [ 1.4848, 43.5753 ], [ 1.4845, 43.5751 ], [ 1.4843, 43.575 ], [ 1.4841, 43.5749 ], [ 1.4843, 43.5748 ], [ 1.4836, 43.5747 ], [ 1.4837, 43.5744 ], [ 1.4837, 43.5744 ], [ 1.4838, 43.574 ], [ 1.4838, 43.5739 ], [ 1.4839, 43.5738 ], [ 1.4837, 43.5738 ], [ 1.4835, 43.5738 ], [ 1.4835, 43.5738 ], [ 1.4833, 43.5738 ], [ 1.4819, 43.5747 ], [ 1.4818, 43.5748 ], [ 1.4817, 43.5749 ], [ 1.4816, 43.5749 ], [ 1.4814, 43.575 ], [ 1.4812, 43.5751 ], [ 1.4802, 43.5756 ], [ 1.4794, 43.576 ], [ 1.4793, 43.5761 ], [ 1.4792, 43.5763 ], [ 1.4792, 43.5763 ], [ 1.4792, 43.5764 ], [ 1.4793, 43.5768 ], [ 1.4794, 43.5772 ], [ 1.4798, 43.5778 ], [ 1.4798, 43.5778 ], [ 1.4801, 43.5777 ] ] ], "type": "Polygon" }, "id": "46", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031013", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Saint Exupéry" }, "type": "Feature" }, { "bbox": [ 1.073, 44.0999, 1.0904, 44.1069 ], "geometry": { "coordinates": [ [ [ 1.0777, 44.102 ], [ 1.0779, 44.1021 ], [ 1.078, 44.1022 ], [ 1.0784, 44.1024 ], [ 1.0787, 44.1025 ], [ 1.0796, 44.1028 ], [ 1.0807, 44.1032 ], [ 1.0818, 44.1036 ], [ 1.0818, 44.1037 ], [ 1.0819, 44.1037 ], [ 1.082, 44.1038 ], [ 1.0821, 44.1037 ], [ 1.0826, 44.1039 ], [ 1.0832, 44.1043 ], [ 1.0837, 44.1045 ], [ 1.0838, 44.1047 ], [ 1.0838, 44.1047 ], [ 1.0838, 44.1051 ], [ 1.0838, 44.1054 ], [ 1.0839, 44.1062 ], [ 1.084, 44.1065 ], [ 1.0844, 44.1065 ], [ 1.0844, 44.1066 ], [ 1.0844, 44.1067 ], [ 1.0846, 44.1068 ], [ 1.0847, 44.1068 ], [ 1.0849, 44.1068 ], [ 1.0851, 44.1068 ], [ 1.0853, 44.1068 ], [ 1.0854, 44.1068 ], [ 1.0858, 44.1069 ], [ 1.086, 44.1068 ], [ 1.0862, 44.1068 ], [ 1.0871, 44.1068 ], [ 1.0871, 44.1067 ], [ 1.0871, 44.1065 ], [ 1.0871, 44.1063 ], [ 1.0874, 44.1063 ], [ 1.0874, 44.1063 ], [ 1.0901, 44.1063 ], [ 1.0901, 44.1061 ], [ 1.0902, 44.106 ], [ 1.0901, 44.106 ], [ 1.0901, 44.1059 ], [ 1.0902, 44.106 ], [ 1.0902, 44.1059 ], [ 1.0902, 44.1059 ], [ 1.0902, 44.1058 ], [ 1.0903, 44.1057 ], [ 1.0902, 44.1057 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1055 ], [ 1.0902, 44.1055 ], [ 1.0902, 44.1055 ], [ 1.0904, 44.1055 ], [ 1.0904, 44.1054 ], [ 1.0903, 44.1052 ], [ 1.0902, 44.1053 ], [ 1.0899, 44.1053 ], [ 1.0893, 44.1054 ], [ 1.0895, 44.1053 ], [ 1.0897, 44.105 ], [ 1.0888, 44.1045 ], [ 1.0884, 44.1044 ], [ 1.0885, 44.1042 ], [ 1.0887, 44.1041 ], [ 1.0886, 44.1041 ], [ 1.0883, 44.1039 ], [ 1.088, 44.1039 ], [ 1.0879, 44.1039 ], [ 1.0879, 44.1039 ], [ 1.0878, 44.1037 ], [ 1.0877, 44.1036 ], [ 1.0875, 44.1035 ], [ 1.0879, 44.1034 ], [ 1.0878, 44.1029 ], [ 1.0872, 44.1031 ], [ 1.0871, 44.1032 ], [ 1.0869, 44.1029 ], [ 1.0868, 44.1028 ], [ 1.0867, 44.1026 ], [ 1.0865, 44.1024 ], [ 1.0864, 44.1023 ], [ 1.0863, 44.1022 ], [ 1.086, 44.1021 ], [ 1.0855, 44.102 ], [ 1.0853, 44.102 ], [ 1.0852, 44.1018 ], [ 1.0851, 44.1016 ], [ 1.085, 44.1015 ], [ 1.0847, 44.1009 ], [ 1.0844, 44.1004 ], [ 1.0844, 44.1003 ], [ 1.0841, 44.1 ], [ 1.084, 44.1 ], [ 1.0838, 44.1 ], [ 1.0837, 44.1 ], [ 1.0835, 44.1 ], [ 1.0835, 44.1 ], [ 1.0833, 44.1 ], [ 1.083, 44.0999 ], [ 1.0823, 44.1 ], [ 1.0818, 44.1 ], [ 1.0817, 44.1 ], [ 1.0814, 44.1001 ], [ 1.0811, 44.1002 ], [ 1.0799, 44.1004 ], [ 1.0788, 44.1006 ], [ 1.0786, 44.1006 ], [ 1.0782, 44.1006 ], [ 1.0781, 44.1007 ], [ 1.078, 44.1005 ], [ 1.0778, 44.0999 ], [ 1.0771, 44.1 ], [ 1.0751, 44.1 ], [ 1.0747, 44.1001 ], [ 1.0738, 44.1002 ], [ 1.0731, 44.1001 ], [ 1.0732, 44.1005 ], [ 1.0731, 44.1008 ], [ 1.073, 44.1014 ], [ 1.0742, 44.1016 ], [ 1.0745, 44.1015 ], [ 1.0746, 44.1015 ], [ 1.0747, 44.1015 ], [ 1.0747, 44.1014 ], [ 1.0751, 44.1014 ], [ 1.0754, 44.1014 ], [ 1.0757, 44.1014 ], [ 1.0766, 44.1013 ], [ 1.0769, 44.1013 ], [ 1.0771, 44.1013 ], [ 1.0774, 44.1014 ], [ 1.0775, 44.1015 ], [ 1.0776, 44.1019 ], [ 1.0777, 44.102 ] ] ], "type": "Polygon" }, "id": "47", "properties": { "code_commune": "82112", "code_departement": "82", "code_qp": "QP082003", "commune_qp": "Moissac", "nom_commune": "Moissac", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.4487, 44.4585, 1.4596, 44.4672 ], "geometry": { "coordinates": [ [ [ 1.4509, 44.4638 ], [ 1.4503, 44.4641 ], [ 1.4506, 44.4645 ], [ 1.4512, 44.4652 ], [ 1.452, 44.4648 ], [ 1.4514, 44.4643 ], [ 1.4521, 44.464 ], [ 1.4524, 44.4639 ], [ 1.4525, 44.4638 ], [ 1.4529, 44.4637 ], [ 1.4537, 44.4633 ], [ 1.4543, 44.4639 ], [ 1.4545, 44.4638 ], [ 1.4553, 44.4633 ], [ 1.4554, 44.4633 ], [ 1.4555, 44.4632 ], [ 1.4558, 44.4632 ], [ 1.4559, 44.4633 ], [ 1.4559, 44.4634 ], [ 1.456, 44.4635 ], [ 1.456, 44.4635 ], [ 1.4559, 44.4635 ], [ 1.4558, 44.4635 ], [ 1.4556, 44.4635 ], [ 1.4562, 44.464 ], [ 1.4565, 44.4642 ], [ 1.4568, 44.4645 ], [ 1.4567, 44.4646 ], [ 1.4565, 44.4647 ], [ 1.4566, 44.4648 ], [ 1.4566, 44.4651 ], [ 1.4568, 44.4653 ], [ 1.457, 44.4654 ], [ 1.4576, 44.4654 ], [ 1.4578, 44.4653 ], [ 1.458, 44.4658 ], [ 1.458, 44.4661 ], [ 1.4581, 44.4663 ], [ 1.4583, 44.4665 ], [ 1.4577, 44.4668 ], [ 1.458, 44.467 ], [ 1.4581, 44.4672 ], [ 1.4589, 44.4671 ], [ 1.459, 44.4671 ], [ 1.4589, 44.4667 ], [ 1.4589, 44.4667 ], [ 1.4591, 44.4667 ], [ 1.4592, 44.4667 ], [ 1.4593, 44.4666 ], [ 1.4593, 44.4666 ], [ 1.4594, 44.4666 ], [ 1.4596, 44.4666 ], [ 1.4596, 44.4664 ], [ 1.4596, 44.4662 ], [ 1.4595, 44.466 ], [ 1.4594, 44.4654 ], [ 1.4594, 44.4653 ], [ 1.459, 44.4653 ], [ 1.4589, 44.4651 ], [ 1.4589, 44.4651 ], [ 1.4585, 44.4651 ], [ 1.4584, 44.4648 ], [ 1.4584, 44.4646 ], [ 1.4584, 44.4644 ], [ 1.4584, 44.4642 ], [ 1.4584, 44.464 ], [ 1.4585, 44.4639 ], [ 1.4585, 44.4638 ], [ 1.4586, 44.4637 ], [ 1.4586, 44.4636 ], [ 1.4583, 44.4633 ], [ 1.457, 44.4622 ], [ 1.4559, 44.4614 ], [ 1.4552, 44.4608 ], [ 1.4547, 44.4604 ], [ 1.4541, 44.4607 ], [ 1.4537, 44.4608 ], [ 1.4535, 44.461 ], [ 1.4531, 44.4611 ], [ 1.4529, 44.4612 ], [ 1.4529, 44.4612 ], [ 1.4521, 44.4613 ], [ 1.4521, 44.4614 ], [ 1.452, 44.4614 ], [ 1.4519, 44.4611 ], [ 1.4518, 44.461 ], [ 1.4518, 44.4609 ], [ 1.4517, 44.4609 ], [ 1.4522, 44.4607 ], [ 1.4526, 44.4606 ], [ 1.4533, 44.4603 ], [ 1.4531, 44.46 ], [ 1.4518, 44.4605 ], [ 1.4515, 44.4607 ], [ 1.4514, 44.4607 ], [ 1.4512, 44.4608 ], [ 1.4509, 44.4609 ], [ 1.4507, 44.4605 ], [ 1.4505, 44.4601 ], [ 1.4503, 44.46 ], [ 1.4501, 44.4597 ], [ 1.4497, 44.4593 ], [ 1.4491, 44.4586 ], [ 1.4489, 44.4585 ], [ 1.4488, 44.4587 ], [ 1.4487, 44.4588 ], [ 1.4487, 44.4589 ], [ 1.4488, 44.459 ], [ 1.4489, 44.4595 ], [ 1.449, 44.4595 ], [ 1.4494, 44.46 ], [ 1.4489, 44.4601 ], [ 1.4491, 44.4603 ], [ 1.4493, 44.4607 ], [ 1.4496, 44.4611 ], [ 1.4498, 44.4615 ], [ 1.4499, 44.4619 ], [ 1.4502, 44.4628 ], [ 1.4502, 44.463 ], [ 1.4503, 44.4631 ], [ 1.4508, 44.4637 ], [ 1.4509, 44.4638 ] ] ], "type": "Polygon" }, "id": "48", "properties": { "code_commune": "46042", "code_departement": "46", "code_qp": "QP046001", "commune_qp": "Cahors", "nom_commune": "Cahors", "nom_qp": "Terre Rouge" }, "type": "Feature" }, { "bbox": [ 2.3371, 43.2234, 2.3456, 43.2272 ], "geometry": { "coordinates": [ [ [ 2.3455, 43.2244 ], [ 2.3456, 43.2242 ], [ 2.3456, 43.2241 ], [ 2.3455, 43.224 ], [ 2.3454, 43.224 ], [ 2.3452, 43.224 ], [ 2.3451, 43.224 ], [ 2.3447, 43.224 ], [ 2.3447, 43.224 ], [ 2.3448, 43.2238 ], [ 2.3441, 43.2236 ], [ 2.3439, 43.2235 ], [ 2.3437, 43.2235 ], [ 2.3432, 43.2234 ], [ 2.3432, 43.2236 ], [ 2.344, 43.2239 ], [ 2.3443, 43.224 ], [ 2.3443, 43.2243 ], [ 2.3443, 43.2243 ], [ 2.3442, 43.2247 ], [ 2.3441, 43.2247 ], [ 2.3439, 43.2253 ], [ 2.3438, 43.2253 ], [ 2.3428, 43.2252 ], [ 2.3428, 43.2252 ], [ 2.3428, 43.2251 ], [ 2.3427, 43.2251 ], [ 2.3425, 43.2251 ], [ 2.3424, 43.2251 ], [ 2.3419, 43.225 ], [ 2.3419, 43.225 ], [ 2.3418, 43.225 ], [ 2.3416, 43.225 ], [ 2.3411, 43.2249 ], [ 2.3409, 43.2248 ], [ 2.3405, 43.2247 ], [ 2.3399, 43.2246 ], [ 2.3398, 43.2246 ], [ 2.3396, 43.2245 ], [ 2.3394, 43.2246 ], [ 2.3391, 43.2245 ], [ 2.3391, 43.2246 ], [ 2.339, 43.2248 ], [ 2.339, 43.2251 ], [ 2.3389, 43.2252 ], [ 2.3389, 43.2252 ], [ 2.3388, 43.2253 ], [ 2.3388, 43.2253 ], [ 2.3385, 43.2257 ], [ 2.3384, 43.2258 ], [ 2.3381, 43.2261 ], [ 2.338, 43.2261 ], [ 2.3376, 43.2265 ], [ 2.3374, 43.2266 ], [ 2.3372, 43.2269 ], [ 2.3371, 43.2271 ], [ 2.3372, 43.2271 ], [ 2.3382, 43.2272 ], [ 2.3383, 43.2269 ], [ 2.3393, 43.2269 ], [ 2.3396, 43.2269 ], [ 2.3401, 43.2269 ], [ 2.3403, 43.2269 ], [ 2.3407, 43.2269 ], [ 2.3411, 43.2268 ], [ 2.3419, 43.2266 ], [ 2.3425, 43.2265 ], [ 2.3429, 43.2264 ], [ 2.3433, 43.2263 ], [ 2.3438, 43.2262 ], [ 2.344, 43.2262 ], [ 2.3449, 43.2263 ], [ 2.345, 43.2263 ], [ 2.345, 43.2258 ], [ 2.345, 43.2255 ], [ 2.3451, 43.2251 ], [ 2.3451, 43.225 ], [ 2.3452, 43.2249 ], [ 2.3455, 43.2244 ] ] ], "type": "Polygon" }, "id": "49", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011005", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Fleming La Reille" }, "type": "Feature" }, { "bbox": [ 2.0317, 44.3495, 2.0405, 44.3571 ], "geometry": { "coordinates": [ [ [ 2.0348, 44.3523 ], [ 2.0343, 44.3523 ], [ 2.0345, 44.3527 ], [ 2.0347, 44.3531 ], [ 2.0346, 44.3532 ], [ 2.0349, 44.3534 ], [ 2.035, 44.3534 ], [ 2.0352, 44.3535 ], [ 2.0354, 44.3536 ], [ 2.0357, 44.3537 ], [ 2.0363, 44.3538 ], [ 2.0368, 44.3539 ], [ 2.0368, 44.3539 ], [ 2.0374, 44.354 ], [ 2.0377, 44.354 ], [ 2.0379, 44.3541 ], [ 2.0378, 44.3542 ], [ 2.0374, 44.3542 ], [ 2.0372, 44.3543 ], [ 2.037, 44.3546 ], [ 2.0368, 44.3548 ], [ 2.0367, 44.355 ], [ 2.0365, 44.3552 ], [ 2.0364, 44.3555 ], [ 2.0361, 44.3554 ], [ 2.036, 44.3554 ], [ 2.0357, 44.3554 ], [ 2.0352, 44.3556 ], [ 2.0348, 44.355 ], [ 2.0337, 44.3554 ], [ 2.0331, 44.3555 ], [ 2.0329, 44.3556 ], [ 2.0323, 44.3555 ], [ 2.0321, 44.3559 ], [ 2.0319, 44.3561 ], [ 2.0319, 44.3561 ], [ 2.032, 44.3562 ], [ 2.0318, 44.3564 ], [ 2.0317, 44.3566 ], [ 2.0319, 44.3568 ], [ 2.0326, 44.3566 ], [ 2.0327, 44.3565 ], [ 2.0327, 44.3566 ], [ 2.0329, 44.3571 ], [ 2.0331, 44.3571 ], [ 2.0332, 44.3569 ], [ 2.0334, 44.3569 ], [ 2.0336, 44.357 ], [ 2.0337, 44.3568 ], [ 2.0338, 44.3566 ], [ 2.0341, 44.3566 ], [ 2.0339, 44.3563 ], [ 2.034, 44.3562 ], [ 2.0346, 44.356 ], [ 2.0348, 44.3558 ], [ 2.0351, 44.3558 ], [ 2.0352, 44.3558 ], [ 2.0357, 44.356 ], [ 2.036, 44.3557 ], [ 2.0362, 44.3558 ], [ 2.0365, 44.356 ], [ 2.0364, 44.3561 ], [ 2.0363, 44.3564 ], [ 2.0373, 44.3567 ], [ 2.0375, 44.3563 ], [ 2.0373, 44.3557 ], [ 2.038, 44.3555 ], [ 2.0379, 44.3554 ], [ 2.0377, 44.3551 ], [ 2.0375, 44.355 ], [ 2.038, 44.3548 ], [ 2.0379, 44.3545 ], [ 2.038, 44.3545 ], [ 2.0379, 44.3544 ], [ 2.0381, 44.3543 ], [ 2.0382, 44.3544 ], [ 2.0385, 44.3544 ], [ 2.0387, 44.3544 ], [ 2.0387, 44.3544 ], [ 2.0387, 44.354 ], [ 2.0387, 44.3539 ], [ 2.0388, 44.3536 ], [ 2.0391, 44.353 ], [ 2.0394, 44.3526 ], [ 2.0396, 44.3522 ], [ 2.04, 44.3517 ], [ 2.0404, 44.3513 ], [ 2.0404, 44.3512 ], [ 2.0405, 44.3509 ], [ 2.0404, 44.3508 ], [ 2.0401, 44.3507 ], [ 2.0397, 44.3503 ], [ 2.0395, 44.3501 ], [ 2.0394, 44.35 ], [ 2.0385, 44.3498 ], [ 2.0381, 44.3497 ], [ 2.0378, 44.3497 ], [ 2.0371, 44.3495 ], [ 2.0365, 44.3495 ], [ 2.0362, 44.35 ], [ 2.0361, 44.35 ], [ 2.0365, 44.35 ], [ 2.0366, 44.3501 ], [ 2.0367, 44.3502 ], [ 2.0367, 44.3505 ], [ 2.0367, 44.3506 ], [ 2.0368, 44.3509 ], [ 2.0369, 44.3511 ], [ 2.0363, 44.3513 ], [ 2.0351, 44.3519 ], [ 2.0348, 44.3521 ], [ 2.0348, 44.3521 ], [ 2.0348, 44.3522 ], [ 2.0348, 44.3523 ] ] ], "type": "Polygon" }, "id": "50", "properties": { "code_commune": "12300", "code_departement": "12", "code_qp": "QP012002", "commune_qp": "Villefranche-de-Rouergue", "nom_commune": "Villefranche-de-Rouergue", "nom_qp": "La Bastide" }, "type": "Feature" }, { "bbox": [ 1.3795, 43.6375, 1.3879, 43.6403 ], "geometry": { "coordinates": [ [ [ 1.3819, 43.6376 ], [ 1.3815, 43.6377 ], [ 1.381, 43.6379 ], [ 1.3807, 43.638 ], [ 1.3804, 43.6381 ], [ 1.3801, 43.6382 ], [ 1.38, 43.6383 ], [ 1.3795, 43.6385 ], [ 1.3801, 43.6394 ], [ 1.3801, 43.6394 ], [ 1.3799, 43.6394 ], [ 1.38, 43.6395 ], [ 1.3804, 43.6396 ], [ 1.3805, 43.6396 ], [ 1.3806, 43.6393 ], [ 1.3807, 43.6393 ], [ 1.3808, 43.6395 ], [ 1.381, 43.6399 ], [ 1.3815, 43.6399 ], [ 1.3815, 43.6398 ], [ 1.3816, 43.6397 ], [ 1.3819, 43.6398 ], [ 1.3819, 43.6398 ], [ 1.3826, 43.6397 ], [ 1.3828, 43.6398 ], [ 1.3829, 43.6395 ], [ 1.3853, 43.6397 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6402 ], [ 1.3853, 43.6402 ], [ 1.3859, 43.6403 ], [ 1.3862, 43.6403 ], [ 1.3863, 43.6403 ], [ 1.3865, 43.6401 ], [ 1.3867, 43.6399 ], [ 1.387, 43.6397 ], [ 1.387, 43.6397 ], [ 1.3872, 43.6398 ], [ 1.3879, 43.6392 ], [ 1.3866, 43.639 ], [ 1.3857, 43.6389 ], [ 1.3856, 43.6389 ], [ 1.3856, 43.6389 ], [ 1.3856, 43.639 ], [ 1.3855, 43.639 ], [ 1.3854, 43.6391 ], [ 1.3853, 43.639 ], [ 1.3831, 43.6389 ], [ 1.3836, 43.6376 ], [ 1.3835, 43.6375 ], [ 1.3833, 43.6375 ], [ 1.383, 43.6375 ], [ 1.3824, 43.6376 ], [ 1.3819, 43.6376 ] ] ], "type": "Polygon" }, "id": "51", "properties": { "code_commune": "31069", "code_departement": "31", "code_qp": "QP031004", "commune_qp": "Blagnac", "nom_commune": "Blagnac", "nom_qp": "Barradels" }, "type": "Feature" }, { "bbox": [ 1.4736, 43.608, 1.4801, 43.6149 ], "geometry": { "coordinates": [ [ [ 1.4736, 43.6126 ], [ 1.4753, 43.6133 ], [ 1.4758, 43.6136 ], [ 1.4761, 43.6138 ], [ 1.4764, 43.6135 ], [ 1.478, 43.6143 ], [ 1.4792, 43.6149 ], [ 1.4799, 43.6142 ], [ 1.48, 43.6142 ], [ 1.4801, 43.614 ], [ 1.4785, 43.6132 ], [ 1.478, 43.6129 ], [ 1.4774, 43.6126 ], [ 1.4773, 43.6123 ], [ 1.4772, 43.612 ], [ 1.4776, 43.6116 ], [ 1.4786, 43.6106 ], [ 1.4791, 43.6101 ], [ 1.4779, 43.6096 ], [ 1.4774, 43.6093 ], [ 1.4781, 43.6086 ], [ 1.4767, 43.608 ], [ 1.4762, 43.6086 ], [ 1.476, 43.6087 ], [ 1.4759, 43.6088 ], [ 1.4753, 43.6095 ], [ 1.4753, 43.6095 ], [ 1.4753, 43.6096 ], [ 1.4753, 43.6096 ], [ 1.4755, 43.6097 ], [ 1.4769, 43.6104 ], [ 1.4762, 43.6112 ], [ 1.4767, 43.6114 ], [ 1.4774, 43.6117 ], [ 1.4771, 43.612 ], [ 1.4772, 43.6125 ], [ 1.4771, 43.6125 ], [ 1.4767, 43.6123 ], [ 1.476, 43.6119 ], [ 1.4756, 43.6117 ], [ 1.4754, 43.6116 ], [ 1.4748, 43.6122 ], [ 1.4742, 43.6119 ], [ 1.4736, 43.6126 ] ] ], "type": "Polygon" }, "id": "52", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031014", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Soupetard" }, "type": "Feature" }, { "bbox": [ 2.8921, 42.6847, 2.8956, 42.6892 ], "geometry": { "coordinates": [ [ [ 2.8956, 42.6868 ], [ 2.8955, 42.6868 ], [ 2.8954, 42.6866 ], [ 2.8955, 42.6867 ], [ 2.8948, 42.6861 ], [ 2.8946, 42.6859 ], [ 2.8945, 42.6858 ], [ 2.8945, 42.6857 ], [ 2.8944, 42.6857 ], [ 2.8944, 42.6855 ], [ 2.8943, 42.6852 ], [ 2.8947, 42.6852 ], [ 2.8946, 42.6852 ], [ 2.8945, 42.685 ], [ 2.8943, 42.6847 ], [ 2.8939, 42.6848 ], [ 2.8935, 42.685 ], [ 2.8933, 42.6851 ], [ 2.8933, 42.6853 ], [ 2.8933, 42.6854 ], [ 2.8934, 42.6858 ], [ 2.8929, 42.6858 ], [ 2.8928, 42.6858 ], [ 2.8923, 42.6858 ], [ 2.8921, 42.6859 ], [ 2.8922, 42.686 ], [ 2.8922, 42.6867 ], [ 2.8923, 42.6867 ], [ 2.8923, 42.6868 ], [ 2.8923, 42.6871 ], [ 2.8924, 42.6873 ], [ 2.8925, 42.6876 ], [ 2.8927, 42.6881 ], [ 2.8928, 42.688 ], [ 2.8928, 42.688 ], [ 2.8928, 42.6881 ], [ 2.8928, 42.6883 ], [ 2.893, 42.6886 ], [ 2.893, 42.6887 ], [ 2.8931, 42.6889 ], [ 2.8931, 42.6889 ], [ 2.8932, 42.6891 ], [ 2.8932, 42.6892 ], [ 2.8935, 42.689 ], [ 2.8936, 42.6889 ], [ 2.8937, 42.6889 ], [ 2.8937, 42.6888 ], [ 2.8937, 42.6888 ], [ 2.8947, 42.6881 ], [ 2.895, 42.6878 ], [ 2.8951, 42.6878 ], [ 2.8954, 42.6873 ], [ 2.8956, 42.6869 ], [ 2.8956, 42.6868 ] ] ], "type": "Polygon" }, "id": "53", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066006", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Rois De Majorque" }, "type": "Feature" }, { "bbox": [ 2.892, 42.7241, 2.9024, 42.729 ], "geometry": { "coordinates": [ [ [ 2.8942, 42.7246 ], [ 2.8936, 42.7241 ], [ 2.8931, 42.7245 ], [ 2.8923, 42.7251 ], [ 2.8923, 42.7251 ], [ 2.892, 42.7253 ], [ 2.8932, 42.7264 ], [ 2.8945, 42.7275 ], [ 2.8949, 42.7278 ], [ 2.8952, 42.728 ], [ 2.896, 42.7285 ], [ 2.8964, 42.7288 ], [ 2.897, 42.7283 ], [ 2.897, 42.7284 ], [ 2.8975, 42.7287 ], [ 2.8977, 42.7289 ], [ 2.8979, 42.729 ], [ 2.8991, 42.7281 ], [ 2.8993, 42.728 ], [ 2.8994, 42.7281 ], [ 2.8996, 42.7279 ], [ 2.8999, 42.7278 ], [ 2.9001, 42.7276 ], [ 2.9003, 42.7279 ], [ 2.9004, 42.7279 ], [ 2.9007, 42.7282 ], [ 2.9007, 42.7282 ], [ 2.9011, 42.7286 ], [ 2.9018, 42.7281 ], [ 2.9019, 42.728 ], [ 2.9021, 42.7278 ], [ 2.9022, 42.7277 ], [ 2.9023, 42.7274 ], [ 2.9024, 42.7273 ], [ 2.9008, 42.7271 ], [ 2.9007, 42.7271 ], [ 2.9, 42.727 ], [ 2.8999, 42.7269 ], [ 2.8997, 42.7269 ], [ 2.8983, 42.7267 ], [ 2.8983, 42.7266 ], [ 2.8988, 42.7262 ], [ 2.8985, 42.726 ], [ 2.8982, 42.7258 ], [ 2.8981, 42.7257 ], [ 2.8979, 42.7256 ], [ 2.8979, 42.7255 ], [ 2.8978, 42.7255 ], [ 2.8977, 42.7255 ], [ 2.8977, 42.7255 ], [ 2.8975, 42.7255 ], [ 2.8974, 42.7254 ], [ 2.8974, 42.7254 ], [ 2.8972, 42.7253 ], [ 2.8971, 42.7253 ], [ 2.897, 42.7254 ], [ 2.8969, 42.7255 ], [ 2.8965, 42.7257 ], [ 2.8963, 42.7259 ], [ 2.8962, 42.7258 ], [ 2.896, 42.726 ], [ 2.8953, 42.7255 ], [ 2.8953, 42.7255 ], [ 2.8942, 42.7246 ] ] ], "type": "Polygon" }, "id": "54", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066009", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Nouveau Logis" }, "type": "Feature" }, { "bbox": [ 3.8654, 43.6347, 3.8703, 43.6395 ], "geometry": { "coordinates": [ [ [ 3.8667, 43.635 ], [ 3.8668, 43.635 ], [ 3.8666, 43.6353 ], [ 3.8659, 43.6351 ], [ 3.8657, 43.6357 ], [ 3.8663, 43.6358 ], [ 3.8664, 43.6359 ], [ 3.8659, 43.6363 ], [ 3.8654, 43.6367 ], [ 3.8659, 43.6369 ], [ 3.8662, 43.637 ], [ 3.8667, 43.6373 ], [ 3.8665, 43.6375 ], [ 3.8671, 43.6378 ], [ 3.8673, 43.6383 ], [ 3.8686, 43.6389 ], [ 3.8691, 43.6391 ], [ 3.87, 43.6395 ], [ 3.8695, 43.6389 ], [ 3.869, 43.6384 ], [ 3.869, 43.6383 ], [ 3.8693, 43.6381 ], [ 3.8694, 43.6379 ], [ 3.8697, 43.638 ], [ 3.8699, 43.6381 ], [ 3.8699, 43.6381 ], [ 3.8699, 43.6379 ], [ 3.8697, 43.6378 ], [ 3.8701, 43.6377 ], [ 3.8703, 43.6376 ], [ 3.8703, 43.6372 ], [ 3.8696, 43.6364 ], [ 3.8687, 43.6364 ], [ 3.8684, 43.6358 ], [ 3.8683, 43.6357 ], [ 3.8682, 43.6355 ], [ 3.8682, 43.6352 ], [ 3.8682, 43.6349 ], [ 3.8681, 43.6348 ], [ 3.8679, 43.6347 ], [ 3.8676, 43.6347 ], [ 3.867, 43.6347 ], [ 3.8668, 43.6347 ], [ 3.8667, 43.6349 ], [ 3.8667, 43.6349 ], [ 3.8667, 43.635 ] ] ], "type": "Polygon" }, "id": "55", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034015", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Vert-Bois" }, "type": "Feature" }, { "bbox": [ 1.3685, 44.0085, 1.3867, 44.0176 ], "geometry": { "coordinates": [ [ [ 1.3867, 44.0146 ], [ 1.3866, 44.0144 ], [ 1.3861, 44.0143 ], [ 1.3849, 44.0141 ], [ 1.3845, 44.014 ], [ 1.3838, 44.0139 ], [ 1.3848, 44.0127 ], [ 1.3842, 44.0122 ], [ 1.3836, 44.0117 ], [ 1.3827, 44.011 ], [ 1.3832, 44.0107 ], [ 1.384, 44.0103 ], [ 1.3841, 44.0102 ], [ 1.3841, 44.0102 ], [ 1.3839, 44.0101 ], [ 1.3836, 44.0099 ], [ 1.3833, 44.0096 ], [ 1.383, 44.0093 ], [ 1.3827, 44.009 ], [ 1.3825, 44.0088 ], [ 1.3824, 44.0088 ], [ 1.3821, 44.0088 ], [ 1.3818, 44.0091 ], [ 1.3807, 44.0098 ], [ 1.3813, 44.0103 ], [ 1.3809, 44.0105 ], [ 1.3806, 44.0106 ], [ 1.3804, 44.0108 ], [ 1.3803, 44.0108 ], [ 1.3802, 44.0108 ], [ 1.3802, 44.0108 ], [ 1.3793, 44.0111 ], [ 1.3792, 44.0109 ], [ 1.3789, 44.011 ], [ 1.3789, 44.0111 ], [ 1.3786, 44.0111 ], [ 1.3786, 44.0114 ], [ 1.3782, 44.0114 ], [ 1.3779, 44.0105 ], [ 1.3779, 44.0103 ], [ 1.3786, 44.01 ], [ 1.3787, 44.01 ], [ 1.379, 44.0098 ], [ 1.3797, 44.0097 ], [ 1.3796, 44.0094 ], [ 1.3788, 44.0095 ], [ 1.3787, 44.0085 ], [ 1.3781, 44.0085 ], [ 1.3777, 44.0086 ], [ 1.3774, 44.0086 ], [ 1.3774, 44.0086 ], [ 1.3771, 44.0087 ], [ 1.3764, 44.0087 ], [ 1.3762, 44.0088 ], [ 1.376, 44.0089 ], [ 1.3757, 44.009 ], [ 1.3756, 44.0092 ], [ 1.3747, 44.0099 ], [ 1.3737, 44.011 ], [ 1.3735, 44.0104 ], [ 1.3734, 44.0102 ], [ 1.3734, 44.0102 ], [ 1.3733, 44.0101 ], [ 1.3732, 44.01 ], [ 1.3733, 44.0099 ], [ 1.3732, 44.0097 ], [ 1.3724, 44.0098 ], [ 1.3723, 44.0098 ], [ 1.3721, 44.0098 ], [ 1.3721, 44.0099 ], [ 1.3713, 44.0101 ], [ 1.3716, 44.0107 ], [ 1.3718, 44.0109 ], [ 1.3713, 44.0111 ], [ 1.3711, 44.0112 ], [ 1.3708, 44.0107 ], [ 1.3703, 44.0108 ], [ 1.3704, 44.0109 ], [ 1.3698, 44.0111 ], [ 1.3697, 44.0112 ], [ 1.3699, 44.0116 ], [ 1.3693, 44.0116 ], [ 1.3688, 44.0117 ], [ 1.3685, 44.012 ], [ 1.3698, 44.0128 ], [ 1.3701, 44.0127 ], [ 1.3704, 44.0128 ], [ 1.371, 44.0132 ], [ 1.3718, 44.0138 ], [ 1.3719, 44.0138 ], [ 1.3729, 44.015 ], [ 1.3735, 44.0157 ], [ 1.3742, 44.0153 ], [ 1.3751, 44.0161 ], [ 1.3759, 44.0168 ], [ 1.3761, 44.017 ], [ 1.3766, 44.0172 ], [ 1.3773, 44.0166 ], [ 1.378, 44.016 ], [ 1.3779, 44.0159 ], [ 1.3774, 44.0156 ], [ 1.377, 44.0153 ], [ 1.3769, 44.0155 ], [ 1.3764, 44.0152 ], [ 1.3763, 44.0153 ], [ 1.3754, 44.0145 ], [ 1.3758, 44.0142 ], [ 1.3763, 44.014 ], [ 1.3754, 44.0129 ], [ 1.3754, 44.0128 ], [ 1.375, 44.0122 ], [ 1.3751, 44.0122 ], [ 1.3744, 44.0121 ], [ 1.374, 44.012 ], [ 1.3739, 44.0121 ], [ 1.3737, 44.0112 ], [ 1.3739, 44.0109 ], [ 1.3751, 44.0108 ], [ 1.3754, 44.0108 ], [ 1.3756, 44.0106 ], [ 1.3764, 44.0105 ], [ 1.3766, 44.0105 ], [ 1.3767, 44.0107 ], [ 1.3766, 44.0107 ], [ 1.3765, 44.0107 ], [ 1.3762, 44.0108 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.011 ], [ 1.3763, 44.0112 ], [ 1.3762, 44.0112 ], [ 1.3761, 44.0112 ], [ 1.3757, 44.0112 ], [ 1.3757, 44.0113 ], [ 1.3757, 44.0113 ], [ 1.3758, 44.0118 ], [ 1.3758, 44.0118 ], [ 1.3758, 44.012 ], [ 1.3757, 44.0122 ], [ 1.3765, 44.0122 ], [ 1.3769, 44.0122 ], [ 1.3771, 44.0122 ], [ 1.3773, 44.0123 ], [ 1.3784, 44.0124 ], [ 1.3786, 44.0125 ], [ 1.3788, 44.0124 ], [ 1.3789, 44.0124 ], [ 1.3792, 44.0124 ], [ 1.3793, 44.0125 ], [ 1.3794, 44.0126 ], [ 1.3804, 44.0128 ], [ 1.3806, 44.0128 ], [ 1.3809, 44.0129 ], [ 1.3812, 44.0131 ], [ 1.3814, 44.0132 ], [ 1.3814, 44.0133 ], [ 1.381, 44.0138 ], [ 1.3825, 44.0143 ], [ 1.3821, 44.0149 ], [ 1.3819, 44.0151 ], [ 1.3813, 44.0158 ], [ 1.3817, 44.0159 ], [ 1.3822, 44.0161 ], [ 1.3829, 44.0164 ], [ 1.3836, 44.0167 ], [ 1.3839, 44.0168 ], [ 1.3841, 44.0168 ], [ 1.3837, 44.0176 ], [ 1.384, 44.0176 ], [ 1.3843, 44.0176 ], [ 1.3847, 44.0169 ], [ 1.3848, 44.017 ], [ 1.3855, 44.0166 ], [ 1.3855, 44.0166 ], [ 1.3858, 44.0164 ], [ 1.3857, 44.016 ], [ 1.3864, 44.0156 ], [ 1.3863, 44.015 ], [ 1.3863, 44.0149 ], [ 1.3864, 44.0148 ], [ 1.3866, 44.0147 ], [ 1.3867, 44.0146 ], [ 1.3867, 44.0146 ] ] ], "type": "Polygon" }, "id": "56", "properties": { "code_commune": "82121", "code_departement": "82", "code_qp": "QP082002", "commune_qp": "Montauban", "nom_commune": "Montauban", "nom_qp": "Médiathèque - Chambord" }, "type": "Feature" }, { "bbox": [ 2.1581, 43.9249, 2.1666, 43.9301 ], "geometry": { "coordinates": [ [ [ 2.1634, 43.9298 ], [ 2.1645, 43.9293 ], [ 2.1646, 43.9292 ], [ 2.1644, 43.9291 ], [ 2.1648, 43.9287 ], [ 2.165, 43.9286 ], [ 2.1651, 43.9284 ], [ 2.1653, 43.9282 ], [ 2.1652, 43.9279 ], [ 2.1653, 43.9279 ], [ 2.1662, 43.9278 ], [ 2.1661, 43.9278 ], [ 2.1666, 43.9276 ], [ 2.1665, 43.9272 ], [ 2.166, 43.9272 ], [ 2.166, 43.9273 ], [ 2.1659, 43.9274 ], [ 2.1651, 43.9275 ], [ 2.165, 43.9274 ], [ 2.1646, 43.9274 ], [ 2.1646, 43.9273 ], [ 2.1644, 43.9274 ], [ 2.1643, 43.9271 ], [ 2.164, 43.9271 ], [ 2.1639, 43.9267 ], [ 2.1638, 43.9266 ], [ 2.1633, 43.9266 ], [ 2.1632, 43.9261 ], [ 2.1632, 43.9261 ], [ 2.1631, 43.926 ], [ 2.1629, 43.9257 ], [ 2.1623, 43.9257 ], [ 2.1622, 43.9253 ], [ 2.162, 43.9252 ], [ 2.1614, 43.9254 ], [ 2.1613, 43.925 ], [ 2.1607, 43.9252 ], [ 2.1596, 43.9255 ], [ 2.1596, 43.9254 ], [ 2.1592, 43.9249 ], [ 2.159, 43.9249 ], [ 2.1587, 43.925 ], [ 2.1584, 43.9252 ], [ 2.1581, 43.9253 ], [ 2.1587, 43.9267 ], [ 2.1598, 43.9265 ], [ 2.1597, 43.9259 ], [ 2.1603, 43.9259 ], [ 2.1606, 43.9259 ], [ 2.161, 43.9258 ], [ 2.1612, 43.9262 ], [ 2.1612, 43.9264 ], [ 2.1615, 43.9264 ], [ 2.1616, 43.9267 ], [ 2.1615, 43.9267 ], [ 2.1617, 43.9273 ], [ 2.1618, 43.9273 ], [ 2.1618, 43.9273 ], [ 2.1619, 43.9276 ], [ 2.1619, 43.9278 ], [ 2.162, 43.9283 ], [ 2.1616, 43.9284 ], [ 2.1611, 43.9283 ], [ 2.1611, 43.9287 ], [ 2.1611, 43.9288 ], [ 2.1621, 43.9287 ], [ 2.1622, 43.929 ], [ 2.1632, 43.9288 ], [ 2.1633, 43.9293 ], [ 2.1629, 43.9294 ], [ 2.1627, 43.9297 ], [ 2.1628, 43.9297 ], [ 2.1626, 43.9299 ], [ 2.1631, 43.9301 ], [ 2.1632, 43.9301 ], [ 2.1634, 43.9298 ] ] ], "type": "Polygon" }, "id": "57", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081008", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Lapanouse" }, "type": "Feature" }, { "bbox": [ 1.4619, 43.565, 1.4697, 43.5738 ], "geometry": { "coordinates": [ [ [ 1.4636, 43.5734 ], [ 1.4637, 43.5734 ], [ 1.4626, 43.5724 ], [ 1.4639, 43.5722 ], [ 1.4628, 43.5712 ], [ 1.464, 43.5705 ], [ 1.4639, 43.5705 ], [ 1.4641, 43.5704 ], [ 1.4642, 43.5704 ], [ 1.4645, 43.5702 ], [ 1.4647, 43.57 ], [ 1.4648, 43.5693 ], [ 1.4654, 43.5693 ], [ 1.4658, 43.5689 ], [ 1.4664, 43.5692 ], [ 1.4679, 43.5699 ], [ 1.4685, 43.5693 ], [ 1.4692, 43.5686 ], [ 1.4697, 43.5681 ], [ 1.4658, 43.5661 ], [ 1.4652, 43.5657 ], [ 1.4645, 43.565 ], [ 1.464, 43.5656 ], [ 1.4635, 43.5658 ], [ 1.4637, 43.566 ], [ 1.4633, 43.5663 ], [ 1.4634, 43.5677 ], [ 1.4643, 43.5676 ], [ 1.464, 43.569 ], [ 1.4634, 43.5691 ], [ 1.4633, 43.5702 ], [ 1.4619, 43.5705 ], [ 1.4626, 43.5713 ], [ 1.4623, 43.5715 ], [ 1.4627, 43.5719 ], [ 1.462, 43.5725 ], [ 1.4627, 43.5731 ], [ 1.4624, 43.5732 ], [ 1.463, 43.5738 ], [ 1.463, 43.5738 ], [ 1.4636, 43.5734 ] ] ], "type": "Polygon" }, "id": "58", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031015", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Rangueil" }, "type": "Feature" }, { "bbox": [ 2.9733, 43.1814, 2.9962, 43.19 ], "geometry": { "coordinates": [ [ [ 2.9837, 43.1842 ], [ 2.9837, 43.1836 ], [ 2.9812, 43.1837 ], [ 2.9808, 43.1838 ], [ 2.9807, 43.1827 ], [ 2.9807, 43.1827 ], [ 2.981, 43.1827 ], [ 2.9809, 43.1816 ], [ 2.98, 43.1815 ], [ 2.9786, 43.1815 ], [ 2.9779, 43.1814 ], [ 2.9779, 43.1819 ], [ 2.978, 43.1826 ], [ 2.978, 43.1827 ], [ 2.978, 43.1834 ], [ 2.978, 43.1834 ], [ 2.9778, 43.1834 ], [ 2.9776, 43.1834 ], [ 2.9768, 43.1833 ], [ 2.9762, 43.1833 ], [ 2.9761, 43.1833 ], [ 2.976, 43.1833 ], [ 2.9759, 43.1832 ], [ 2.9761, 43.1826 ], [ 2.9761, 43.1826 ], [ 2.9755, 43.1825 ], [ 2.9752, 43.1825 ], [ 2.9751, 43.1825 ], [ 2.975, 43.1825 ], [ 2.9749, 43.1825 ], [ 2.9749, 43.182 ], [ 2.9743, 43.1819 ], [ 2.9743, 43.1821 ], [ 2.9739, 43.1821 ], [ 2.9739, 43.182 ], [ 2.9739, 43.182 ], [ 2.9734, 43.182 ], [ 2.9734, 43.1827 ], [ 2.9733, 43.1831 ], [ 2.9735, 43.1831 ], [ 2.974, 43.1833 ], [ 2.9755, 43.1838 ], [ 2.9757, 43.1839 ], [ 2.9758, 43.1839 ], [ 2.9763, 43.1842 ], [ 2.9764, 43.1842 ], [ 2.9765, 43.1843 ], [ 2.9768, 43.1848 ], [ 2.9768, 43.1849 ], [ 2.9768, 43.1852 ], [ 2.9762, 43.1851 ], [ 2.9762, 43.1858 ], [ 2.9763, 43.1861 ], [ 2.9763, 43.1863 ], [ 2.9765, 43.1864 ], [ 2.9765, 43.1866 ], [ 2.9768, 43.1866 ], [ 2.9769, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9775, 43.1865 ], [ 2.9775, 43.1864 ], [ 2.9778, 43.1864 ], [ 2.9778, 43.1863 ], [ 2.9782, 43.1864 ], [ 2.9782, 43.1864 ], [ 2.9783, 43.1865 ], [ 2.9783, 43.1865 ], [ 2.9786, 43.1865 ], [ 2.9786, 43.1867 ], [ 2.9785, 43.1868 ], [ 2.9786, 43.1868 ], [ 2.9786, 43.1868 ], [ 2.979, 43.1868 ], [ 2.979, 43.1867 ], [ 2.9789, 43.1866 ], [ 2.9789, 43.1865 ], [ 2.9789, 43.1864 ], [ 2.9789, 43.1861 ], [ 2.9793, 43.1861 ], [ 2.9793, 43.1859 ], [ 2.9786, 43.1859 ], [ 2.9786, 43.1858 ], [ 2.9786, 43.1849 ], [ 2.9786, 43.1846 ], [ 2.979, 43.1847 ], [ 2.9791, 43.1847 ], [ 2.9794, 43.1847 ], [ 2.9798, 43.1847 ], [ 2.981, 43.185 ], [ 2.9811, 43.1847 ], [ 2.981, 43.1846 ], [ 2.981, 43.1841 ], [ 2.9817, 43.1841 ], [ 2.9822, 43.1842 ], [ 2.9824, 43.1841 ], [ 2.9825, 43.1841 ], [ 2.9832, 43.1841 ], [ 2.9832, 43.1841 ], [ 2.9833, 43.1842 ], [ 2.9833, 43.1843 ], [ 2.9836, 43.1855 ], [ 2.9837, 43.1856 ], [ 2.9839, 43.1864 ], [ 2.984, 43.1871 ], [ 2.9836, 43.1871 ], [ 2.984, 43.1877 ], [ 2.9842, 43.188 ], [ 2.9843, 43.1881 ], [ 2.9844, 43.1881 ], [ 2.9847, 43.1882 ], [ 2.9848, 43.1882 ], [ 2.985, 43.1885 ], [ 2.9852, 43.189 ], [ 2.9854, 43.1891 ], [ 2.9854, 43.1891 ], [ 2.9863, 43.1886 ], [ 2.9864, 43.1886 ], [ 2.9864, 43.1887 ], [ 2.9865, 43.1887 ], [ 2.9866, 43.1888 ], [ 2.9867, 43.1888 ], [ 2.9876, 43.1884 ], [ 2.9878, 43.1888 ], [ 2.9881, 43.1891 ], [ 2.9882, 43.1893 ], [ 2.9881, 43.1894 ], [ 2.9885, 43.1898 ], [ 2.9898, 43.189 ], [ 2.9901, 43.1888 ], [ 2.9903, 43.1886 ], [ 2.991, 43.1882 ], [ 2.9913, 43.1886 ], [ 2.9917, 43.1889 ], [ 2.9923, 43.189 ], [ 2.9929, 43.1887 ], [ 2.9933, 43.189 ], [ 2.9936, 43.1892 ], [ 2.9936, 43.1892 ], [ 2.9935, 43.1894 ], [ 2.9935, 43.1895 ], [ 2.9935, 43.1896 ], [ 2.9941, 43.1898 ], [ 2.9947, 43.19 ], [ 2.9949, 43.19 ], [ 2.9951, 43.1898 ], [ 2.9958, 43.1889 ], [ 2.9961, 43.1886 ], [ 2.9962, 43.1884 ], [ 2.9955, 43.1887 ], [ 2.9941, 43.1891 ], [ 2.9934, 43.1885 ], [ 2.993, 43.1881 ], [ 2.9928, 43.1879 ], [ 2.9928, 43.1877 ], [ 2.9929, 43.1877 ], [ 2.9932, 43.1877 ], [ 2.9934, 43.1877 ], [ 2.9939, 43.1878 ], [ 2.9942, 43.1878 ], [ 2.9942, 43.1878 ], [ 2.9943, 43.1877 ], [ 2.995, 43.1877 ], [ 2.9954, 43.1877 ], [ 2.9958, 43.1877 ], [ 2.9961, 43.1876 ], [ 2.9953, 43.1866 ], [ 2.995, 43.1867 ], [ 2.9945, 43.1869 ], [ 2.9946, 43.1871 ], [ 2.9944, 43.1872 ], [ 2.9944, 43.1872 ], [ 2.994, 43.1874 ], [ 2.9939, 43.1874 ], [ 2.9937, 43.1871 ], [ 2.9934, 43.1873 ], [ 2.9931, 43.1874 ], [ 2.9923, 43.1876 ], [ 2.9921, 43.1871 ], [ 2.9919, 43.1871 ], [ 2.992, 43.1871 ], [ 2.9916, 43.1873 ], [ 2.9916, 43.1874 ], [ 2.9915, 43.1874 ], [ 2.9909, 43.1877 ], [ 2.9908, 43.1873 ], [ 2.9907, 43.1871 ], [ 2.9906, 43.187 ], [ 2.9905, 43.187 ], [ 2.9895, 43.1871 ], [ 2.9888, 43.1872 ], [ 2.9877, 43.1872 ], [ 2.9871, 43.1873 ], [ 2.9866, 43.1873 ], [ 2.986, 43.1873 ], [ 2.9858, 43.1871 ], [ 2.9855, 43.187 ], [ 2.9853, 43.187 ], [ 2.9848, 43.187 ], [ 2.9848, 43.1866 ], [ 2.9849, 43.1865 ], [ 2.9848, 43.1859 ], [ 2.9843, 43.1859 ], [ 2.9843, 43.1856 ], [ 2.9843, 43.1855 ], [ 2.985, 43.1855 ], [ 2.9848, 43.1842 ], [ 2.9841, 43.1842 ], [ 2.9837, 43.1842 ] ] ], "type": "Polygon" }, "id": "59", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011007", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Ouest" }, "type": "Feature" }, { "bbox": [ 4.0105, 44.2164, 4.0202, 44.2295 ], "geometry": { "coordinates": [ [ [ 4.0202, 44.2165 ], [ 4.02, 44.2164 ], [ 4.0198, 44.2166 ], [ 4.0197, 44.2168 ], [ 4.0196, 44.2169 ], [ 4.0194, 44.2171 ], [ 4.0192, 44.2172 ], [ 4.0189, 44.2174 ], [ 4.0188, 44.2175 ], [ 4.0187, 44.2176 ], [ 4.0182, 44.2178 ], [ 4.0177, 44.2181 ], [ 4.0169, 44.2185 ], [ 4.0163, 44.2188 ], [ 4.016, 44.2191 ], [ 4.0151, 44.2198 ], [ 4.0147, 44.22 ], [ 4.0144, 44.2203 ], [ 4.0142, 44.2205 ], [ 4.014, 44.2206 ], [ 4.0139, 44.2207 ], [ 4.0139, 44.2208 ], [ 4.0139, 44.2208 ], [ 4.0137, 44.2208 ], [ 4.0136, 44.2208 ], [ 4.0134, 44.221 ], [ 4.0133, 44.2214 ], [ 4.0132, 44.2217 ], [ 4.0132, 44.2218 ], [ 4.0132, 44.2219 ], [ 4.0132, 44.222 ], [ 4.0137, 44.2222 ], [ 4.014, 44.2224 ], [ 4.0138, 44.2226 ], [ 4.0137, 44.2228 ], [ 4.0136, 44.223 ], [ 4.0135, 44.2232 ], [ 4.0134, 44.2234 ], [ 4.0134, 44.2236 ], [ 4.0133, 44.2236 ], [ 4.0132, 44.2239 ], [ 4.0132, 44.224 ], [ 4.0132, 44.2241 ], [ 4.0132, 44.2242 ], [ 4.0131, 44.2246 ], [ 4.0131, 44.2246 ], [ 4.0131, 44.2248 ], [ 4.013, 44.2252 ], [ 4.0129, 44.2255 ], [ 4.0128, 44.2256 ], [ 4.0128, 44.2258 ], [ 4.0127, 44.2259 ], [ 4.0126, 44.2261 ], [ 4.0125, 44.2263 ], [ 4.0124, 44.2265 ], [ 4.0123, 44.2266 ], [ 4.0121, 44.227 ], [ 4.0121, 44.227 ], [ 4.012, 44.227 ], [ 4.0118, 44.2274 ], [ 4.0117, 44.2276 ], [ 4.0116, 44.2277 ], [ 4.0114, 44.2279 ], [ 4.0112, 44.2281 ], [ 4.011, 44.2283 ], [ 4.0108, 44.2284 ], [ 4.0108, 44.2284 ], [ 4.0108, 44.2285 ], [ 4.0108, 44.2285 ], [ 4.0106, 44.2286 ], [ 4.0105, 44.2287 ], [ 4.0106, 44.2289 ], [ 4.0107, 44.2289 ], [ 4.0108, 44.2289 ], [ 4.0108, 44.2289 ], [ 4.011, 44.229 ], [ 4.011, 44.229 ], [ 4.0114, 44.2291 ], [ 4.0112, 44.2294 ], [ 4.0112, 44.2295 ], [ 4.0113, 44.2295 ], [ 4.0114, 44.2295 ], [ 4.0116, 44.2295 ], [ 4.0119, 44.2295 ], [ 4.0121, 44.2295 ], [ 4.0121, 44.2295 ], [ 4.0121, 44.2294 ], [ 4.0122, 44.2293 ], [ 4.0123, 44.2293 ], [ 4.0124, 44.2292 ], [ 4.0128, 44.2292 ], [ 4.0129, 44.229 ], [ 4.0128, 44.229 ], [ 4.0127, 44.229 ], [ 4.0127, 44.229 ], [ 4.0126, 44.229 ], [ 4.0125, 44.2289 ], [ 4.0126, 44.2289 ], [ 4.0125, 44.2289 ], [ 4.0127, 44.2287 ], [ 4.0127, 44.2287 ], [ 4.0127, 44.2287 ], [ 4.0124, 44.2285 ], [ 4.0122, 44.2285 ], [ 4.012, 44.2284 ], [ 4.0118, 44.2283 ], [ 4.0117, 44.2283 ], [ 4.0118, 44.2282 ], [ 4.0118, 44.2282 ], [ 4.0119, 44.2281 ], [ 4.012, 44.2281 ], [ 4.0119, 44.2281 ], [ 4.0119, 44.228 ], [ 4.012, 44.228 ], [ 4.0121, 44.228 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.228 ], [ 4.0125, 44.228 ], [ 4.0127, 44.2279 ], [ 4.013, 44.2277 ], [ 4.0131, 44.2277 ], [ 4.0131, 44.2276 ], [ 4.0131, 44.2275 ], [ 4.0131, 44.2274 ], [ 4.0131, 44.2273 ], [ 4.0131, 44.2272 ], [ 4.0131, 44.2272 ], [ 4.0136, 44.2272 ], [ 4.0141, 44.2272 ], [ 4.0141, 44.2272 ], [ 4.0142, 44.2272 ], [ 4.0144, 44.2272 ], [ 4.0144, 44.2273 ], [ 4.0144, 44.2274 ], [ 4.0146, 44.2275 ], [ 4.0147, 44.2275 ], [ 4.0147, 44.2275 ], [ 4.0148, 44.2275 ], [ 4.0149, 44.2276 ], [ 4.015, 44.2276 ], [ 4.015, 44.2276 ], [ 4.0151, 44.2277 ], [ 4.0151, 44.2277 ], [ 4.0151, 44.2278 ], [ 4.0152, 44.2278 ], [ 4.0153, 44.2278 ], [ 4.0153, 44.2279 ], [ 4.0154, 44.2279 ], [ 4.0155, 44.228 ], [ 4.0156, 44.2279 ], [ 4.0157, 44.2279 ], [ 4.0157, 44.2279 ], [ 4.0156, 44.2276 ], [ 4.0155, 44.2275 ], [ 4.0155, 44.2274 ], [ 4.0155, 44.2273 ], [ 4.0155, 44.2272 ], [ 4.0155, 44.2271 ], [ 4.0155, 44.2271 ], [ 4.0156, 44.227 ], [ 4.0156, 44.2269 ], [ 4.0157, 44.2268 ], [ 4.0161, 44.2265 ], [ 4.0157, 44.2258 ], [ 4.0152, 44.225 ], [ 4.0152, 44.2245 ], [ 4.0152, 44.2245 ], [ 4.0151, 44.2244 ], [ 4.0151, 44.2243 ], [ 4.015, 44.2242 ], [ 4.015, 44.2242 ], [ 4.0149, 44.224 ], [ 4.0149, 44.2239 ], [ 4.0151, 44.2238 ], [ 4.0154, 44.2236 ], [ 4.0156, 44.2235 ], [ 4.016, 44.2233 ], [ 4.0162, 44.2232 ], [ 4.0163, 44.2232 ], [ 4.0164, 44.2232 ], [ 4.0164, 44.2232 ], [ 4.0166, 44.2235 ], [ 4.0169, 44.224 ], [ 4.0171, 44.2239 ], [ 4.0173, 44.2239 ], [ 4.0174, 44.2238 ], [ 4.018, 44.2237 ], [ 4.018, 44.2237 ], [ 4.018, 44.2238 ], [ 4.0181, 44.224 ], [ 4.0185, 44.2239 ], [ 4.0188, 44.2237 ], [ 4.0187, 44.2236 ], [ 4.0188, 44.2234 ], [ 4.0187, 44.2233 ], [ 4.0187, 44.2231 ], [ 4.0186, 44.2229 ], [ 4.0187, 44.2229 ], [ 4.0185, 44.2228 ], [ 4.0184, 44.2228 ], [ 4.0183, 44.2228 ], [ 4.0182, 44.2227 ], [ 4.0182, 44.2225 ], [ 4.0183, 44.2224 ], [ 4.0186, 44.2223 ], [ 4.0186, 44.2223 ], [ 4.0188, 44.2222 ], [ 4.0188, 44.2222 ], [ 4.019, 44.2221 ], [ 4.0191, 44.2219 ], [ 4.0192, 44.2218 ], [ 4.0194, 44.2218 ], [ 4.0195, 44.2218 ], [ 4.0195, 44.2217 ], [ 4.0192, 44.2216 ], [ 4.0192, 44.2216 ], [ 4.019, 44.2215 ], [ 4.0191, 44.2214 ], [ 4.0189, 44.2213 ], [ 4.0189, 44.2212 ], [ 4.0189, 44.221 ], [ 4.019, 44.221 ], [ 4.019, 44.2209 ], [ 4.019, 44.2208 ], [ 4.019, 44.2208 ], [ 4.0191, 44.2207 ], [ 4.0191, 44.2207 ], [ 4.0191, 44.2206 ], [ 4.0192, 44.2205 ], [ 4.0193, 44.2205 ], [ 4.0196, 44.2202 ], [ 4.0197, 44.2201 ], [ 4.0197, 44.2199 ], [ 4.0202, 44.2196 ], [ 4.02, 44.2195 ], [ 4.0198, 44.2195 ], [ 4.0194, 44.2193 ], [ 4.0194, 44.2192 ], [ 4.0194, 44.2191 ], [ 4.0193, 44.219 ], [ 4.0196, 44.2187 ], [ 4.0197, 44.2186 ], [ 4.0196, 44.2185 ], [ 4.0196, 44.2185 ], [ 4.0196, 44.2184 ], [ 4.0196, 44.2183 ], [ 4.0196, 44.2181 ], [ 4.019, 44.218 ], [ 4.0193, 44.2176 ], [ 4.0193, 44.2175 ], [ 4.0195, 44.2173 ], [ 4.0196, 44.2171 ], [ 4.0199, 44.2167 ], [ 4.0202, 44.2165 ] ] ], "type": "Polygon" }, "id": "60", "properties": { "code_commune": "30132", "code_departement": "30", "code_qp": "QP030017", "commune_qp": "La Grand-Combe", "nom_commune": "La Grand-Combe", "nom_qp": "Trescol - La Levade" }, "type": "Feature" }, { "bbox": [ 3.8707, 43.5912, 3.874, 43.594 ], "geometry": { "coordinates": [ [ [ 3.8721, 43.594 ], [ 3.8726, 43.5937 ], [ 3.8729, 43.5936 ], [ 3.8733, 43.5934 ], [ 3.8734, 43.5933 ], [ 3.8737, 43.5932 ], [ 3.8738, 43.5931 ], [ 3.874, 43.593 ], [ 3.8732, 43.5921 ], [ 3.873, 43.5921 ], [ 3.8729, 43.5921 ], [ 3.8727, 43.5922 ], [ 3.8725, 43.5923 ], [ 3.8723, 43.5921 ], [ 3.8728, 43.5919 ], [ 3.8733, 43.5917 ], [ 3.8727, 43.5912 ], [ 3.8719, 43.5916 ], [ 3.8715, 43.5913 ], [ 3.8707, 43.5917 ], [ 3.8713, 43.5923 ], [ 3.8716, 43.5927 ], [ 3.8712, 43.5929 ], [ 3.8717, 43.5935 ], [ 3.8717, 43.5936 ], [ 3.8721, 43.594 ] ] ], "type": "Polygon" }, "id": "61", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034011", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Lemasson" }, "type": "Feature" }, { "bbox": [ 3.8982, 43.6178, 3.9038, 43.6215 ], "geometry": { "coordinates": [ [ [ 3.9006, 43.6185 ], [ 3.9002, 43.6184 ], [ 3.8991, 43.6183 ], [ 3.8988, 43.6183 ], [ 3.8986, 43.6183 ], [ 3.8982, 43.6184 ], [ 3.8983, 43.6185 ], [ 3.8986, 43.6188 ], [ 3.8988, 43.6189 ], [ 3.899, 43.619 ], [ 3.8994, 43.6192 ], [ 3.8996, 43.6193 ], [ 3.8997, 43.6193 ], [ 3.8999, 43.6194 ], [ 3.9002, 43.6194 ], [ 3.9005, 43.6194 ], [ 3.9007, 43.6195 ], [ 3.9008, 43.6196 ], [ 3.901, 43.6197 ], [ 3.901, 43.6198 ], [ 3.9011, 43.6199 ], [ 3.9011, 43.62 ], [ 3.9015, 43.6203 ], [ 3.9016, 43.6204 ], [ 3.9017, 43.6205 ], [ 3.9017, 43.6206 ], [ 3.9016, 43.621 ], [ 3.9016, 43.621 ], [ 3.9017, 43.6212 ], [ 3.9018, 43.6213 ], [ 3.9019, 43.6213 ], [ 3.9021, 43.6214 ], [ 3.9026, 43.6214 ], [ 3.9029, 43.6214 ], [ 3.9031, 43.6215 ], [ 3.9033, 43.6215 ], [ 3.9034, 43.6215 ], [ 3.9036, 43.6214 ], [ 3.9036, 43.6213 ], [ 3.9037, 43.6213 ], [ 3.9037, 43.6212 ], [ 3.9038, 43.6209 ], [ 3.9038, 43.6208 ], [ 3.9037, 43.6208 ], [ 3.9036, 43.6207 ], [ 3.9034, 43.6206 ], [ 3.9033, 43.6205 ], [ 3.9033, 43.6204 ], [ 3.9034, 43.6201 ], [ 3.9034, 43.62 ], [ 3.9037, 43.6198 ], [ 3.9038, 43.6197 ], [ 3.9033, 43.6195 ], [ 3.9032, 43.6195 ], [ 3.9033, 43.6191 ], [ 3.903, 43.6191 ], [ 3.9027, 43.6191 ], [ 3.9023, 43.6191 ], [ 3.9019, 43.6192 ], [ 3.9015, 43.6193 ], [ 3.9009, 43.6194 ], [ 3.9011, 43.6189 ], [ 3.9012, 43.6185 ], [ 3.9014, 43.618 ], [ 3.9014, 43.6179 ], [ 3.9012, 43.6178 ], [ 3.9011, 43.6178 ], [ 3.9009, 43.6178 ], [ 3.9008, 43.6178 ], [ 3.9007, 43.6178 ], [ 3.9007, 43.6179 ], [ 3.9006, 43.6185 ] ] ], "type": "Polygon" }, "id": "62", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034013", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Pompignane" }, "type": "Feature" }, { "bbox": [ 1.1403, 42.9816, 1.1485, 42.9867 ], "geometry": { "coordinates": [ [ [ 1.1438, 42.9863 ], [ 1.1441, 42.9864 ], [ 1.1443, 42.9865 ], [ 1.1445, 42.9866 ], [ 1.1447, 42.9867 ], [ 1.145, 42.9864 ], [ 1.145, 42.9863 ], [ 1.145, 42.9863 ], [ 1.1452, 42.9862 ], [ 1.1453, 42.9863 ], [ 1.1454, 42.9863 ], [ 1.1455, 42.9863 ], [ 1.1454, 42.9862 ], [ 1.1455, 42.9862 ], [ 1.1456, 42.9862 ], [ 1.1456, 42.9862 ], [ 1.1455, 42.9862 ], [ 1.1455, 42.9861 ], [ 1.1455, 42.9861 ], [ 1.1456, 42.9861 ], [ 1.1456, 42.986 ], [ 1.1455, 42.986 ], [ 1.1455, 42.9859 ], [ 1.146, 42.9858 ], [ 1.1465, 42.9857 ], [ 1.1467, 42.9856 ], [ 1.1468, 42.9856 ], [ 1.147, 42.9855 ], [ 1.1472, 42.9853 ], [ 1.1473, 42.9851 ], [ 1.1475, 42.9847 ], [ 1.1485, 42.9829 ], [ 1.1481, 42.9828 ], [ 1.1478, 42.9827 ], [ 1.1474, 42.9828 ], [ 1.1472, 42.9828 ], [ 1.147, 42.9827 ], [ 1.146, 42.9823 ], [ 1.1449, 42.9834 ], [ 1.1448, 42.9835 ], [ 1.1447, 42.9834 ], [ 1.1446, 42.9835 ], [ 1.1445, 42.9836 ], [ 1.1442, 42.9839 ], [ 1.1441, 42.9841 ], [ 1.144, 42.9842 ], [ 1.1435, 42.9844 ], [ 1.1432, 42.9846 ], [ 1.1433, 42.9848 ], [ 1.1427, 42.9857 ], [ 1.1421, 42.9855 ], [ 1.1422, 42.9853 ], [ 1.1429, 42.9842 ], [ 1.1432, 42.984 ], [ 1.1437, 42.9836 ], [ 1.1442, 42.9831 ], [ 1.1442, 42.9832 ], [ 1.1443, 42.9831 ], [ 1.1443, 42.9831 ], [ 1.1443, 42.983 ], [ 1.1442, 42.983 ], [ 1.1444, 42.9829 ], [ 1.1445, 42.9828 ], [ 1.1446, 42.9827 ], [ 1.1449, 42.9825 ], [ 1.1452, 42.9823 ], [ 1.1455, 42.9819 ], [ 1.1454, 42.9819 ], [ 1.1451, 42.9818 ], [ 1.1451, 42.9817 ], [ 1.1449, 42.9816 ], [ 1.1448, 42.9817 ], [ 1.1446, 42.9816 ], [ 1.1446, 42.9817 ], [ 1.1443, 42.9816 ], [ 1.1441, 42.9817 ], [ 1.1443, 42.9818 ], [ 1.1442, 42.9818 ], [ 1.1441, 42.9819 ], [ 1.144, 42.982 ], [ 1.1439, 42.982 ], [ 1.1438, 42.9821 ], [ 1.1439, 42.9821 ], [ 1.1436, 42.9825 ], [ 1.1435, 42.9824 ], [ 1.1434, 42.9824 ], [ 1.1433, 42.9825 ], [ 1.1432, 42.983 ], [ 1.1432, 42.9832 ], [ 1.1431, 42.9833 ], [ 1.1427, 42.9838 ], [ 1.1425, 42.984 ], [ 1.1413, 42.9852 ], [ 1.1412, 42.9851 ], [ 1.1406, 42.9849 ], [ 1.1403, 42.9854 ], [ 1.1412, 42.9858 ], [ 1.1413, 42.9859 ], [ 1.1415, 42.986 ], [ 1.1414, 42.9862 ], [ 1.1416, 42.9862 ], [ 1.142, 42.9857 ], [ 1.1426, 42.9859 ], [ 1.1438, 42.9863 ] ] ], "type": "Polygon" }, "id": "63", "properties": { "code_commune": "09261", "code_departement": "09", "code_qp": "QP009001", "commune_qp": "Saint-Girons", "nom_commune": "Saint-Girons", "nom_qp": "Coeur De Ville" }, "type": "Feature" }, { "bbox": [ 2.9697, 42.5983, 2.9755, 42.6013 ], "geometry": { "coordinates": [ [ [ 2.9716, 42.6011 ], [ 2.9718, 42.601 ], [ 2.972, 42.601 ], [ 2.9723, 42.601 ], [ 2.9725, 42.6009 ], [ 2.9727, 42.6009 ], [ 2.9733, 42.601 ], [ 2.9737, 42.6011 ], [ 2.9743, 42.6012 ], [ 2.9744, 42.6012 ], [ 2.9745, 42.6012 ], [ 2.9746, 42.6011 ], [ 2.975, 42.601 ], [ 2.975, 42.6009 ], [ 2.9751, 42.6008 ], [ 2.9751, 42.6006 ], [ 2.9751, 42.6006 ], [ 2.9755, 42.5995 ], [ 2.9755, 42.5993 ], [ 2.9755, 42.5992 ], [ 2.9753, 42.599 ], [ 2.9751, 42.5989 ], [ 2.9749, 42.5988 ], [ 2.9735, 42.5985 ], [ 2.9735, 42.5984 ], [ 2.9734, 42.5983 ], [ 2.9732, 42.5985 ], [ 2.9732, 42.5985 ], [ 2.9731, 42.5985 ], [ 2.9732, 42.5985 ], [ 2.9731, 42.5986 ], [ 2.973, 42.5987 ], [ 2.9728, 42.5987 ], [ 2.9728, 42.5987 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5987 ], [ 2.9726, 42.5986 ], [ 2.9724, 42.5986 ], [ 2.9722, 42.5987 ], [ 2.9722, 42.5987 ], [ 2.9722, 42.5988 ], [ 2.9723, 42.5989 ], [ 2.9724, 42.599 ], [ 2.9725, 42.5991 ], [ 2.9725, 42.5992 ], [ 2.9725, 42.5993 ], [ 2.9724, 42.5993 ], [ 2.9723, 42.5994 ], [ 2.9721, 42.5995 ], [ 2.9721, 42.5995 ], [ 2.972, 42.5995 ], [ 2.9719, 42.5994 ], [ 2.9718, 42.5994 ], [ 2.9716, 42.5994 ], [ 2.9716, 42.5995 ], [ 2.9715, 42.5996 ], [ 2.9715, 42.5996 ], [ 2.9714, 42.5996 ], [ 2.9711, 42.5995 ], [ 2.9711, 42.5995 ], [ 2.971, 42.5995 ], [ 2.9709, 42.5994 ], [ 2.9709, 42.5993 ], [ 2.9706, 42.5993 ], [ 2.9701, 42.5993 ], [ 2.9699, 42.5994 ], [ 2.9698, 42.5993 ], [ 2.9697, 42.5993 ], [ 2.9697, 42.5994 ], [ 2.9698, 42.5996 ], [ 2.9698, 42.5997 ], [ 2.9699, 42.5998 ], [ 2.97, 42.6 ], [ 2.97, 42.6001 ], [ 2.9701, 42.6003 ], [ 2.9702, 42.6004 ], [ 2.9702, 42.6005 ], [ 2.9703, 42.6006 ], [ 2.9704, 42.6006 ], [ 2.9704, 42.6006 ], [ 2.9703, 42.6009 ], [ 2.9703, 42.601 ], [ 2.9705, 42.601 ], [ 2.9709, 42.6011 ], [ 2.971, 42.6011 ], [ 2.971, 42.6012 ], [ 2.971, 42.6013 ], [ 2.9711, 42.6013 ], [ 2.9712, 42.6012 ], [ 2.9716, 42.6011 ] ] ], "type": "Polygon" }, "id": "64", "properties": { "code_commune": "66065", "code_departement": "66", "code_qp": "QP066001", "commune_qp": "Elne", "nom_commune": "Elne", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 2.8899, 42.6937, 2.9034, 42.7007 ], "geometry": { "coordinates": [ [ [ 2.9033, 42.6991 ], [ 2.9034, 42.6991 ], [ 2.9033, 42.699 ], [ 2.903, 42.6988 ], [ 2.9026, 42.6991 ], [ 2.9026, 42.6991 ], [ 2.9025, 42.699 ], [ 2.9023, 42.699 ], [ 2.9022, 42.6989 ], [ 2.9023, 42.6989 ], [ 2.9022, 42.6988 ], [ 2.9018, 42.6985 ], [ 2.902, 42.6984 ], [ 2.9021, 42.6983 ], [ 2.9023, 42.6982 ], [ 2.9021, 42.698 ], [ 2.9023, 42.6979 ], [ 2.9024, 42.6979 ], [ 2.9026, 42.6978 ], [ 2.9025, 42.6977 ], [ 2.9024, 42.6976 ], [ 2.9024, 42.6975 ], [ 2.9024, 42.6975 ], [ 2.9023, 42.6974 ], [ 2.9022, 42.6973 ], [ 2.9022, 42.6973 ], [ 2.9021, 42.6972 ], [ 2.9021, 42.6972 ], [ 2.902, 42.6971 ], [ 2.902, 42.697 ], [ 2.9019, 42.6969 ], [ 2.9018, 42.6966 ], [ 2.9018, 42.6965 ], [ 2.9017, 42.6964 ], [ 2.9017, 42.6962 ], [ 2.9017, 42.696 ], [ 2.9017, 42.6959 ], [ 2.9017, 42.6959 ], [ 2.9014, 42.6957 ], [ 2.9011, 42.6956 ], [ 2.901, 42.6955 ], [ 2.9006, 42.6952 ], [ 2.9002, 42.6955 ], [ 2.8995, 42.6961 ], [ 2.8992, 42.6962 ], [ 2.8989, 42.6964 ], [ 2.8988, 42.6963 ], [ 2.8988, 42.6961 ], [ 2.8988, 42.6961 ], [ 2.8983, 42.6961 ], [ 2.8982, 42.696 ], [ 2.8976, 42.6957 ], [ 2.8973, 42.6955 ], [ 2.8972, 42.6955 ], [ 2.8972, 42.6955 ], [ 2.8971, 42.6956 ], [ 2.8971, 42.6956 ], [ 2.8966, 42.6952 ], [ 2.8964, 42.6952 ], [ 2.8963, 42.6952 ], [ 2.896, 42.6953 ], [ 2.8956, 42.6951 ], [ 2.8954, 42.695 ], [ 2.8954, 42.6949 ], [ 2.8953, 42.6949 ], [ 2.895, 42.6948 ], [ 2.8947, 42.6948 ], [ 2.8946, 42.6948 ], [ 2.8936, 42.6948 ], [ 2.8929, 42.6947 ], [ 2.8928, 42.6951 ], [ 2.8927, 42.6951 ], [ 2.8926, 42.695 ], [ 2.8925, 42.6949 ], [ 2.8924, 42.6948 ], [ 2.8923, 42.6946 ], [ 2.8922, 42.6945 ], [ 2.8921, 42.6944 ], [ 2.8921, 42.6943 ], [ 2.892, 42.6942 ], [ 2.8916, 42.6939 ], [ 2.8915, 42.6939 ], [ 2.8913, 42.6937 ], [ 2.8903, 42.6944 ], [ 2.8906, 42.6946 ], [ 2.8908, 42.6947 ], [ 2.8906, 42.6949 ], [ 2.8904, 42.6951 ], [ 2.8901, 42.6952 ], [ 2.8899, 42.6954 ], [ 2.89, 42.6955 ], [ 2.8901, 42.6956 ], [ 2.8903, 42.6957 ], [ 2.8904, 42.6958 ], [ 2.8908, 42.696 ], [ 2.8913, 42.6964 ], [ 2.8911, 42.6966 ], [ 2.8913, 42.6968 ], [ 2.8917, 42.6971 ], [ 2.892, 42.6973 ], [ 2.8922, 42.6975 ], [ 2.8923, 42.6976 ], [ 2.8922, 42.6977 ], [ 2.892, 42.698 ], [ 2.8922, 42.6981 ], [ 2.8923, 42.6981 ], [ 2.8923, 42.6982 ], [ 2.8925, 42.6984 ], [ 2.8925, 42.6986 ], [ 2.8925, 42.6986 ], [ 2.8925, 42.6987 ], [ 2.8923, 42.6987 ], [ 2.8924, 42.6989 ], [ 2.8925, 42.6991 ], [ 2.8929, 42.6995 ], [ 2.8931, 42.6997 ], [ 2.8933, 42.7 ], [ 2.8935, 42.7002 ], [ 2.8936, 42.7003 ], [ 2.8937, 42.7003 ], [ 2.8938, 42.7001 ], [ 2.8941, 42.7003 ], [ 2.8941, 42.7003 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8943, 42.7004 ], [ 2.8945, 42.7004 ], [ 2.8948, 42.7005 ], [ 2.895, 42.7006 ], [ 2.8951, 42.7005 ], [ 2.8953, 42.7003 ], [ 2.8953, 42.7003 ], [ 2.8954, 42.7004 ], [ 2.8954, 42.7003 ], [ 2.8957, 42.7 ], [ 2.8958, 42.7 ], [ 2.8959, 42.6999 ], [ 2.8959, 42.6999 ], [ 2.896, 42.6998 ], [ 2.8961, 42.6997 ], [ 2.8963, 42.6996 ], [ 2.8963, 42.6996 ], [ 2.8964, 42.6995 ], [ 2.8965, 42.6995 ], [ 2.8965, 42.6995 ], [ 2.8966, 42.6994 ], [ 2.8966, 42.6994 ], [ 2.8967, 42.6995 ], [ 2.8967, 42.6995 ], [ 2.8969, 42.6995 ], [ 2.8969, 42.6995 ], [ 2.897, 42.6995 ], [ 2.8972, 42.6996 ], [ 2.8973, 42.6996 ], [ 2.8974, 42.6996 ], [ 2.8974, 42.6996 ], [ 2.8975, 42.6996 ], [ 2.8977, 42.6997 ], [ 2.8978, 42.6997 ], [ 2.8979, 42.6997 ], [ 2.8981, 42.6997 ], [ 2.8982, 42.6997 ], [ 2.8983, 42.6995 ], [ 2.8986, 42.6996 ], [ 2.8988, 42.6996 ], [ 2.8997, 42.6992 ], [ 2.8999, 42.6994 ], [ 2.9004, 42.6999 ], [ 2.9006, 42.7002 ], [ 2.9005, 42.7003 ], [ 2.9007, 42.7004 ], [ 2.9008, 42.7005 ], [ 2.9011, 42.7007 ], [ 2.9018, 42.7001 ], [ 2.9025, 42.6995 ], [ 2.9028, 42.6997 ], [ 2.9033, 42.6992 ], [ 2.9032, 42.6992 ], [ 2.9033, 42.6991 ] ] ], "type": "Polygon" }, "id": "65", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066008", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Centre Ancien" }, "type": "Feature" }, { "bbox": [ 1.4331, 43.6327, 1.4456, 43.6435 ], "geometry": { "coordinates": [ [ [ 1.4331, 43.6346 ], [ 1.4331, 43.635 ], [ 1.4331, 43.6353 ], [ 1.4333, 43.636 ], [ 1.4349, 43.6358 ], [ 1.435, 43.6359 ], [ 1.4366, 43.6357 ], [ 1.4368, 43.6362 ], [ 1.4376, 43.6361 ], [ 1.4373, 43.6364 ], [ 1.4382, 43.6367 ], [ 1.439, 43.6366 ], [ 1.4391, 43.6369 ], [ 1.4391, 43.6375 ], [ 1.4392, 43.6382 ], [ 1.4399, 43.6382 ], [ 1.4418, 43.6384 ], [ 1.4418, 43.6385 ], [ 1.4419, 43.6388 ], [ 1.4419, 43.6389 ], [ 1.4418, 43.6393 ], [ 1.4417, 43.64 ], [ 1.4416, 43.6404 ], [ 1.4392, 43.6403 ], [ 1.4391, 43.6418 ], [ 1.4391, 43.6429 ], [ 1.4406, 43.6431 ], [ 1.4413, 43.6432 ], [ 1.4419, 43.6432 ], [ 1.4422, 43.6435 ], [ 1.4434, 43.6431 ], [ 1.4445, 43.6429 ], [ 1.4444, 43.6423 ], [ 1.4444, 43.6409 ], [ 1.4444, 43.6401 ], [ 1.4451, 43.6401 ], [ 1.4451, 43.6395 ], [ 1.4453, 43.6395 ], [ 1.4452, 43.639 ], [ 1.4454, 43.6389 ], [ 1.4453, 43.6379 ], [ 1.4456, 43.6379 ], [ 1.4455, 43.6376 ], [ 1.4454, 43.6373 ], [ 1.4448, 43.6374 ], [ 1.4447, 43.6372 ], [ 1.4447, 43.6369 ], [ 1.4447, 43.6364 ], [ 1.4446, 43.636 ], [ 1.4442, 43.6361 ], [ 1.4441, 43.6356 ], [ 1.4439, 43.6356 ], [ 1.4439, 43.6354 ], [ 1.4434, 43.6356 ], [ 1.4426, 43.635 ], [ 1.4419, 43.6344 ], [ 1.4417, 43.6341 ], [ 1.4413, 43.6332 ], [ 1.4411, 43.6328 ], [ 1.441, 43.6327 ], [ 1.44, 43.6346 ], [ 1.4392, 43.6344 ], [ 1.4391, 43.6346 ], [ 1.4389, 43.6346 ], [ 1.4383, 43.6348 ], [ 1.4379, 43.6348 ], [ 1.4378, 43.6346 ], [ 1.4377, 43.6345 ], [ 1.4368, 43.6345 ], [ 1.4368, 43.6345 ], [ 1.4369, 43.6346 ], [ 1.4369, 43.6347 ], [ 1.4367, 43.6347 ], [ 1.4365, 43.6347 ], [ 1.4364, 43.6348 ], [ 1.4364, 43.6349 ], [ 1.4363, 43.6349 ], [ 1.436, 43.635 ], [ 1.4356, 43.635 ], [ 1.4356, 43.6346 ], [ 1.4356, 43.6343 ], [ 1.4342, 43.6344 ], [ 1.4342, 43.6346 ], [ 1.4341, 43.6346 ], [ 1.4335, 43.6346 ], [ 1.4331, 43.6346 ] ] ], "type": "Polygon" }, "id": "66", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031011", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Les Izards - La Vache" }, "type": "Feature" }, { "bbox": [ 0.0491, 43.2277, 0.0564, 43.2315 ], "geometry": { "coordinates": [ [ [ 0.0497, 43.2288 ], [ 0.05, 43.229 ], [ 0.0503, 43.2292 ], [ 0.0507, 43.2293 ], [ 0.0513, 43.2294 ], [ 0.0518, 43.2293 ], [ 0.0523, 43.2293 ], [ 0.0528, 43.2293 ], [ 0.0535, 43.2293 ], [ 0.0543, 43.2294 ], [ 0.0546, 43.2295 ], [ 0.0546, 43.2296 ], [ 0.0546, 43.23 ], [ 0.054, 43.23 ], [ 0.054, 43.2301 ], [ 0.054, 43.2302 ], [ 0.0539, 43.2315 ], [ 0.0546, 43.2315 ], [ 0.0546, 43.2313 ], [ 0.0547, 43.2311 ], [ 0.0548, 43.2309 ], [ 0.0549, 43.231 ], [ 0.0556, 43.231 ], [ 0.0558, 43.231 ], [ 0.0558, 43.2309 ], [ 0.0564, 43.2309 ], [ 0.0564, 43.2303 ], [ 0.0564, 43.2296 ], [ 0.0559, 43.2296 ], [ 0.0557, 43.2296 ], [ 0.0555, 43.2295 ], [ 0.0556, 43.2293 ], [ 0.0548, 43.2293 ], [ 0.0547, 43.2293 ], [ 0.0543, 43.2293 ], [ 0.0543, 43.228 ], [ 0.0539, 43.2281 ], [ 0.0534, 43.2281 ], [ 0.0534, 43.2277 ], [ 0.052, 43.2278 ], [ 0.0504, 43.2278 ], [ 0.0497, 43.2278 ], [ 0.0497, 43.2279 ], [ 0.0496, 43.2279 ], [ 0.0493, 43.2279 ], [ 0.0493, 43.228 ], [ 0.0493, 43.228 ], [ 0.0492, 43.2281 ], [ 0.0492, 43.2281 ], [ 0.0491, 43.2281 ], [ 0.0491, 43.2282 ], [ 0.0495, 43.2285 ], [ 0.0497, 43.2288 ], [ 0.0497, 43.2288 ] ] ], "type": "Polygon" }, "id": "67", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065001", "commune_qp": "Tarbes", "nom_commune": "Tarbes", "nom_qp": "Tarbes Ouest" }, "type": "Feature" }, { "bbox": [ 3.8367, 43.5925, 3.8495, 43.6013 ], "geometry": { "coordinates": [ [ [ 3.8479, 43.5999 ], [ 3.8475, 43.5997 ], [ 3.8472, 43.5994 ], [ 3.8466, 43.5987 ], [ 3.8464, 43.5985 ], [ 3.8469, 43.5984 ], [ 3.8467, 43.5979 ], [ 3.8464, 43.5974 ], [ 3.8459, 43.5977 ], [ 3.8455, 43.5972 ], [ 3.8457, 43.5971 ], [ 3.846, 43.597 ], [ 3.8458, 43.5968 ], [ 3.8463, 43.5965 ], [ 3.846, 43.5962 ], [ 3.845, 43.5966 ], [ 3.8436, 43.5972 ], [ 3.8428, 43.5976 ], [ 3.8418, 43.5966 ], [ 3.8422, 43.5965 ], [ 3.8421, 43.5964 ], [ 3.8418, 43.5961 ], [ 3.8415, 43.5959 ], [ 3.8413, 43.5956 ], [ 3.841, 43.5956 ], [ 3.8409, 43.5955 ], [ 3.8407, 43.5954 ], [ 3.8404, 43.5952 ], [ 3.8401, 43.595 ], [ 3.8398, 43.5947 ], [ 3.8401, 43.5944 ], [ 3.8404, 43.5946 ], [ 3.8405, 43.5945 ], [ 3.8408, 43.5946 ], [ 3.841, 43.5944 ], [ 3.8412, 43.5942 ], [ 3.8414, 43.5943 ], [ 3.8414, 43.5943 ], [ 3.8415, 43.5943 ], [ 3.8416, 43.5943 ], [ 3.8418, 43.5943 ], [ 3.8424, 43.5946 ], [ 3.8425, 43.5946 ], [ 3.8425, 43.5946 ], [ 3.8426, 43.5946 ], [ 3.8431, 43.5935 ], [ 3.8431, 43.5934 ], [ 3.843, 43.5934 ], [ 3.8425, 43.5935 ], [ 3.8422, 43.5929 ], [ 3.8417, 43.5926 ], [ 3.8416, 43.5925 ], [ 3.8415, 43.5925 ], [ 3.8407, 43.5932 ], [ 3.8406, 43.5932 ], [ 3.8405, 43.5933 ], [ 3.8399, 43.5931 ], [ 3.8396, 43.593 ], [ 3.8388, 43.5942 ], [ 3.8386, 43.5942 ], [ 3.8385, 43.5943 ], [ 3.8388, 43.5946 ], [ 3.8385, 43.5948 ], [ 3.8382, 43.5946 ], [ 3.8378, 43.5948 ], [ 3.8376, 43.5947 ], [ 3.8374, 43.5949 ], [ 3.8372, 43.595 ], [ 3.8369, 43.5949 ], [ 3.8367, 43.5952 ], [ 3.8369, 43.5953 ], [ 3.837, 43.5955 ], [ 3.8369, 43.5956 ], [ 3.8368, 43.5957 ], [ 3.8368, 43.5958 ], [ 3.8368, 43.5959 ], [ 3.8368, 43.5961 ], [ 3.8369, 43.5961 ], [ 3.8372, 43.5963 ], [ 3.8375, 43.5965 ], [ 3.8378, 43.5966 ], [ 3.8385, 43.5968 ], [ 3.839, 43.5963 ], [ 3.8388, 43.5961 ], [ 3.8391, 43.5958 ], [ 3.8393, 43.5956 ], [ 3.8394, 43.5956 ], [ 3.8395, 43.5957 ], [ 3.8396, 43.5957 ], [ 3.8399, 43.5961 ], [ 3.84, 43.5962 ], [ 3.8401, 43.5964 ], [ 3.8405, 43.5966 ], [ 3.8412, 43.5969 ], [ 3.8415, 43.5971 ], [ 3.8418, 43.5984 ], [ 3.8431, 43.5996 ], [ 3.8454, 43.6008 ], [ 3.8461, 43.6011 ], [ 3.8466, 43.6012 ], [ 3.8484, 43.6013 ], [ 3.8494, 43.601 ], [ 3.8495, 43.6008 ], [ 3.8484, 43.6003 ], [ 3.8479, 43.5999 ] ] ], "type": "Polygon" }, "id": "68", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034007", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Pas Du Loup - Val De Croze" }, "type": "Feature" }, { "bbox": [ 2.5906, 44.3632, 2.6018, 44.3674 ], "geometry": { "coordinates": [ [ [ 2.5926, 44.3671 ], [ 2.5927, 44.3672 ], [ 2.5929, 44.3674 ], [ 2.5933, 44.3672 ], [ 2.594, 44.367 ], [ 2.5947, 44.3668 ], [ 2.5949, 44.3667 ], [ 2.5954, 44.3666 ], [ 2.5956, 44.3665 ], [ 2.5965, 44.3661 ], [ 2.5972, 44.3656 ], [ 2.5977, 44.3652 ], [ 2.598, 44.365 ], [ 2.5988, 44.3655 ], [ 2.5996, 44.3653 ], [ 2.5998, 44.3653 ], [ 2.6001, 44.3652 ], [ 2.6005, 44.3647 ], [ 2.6006, 44.3646 ], [ 2.6006, 44.3646 ], [ 2.6009, 44.3646 ], [ 2.6013, 44.3645 ], [ 2.6014, 44.3645 ], [ 2.6016, 44.3645 ], [ 2.6017, 44.3644 ], [ 2.6018, 44.3643 ], [ 2.6016, 44.3643 ], [ 2.6015, 44.3642 ], [ 2.6013, 44.3641 ], [ 2.6011, 44.3641 ], [ 2.6016, 44.3638 ], [ 2.6018, 44.3634 ], [ 2.6015, 44.3632 ], [ 2.6011, 44.3634 ], [ 2.6009, 44.3635 ], [ 2.6003, 44.3639 ], [ 2.5994, 44.3637 ], [ 2.5991, 44.3636 ], [ 2.5974, 44.3635 ], [ 2.597, 44.3636 ], [ 2.5969, 44.3637 ], [ 2.5967, 44.3638 ], [ 2.5963, 44.3641 ], [ 2.5959, 44.3642 ], [ 2.5955, 44.3643 ], [ 2.5947, 44.3645 ], [ 2.5945, 44.3645 ], [ 2.5942, 44.3645 ], [ 2.5941, 44.3643 ], [ 2.594, 44.3641 ], [ 2.5927, 44.3642 ], [ 2.5924, 44.3642 ], [ 2.5922, 44.3642 ], [ 2.592, 44.3642 ], [ 2.5919, 44.3643 ], [ 2.5918, 44.3644 ], [ 2.5919, 44.3647 ], [ 2.5921, 44.3646 ], [ 2.5921, 44.3648 ], [ 2.5921, 44.3649 ], [ 2.5921, 44.3651 ], [ 2.592, 44.3651 ], [ 2.5919, 44.3652 ], [ 2.5919, 44.3652 ], [ 2.5919, 44.3653 ], [ 2.5919, 44.3653 ], [ 2.5919, 44.3654 ], [ 2.592, 44.3654 ], [ 2.592, 44.3655 ], [ 2.5918, 44.3656 ], [ 2.5918, 44.3657 ], [ 2.5911, 44.3657 ], [ 2.5912, 44.3658 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.366 ], [ 2.5906, 44.3661 ], [ 2.5907, 44.3663 ], [ 2.5908, 44.3663 ], [ 2.5909, 44.3663 ], [ 2.5911, 44.3662 ], [ 2.5913, 44.3664 ], [ 2.592, 44.3664 ], [ 2.5921, 44.3664 ], [ 2.5926, 44.3671 ] ] ], "type": "Polygon" }, "id": "69", "properties": { "code_commune": "12176", "code_departement": "12", "code_qp": "QP012001", "commune_qp": "Onet-le-Château", "nom_commune": "Onet-le-Château", "nom_qp": "Quatre Saisons" }, "type": "Feature" }, { "bbox": [ -0.0437, 43.0836, -0.0404, 43.0895 ], "geometry": { "coordinates": [ [ [ -0.0418, 43.0892 ], [ -0.0417, 43.0895 ], [ -0.0408, 43.0893 ], [ -0.0404, 43.0888 ], [ -0.0405, 43.0885 ], [ -0.0406, 43.0883 ], [ -0.0407, 43.088 ], [ -0.0408, 43.0879 ], [ -0.0408, 43.0878 ], [ -0.0409, 43.0877 ], [ -0.0407, 43.0872 ], [ -0.0407, 43.0869 ], [ -0.0407, 43.0868 ], [ -0.0407, 43.0867 ], [ -0.0412, 43.0865 ], [ -0.0419, 43.0865 ], [ -0.0421, 43.0865 ], [ -0.0421, 43.086 ], [ -0.0421, 43.0851 ], [ -0.0414, 43.0845 ], [ -0.0414, 43.0843 ], [ -0.0414, 43.0841 ], [ -0.0414, 43.0838 ], [ -0.0415, 43.0838 ], [ -0.0416, 43.0837 ], [ -0.0417, 43.0837 ], [ -0.0421, 43.0837 ], [ -0.0429, 43.0836 ], [ -0.0433, 43.0836 ], [ -0.0437, 43.0836 ], [ -0.0437, 43.0837 ], [ -0.0435, 43.0838 ], [ -0.0434, 43.0851 ], [ -0.0433, 43.0851 ], [ -0.0433, 43.0856 ], [ -0.0433, 43.0861 ], [ -0.0433, 43.0861 ], [ -0.0432, 43.0865 ], [ -0.0432, 43.0867 ], [ -0.0431, 43.0867 ], [ -0.043, 43.0875 ], [ -0.0429, 43.0881 ], [ -0.0427, 43.0891 ], [ -0.0427, 43.0893 ], [ -0.0418, 43.0892 ] ] ], "type": "Polygon" }, "id": "70", "properties": { "code_commune": "65286", "code_departement": "65", "code_qp": "QP065004", "commune_qp": "Lourdes", "nom_commune": "Lourdes", "nom_qp": "Ophite" }, "type": "Feature" }, { "bbox": [ 4.3577, 43.8386, 4.3726, 43.8447 ], "geometry": { "coordinates": [ [ [ 4.3726, 43.8407 ], [ 4.3721, 43.8405 ], [ 4.3712, 43.8403 ], [ 4.3707, 43.8402 ], [ 4.3701, 43.8397 ], [ 4.3695, 43.8393 ], [ 4.3691, 43.839 ], [ 4.3688, 43.8388 ], [ 4.3665, 43.8391 ], [ 4.3657, 43.8391 ], [ 4.3645, 43.8392 ], [ 4.3643, 43.8393 ], [ 4.3641, 43.8392 ], [ 4.3637, 43.839 ], [ 4.3634, 43.8392 ], [ 4.3635, 43.8396 ], [ 4.3635, 43.8398 ], [ 4.3635, 43.8398 ], [ 4.363, 43.84 ], [ 4.3629, 43.84 ], [ 4.3626, 43.8393 ], [ 4.3626, 43.8391 ], [ 4.3626, 43.8391 ], [ 4.3626, 43.839 ], [ 4.3625, 43.8389 ], [ 4.3624, 43.8388 ], [ 4.3622, 43.8387 ], [ 4.3621, 43.8387 ], [ 4.362, 43.8386 ], [ 4.3617, 43.8386 ], [ 4.3616, 43.8386 ], [ 4.3615, 43.8387 ], [ 4.3612, 43.8388 ], [ 4.3606, 43.8391 ], [ 4.3605, 43.8391 ], [ 4.3604, 43.8391 ], [ 4.3599, 43.839 ], [ 4.3599, 43.8393 ], [ 4.3599, 43.8395 ], [ 4.3602, 43.84 ], [ 4.3603, 43.8403 ], [ 4.3603, 43.8404 ], [ 4.36, 43.8404 ], [ 4.3598, 43.8405 ], [ 4.3596, 43.8405 ], [ 4.3591, 43.8405 ], [ 4.3589, 43.8405 ], [ 4.3581, 43.8404 ], [ 4.358, 43.8408 ], [ 4.3579, 43.8413 ], [ 4.3579, 43.8415 ], [ 4.3577, 43.8419 ], [ 4.3582, 43.842 ], [ 4.3583, 43.8421 ], [ 4.3582, 43.8423 ], [ 4.3579, 43.8429 ], [ 4.3577, 43.8433 ], [ 4.3582, 43.8433 ], [ 4.3582, 43.8434 ], [ 4.3587, 43.8435 ], [ 4.3587, 43.8435 ], [ 4.3595, 43.8436 ], [ 4.3597, 43.8436 ], [ 4.3602, 43.8436 ], [ 4.3607, 43.8437 ], [ 4.3607, 43.8437 ], [ 4.3615, 43.8438 ], [ 4.3623, 43.8438 ], [ 4.3624, 43.8436 ], [ 4.3625, 43.8434 ], [ 4.3626, 43.8433 ], [ 4.3625, 43.8423 ], [ 4.3624, 43.8416 ], [ 4.3623, 43.841 ], [ 4.3622, 43.8403 ], [ 4.3629, 43.8402 ], [ 4.3649, 43.8401 ], [ 4.3652, 43.8402 ], [ 4.3656, 43.8404 ], [ 4.3663, 43.841 ], [ 4.3672, 43.8417 ], [ 4.3672, 43.8417 ], [ 4.3675, 43.8426 ], [ 4.3676, 43.8428 ], [ 4.3677, 43.8435 ], [ 4.3677, 43.8437 ], [ 4.3677, 43.8442 ], [ 4.3677, 43.8447 ], [ 4.3686, 43.844 ], [ 4.3692, 43.8433 ], [ 4.3696, 43.8429 ], [ 4.3698, 43.8427 ], [ 4.3704, 43.8423 ], [ 4.3704, 43.8423 ], [ 4.3716, 43.8425 ], [ 4.3718, 43.8419 ], [ 4.372, 43.8415 ], [ 4.372, 43.8415 ], [ 4.372, 43.8415 ], [ 4.3722, 43.8415 ], [ 4.3726, 43.8407 ] ] ], "type": "Polygon" }, "id": "71", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030004", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Gambetta-Richelieu" }, "type": "Feature" }, { "bbox": [ 3.8427, 43.617, 3.8555, 43.6246 ], "geometry": { "coordinates": [ [ [ 3.8548, 43.6206 ], [ 3.8549, 43.6201 ], [ 3.8543, 43.6201 ], [ 3.8533, 43.6201 ], [ 3.8521, 43.62 ], [ 3.8505, 43.62 ], [ 3.8482, 43.6213 ], [ 3.8475, 43.6212 ], [ 3.8475, 43.6212 ], [ 3.8474, 43.6212 ], [ 3.847, 43.6213 ], [ 3.8465, 43.621 ], [ 3.8465, 43.621 ], [ 3.8465, 43.6209 ], [ 3.8465, 43.6208 ], [ 3.8459, 43.6207 ], [ 3.8459, 43.6207 ], [ 3.8458, 43.6207 ], [ 3.8458, 43.6205 ], [ 3.8459, 43.6202 ], [ 3.8461, 43.6199 ], [ 3.8462, 43.6198 ], [ 3.8462, 43.6198 ], [ 3.8462, 43.6197 ], [ 3.8463, 43.6196 ], [ 3.8464, 43.6195 ], [ 3.8464, 43.6194 ], [ 3.8465, 43.6192 ], [ 3.8466, 43.6191 ], [ 3.8466, 43.619 ], [ 3.8466, 43.6189 ], [ 3.8466, 43.6187 ], [ 3.8462, 43.6186 ], [ 3.8463, 43.6184 ], [ 3.8469, 43.6179 ], [ 3.8474, 43.618 ], [ 3.8477, 43.6174 ], [ 3.8471, 43.6174 ], [ 3.8465, 43.6175 ], [ 3.8464, 43.6175 ], [ 3.8459, 43.617 ], [ 3.8459, 43.6171 ], [ 3.8458, 43.6171 ], [ 3.8452, 43.6171 ], [ 3.8451, 43.6171 ], [ 3.8439, 43.618 ], [ 3.8442, 43.6181 ], [ 3.8435, 43.6189 ], [ 3.8427, 43.6194 ], [ 3.8436, 43.6198 ], [ 3.8432, 43.6203 ], [ 3.8437, 43.6206 ], [ 3.8435, 43.6209 ], [ 3.8432, 43.6213 ], [ 3.8434, 43.6214 ], [ 3.8435, 43.6215 ], [ 3.8437, 43.6215 ], [ 3.8438, 43.6215 ], [ 3.8443, 43.6215 ], [ 3.8444, 43.6217 ], [ 3.8444, 43.6219 ], [ 3.8446, 43.6219 ], [ 3.8447, 43.622 ], [ 3.844, 43.6225 ], [ 3.8444, 43.623 ], [ 3.8452, 43.6225 ], [ 3.8459, 43.6221 ], [ 3.8468, 43.6218 ], [ 3.8473, 43.6217 ], [ 3.8477, 43.6216 ], [ 3.8478, 43.6217 ], [ 3.8479, 43.6217 ], [ 3.8481, 43.6218 ], [ 3.8481, 43.6218 ], [ 3.8483, 43.6224 ], [ 3.8491, 43.6222 ], [ 3.8492, 43.6222 ], [ 3.8498, 43.6224 ], [ 3.8499, 43.6224 ], [ 3.85, 43.6224 ], [ 3.8504, 43.623 ], [ 3.8495, 43.6234 ], [ 3.8492, 43.6237 ], [ 3.8492, 43.6238 ], [ 3.8492, 43.6238 ], [ 3.8493, 43.6241 ], [ 3.8493, 43.6243 ], [ 3.8494, 43.6243 ], [ 3.8498, 43.6245 ], [ 3.85, 43.6246 ], [ 3.8501, 43.6245 ], [ 3.8504, 43.6244 ], [ 3.8509, 43.624 ], [ 3.8513, 43.6235 ], [ 3.8516, 43.6233 ], [ 3.8519, 43.6231 ], [ 3.852, 43.6231 ], [ 3.8525, 43.6235 ], [ 3.8529, 43.6237 ], [ 3.8537, 43.6231 ], [ 3.8536, 43.623 ], [ 3.8535, 43.6227 ], [ 3.8538, 43.6226 ], [ 3.8542, 43.6226 ], [ 3.8545, 43.6226 ], [ 3.8547, 43.6224 ], [ 3.8555, 43.6219 ], [ 3.855, 43.6217 ], [ 3.855, 43.6217 ], [ 3.8545, 43.6216 ], [ 3.8544, 43.6215 ], [ 3.855, 43.6212 ], [ 3.8551, 43.6211 ], [ 3.8552, 43.6209 ], [ 3.8549, 43.6206 ], [ 3.8548, 43.6206 ] ] ], "type": "Polygon" }, "id": "72", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034008", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Cévennes" }, "type": "Feature" }, { "bbox": [ 4.3816, 43.8369, 4.396, 43.8472 ], "geometry": { "coordinates": [ [ [ 4.3863, 43.8422 ], [ 4.3821, 43.8428 ], [ 4.3817, 43.8429 ], [ 4.3816, 43.843 ], [ 4.3816, 43.8432 ], [ 4.3829, 43.8443 ], [ 4.3826, 43.8444 ], [ 4.3825, 43.8446 ], [ 4.3824, 43.8447 ], [ 4.3821, 43.8448 ], [ 4.3822, 43.8454 ], [ 4.3849, 43.8461 ], [ 4.385, 43.846 ], [ 4.3839, 43.8451 ], [ 4.3843, 43.8449 ], [ 4.3846, 43.8447 ], [ 4.3852, 43.8444 ], [ 4.3856, 43.8445 ], [ 4.3863, 43.8449 ], [ 4.3866, 43.8451 ], [ 4.3871, 43.8453 ], [ 4.3874, 43.8454 ], [ 4.3879, 43.8456 ], [ 4.3884, 43.8458 ], [ 4.3888, 43.846 ], [ 4.3892, 43.8463 ], [ 4.3896, 43.8465 ], [ 4.3898, 43.8466 ], [ 4.39, 43.8466 ], [ 4.3901, 43.8467 ], [ 4.3903, 43.8467 ], [ 4.3905, 43.8468 ], [ 4.3907, 43.8468 ], [ 4.3916, 43.8469 ], [ 4.3929, 43.8469 ], [ 4.3942, 43.8471 ], [ 4.3949, 43.8472 ], [ 4.3959, 43.8471 ], [ 4.396, 43.8469 ], [ 4.3955, 43.8466 ], [ 4.3952, 43.8463 ], [ 4.3949, 43.8461 ], [ 4.3947, 43.8459 ], [ 4.3942, 43.8454 ], [ 4.3935, 43.8448 ], [ 4.3925, 43.8441 ], [ 4.3916, 43.8433 ], [ 4.3913, 43.8431 ], [ 4.3905, 43.8423 ], [ 4.3904, 43.8422 ], [ 4.3903, 43.8421 ], [ 4.39, 43.8418 ], [ 4.3897, 43.8415 ], [ 4.3897, 43.8412 ], [ 4.3895, 43.841 ], [ 4.389, 43.8401 ], [ 4.3885, 43.8389 ], [ 4.3881, 43.8372 ], [ 4.388, 43.837 ], [ 4.3875, 43.8369 ], [ 4.3871, 43.8369 ], [ 4.3869, 43.8375 ], [ 4.3867, 43.8383 ], [ 4.3866, 43.8388 ], [ 4.3866, 43.8389 ], [ 4.3868, 43.839 ], [ 4.3873, 43.8392 ], [ 4.3873, 43.8393 ], [ 4.3872, 43.8396 ], [ 4.3869, 43.8402 ], [ 4.3882, 43.8405 ], [ 4.388, 43.8409 ], [ 4.3885, 43.8411 ], [ 4.3886, 43.8411 ], [ 4.3885, 43.8414 ], [ 4.3874, 43.8412 ], [ 4.3873, 43.8412 ], [ 4.3872, 43.8417 ], [ 4.3867, 43.8416 ], [ 4.3865, 43.8416 ], [ 4.3862, 43.8421 ], [ 4.3863, 43.8422 ] ] ], "type": "Polygon" }, "id": "73", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030005", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Chemin-Bas D'Avignon - Clos D'Orville" }, "type": "Feature" }, { "bbox": [ 4.3932, 43.8528, 4.4027, 43.8608 ], "geometry": { "coordinates": [ [ [ 4.3977, 43.8531 ], [ 4.3975, 43.8528 ], [ 4.3972, 43.8529 ], [ 4.3973, 43.8531 ], [ 4.3969, 43.8532 ], [ 4.397, 43.8534 ], [ 4.3969, 43.8538 ], [ 4.3968, 43.8543 ], [ 4.3966, 43.8546 ], [ 4.3967, 43.8546 ], [ 4.3965, 43.8548 ], [ 4.3963, 43.8552 ], [ 4.3962, 43.8554 ], [ 4.3962, 43.8554 ], [ 4.3957, 43.8553 ], [ 4.3956, 43.8553 ], [ 4.3954, 43.8552 ], [ 4.3953, 43.8552 ], [ 4.395, 43.8556 ], [ 4.3947, 43.856 ], [ 4.3946, 43.8559 ], [ 4.3944, 43.8561 ], [ 4.3944, 43.8561 ], [ 4.3944, 43.8562 ], [ 4.3943, 43.8562 ], [ 4.3942, 43.8562 ], [ 4.3941, 43.8563 ], [ 4.394, 43.8563 ], [ 4.3936, 43.8563 ], [ 4.3934, 43.8567 ], [ 4.3935, 43.8567 ], [ 4.3933, 43.857 ], [ 4.3932, 43.857 ], [ 4.3932, 43.8571 ], [ 4.3935, 43.8573 ], [ 4.3938, 43.8575 ], [ 4.394, 43.8576 ], [ 4.3942, 43.8577 ], [ 4.3945, 43.8578 ], [ 4.3945, 43.8578 ], [ 4.3944, 43.8579 ], [ 4.3944, 43.8581 ], [ 4.3943, 43.8582 ], [ 4.3943, 43.8583 ], [ 4.3943, 43.8585 ], [ 4.3944, 43.8586 ], [ 4.3946, 43.8586 ], [ 4.3949, 43.8586 ], [ 4.395, 43.8587 ], [ 4.3949, 43.8592 ], [ 4.395, 43.8593 ], [ 4.3957, 43.8595 ], [ 4.3959, 43.8596 ], [ 4.396, 43.8596 ], [ 4.3962, 43.8596 ], [ 4.3964, 43.8593 ], [ 4.3964, 43.8589 ], [ 4.3961, 43.8589 ], [ 4.3961, 43.8589 ], [ 4.3958, 43.8588 ], [ 4.3957, 43.8586 ], [ 4.3957, 43.8584 ], [ 4.3957, 43.8583 ], [ 4.3957, 43.8582 ], [ 4.3961, 43.8582 ], [ 4.3963, 43.8583 ], [ 4.3963, 43.8582 ], [ 4.3964, 43.8582 ], [ 4.3965, 43.8583 ], [ 4.3966, 43.8583 ], [ 4.3966, 43.8585 ], [ 4.3965, 43.8586 ], [ 4.3964, 43.8589 ], [ 4.397, 43.8589 ], [ 4.3973, 43.8589 ], [ 4.3975, 43.8588 ], [ 4.3974, 43.8587 ], [ 4.3973, 43.8585 ], [ 4.3972, 43.8583 ], [ 4.3972, 43.8583 ], [ 4.3971, 43.8582 ], [ 4.3971, 43.8581 ], [ 4.3971, 43.8579 ], [ 4.3971, 43.8577 ], [ 4.3972, 43.8575 ], [ 4.3977, 43.8575 ], [ 4.3976, 43.8577 ], [ 4.3977, 43.8577 ], [ 4.3981, 43.8579 ], [ 4.3983, 43.858 ], [ 4.3984, 43.858 ], [ 4.3986, 43.8582 ], [ 4.3984, 43.8584 ], [ 4.3983, 43.8583 ], [ 4.3983, 43.8584 ], [ 4.3982, 43.8584 ], [ 4.3981, 43.8585 ], [ 4.398, 43.8586 ], [ 4.398, 43.8586 ], [ 4.3981, 43.8586 ], [ 4.3983, 43.8586 ], [ 4.3986, 43.8586 ], [ 4.3988, 43.8588 ], [ 4.399, 43.8589 ], [ 4.3993, 43.8592 ], [ 4.3987, 43.8597 ], [ 4.3989, 43.8599 ], [ 4.3997, 43.8592 ], [ 4.3998, 43.8593 ], [ 4.3998, 43.8594 ], [ 4.4, 43.8595 ], [ 4.4001, 43.8597 ], [ 4.4002, 43.8597 ], [ 4.4003, 43.8597 ], [ 4.4007, 43.8599 ], [ 4.4011, 43.8603 ], [ 4.401, 43.8603 ], [ 4.4015, 43.8608 ], [ 4.4018, 43.8607 ], [ 4.4017, 43.8606 ], [ 4.402, 43.8604 ], [ 4.4022, 43.8605 ], [ 4.4023, 43.8605 ], [ 4.4024, 43.8605 ], [ 4.4025, 43.8605 ], [ 4.4026, 43.8603 ], [ 4.4027, 43.8603 ], [ 4.4027, 43.8602 ], [ 4.4027, 43.8602 ], [ 4.4027, 43.86 ], [ 4.4024, 43.8593 ], [ 4.4023, 43.8591 ], [ 4.4021, 43.8587 ], [ 4.402, 43.8583 ], [ 4.4013, 43.8572 ], [ 4.4003, 43.8576 ], [ 4.4002, 43.8578 ], [ 4.4001, 43.8579 ], [ 4.4001, 43.8579 ], [ 4.4002, 43.8579 ], [ 4.4, 43.8582 ], [ 4.3999, 43.8581 ], [ 4.3997, 43.8581 ], [ 4.3996, 43.8581 ], [ 4.3995, 43.858 ], [ 4.3997, 43.8579 ], [ 4.3998, 43.8575 ], [ 4.3998, 43.8575 ], [ 4.3997, 43.8572 ], [ 4.3997, 43.8571 ], [ 4.3999, 43.8566 ], [ 4.4, 43.8564 ], [ 4.4001, 43.8563 ], [ 4.4001, 43.8563 ], [ 4.4002, 43.8562 ], [ 4.4004, 43.8561 ], [ 4.4005, 43.856 ], [ 4.4006, 43.8559 ], [ 4.4005, 43.8558 ], [ 4.4003, 43.8556 ], [ 4.4, 43.8554 ], [ 4.3995, 43.8551 ], [ 4.3991, 43.8548 ], [ 4.3989, 43.8546 ], [ 4.3986, 43.8544 ], [ 4.3982, 43.854 ], [ 4.3981, 43.8538 ], [ 4.398, 43.8538 ], [ 4.3979, 43.8534 ], [ 4.3979, 43.8533 ], [ 4.3977, 43.8531 ] ] ], "type": "Polygon" }, "id": "74", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030006", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Mas De Mingue" }, "type": "Feature" }, { "bbox": [ 3.8752, 43.58, 3.8901, 43.5942 ], "geometry": { "coordinates": [ [ [ 3.8763, 43.5812 ], [ 3.8766, 43.5814 ], [ 3.8762, 43.5818 ], [ 3.8766, 43.5821 ], [ 3.8769, 43.5822 ], [ 3.8773, 43.5822 ], [ 3.8776, 43.5822 ], [ 3.8779, 43.5821 ], [ 3.8782, 43.582 ], [ 3.8784, 43.5819 ], [ 3.8786, 43.5817 ], [ 3.8797, 43.5822 ], [ 3.8805, 43.5829 ], [ 3.8829, 43.5865 ], [ 3.884, 43.588 ], [ 3.8827, 43.5884 ], [ 3.8838, 43.5894 ], [ 3.8836, 43.5894 ], [ 3.8844, 43.5906 ], [ 3.8832, 43.5911 ], [ 3.8822, 43.5915 ], [ 3.883, 43.5927 ], [ 3.8824, 43.5929 ], [ 3.8826, 43.5932 ], [ 3.8839, 43.5927 ], [ 3.8845, 43.5935 ], [ 3.8848, 43.5938 ], [ 3.8852, 43.5942 ], [ 3.8854, 43.5941 ], [ 3.8856, 43.5939 ], [ 3.8859, 43.5937 ], [ 3.8861, 43.5935 ], [ 3.8863, 43.5933 ], [ 3.8861, 43.5931 ], [ 3.8861, 43.593 ], [ 3.8862, 43.5929 ], [ 3.8867, 43.5924 ], [ 3.8854, 43.5907 ], [ 3.8857, 43.5905 ], [ 3.8856, 43.5902 ], [ 3.886, 43.5901 ], [ 3.8876, 43.5896 ], [ 3.8879, 43.5895 ], [ 3.8886, 43.5894 ], [ 3.8894, 43.5894 ], [ 3.8896, 43.5894 ], [ 3.8895, 43.5891 ], [ 3.8897, 43.5889 ], [ 3.89, 43.5887 ], [ 3.8901, 43.5882 ], [ 3.89, 43.5879 ], [ 3.8895, 43.5872 ], [ 3.8892, 43.5868 ], [ 3.8887, 43.5857 ], [ 3.8883, 43.5853 ], [ 3.8882, 43.5846 ], [ 3.8881, 43.5843 ], [ 3.888, 43.5843 ], [ 3.8875, 43.5835 ], [ 3.8871, 43.5831 ], [ 3.886, 43.5821 ], [ 3.8856, 43.5819 ], [ 3.8837, 43.5812 ], [ 3.8824, 43.5808 ], [ 3.8821, 43.5807 ], [ 3.8819, 43.5808 ], [ 3.8813, 43.5811 ], [ 3.8812, 43.5813 ], [ 3.8809, 43.5815 ], [ 3.8804, 43.5818 ], [ 3.8789, 43.5815 ], [ 3.879, 43.5813 ], [ 3.879, 43.5812 ], [ 3.879, 43.581 ], [ 3.8788, 43.581 ], [ 3.8787, 43.581 ], [ 3.8786, 43.5808 ], [ 3.8784, 43.5806 ], [ 3.8782, 43.5804 ], [ 3.8778, 43.5802 ], [ 3.8776, 43.5802 ], [ 3.8775, 43.5802 ], [ 3.8771, 43.5802 ], [ 3.8767, 43.5803 ], [ 3.8765, 43.58 ], [ 3.8761, 43.5802 ], [ 3.8759, 43.58 ], [ 3.8752, 43.5804 ], [ 3.8762, 43.5806 ], [ 3.8763, 43.5807 ], [ 3.8764, 43.581 ], [ 3.8764, 43.5811 ], [ 3.8764, 43.5811 ], [ 3.8763, 43.5812 ] ] ], "type": "Polygon" }, "id": "75", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034012", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Près D'Arènes" }, "type": "Feature" }, { "bbox": [ 0.7183, 43.1062, 0.7301, 43.1123 ], "geometry": { "coordinates": [ [ [ 0.7224, 43.1089 ], [ 0.7222, 43.1095 ], [ 0.7222, 43.1098 ], [ 0.7217, 43.1097 ], [ 0.7215, 43.11 ], [ 0.7214, 43.11 ], [ 0.7213, 43.1101 ], [ 0.723, 43.1103 ], [ 0.7229, 43.1106 ], [ 0.7229, 43.1107 ], [ 0.7227, 43.111 ], [ 0.7228, 43.111 ], [ 0.7234, 43.1111 ], [ 0.7241, 43.1112 ], [ 0.7242, 43.1113 ], [ 0.7242, 43.1116 ], [ 0.7242, 43.1117 ], [ 0.7245, 43.1117 ], [ 0.7245, 43.1123 ], [ 0.7257, 43.1122 ], [ 0.7259, 43.1121 ], [ 0.7263, 43.1121 ], [ 0.7264, 43.1118 ], [ 0.7263, 43.1117 ], [ 0.7263, 43.1114 ], [ 0.7263, 43.1112 ], [ 0.7271, 43.1112 ], [ 0.7271, 43.1109 ], [ 0.7276, 43.1109 ], [ 0.7279, 43.1109 ], [ 0.7279, 43.1109 ], [ 0.728, 43.1102 ], [ 0.7283, 43.1103 ], [ 0.729, 43.1103 ], [ 0.729, 43.1105 ], [ 0.7292, 43.1105 ], [ 0.7294, 43.1105 ], [ 0.7295, 43.1106 ], [ 0.7297, 43.1106 ], [ 0.7298, 43.1107 ], [ 0.7299, 43.1107 ], [ 0.73, 43.1105 ], [ 0.7301, 43.1103 ], [ 0.7296, 43.1101 ], [ 0.729, 43.1096 ], [ 0.7286, 43.1095 ], [ 0.7286, 43.1093 ], [ 0.7286, 43.1091 ], [ 0.7298, 43.1065 ], [ 0.7295, 43.1065 ], [ 0.7292, 43.1066 ], [ 0.7286, 43.1067 ], [ 0.7283, 43.1067 ], [ 0.7278, 43.1069 ], [ 0.7277, 43.1069 ], [ 0.7276, 43.107 ], [ 0.7274, 43.1073 ], [ 0.7273, 43.1073 ], [ 0.7272, 43.1073 ], [ 0.7268, 43.1073 ], [ 0.7267, 43.1075 ], [ 0.7265, 43.1076 ], [ 0.7266, 43.1079 ], [ 0.7263, 43.1078 ], [ 0.7262, 43.1078 ], [ 0.7261, 43.1077 ], [ 0.7261, 43.1075 ], [ 0.726, 43.1075 ], [ 0.7259, 43.1074 ], [ 0.7253, 43.1071 ], [ 0.7252, 43.1071 ], [ 0.725, 43.1071 ], [ 0.7249, 43.1071 ], [ 0.7247, 43.107 ], [ 0.7238, 43.1068 ], [ 0.7229, 43.1065 ], [ 0.7221, 43.1063 ], [ 0.7217, 43.1062 ], [ 0.7215, 43.1062 ], [ 0.7215, 43.1062 ], [ 0.7212, 43.1063 ], [ 0.721, 43.1063 ], [ 0.7209, 43.1064 ], [ 0.7208, 43.1066 ], [ 0.7208, 43.1067 ], [ 0.7207, 43.1068 ], [ 0.7204, 43.1067 ], [ 0.72, 43.1066 ], [ 0.7191, 43.1063 ], [ 0.719, 43.1066 ], [ 0.7189, 43.1066 ], [ 0.7187, 43.1069 ], [ 0.7186, 43.1071 ], [ 0.7186, 43.1071 ], [ 0.7186, 43.1072 ], [ 0.7183, 43.1071 ], [ 0.7184, 43.1074 ], [ 0.7186, 43.1074 ], [ 0.7187, 43.1078 ], [ 0.7189, 43.1078 ], [ 0.719, 43.1079 ], [ 0.7191, 43.1079 ], [ 0.7191, 43.1082 ], [ 0.7191, 43.1083 ], [ 0.7191, 43.1088 ], [ 0.7189, 43.1088 ], [ 0.7191, 43.1091 ], [ 0.7201, 43.1086 ], [ 0.7202, 43.1086 ], [ 0.7207, 43.1084 ], [ 0.7208, 43.1084 ], [ 0.7209, 43.1085 ], [ 0.7209, 43.1085 ], [ 0.7217, 43.1087 ], [ 0.7224, 43.1089 ] ] ], "type": "Polygon" }, "id": "76", "properties": { "code_commune": "31483", "code_departement": "31", "code_qp": "QP031003", "commune_qp": "Saint-Gaudens", "nom_commune": "Saint-Gaudens", "nom_qp": "Coeur De Ville" }, "type": "Feature" }, { "bbox": [ 3.7479, 43.4489, 3.7537, 43.4538 ], "geometry": { "coordinates": [ [ [ 3.7501, 43.4538 ], [ 3.7503, 43.4535 ], [ 3.7504, 43.4534 ], [ 3.7506, 43.4532 ], [ 3.7509, 43.4529 ], [ 3.7509, 43.4528 ], [ 3.751, 43.4528 ], [ 3.7513, 43.4526 ], [ 3.7514, 43.4525 ], [ 3.7516, 43.4524 ], [ 3.7516, 43.4524 ], [ 3.7518, 43.4521 ], [ 3.7523, 43.4516 ], [ 3.7524, 43.4516 ], [ 3.7527, 43.4513 ], [ 3.7533, 43.451 ], [ 3.7534, 43.4509 ], [ 3.7537, 43.4505 ], [ 3.7534, 43.4503 ], [ 3.7529, 43.45 ], [ 3.7518, 43.4493 ], [ 3.7515, 43.4491 ], [ 3.7512, 43.4489 ], [ 3.7511, 43.4489 ], [ 3.7511, 43.449 ], [ 3.751, 43.4491 ], [ 3.7507, 43.4492 ], [ 3.7513, 43.4497 ], [ 3.7517, 43.45 ], [ 3.7519, 43.4502 ], [ 3.7521, 43.4503 ], [ 3.7524, 43.4504 ], [ 3.7518, 43.4508 ], [ 3.7517, 43.4508 ], [ 3.7514, 43.451 ], [ 3.7513, 43.4511 ], [ 3.7512, 43.4513 ], [ 3.751, 43.4512 ], [ 3.7507, 43.4514 ], [ 3.751, 43.4516 ], [ 3.7507, 43.4518 ], [ 3.7507, 43.4518 ], [ 3.7503, 43.4521 ], [ 3.7504, 43.4522 ], [ 3.7505, 43.4523 ], [ 3.7502, 43.4526 ], [ 3.7501, 43.4525 ], [ 3.7492, 43.4518 ], [ 3.7491, 43.4519 ], [ 3.7487, 43.4521 ], [ 3.7486, 43.4522 ], [ 3.7485, 43.4523 ], [ 3.7483, 43.4523 ], [ 3.7481, 43.4524 ], [ 3.748, 43.4525 ], [ 3.748, 43.4526 ], [ 3.7479, 43.4527 ], [ 3.7479, 43.4527 ], [ 3.748, 43.4528 ], [ 3.7481, 43.4531 ], [ 3.7483, 43.4533 ], [ 3.7484, 43.4534 ], [ 3.7485, 43.4535 ], [ 3.749, 43.4533 ], [ 3.7491, 43.4532 ], [ 3.7492, 43.4532 ], [ 3.7493, 43.4533 ], [ 3.7494, 43.4533 ], [ 3.7495, 43.4534 ], [ 3.7495, 43.4534 ], [ 3.7497, 43.4535 ], [ 3.7498, 43.4536 ], [ 3.7498, 43.4536 ], [ 3.7498, 43.4537 ], [ 3.7501, 43.4538 ] ] ], "type": "Polygon" }, "id": "77", "properties": { "code_commune": "34108", "code_departement": "34", "code_qp": "QP034016", "commune_qp": "Frontignan", "nom_commune": "Frontignan", "nom_qp": "Les Deux Pins" }, "type": "Feature" }, { "bbox": [ 3.6911, 43.3997, 3.701, 43.4078 ], "geometry": { "coordinates": [ [ [ 3.6965, 43.4013 ], [ 3.6964, 43.4009 ], [ 3.6962, 43.4002 ], [ 3.6961, 43.3998 ], [ 3.6951, 43.3998 ], [ 3.695, 43.3998 ], [ 3.695, 43.3997 ], [ 3.6946, 43.3997 ], [ 3.6943, 43.3997 ], [ 3.6941, 43.3997 ], [ 3.694, 43.3998 ], [ 3.694, 43.4 ], [ 3.6938, 43.4 ], [ 3.6935, 43.4 ], [ 3.6931, 43.3997 ], [ 3.6929, 43.4001 ], [ 3.6928, 43.4001 ], [ 3.6927, 43.4004 ], [ 3.6927, 43.4005 ], [ 3.6926, 43.4008 ], [ 3.6926, 43.4008 ], [ 3.6925, 43.4013 ], [ 3.6925, 43.4015 ], [ 3.6927, 43.4015 ], [ 3.6928, 43.4014 ], [ 3.6928, 43.4016 ], [ 3.6929, 43.4016 ], [ 3.6929, 43.4016 ], [ 3.693, 43.4016 ], [ 3.693, 43.4016 ], [ 3.6931, 43.4016 ], [ 3.6933, 43.4016 ], [ 3.6933, 43.4017 ], [ 3.6933, 43.4017 ], [ 3.6936, 43.4017 ], [ 3.6936, 43.4018 ], [ 3.6939, 43.4018 ], [ 3.6939, 43.4019 ], [ 3.6942, 43.4019 ], [ 3.6941, 43.4022 ], [ 3.6941, 43.4022 ], [ 3.6941, 43.4023 ], [ 3.6938, 43.4023 ], [ 3.6938, 43.4024 ], [ 3.6939, 43.4024 ], [ 3.6939, 43.4025 ], [ 3.6938, 43.4025 ], [ 3.6934, 43.4025 ], [ 3.6931, 43.4025 ], [ 3.6927, 43.4024 ], [ 3.6923, 43.4024 ], [ 3.6927, 43.4031 ], [ 3.6928, 43.4033 ], [ 3.6937, 43.4034 ], [ 3.6937, 43.4037 ], [ 3.6935, 43.4037 ], [ 3.6934, 43.4039 ], [ 3.6931, 43.4039 ], [ 3.6931, 43.4039 ], [ 3.693, 43.404 ], [ 3.6929, 43.4041 ], [ 3.6928, 43.4041 ], [ 3.6927, 43.4042 ], [ 3.6925, 43.4042 ], [ 3.6915, 43.4041 ], [ 3.6914, 43.4043 ], [ 3.6914, 43.4044 ], [ 3.6914, 43.4046 ], [ 3.6914, 43.4048 ], [ 3.6912, 43.4058 ], [ 3.6911, 43.4065 ], [ 3.6915, 43.4066 ], [ 3.692, 43.4066 ], [ 3.6919, 43.4067 ], [ 3.6925, 43.4067 ], [ 3.6925, 43.4068 ], [ 3.6928, 43.4068 ], [ 3.6927, 43.407 ], [ 3.693, 43.407 ], [ 3.693, 43.4067 ], [ 3.693, 43.4066 ], [ 3.6933, 43.4066 ], [ 3.6932, 43.4078 ], [ 3.6935, 43.4076 ], [ 3.6939, 43.4072 ], [ 3.6941, 43.4066 ], [ 3.6933, 43.4065 ], [ 3.6934, 43.406 ], [ 3.6935, 43.4055 ], [ 3.6935, 43.4053 ], [ 3.6935, 43.405 ], [ 3.6939, 43.4051 ], [ 3.6943, 43.4051 ], [ 3.6944, 43.404 ], [ 3.6945, 43.4037 ], [ 3.6945, 43.4036 ], [ 3.6943, 43.4036 ], [ 3.6944, 43.4033 ], [ 3.6943, 43.4033 ], [ 3.6943, 43.4033 ], [ 3.6944, 43.4032 ], [ 3.6944, 43.4032 ], [ 3.6945, 43.4032 ], [ 3.6946, 43.4029 ], [ 3.6945, 43.4029 ], [ 3.6945, 43.4027 ], [ 3.6945, 43.4026 ], [ 3.6946, 43.4026 ], [ 3.6946, 43.4025 ], [ 3.6945, 43.4024 ], [ 3.6945, 43.4019 ], [ 3.6947, 43.4019 ], [ 3.6951, 43.402 ], [ 3.6956, 43.402 ], [ 3.6956, 43.4016 ], [ 3.6959, 43.4016 ], [ 3.6959, 43.4018 ], [ 3.6959, 43.4018 ], [ 3.6958, 43.4018 ], [ 3.6958, 43.4018 ], [ 3.6959, 43.4018 ], [ 3.6959, 43.4019 ], [ 3.6958, 43.4019 ], [ 3.6958, 43.402 ], [ 3.6966, 43.402 ], [ 3.6967, 43.402 ], [ 3.6967, 43.4019 ], [ 3.697, 43.4018 ], [ 3.6977, 43.4018 ], [ 3.6977, 43.4025 ], [ 3.6981, 43.4025 ], [ 3.6981, 43.4028 ], [ 3.6984, 43.4028 ], [ 3.6986, 43.4028 ], [ 3.6986, 43.4027 ], [ 3.6987, 43.4027 ], [ 3.6991, 43.403 ], [ 3.699, 43.4031 ], [ 3.699, 43.4031 ], [ 3.6994, 43.4033 ], [ 3.6993, 43.404 ], [ 3.6994, 43.4045 ], [ 3.6994, 43.4045 ], [ 3.6993, 43.4048 ], [ 3.6993, 43.4049 ], [ 3.6992, 43.4049 ], [ 3.6992, 43.4049 ], [ 3.6991, 43.4051 ], [ 3.6991, 43.4052 ], [ 3.6991, 43.4052 ], [ 3.6991, 43.4052 ], [ 3.699, 43.4052 ], [ 3.699, 43.4054 ], [ 3.6993, 43.4054 ], [ 3.6993, 43.4055 ], [ 3.6993, 43.4055 ], [ 3.6993, 43.4056 ], [ 3.6989, 43.4055 ], [ 3.6989, 43.4056 ], [ 3.6992, 43.4056 ], [ 3.699, 43.4059 ], [ 3.6992, 43.406 ], [ 3.6995, 43.4057 ], [ 3.6996, 43.4056 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4059 ], [ 3.6999, 43.4059 ], [ 3.6999, 43.4061 ], [ 3.7001, 43.4061 ], [ 3.7001, 43.4062 ], [ 3.7002, 43.4062 ], [ 3.7004, 43.4062 ], [ 3.7004, 43.4064 ], [ 3.7003, 43.4066 ], [ 3.7001, 43.4067 ], [ 3.7003, 43.4068 ], [ 3.7006, 43.4066 ], [ 3.7005, 43.4065 ], [ 3.7006, 43.4065 ], [ 3.7007, 43.4065 ], [ 3.7007, 43.4064 ], [ 3.7006, 43.4064 ], [ 3.7006, 43.4063 ], [ 3.7008, 43.4063 ], [ 3.7008, 43.4062 ], [ 3.7006, 43.4063 ], [ 3.7006, 43.4062 ], [ 3.7006, 43.4062 ], [ 3.7008, 43.4061 ], [ 3.7007, 43.4061 ], [ 3.7005, 43.4061 ], [ 3.7005, 43.406 ], [ 3.7005, 43.4059 ], [ 3.7004, 43.4059 ], [ 3.7002, 43.4059 ], [ 3.7001, 43.4055 ], [ 3.7, 43.4054 ], [ 3.7007, 43.4054 ], [ 3.7007, 43.4053 ], [ 3.7003, 43.4052 ], [ 3.7004, 43.4052 ], [ 3.7002, 43.405 ], [ 3.7001, 43.4049 ], [ 3.7, 43.4048 ], [ 3.7001, 43.4046 ], [ 3.6998, 43.4046 ], [ 3.7, 43.4042 ], [ 3.7002, 43.4041 ], [ 3.7004, 43.4041 ], [ 3.7005, 43.4041 ], [ 3.7006, 43.4042 ], [ 3.7009, 43.404 ], [ 3.701, 43.4041 ], [ 3.701, 43.4036 ], [ 3.7004, 43.4033 ], [ 3.7005, 43.4032 ], [ 3.7004, 43.4031 ], [ 3.7003, 43.4033 ], [ 3.7002, 43.4033 ], [ 3.7003, 43.4031 ], [ 3.7001, 43.4031 ], [ 3.7001, 43.4032 ], [ 3.7, 43.4032 ], [ 3.7, 43.4031 ], [ 3.7, 43.4031 ], [ 3.6999, 43.4031 ], [ 3.6999, 43.4029 ], [ 3.6997, 43.4029 ], [ 3.6997, 43.4028 ], [ 3.6994, 43.4028 ], [ 3.6995, 43.4025 ], [ 3.6986, 43.4025 ], [ 3.6986, 43.4024 ], [ 3.6981, 43.4024 ], [ 3.6981, 43.4022 ], [ 3.6983, 43.4022 ], [ 3.6983, 43.4021 ], [ 3.6979, 43.4021 ], [ 3.698, 43.402 ], [ 3.698, 43.402 ], [ 3.698, 43.4019 ], [ 3.698, 43.4019 ], [ 3.698, 43.4019 ], [ 3.698, 43.4017 ], [ 3.6977, 43.4017 ], [ 3.697, 43.4015 ], [ 3.6966, 43.4016 ], [ 3.6965, 43.4013 ] ] ], "type": "Polygon" }, "id": "78", "properties": { "code_commune": "34301", "code_departement": "34", "code_qp": "QP034018", "commune_qp": "Sète", "nom_commune": "Sète", "nom_qp": "Centre Ville - Ile Sud" }, "type": "Feature" }, { "bbox": [ 4.6479, 44.2542, 4.6525, 44.2583 ], "geometry": { "coordinates": [ [ [ 4.6485, 44.2583 ], [ 4.6488, 44.2582 ], [ 4.649, 44.2582 ], [ 4.6492, 44.2581 ], [ 4.6493, 44.2581 ], [ 4.6498, 44.2581 ], [ 4.6499, 44.258 ], [ 4.65, 44.258 ], [ 4.65, 44.2579 ], [ 4.6501, 44.2579 ], [ 4.6501, 44.258 ], [ 4.6501, 44.2583 ], [ 4.6505, 44.2583 ], [ 4.6509, 44.2578 ], [ 4.6511, 44.2576 ], [ 4.6514, 44.2572 ], [ 4.6517, 44.2568 ], [ 4.6518, 44.2566 ], [ 4.6519, 44.2563 ], [ 4.652, 44.2561 ], [ 4.6523, 44.2554 ], [ 4.6524, 44.2551 ], [ 4.6524, 44.2551 ], [ 4.6524, 44.2547 ], [ 4.6525, 44.2543 ], [ 4.652, 44.2544 ], [ 4.6519, 44.2543 ], [ 4.6517, 44.2543 ], [ 4.6512, 44.2542 ], [ 4.6511, 44.2544 ], [ 4.6511, 44.2545 ], [ 4.6508, 44.2546 ], [ 4.6507, 44.2546 ], [ 4.6505, 44.2546 ], [ 4.6505, 44.2546 ], [ 4.6505, 44.2547 ], [ 4.6504, 44.2546 ], [ 4.6503, 44.2547 ], [ 4.6502, 44.2547 ], [ 4.6502, 44.2547 ], [ 4.6501, 44.2546 ], [ 4.6501, 44.2546 ], [ 4.65, 44.2546 ], [ 4.65, 44.2546 ], [ 4.6499, 44.2546 ], [ 4.6497, 44.2546 ], [ 4.6497, 44.2546 ], [ 4.6496, 44.2546 ], [ 4.6496, 44.2547 ], [ 4.6495, 44.2547 ], [ 4.6496, 44.2547 ], [ 4.6495, 44.2546 ], [ 4.6494, 44.2546 ], [ 4.6493, 44.2546 ], [ 4.6493, 44.2548 ], [ 4.6491, 44.2548 ], [ 4.649, 44.2548 ], [ 4.6485, 44.2549 ], [ 4.6483, 44.2548 ], [ 4.6482, 44.255 ], [ 4.6482, 44.2551 ], [ 4.6483, 44.2552 ], [ 4.6484, 44.2555 ], [ 4.6481, 44.2555 ], [ 4.648, 44.2555 ], [ 4.648, 44.2556 ], [ 4.6479, 44.2557 ], [ 4.6481, 44.2557 ], [ 4.6481, 44.2558 ], [ 4.6481, 44.2558 ], [ 4.6482, 44.2559 ], [ 4.6481, 44.2559 ], [ 4.6481, 44.256 ], [ 4.648, 44.256 ], [ 4.648, 44.2561 ], [ 4.6481, 44.2561 ], [ 4.6481, 44.2562 ], [ 4.648, 44.2562 ], [ 4.648, 44.2563 ], [ 4.648, 44.2563 ], [ 4.648, 44.2564 ], [ 4.648, 44.2565 ], [ 4.6479, 44.2565 ], [ 4.6479, 44.2566 ], [ 4.6479, 44.2566 ], [ 4.6479, 44.2568 ], [ 4.648, 44.2568 ], [ 4.648, 44.2568 ], [ 4.648, 44.2568 ], [ 4.6481, 44.2569 ], [ 4.6481, 44.257 ], [ 4.6481, 44.257 ], [ 4.6481, 44.2571 ], [ 4.6481, 44.2571 ], [ 4.6481, 44.2571 ], [ 4.6482, 44.2571 ], [ 4.6482, 44.2572 ], [ 4.6483, 44.2572 ], [ 4.6483, 44.2572 ], [ 4.6481, 44.2572 ], [ 4.6481, 44.2573 ], [ 4.6482, 44.2573 ], [ 4.6481, 44.2573 ], [ 4.6481, 44.2573 ], [ 4.6481, 44.2574 ], [ 4.6482, 44.2574 ], [ 4.6482, 44.2574 ], [ 4.6481, 44.2574 ], [ 4.6481, 44.2574 ], [ 4.6482, 44.2575 ], [ 4.6482, 44.2575 ], [ 4.6483, 44.2576 ], [ 4.6483, 44.2576 ], [ 4.6482, 44.2576 ], [ 4.6482, 44.2577 ], [ 4.6481, 44.2577 ], [ 4.6481, 44.2578 ], [ 4.6482, 44.258 ], [ 4.6482, 44.2581 ], [ 4.6482, 44.2582 ], [ 4.6483, 44.2582 ], [ 4.6484, 44.2583 ], [ 4.6485, 44.2583 ] ] ], "type": "Polygon" }, "id": "79", "properties": { "code_commune": "30202", "code_departement": "30", "code_qp": "QP030011", "commune_qp": "Pont-Saint-Esprit", "nom_commune": "Pont-Saint-Esprit", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.9763, 43.76, 2.0026, 43.7681 ], "geometry": { "coordinates": [ [ [ 2.0023, 43.7645 ], [ 2.0025, 43.7645 ], [ 2.0026, 43.7642 ], [ 2.0026, 43.764 ], [ 2.0025, 43.7639 ], [ 2.0017, 43.7639 ], [ 2.0013, 43.7624 ], [ 2.0012, 43.7624 ], [ 1.9999, 43.7624 ], [ 1.9988, 43.7624 ], [ 1.9977, 43.7625 ], [ 1.9977, 43.7625 ], [ 1.997, 43.7625 ], [ 1.9969, 43.7627 ], [ 1.9966, 43.7629 ], [ 1.9965, 43.763 ], [ 1.9964, 43.7631 ], [ 1.9963, 43.7631 ], [ 1.9963, 43.763 ], [ 1.996, 43.7627 ], [ 1.9959, 43.7626 ], [ 1.9958, 43.7626 ], [ 1.9957, 43.7625 ], [ 1.9954, 43.7626 ], [ 1.9919, 43.7628 ], [ 1.9914, 43.7629 ], [ 1.9907, 43.7629 ], [ 1.9905, 43.7628 ], [ 1.9903, 43.7625 ], [ 1.9912, 43.7623 ], [ 1.9915, 43.7621 ], [ 1.9931, 43.7615 ], [ 1.9944, 43.7611 ], [ 1.9948, 43.7611 ], [ 1.9943, 43.7602 ], [ 1.9939, 43.7601 ], [ 1.9929, 43.76 ], [ 1.9889, 43.76 ], [ 1.9878, 43.7601 ], [ 1.9876, 43.7602 ], [ 1.9873, 43.7604 ], [ 1.9869, 43.7607 ], [ 1.9867, 43.7608 ], [ 1.9866, 43.7608 ], [ 1.9851, 43.7608 ], [ 1.9851, 43.7622 ], [ 1.985, 43.7622 ], [ 1.9832, 43.7622 ], [ 1.982, 43.7622 ], [ 1.9813, 43.7622 ], [ 1.981, 43.7621 ], [ 1.9792, 43.7614 ], [ 1.979, 43.7615 ], [ 1.9784, 43.7615 ], [ 1.9781, 43.7618 ], [ 1.9763, 43.7618 ], [ 1.9766, 43.7636 ], [ 1.977, 43.7641 ], [ 1.9779, 43.7645 ], [ 1.9778, 43.7643 ], [ 1.9785, 43.764 ], [ 1.9794, 43.7636 ], [ 1.9796, 43.7636 ], [ 1.9806, 43.7634 ], [ 1.9815, 43.7647 ], [ 1.9824, 43.7643 ], [ 1.983, 43.764 ], [ 1.9838, 43.7637 ], [ 1.9843, 43.7635 ], [ 1.9853, 43.7633 ], [ 1.9855, 43.7642 ], [ 1.9875, 43.764 ], [ 1.9874, 43.7638 ], [ 1.988, 43.7637 ], [ 1.988, 43.7638 ], [ 1.9884, 43.7637 ], [ 1.9884, 43.7637 ], [ 1.9889, 43.7636 ], [ 1.989, 43.7638 ], [ 1.9892, 43.7639 ], [ 1.9894, 43.7634 ], [ 1.9898, 43.7628 ], [ 1.9903, 43.763 ], [ 1.9902, 43.7631 ], [ 1.99, 43.7635 ], [ 1.99, 43.7636 ], [ 1.9903, 43.7637 ], [ 1.9903, 43.7636 ], [ 1.9904, 43.7635 ], [ 1.9907, 43.7635 ], [ 1.9909, 43.7637 ], [ 1.991, 43.7638 ], [ 1.9913, 43.7642 ], [ 1.9916, 43.7646 ], [ 1.9917, 43.7647 ], [ 1.9919, 43.7648 ], [ 1.9923, 43.7649 ], [ 1.9931, 43.7652 ], [ 1.9932, 43.7652 ], [ 1.9947, 43.7649 ], [ 1.9971, 43.7646 ], [ 1.9974, 43.7645 ], [ 1.9979, 43.7661 ], [ 1.9967, 43.7663 ], [ 1.9968, 43.7667 ], [ 1.9989, 43.768 ], [ 1.999, 43.7679 ], [ 1.9991, 43.7681 ], [ 2.0003, 43.7679 ], [ 2.0004, 43.7679 ], [ 2.0005, 43.7679 ], [ 2.0012, 43.7662 ], [ 2.0017, 43.7648 ], [ 2.0019, 43.7645 ], [ 2.0023, 43.7645 ] ] ], "type": "Polygon" }, "id": "80", "properties": { "code_commune": "81105", "code_departement": "81", "code_qp": "QP081011", "commune_qp": "Graulhet", "nom_commune": "Graulhet", "nom_qp": "Crins - En Gach" }, "type": "Feature" }, { "bbox": [ 2.1471, 44.0485, 2.1615, 44.0577 ], "geometry": { "coordinates": [ [ [ 2.1605, 44.0528 ], [ 2.1608, 44.0525 ], [ 2.1609, 44.0522 ], [ 2.161, 44.0514 ], [ 2.1609, 44.0513 ], [ 2.1608, 44.0511 ], [ 2.161, 44.0511 ], [ 2.1614, 44.0509 ], [ 2.1612, 44.0505 ], [ 2.1615, 44.0504 ], [ 2.1615, 44.0502 ], [ 2.1612, 44.0499 ], [ 2.1609, 44.0498 ], [ 2.1606, 44.0497 ], [ 2.1603, 44.0498 ], [ 2.1592, 44.05 ], [ 2.1584, 44.0499 ], [ 2.1584, 44.0497 ], [ 2.1583, 44.0496 ], [ 2.158, 44.0497 ], [ 2.1581, 44.0507 ], [ 2.1582, 44.0517 ], [ 2.1582, 44.0518 ], [ 2.1579, 44.0519 ], [ 2.1564, 44.0525 ], [ 2.1558, 44.0518 ], [ 2.1539, 44.0519 ], [ 2.1538, 44.0508 ], [ 2.1537, 44.0504 ], [ 2.1537, 44.0498 ], [ 2.1533, 44.0499 ], [ 2.1532, 44.0497 ], [ 2.1532, 44.0495 ], [ 2.1533, 44.0492 ], [ 2.1535, 44.0491 ], [ 2.1536, 44.0491 ], [ 2.1537, 44.049 ], [ 2.1534, 44.0488 ], [ 2.1536, 44.0486 ], [ 2.1533, 44.0485 ], [ 2.1529, 44.0489 ], [ 2.1527, 44.049 ], [ 2.1525, 44.049 ], [ 2.1521, 44.0491 ], [ 2.1519, 44.0491 ], [ 2.1513, 44.0498 ], [ 2.151, 44.05 ], [ 2.1509, 44.05 ], [ 2.1494, 44.0501 ], [ 2.1492, 44.0501 ], [ 2.1492, 44.0501 ], [ 2.1471, 44.0502 ], [ 2.1473, 44.0507 ], [ 2.1475, 44.051 ], [ 2.1477, 44.0512 ], [ 2.1482, 44.0514 ], [ 2.1483, 44.0515 ], [ 2.1486, 44.0515 ], [ 2.1488, 44.0515 ], [ 2.1508, 44.0519 ], [ 2.1516, 44.0521 ], [ 2.1522, 44.0521 ], [ 2.1534, 44.052 ], [ 2.1535, 44.052 ], [ 2.1535, 44.0521 ], [ 2.1539, 44.0526 ], [ 2.1539, 44.0526 ], [ 2.154, 44.0528 ], [ 2.1541, 44.0528 ], [ 2.154, 44.0529 ], [ 2.1541, 44.053 ], [ 2.1542, 44.0531 ], [ 2.1542, 44.0531 ], [ 2.1543, 44.0532 ], [ 2.1544, 44.0533 ], [ 2.154, 44.0534 ], [ 2.1549, 44.054 ], [ 2.155, 44.0539 ], [ 2.1567, 44.0531 ], [ 2.1571, 44.0529 ], [ 2.1576, 44.0535 ], [ 2.1573, 44.0536 ], [ 2.1572, 44.0536 ], [ 2.157, 44.0536 ], [ 2.1563, 44.0538 ], [ 2.1562, 44.0538 ], [ 2.1559, 44.054 ], [ 2.1558, 44.054 ], [ 2.1555, 44.054 ], [ 2.155, 44.054 ], [ 2.1547, 44.0543 ], [ 2.1546, 44.0545 ], [ 2.1547, 44.0547 ], [ 2.1547, 44.0548 ], [ 2.1541, 44.0548 ], [ 2.1535, 44.0544 ], [ 2.1535, 44.0544 ], [ 2.1533, 44.0544 ], [ 2.1526, 44.0545 ], [ 2.1524, 44.0546 ], [ 2.1522, 44.0543 ], [ 2.1519, 44.0544 ], [ 2.151, 44.0535 ], [ 2.1502, 44.054 ], [ 2.1501, 44.0542 ], [ 2.1502, 44.0543 ], [ 2.1503, 44.0545 ], [ 2.1504, 44.0546 ], [ 2.1501, 44.0551 ], [ 2.15, 44.0552 ], [ 2.1501, 44.0554 ], [ 2.1498, 44.0555 ], [ 2.1482, 44.056 ], [ 2.1487, 44.0561 ], [ 2.1492, 44.0561 ], [ 2.1492, 44.0571 ], [ 2.15, 44.057 ], [ 2.151, 44.0571 ], [ 2.1513, 44.0572 ], [ 2.1515, 44.0572 ], [ 2.1518, 44.0574 ], [ 2.1522, 44.0575 ], [ 2.1525, 44.0576 ], [ 2.1527, 44.0577 ], [ 2.153, 44.0576 ], [ 2.1532, 44.0576 ], [ 2.154, 44.0573 ], [ 2.1546, 44.0571 ], [ 2.1549, 44.0571 ], [ 2.1552, 44.057 ], [ 2.1555, 44.0568 ], [ 2.1558, 44.0564 ], [ 2.156, 44.0562 ], [ 2.1561, 44.0562 ], [ 2.1564, 44.0559 ], [ 2.1573, 44.0552 ], [ 2.1578, 44.0557 ], [ 2.1586, 44.0553 ], [ 2.1589, 44.0552 ], [ 2.1598, 44.0552 ], [ 2.1599, 44.0552 ], [ 2.1603, 44.055 ], [ 2.1611, 44.0545 ], [ 2.1596, 44.0535 ], [ 2.1595, 44.0535 ], [ 2.16, 44.0531 ], [ 2.1605, 44.0528 ] ] ], "type": "Polygon" }, "id": "81", "properties": { "code_commune": "81060", "code_departement": "81", "code_qp": "QP081009", "commune_qp": "Carmaux", "nom_commune": "Carmaux", "nom_qp": "Rajol - Cérou - Gourgatieux - Bouloc - Verrerie" }, "type": "Feature" }, { "bbox": [ 3.312, 43.7269, 3.3249, 43.7361 ], "geometry": { "coordinates": [ [ [ 3.3249, 43.731 ], [ 3.3246, 43.731 ], [ 3.3246, 43.731 ], [ 3.3244, 43.731 ], [ 3.3244, 43.7308 ], [ 3.3244, 43.7307 ], [ 3.3244, 43.7305 ], [ 3.3243, 43.7305 ], [ 3.3244, 43.7303 ], [ 3.3244, 43.7303 ], [ 3.3244, 43.7299 ], [ 3.3243, 43.7298 ], [ 3.3242, 43.7298 ], [ 3.3243, 43.7297 ], [ 3.3243, 43.7296 ], [ 3.3241, 43.7295 ], [ 3.3238, 43.7292 ], [ 3.3241, 43.7289 ], [ 3.3241, 43.7289 ], [ 3.3242, 43.7288 ], [ 3.3241, 43.7287 ], [ 3.324, 43.7285 ], [ 3.3238, 43.7283 ], [ 3.3237, 43.7281 ], [ 3.3232, 43.7278 ], [ 3.3231, 43.7279 ], [ 3.3233, 43.728 ], [ 3.3232, 43.7281 ], [ 3.3232, 43.7282 ], [ 3.3232, 43.7283 ], [ 3.3233, 43.7285 ], [ 3.3234, 43.7286 ], [ 3.3235, 43.7286 ], [ 3.3235, 43.7286 ], [ 3.3235, 43.7288 ], [ 3.3234, 43.729 ], [ 3.3231, 43.7291 ], [ 3.3229, 43.7291 ], [ 3.3227, 43.7291 ], [ 3.3224, 43.7291 ], [ 3.3223, 43.729 ], [ 3.3221, 43.729 ], [ 3.3221, 43.7289 ], [ 3.322, 43.7289 ], [ 3.3219, 43.7288 ], [ 3.3217, 43.7288 ], [ 3.3213, 43.7287 ], [ 3.3211, 43.7286 ], [ 3.321, 43.7287 ], [ 3.3208, 43.7287 ], [ 3.3205, 43.7287 ], [ 3.3202, 43.7288 ], [ 3.3202, 43.7289 ], [ 3.3201, 43.7289 ], [ 3.3197, 43.7287 ], [ 3.3197, 43.7286 ], [ 3.3197, 43.7285 ], [ 3.3196, 43.7283 ], [ 3.3195, 43.7282 ], [ 3.3194, 43.7282 ], [ 3.3193, 43.7281 ], [ 3.3187, 43.7281 ], [ 3.3182, 43.7278 ], [ 3.3181, 43.7277 ], [ 3.318, 43.7276 ], [ 3.3179, 43.7274 ], [ 3.3178, 43.7273 ], [ 3.3174, 43.7271 ], [ 3.3172, 43.727 ], [ 3.3167, 43.727 ], [ 3.3163, 43.727 ], [ 3.3161, 43.727 ], [ 3.3158, 43.7269 ], [ 3.3158, 43.7269 ], [ 3.3161, 43.7272 ], [ 3.3162, 43.7273 ], [ 3.3162, 43.7274 ], [ 3.316, 43.7278 ], [ 3.316, 43.7278 ], [ 3.3161, 43.728 ], [ 3.3163, 43.728 ], [ 3.3161, 43.7281 ], [ 3.3159, 43.7283 ], [ 3.316, 43.7284 ], [ 3.3161, 43.7288 ], [ 3.3161, 43.7288 ], [ 3.3163, 43.7291 ], [ 3.3163, 43.7292 ], [ 3.3162, 43.7294 ], [ 3.3167, 43.7295 ], [ 3.3166, 43.7297 ], [ 3.3168, 43.73 ], [ 3.3169, 43.7303 ], [ 3.3164, 43.7303 ], [ 3.3165, 43.7305 ], [ 3.3166, 43.7307 ], [ 3.3164, 43.7307 ], [ 3.3165, 43.7309 ], [ 3.3165, 43.7309 ], [ 3.316, 43.7312 ], [ 3.3149, 43.7318 ], [ 3.3147, 43.7319 ], [ 3.3146, 43.732 ], [ 3.3136, 43.7324 ], [ 3.313, 43.7327 ], [ 3.3125, 43.7329 ], [ 3.312, 43.7332 ], [ 3.3121, 43.7334 ], [ 3.3122, 43.7335 ], [ 3.3122, 43.7336 ], [ 3.3129, 43.7334 ], [ 3.3132, 43.7333 ], [ 3.3142, 43.7328 ], [ 3.3148, 43.7326 ], [ 3.3157, 43.7322 ], [ 3.3162, 43.7324 ], [ 3.3163, 43.7323 ], [ 3.3161, 43.7322 ], [ 3.3163, 43.7321 ], [ 3.3165, 43.732 ], [ 3.3166, 43.7318 ], [ 3.3168, 43.7316 ], [ 3.3171, 43.7313 ], [ 3.3174, 43.7315 ], [ 3.3175, 43.7315 ], [ 3.3176, 43.7317 ], [ 3.3177, 43.7318 ], [ 3.3177, 43.732 ], [ 3.3177, 43.7322 ], [ 3.3177, 43.7323 ], [ 3.3181, 43.7325 ], [ 3.3182, 43.7326 ], [ 3.3184, 43.7329 ], [ 3.3187, 43.7331 ], [ 3.319, 43.7329 ], [ 3.3191, 43.7329 ], [ 3.3193, 43.733 ], [ 3.3195, 43.7333 ], [ 3.3176, 43.7349 ], [ 3.3179, 43.735 ], [ 3.3174, 43.7354 ], [ 3.3176, 43.7355 ], [ 3.3176, 43.7355 ], [ 3.3177, 43.7356 ], [ 3.3176, 43.7357 ], [ 3.3175, 43.7357 ], [ 3.3175, 43.7358 ], [ 3.3176, 43.7359 ], [ 3.3176, 43.7359 ], [ 3.3183, 43.7361 ], [ 3.3184, 43.7361 ], [ 3.3187, 43.736 ], [ 3.3188, 43.7358 ], [ 3.3188, 43.7358 ], [ 3.3189, 43.7357 ], [ 3.319, 43.7358 ], [ 3.3194, 43.7356 ], [ 3.3195, 43.7355 ], [ 3.3198, 43.7355 ], [ 3.3206, 43.7354 ], [ 3.3205, 43.7351 ], [ 3.3194, 43.7352 ], [ 3.3197, 43.7349 ], [ 3.32, 43.7346 ], [ 3.3205, 43.7341 ], [ 3.3198, 43.7334 ], [ 3.3203, 43.733 ], [ 3.3205, 43.7329 ], [ 3.3207, 43.7327 ], [ 3.3208, 43.7328 ], [ 3.3212, 43.7325 ], [ 3.3215, 43.7322 ], [ 3.322, 43.7321 ], [ 3.3223, 43.732 ], [ 3.3227, 43.7322 ], [ 3.3233, 43.7323 ], [ 3.3236, 43.7323 ], [ 3.3236, 43.7325 ], [ 3.3236, 43.7327 ], [ 3.3237, 43.7332 ], [ 3.3239, 43.7337 ], [ 3.3249, 43.7338 ], [ 3.3249, 43.7334 ], [ 3.3246, 43.7335 ], [ 3.3245, 43.7331 ], [ 3.3245, 43.7329 ], [ 3.3244, 43.7324 ], [ 3.3244, 43.7324 ], [ 3.3245, 43.7324 ], [ 3.3246, 43.7321 ], [ 3.3246, 43.732 ], [ 3.3248, 43.7318 ], [ 3.3247, 43.7318 ], [ 3.3248, 43.7315 ], [ 3.3248, 43.7315 ], [ 3.3248, 43.7314 ], [ 3.3248, 43.7314 ], [ 3.3248, 43.7313 ], [ 3.3249, 43.7312 ], [ 3.3249, 43.731 ] ] ], "type": "Polygon" }, "id": "82", "properties": { "code_commune": "34142", "code_departement": "34", "code_qp": "QP034022", "commune_qp": "Lodève", "nom_commune": "Lodève", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.153, 43.6131, 3.1621, 43.6187 ], "geometry": { "coordinates": [ [ [ 3.1553, 43.6173 ], [ 3.1553, 43.6176 ], [ 3.1559, 43.6174 ], [ 3.1558, 43.6174 ], [ 3.1561, 43.6173 ], [ 3.1561, 43.6172 ], [ 3.1562, 43.6167 ], [ 3.1562, 43.6164 ], [ 3.1562, 43.6163 ], [ 3.1562, 43.6162 ], [ 3.157, 43.6162 ], [ 3.157, 43.6166 ], [ 3.157, 43.6173 ], [ 3.1568, 43.6175 ], [ 3.1568, 43.6175 ], [ 3.1567, 43.6176 ], [ 3.1567, 43.6176 ], [ 3.1566, 43.6177 ], [ 3.1575, 43.6182 ], [ 3.1578, 43.6179 ], [ 3.1585, 43.6183 ], [ 3.1589, 43.6185 ], [ 3.1593, 43.6187 ], [ 3.1601, 43.6181 ], [ 3.1605, 43.6177 ], [ 3.1608, 43.6175 ], [ 3.161, 43.6176 ], [ 3.1611, 43.6175 ], [ 3.1613, 43.6176 ], [ 3.1615, 43.6177 ], [ 3.1617, 43.6179 ], [ 3.1617, 43.6179 ], [ 3.1621, 43.6177 ], [ 3.1618, 43.6175 ], [ 3.162, 43.6174 ], [ 3.1615, 43.6169 ], [ 3.1614, 43.6168 ], [ 3.1614, 43.6168 ], [ 3.1613, 43.6167 ], [ 3.1613, 43.6167 ], [ 3.1611, 43.6163 ], [ 3.1609, 43.6161 ], [ 3.1609, 43.6161 ], [ 3.1608, 43.6161 ], [ 3.1608, 43.616 ], [ 3.1607, 43.6159 ], [ 3.1608, 43.6158 ], [ 3.1608, 43.6157 ], [ 3.1609, 43.6156 ], [ 3.1609, 43.6156 ], [ 3.1611, 43.6155 ], [ 3.1605, 43.615 ], [ 3.1597, 43.6145 ], [ 3.1596, 43.6144 ], [ 3.1595, 43.6142 ], [ 3.1595, 43.6142 ], [ 3.1593, 43.6141 ], [ 3.1595, 43.614 ], [ 3.1594, 43.6139 ], [ 3.1594, 43.6139 ], [ 3.1594, 43.6139 ], [ 3.1592, 43.6139 ], [ 3.1596, 43.6135 ], [ 3.1592, 43.6132 ], [ 3.159, 43.6131 ], [ 3.1589, 43.6131 ], [ 3.1585, 43.6133 ], [ 3.1583, 43.6134 ], [ 3.1582, 43.6134 ], [ 3.158, 43.6135 ], [ 3.158, 43.6135 ], [ 3.1575, 43.6137 ], [ 3.1576, 43.6139 ], [ 3.1576, 43.6139 ], [ 3.1576, 43.6139 ], [ 3.1577, 43.614 ], [ 3.1571, 43.6143 ], [ 3.1571, 43.6143 ], [ 3.157, 43.6144 ], [ 3.1569, 43.6143 ], [ 3.1569, 43.6143 ], [ 3.1568, 43.6142 ], [ 3.1567, 43.6143 ], [ 3.1566, 43.6142 ], [ 3.1563, 43.6144 ], [ 3.1564, 43.6145 ], [ 3.1565, 43.6147 ], [ 3.1568, 43.6149 ], [ 3.1569, 43.6149 ], [ 3.1569, 43.615 ], [ 3.1569, 43.615 ], [ 3.1569, 43.615 ], [ 3.157, 43.615 ], [ 3.1571, 43.6151 ], [ 3.1573, 43.6151 ], [ 3.1574, 43.6152 ], [ 3.1572, 43.6153 ], [ 3.1572, 43.6156 ], [ 3.1571, 43.6159 ], [ 3.1571, 43.6161 ], [ 3.1562, 43.6161 ], [ 3.1562, 43.6159 ], [ 3.1559, 43.6154 ], [ 3.1557, 43.6154 ], [ 3.1553, 43.6153 ], [ 3.1551, 43.6153 ], [ 3.1547, 43.6152 ], [ 3.1544, 43.6152 ], [ 3.1544, 43.6151 ], [ 3.1536, 43.6154 ], [ 3.1535, 43.6154 ], [ 3.1535, 43.6154 ], [ 3.1537, 43.6156 ], [ 3.1538, 43.6158 ], [ 3.1537, 43.6158 ], [ 3.1535, 43.6159 ], [ 3.1534, 43.6159 ], [ 3.153, 43.6161 ], [ 3.153, 43.6162 ], [ 3.1535, 43.6169 ], [ 3.1536, 43.6168 ], [ 3.1537, 43.617 ], [ 3.1537, 43.6171 ], [ 3.1537, 43.6172 ], [ 3.1539, 43.6173 ], [ 3.1541, 43.6176 ], [ 3.1541, 43.6176 ], [ 3.1543, 43.6175 ], [ 3.1543, 43.6176 ], [ 3.1553, 43.6173 ] ] ], "type": "Polygon" }, "id": "83", "properties": { "code_commune": "34028", "code_departement": "34", "code_qp": "QP034020", "commune_qp": "Bédarieux", "nom_commune": "Bédarieux", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.6053, 43.107, 1.6151, 43.1218 ], "geometry": { "coordinates": [ [ [ 1.6151, 43.108 ], [ 1.6148, 43.108 ], [ 1.6148, 43.1079 ], [ 1.6141, 43.1079 ], [ 1.6144, 43.1073 ], [ 1.6143, 43.1073 ], [ 1.6142, 43.1073 ], [ 1.6141, 43.1073 ], [ 1.614, 43.1072 ], [ 1.6138, 43.1071 ], [ 1.6137, 43.1071 ], [ 1.6135, 43.1071 ], [ 1.6134, 43.107 ], [ 1.6129, 43.1071 ], [ 1.6125, 43.1072 ], [ 1.6123, 43.1073 ], [ 1.6121, 43.1073 ], [ 1.612, 43.1074 ], [ 1.6115, 43.1075 ], [ 1.6109, 43.1077 ], [ 1.6108, 43.1077 ], [ 1.6106, 43.1077 ], [ 1.6099, 43.1077 ], [ 1.6097, 43.1077 ], [ 1.6094, 43.1077 ], [ 1.6089, 43.1077 ], [ 1.6084, 43.1077 ], [ 1.6081, 43.1077 ], [ 1.608, 43.1078 ], [ 1.6078, 43.108 ], [ 1.6073, 43.1085 ], [ 1.6074, 43.109 ], [ 1.6075, 43.1093 ], [ 1.6082, 43.109 ], [ 1.6083, 43.1091 ], [ 1.6089, 43.1088 ], [ 1.6093, 43.1093 ], [ 1.6102, 43.109 ], [ 1.611, 43.1095 ], [ 1.6112, 43.1097 ], [ 1.6116, 43.1102 ], [ 1.6117, 43.1104 ], [ 1.6121, 43.1109 ], [ 1.612, 43.111 ], [ 1.6115, 43.1111 ], [ 1.6114, 43.111 ], [ 1.6113, 43.111 ], [ 1.6113, 43.111 ], [ 1.6109, 43.1111 ], [ 1.6109, 43.1111 ], [ 1.6105, 43.111 ], [ 1.6097, 43.1107 ], [ 1.6096, 43.1107 ], [ 1.6095, 43.1107 ], [ 1.6093, 43.1108 ], [ 1.609, 43.1111 ], [ 1.6092, 43.1111 ], [ 1.6093, 43.1112 ], [ 1.6095, 43.1115 ], [ 1.6096, 43.1115 ], [ 1.6097, 43.1116 ], [ 1.6097, 43.1117 ], [ 1.6097, 43.1118 ], [ 1.6096, 43.112 ], [ 1.6096, 43.1124 ], [ 1.6095, 43.1126 ], [ 1.6085, 43.1126 ], [ 1.6085, 43.1128 ], [ 1.6085, 43.1129 ], [ 1.6085, 43.1131 ], [ 1.6085, 43.1131 ], [ 1.6086, 43.1131 ], [ 1.6087, 43.1131 ], [ 1.6089, 43.1131 ], [ 1.609, 43.113 ], [ 1.6091, 43.1131 ], [ 1.6093, 43.1131 ], [ 1.6094, 43.1131 ], [ 1.6094, 43.1131 ], [ 1.6095, 43.1131 ], [ 1.6095, 43.1132 ], [ 1.6096, 43.1132 ], [ 1.6096, 43.1132 ], [ 1.6097, 43.1132 ], [ 1.6099, 43.1133 ], [ 1.61, 43.1133 ], [ 1.6102, 43.1134 ], [ 1.6104, 43.1134 ], [ 1.6107, 43.1136 ], [ 1.6105, 43.1138 ], [ 1.6102, 43.1139 ], [ 1.6105, 43.1142 ], [ 1.6106, 43.1143 ], [ 1.6106, 43.1144 ], [ 1.6106, 43.1144 ], [ 1.6109, 43.1146 ], [ 1.6108, 43.1147 ], [ 1.6104, 43.1148 ], [ 1.6098, 43.115 ], [ 1.6095, 43.1151 ], [ 1.6097, 43.1153 ], [ 1.6095, 43.1154 ], [ 1.6094, 43.1155 ], [ 1.6094, 43.1156 ], [ 1.6093, 43.1156 ], [ 1.6089, 43.1157 ], [ 1.6087, 43.1153 ], [ 1.6081, 43.1154 ], [ 1.6076, 43.1147 ], [ 1.6072, 43.1145 ], [ 1.607, 43.1144 ], [ 1.6069, 43.1144 ], [ 1.6068, 43.1143 ], [ 1.6068, 43.1143 ], [ 1.6068, 43.1143 ], [ 1.6069, 43.1141 ], [ 1.6066, 43.1139 ], [ 1.6065, 43.1139 ], [ 1.6065, 43.1138 ], [ 1.6064, 43.1137 ], [ 1.6063, 43.1137 ], [ 1.6062, 43.1137 ], [ 1.6061, 43.1137 ], [ 1.6062, 43.1137 ], [ 1.6059, 43.1135 ], [ 1.6057, 43.1135 ], [ 1.6055, 43.1138 ], [ 1.6054, 43.114 ], [ 1.6053, 43.1143 ], [ 1.6054, 43.1144 ], [ 1.6054, 43.1144 ], [ 1.6055, 43.1145 ], [ 1.6055, 43.1145 ], [ 1.6056, 43.1145 ], [ 1.6064, 43.115 ], [ 1.6066, 43.115 ], [ 1.6067, 43.1152 ], [ 1.6069, 43.1154 ], [ 1.607, 43.1156 ], [ 1.6071, 43.1157 ], [ 1.6073, 43.1161 ], [ 1.6074, 43.1164 ], [ 1.6075, 43.1165 ], [ 1.6078, 43.1166 ], [ 1.608, 43.1167 ], [ 1.608, 43.1167 ], [ 1.6082, 43.1166 ], [ 1.6089, 43.1173 ], [ 1.6092, 43.1177 ], [ 1.6094, 43.1178 ], [ 1.6094, 43.1179 ], [ 1.6095, 43.1181 ], [ 1.6095, 43.1182 ], [ 1.6094, 43.1182 ], [ 1.609, 43.1182 ], [ 1.609, 43.1188 ], [ 1.6089, 43.1191 ], [ 1.6088, 43.1193 ], [ 1.6087, 43.1195 ], [ 1.6087, 43.1197 ], [ 1.6088, 43.1198 ], [ 1.609, 43.12 ], [ 1.6098, 43.1206 ], [ 1.6099, 43.1207 ], [ 1.61, 43.1206 ], [ 1.6105, 43.1204 ], [ 1.6109, 43.1203 ], [ 1.6111, 43.1202 ], [ 1.6113, 43.1202 ], [ 1.6115, 43.1203 ], [ 1.6115, 43.1204 ], [ 1.6116, 43.1204 ], [ 1.6116, 43.1207 ], [ 1.6117, 43.1213 ], [ 1.6124, 43.1214 ], [ 1.6125, 43.1215 ], [ 1.6128, 43.1217 ], [ 1.613, 43.1217 ], [ 1.6134, 43.1218 ], [ 1.6133, 43.1217 ], [ 1.6131, 43.1214 ], [ 1.6128, 43.1213 ], [ 1.6131, 43.1209 ], [ 1.6134, 43.1211 ], [ 1.6137, 43.1209 ], [ 1.6141, 43.1207 ], [ 1.614, 43.1207 ], [ 1.6134, 43.1206 ], [ 1.613, 43.1205 ], [ 1.6127, 43.1206 ], [ 1.6125, 43.1206 ], [ 1.6124, 43.1205 ], [ 1.6125, 43.1203 ], [ 1.6125, 43.12 ], [ 1.6129, 43.12 ], [ 1.6124, 43.1194 ], [ 1.6122, 43.1193 ], [ 1.6125, 43.1192 ], [ 1.6125, 43.1191 ], [ 1.6127, 43.119 ], [ 1.613, 43.1188 ], [ 1.6131, 43.1187 ], [ 1.6135, 43.1185 ], [ 1.6136, 43.1185 ], [ 1.6138, 43.1184 ], [ 1.614, 43.1184 ], [ 1.6142, 43.1182 ], [ 1.6145, 43.118 ], [ 1.6147, 43.1178 ], [ 1.6148, 43.1177 ], [ 1.6149, 43.1175 ], [ 1.6149, 43.1174 ], [ 1.6149, 43.1172 ], [ 1.6149, 43.1169 ], [ 1.6148, 43.1165 ], [ 1.6148, 43.1163 ], [ 1.6147, 43.116 ], [ 1.6146, 43.1155 ], [ 1.6145, 43.1151 ], [ 1.6141, 43.1152 ], [ 1.614, 43.1152 ], [ 1.6139, 43.1153 ], [ 1.6138, 43.1153 ], [ 1.6138, 43.1152 ], [ 1.6137, 43.1152 ], [ 1.6134, 43.1153 ], [ 1.6134, 43.1152 ], [ 1.6132, 43.1152 ], [ 1.6132, 43.1152 ], [ 1.6131, 43.1152 ], [ 1.6131, 43.1153 ], [ 1.6129, 43.1153 ], [ 1.6129, 43.1152 ], [ 1.6127, 43.1153 ], [ 1.6127, 43.1151 ], [ 1.6125, 43.1152 ], [ 1.6124, 43.1151 ], [ 1.6124, 43.1151 ], [ 1.6123, 43.1151 ], [ 1.6121, 43.1149 ], [ 1.6119, 43.1146 ], [ 1.6119, 43.1145 ], [ 1.6116, 43.1142 ], [ 1.6117, 43.1142 ], [ 1.6115, 43.1141 ], [ 1.6115, 43.1141 ], [ 1.6115, 43.114 ], [ 1.6114, 43.114 ], [ 1.6115, 43.114 ], [ 1.6112, 43.1138 ], [ 1.6116, 43.1135 ], [ 1.6121, 43.1137 ], [ 1.6122, 43.1135 ], [ 1.6116, 43.1131 ], [ 1.611, 43.1127 ], [ 1.6113, 43.1125 ], [ 1.6116, 43.1124 ], [ 1.612, 43.1121 ], [ 1.612, 43.112 ], [ 1.6125, 43.1118 ], [ 1.6124, 43.1117 ], [ 1.6123, 43.1117 ], [ 1.6122, 43.1117 ], [ 1.6122, 43.1116 ], [ 1.6122, 43.1116 ], [ 1.612, 43.1115 ], [ 1.6123, 43.1113 ], [ 1.613, 43.111 ], [ 1.6132, 43.1109 ], [ 1.6134, 43.1108 ], [ 1.614, 43.1106 ], [ 1.6147, 43.1102 ], [ 1.6147, 43.1102 ], [ 1.6147, 43.1101 ], [ 1.6146, 43.1099 ], [ 1.6145, 43.1098 ], [ 1.6144, 43.1097 ], [ 1.6141, 43.1094 ], [ 1.6138, 43.1091 ], [ 1.6138, 43.1087 ], [ 1.6138, 43.1084 ], [ 1.6139, 43.1084 ], [ 1.6142, 43.1084 ], [ 1.6147, 43.1084 ], [ 1.6148, 43.1084 ], [ 1.6151, 43.108 ] ] ], "type": "Polygon" }, "id": "84", "properties": { "code_commune": "09225", "code_departement": "09", "code_qp": "QP009003", "commune_qp": "Pamiers", "nom_commune": "Pamiers", "nom_qp": "Centre Ancien - La Gloriette" }, "type": "Feature" }, { "bbox": [ 3.4658, 43.3088, 3.4746, 43.3166 ], "geometry": { "coordinates": [ [ [ 3.4736, 43.316 ], [ 3.4736, 43.3158 ], [ 3.4736, 43.3155 ], [ 3.4735, 43.3151 ], [ 3.4734, 43.3147 ], [ 3.4733, 43.3145 ], [ 3.4733, 43.3143 ], [ 3.4732, 43.314 ], [ 3.4735, 43.3139 ], [ 3.4739, 43.3137 ], [ 3.4741, 43.3132 ], [ 3.4741, 43.3131 ], [ 3.474, 43.3131 ], [ 3.474, 43.3131 ], [ 3.4739, 43.3127 ], [ 3.4737, 43.3117 ], [ 3.4746, 43.3116 ], [ 3.4745, 43.3112 ], [ 3.4735, 43.3111 ], [ 3.4739, 43.3107 ], [ 3.4742, 43.3105 ], [ 3.4746, 43.3102 ], [ 3.4745, 43.3102 ], [ 3.4745, 43.3101 ], [ 3.4745, 43.3101 ], [ 3.4741, 43.3102 ], [ 3.4737, 43.3102 ], [ 3.4733, 43.3103 ], [ 3.4733, 43.3102 ], [ 3.4731, 43.3099 ], [ 3.4729, 43.3099 ], [ 3.4725, 43.31 ], [ 3.4721, 43.31 ], [ 3.4718, 43.31 ], [ 3.4718, 43.31 ], [ 3.4718, 43.3091 ], [ 3.4715, 43.3091 ], [ 3.4715, 43.3091 ], [ 3.471, 43.3089 ], [ 3.471, 43.3089 ], [ 3.4708, 43.3088 ], [ 3.4704, 43.3088 ], [ 3.4703, 43.3088 ], [ 3.4702, 43.3088 ], [ 3.4702, 43.3089 ], [ 3.4701, 43.3089 ], [ 3.4701, 43.3089 ], [ 3.47, 43.3089 ], [ 3.47, 43.309 ], [ 3.4699, 43.309 ], [ 3.4699, 43.309 ], [ 3.4699, 43.309 ], [ 3.4698, 43.309 ], [ 3.4697, 43.309 ], [ 3.4696, 43.3089 ], [ 3.4693, 43.3089 ], [ 3.4692, 43.3088 ], [ 3.4691, 43.3088 ], [ 3.469, 43.3088 ], [ 3.4685, 43.309 ], [ 3.4685, 43.309 ], [ 3.4686, 43.3092 ], [ 3.4687, 43.3093 ], [ 3.4687, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4682, 43.3096 ], [ 3.4681, 43.3097 ], [ 3.4681, 43.3097 ], [ 3.4682, 43.3099 ], [ 3.468, 43.3099 ], [ 3.4681, 43.3101 ], [ 3.4681, 43.3102 ], [ 3.4682, 43.3104 ], [ 3.4682, 43.3104 ], [ 3.4682, 43.3105 ], [ 3.4682, 43.3106 ], [ 3.4659, 43.3109 ], [ 3.466, 43.3111 ], [ 3.4658, 43.3112 ], [ 3.4659, 43.3114 ], [ 3.4661, 43.3114 ], [ 3.4661, 43.3116 ], [ 3.4662, 43.3117 ], [ 3.4663, 43.3119 ], [ 3.4666, 43.3122 ], [ 3.4668, 43.3124 ], [ 3.4669, 43.3126 ], [ 3.4669, 43.3126 ], [ 3.4669, 43.3126 ], [ 3.4674, 43.3133 ], [ 3.4675, 43.3134 ], [ 3.4676, 43.3135 ], [ 3.4678, 43.3136 ], [ 3.4682, 43.3138 ], [ 3.4686, 43.314 ], [ 3.4689, 43.3142 ], [ 3.4692, 43.3144 ], [ 3.4694, 43.3145 ], [ 3.4696, 43.3147 ], [ 3.469, 43.3148 ], [ 3.4682, 43.315 ], [ 3.4677, 43.3146 ], [ 3.4668, 43.315 ], [ 3.4666, 43.3151 ], [ 3.4663, 43.3153 ], [ 3.4662, 43.3153 ], [ 3.4664, 43.3154 ], [ 3.4664, 43.3154 ], [ 3.4665, 43.3154 ], [ 3.467, 43.3156 ], [ 3.4672, 43.3155 ], [ 3.4677, 43.3159 ], [ 3.4683, 43.3153 ], [ 3.47, 43.3148 ], [ 3.4704, 43.315 ], [ 3.4706, 43.3151 ], [ 3.4708, 43.3152 ], [ 3.4724, 43.3161 ], [ 3.4726, 43.3164 ], [ 3.4733, 43.3166 ], [ 3.4734, 43.3165 ], [ 3.4734, 43.316 ], [ 3.4736, 43.316 ] ] ], "type": "Polygon" }, "id": "85", "properties": { "code_commune": "34003", "code_departement": "34", "code_qp": "QP034019", "commune_qp": "Agde", "nom_commune": "Agde", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 0.0545, 43.2405, 0.0703, 43.2469 ], "geometry": { "coordinates": [ [ [ 0.0611, 43.2419 ], [ 0.0611, 43.2425 ], [ 0.061, 43.2425 ], [ 0.061, 43.2431 ], [ 0.0614, 43.2431 ], [ 0.0616, 43.2431 ], [ 0.0616, 43.2431 ], [ 0.0615, 43.2433 ], [ 0.0612, 43.2435 ], [ 0.0601, 43.2436 ], [ 0.0595, 43.2436 ], [ 0.0595, 43.2436 ], [ 0.059, 43.2436 ], [ 0.059, 43.2438 ], [ 0.059, 43.2444 ], [ 0.059, 43.2445 ], [ 0.0589, 43.2447 ], [ 0.0589, 43.2449 ], [ 0.0588, 43.2449 ], [ 0.0588, 43.2449 ], [ 0.0582, 43.2449 ], [ 0.0578, 43.2449 ], [ 0.0568, 43.2449 ], [ 0.0568, 43.245 ], [ 0.0565, 43.2449 ], [ 0.0559, 43.2449 ], [ 0.0559, 43.245 ], [ 0.0559, 43.2453 ], [ 0.0559, 43.2454 ], [ 0.0558, 43.2455 ], [ 0.0557, 43.2455 ], [ 0.0556, 43.2455 ], [ 0.0555, 43.2455 ], [ 0.0553, 43.2454 ], [ 0.0553, 43.2454 ], [ 0.0553, 43.2453 ], [ 0.0553, 43.2451 ], [ 0.0553, 43.245 ], [ 0.0553, 43.2449 ], [ 0.0552, 43.2449 ], [ 0.0552, 43.2448 ], [ 0.0551, 43.2447 ], [ 0.0548, 43.2446 ], [ 0.0547, 43.2446 ], [ 0.0546, 43.2458 ], [ 0.0546, 43.2459 ], [ 0.0545, 43.2459 ], [ 0.0545, 43.2461 ], [ 0.0545, 43.2463 ], [ 0.0546, 43.2466 ], [ 0.055, 43.2469 ], [ 0.0557, 43.2468 ], [ 0.0558, 43.2461 ], [ 0.0558, 43.2461 ], [ 0.0558, 43.2456 ], [ 0.0559, 43.2455 ], [ 0.0559, 43.2455 ], [ 0.056, 43.2455 ], [ 0.0561, 43.2457 ], [ 0.0562, 43.2459 ], [ 0.0563, 43.2459 ], [ 0.0565, 43.246 ], [ 0.057, 43.246 ], [ 0.0574, 43.2461 ], [ 0.0576, 43.2459 ], [ 0.0577, 43.2458 ], [ 0.058, 43.2456 ], [ 0.0583, 43.2454 ], [ 0.0586, 43.2452 ], [ 0.059, 43.2449 ], [ 0.0591, 43.245 ], [ 0.0595, 43.2452 ], [ 0.0602, 43.2445 ], [ 0.0609, 43.2438 ], [ 0.061, 43.2439 ], [ 0.0611, 43.2439 ], [ 0.0614, 43.2439 ], [ 0.0614, 43.244 ], [ 0.0615, 43.244 ], [ 0.0615, 43.2442 ], [ 0.0614, 43.2456 ], [ 0.0613, 43.2459 ], [ 0.0614, 43.2459 ], [ 0.0625, 43.2465 ], [ 0.0627, 43.2466 ], [ 0.0628, 43.2466 ], [ 0.0633, 43.2466 ], [ 0.0646, 43.2466 ], [ 0.0651, 43.2467 ], [ 0.0656, 43.2456 ], [ 0.0657, 43.2456 ], [ 0.0667, 43.2458 ], [ 0.0667, 43.2457 ], [ 0.0668, 43.2458 ], [ 0.0674, 43.2458 ], [ 0.0679, 43.2459 ], [ 0.0684, 43.2459 ], [ 0.0684, 43.2459 ], [ 0.0684, 43.2458 ], [ 0.0684, 43.2458 ], [ 0.0685, 43.2457 ], [ 0.0687, 43.2457 ], [ 0.0689, 43.2456 ], [ 0.0691, 43.2454 ], [ 0.0686, 43.245 ], [ 0.0686, 43.245 ], [ 0.0683, 43.2449 ], [ 0.0684, 43.2449 ], [ 0.0684, 43.2447 ], [ 0.0685, 43.2446 ], [ 0.0685, 43.2445 ], [ 0.0685, 43.2442 ], [ 0.0685, 43.2441 ], [ 0.0693, 43.2442 ], [ 0.07, 43.2442 ], [ 0.0701, 43.2437 ], [ 0.0701, 43.2436 ], [ 0.0702, 43.2434 ], [ 0.0703, 43.243 ], [ 0.0703, 43.2429 ], [ 0.0703, 43.2426 ], [ 0.0697, 43.2426 ], [ 0.0696, 43.2425 ], [ 0.0696, 43.2426 ], [ 0.0695, 43.2426 ], [ 0.0694, 43.2426 ], [ 0.0694, 43.2427 ], [ 0.0694, 43.2427 ], [ 0.0692, 43.243 ], [ 0.069, 43.2431 ], [ 0.069, 43.2432 ], [ 0.069, 43.2432 ], [ 0.069, 43.2432 ], [ 0.069, 43.2433 ], [ 0.069, 43.2434 ], [ 0.0682, 43.2433 ], [ 0.0683, 43.243 ], [ 0.0683, 43.2425 ], [ 0.0683, 43.2425 ], [ 0.0683, 43.2424 ], [ 0.0683, 43.2419 ], [ 0.0674, 43.2419 ], [ 0.0674, 43.2415 ], [ 0.0672, 43.2415 ], [ 0.0671, 43.2417 ], [ 0.0667, 43.2422 ], [ 0.0667, 43.2423 ], [ 0.0659, 43.2423 ], [ 0.0657, 43.2423 ], [ 0.0656, 43.2425 ], [ 0.0641, 43.2424 ], [ 0.064, 43.2424 ], [ 0.0639, 43.2425 ], [ 0.0638, 43.2425 ], [ 0.0635, 43.2428 ], [ 0.063, 43.2426 ], [ 0.0625, 43.2423 ], [ 0.0627, 43.2421 ], [ 0.0626, 43.242 ], [ 0.0626, 43.2421 ], [ 0.0621, 43.2421 ], [ 0.0621, 43.242 ], [ 0.062, 43.242 ], [ 0.0619, 43.242 ], [ 0.0617, 43.242 ], [ 0.0616, 43.242 ], [ 0.0616, 43.2405 ], [ 0.0612, 43.2405 ], [ 0.0609, 43.2405 ], [ 0.0603, 43.2406 ], [ 0.0597, 43.2407 ], [ 0.0591, 43.2408 ], [ 0.0588, 43.2408 ], [ 0.0587, 43.2409 ], [ 0.059, 43.2416 ], [ 0.0591, 43.2418 ], [ 0.0591, 43.242 ], [ 0.0591, 43.242 ], [ 0.0595, 43.2419 ], [ 0.0597, 43.2419 ], [ 0.0601, 43.2419 ], [ 0.0611, 43.2418 ], [ 0.0611, 43.2419 ] ] ], "type": "Polygon" }, "id": "86", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065002", "commune_qp": "Tarbes", "nom_commune": "Tarbes", "nom_qp": "Tarbes Nord" }, "type": "Feature" }, { "bbox": [ 1.8884, 43.8981, 1.9055, 43.91 ], "geometry": { "coordinates": [ [ [ 1.8974, 43.9039 ], [ 1.8973, 43.9038 ], [ 1.8973, 43.9038 ], [ 1.8972, 43.9038 ], [ 1.8972, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8972, 43.9035 ], [ 1.8972, 43.9034 ], [ 1.8965, 43.9033 ], [ 1.8963, 43.9033 ], [ 1.8962, 43.9032 ], [ 1.8961, 43.9031 ], [ 1.8959, 43.903 ], [ 1.8957, 43.9029 ], [ 1.8956, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8954, 43.9029 ], [ 1.8953, 43.9029 ], [ 1.8952, 43.9028 ], [ 1.8951, 43.9028 ], [ 1.8951, 43.9028 ], [ 1.895, 43.9028 ], [ 1.8949, 43.9028 ], [ 1.8948, 43.903 ], [ 1.8946, 43.9029 ], [ 1.8944, 43.9028 ], [ 1.8945, 43.9027 ], [ 1.8941, 43.9025 ], [ 1.8939, 43.9024 ], [ 1.8936, 43.9024 ], [ 1.8934, 43.9023 ], [ 1.8933, 43.9023 ], [ 1.8934, 43.9021 ], [ 1.8932, 43.9021 ], [ 1.8927, 43.9022 ], [ 1.8923, 43.9023 ], [ 1.8923, 43.902 ], [ 1.8922, 43.902 ], [ 1.8922, 43.9018 ], [ 1.8922, 43.9015 ], [ 1.8921, 43.9014 ], [ 1.8921, 43.9012 ], [ 1.8922, 43.9008 ], [ 1.8922, 43.9007 ], [ 1.8923, 43.9005 ], [ 1.8924, 43.9004 ], [ 1.8922, 43.9002 ], [ 1.8919, 43.9 ], [ 1.8918, 43.9001 ], [ 1.8916, 43.9002 ], [ 1.8914, 43.9003 ], [ 1.8912, 43.9004 ], [ 1.891, 43.9006 ], [ 1.8909, 43.9006 ], [ 1.8908, 43.9006 ], [ 1.8906, 43.9006 ], [ 1.8905, 43.9006 ], [ 1.8906, 43.9005 ], [ 1.8907, 43.9005 ], [ 1.8909, 43.9003 ], [ 1.8911, 43.9002 ], [ 1.8912, 43.9001 ], [ 1.8912, 43.9 ], [ 1.8912, 43.8999 ], [ 1.8912, 43.8998 ], [ 1.8913, 43.8997 ], [ 1.8913, 43.8996 ], [ 1.8915, 43.8994 ], [ 1.8915, 43.8994 ], [ 1.8916, 43.8993 ], [ 1.8917, 43.8993 ], [ 1.8919, 43.8992 ], [ 1.8921, 43.899 ], [ 1.8925, 43.8987 ], [ 1.8919, 43.8987 ], [ 1.8915, 43.8986 ], [ 1.8913, 43.8985 ], [ 1.8911, 43.8985 ], [ 1.8907, 43.8984 ], [ 1.8906, 43.8982 ], [ 1.8905, 43.8982 ], [ 1.8903, 43.8981 ], [ 1.89, 43.8981 ], [ 1.8899, 43.8983 ], [ 1.8897, 43.8986 ], [ 1.8894, 43.8989 ], [ 1.8892, 43.899 ], [ 1.889, 43.8992 ], [ 1.889, 43.8992 ], [ 1.8887, 43.8996 ], [ 1.8889, 43.8998 ], [ 1.8884, 43.9003 ], [ 1.8898, 43.9015 ], [ 1.8902, 43.9018 ], [ 1.8906, 43.9022 ], [ 1.8906, 43.9022 ], [ 1.8907, 43.9024 ], [ 1.8909, 43.9026 ], [ 1.8909, 43.9026 ], [ 1.8911, 43.9027 ], [ 1.8912, 43.9027 ], [ 1.8913, 43.9028 ], [ 1.8913, 43.9029 ], [ 1.8914, 43.903 ], [ 1.8915, 43.9032 ], [ 1.8916, 43.9033 ], [ 1.8917, 43.9034 ], [ 1.8918, 43.9035 ], [ 1.8921, 43.9035 ], [ 1.8927, 43.9037 ], [ 1.8928, 43.9037 ], [ 1.893, 43.9038 ], [ 1.893, 43.9039 ], [ 1.8931, 43.904 ], [ 1.8931, 43.9041 ], [ 1.8931, 43.9042 ], [ 1.8931, 43.9043 ], [ 1.893, 43.9046 ], [ 1.893, 43.9047 ], [ 1.8931, 43.9049 ], [ 1.8939, 43.9049 ], [ 1.8942, 43.9049 ], [ 1.8946, 43.9048 ], [ 1.8949, 43.9048 ], [ 1.8956, 43.9048 ], [ 1.8957, 43.9048 ], [ 1.8959, 43.9048 ], [ 1.896, 43.9049 ], [ 1.8961, 43.9049 ], [ 1.896, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8968, 43.9049 ], [ 1.8968, 43.9049 ], [ 1.8969, 43.9049 ], [ 1.8969, 43.9046 ], [ 1.8969, 43.9046 ], [ 1.8971, 43.9046 ], [ 1.8973, 43.9046 ], [ 1.8973, 43.9047 ], [ 1.8975, 43.9047 ], [ 1.8977, 43.9047 ], [ 1.8978, 43.9048 ], [ 1.8979, 43.9048 ], [ 1.8979, 43.9049 ], [ 1.8981, 43.9051 ], [ 1.8981, 43.9052 ], [ 1.8987, 43.9063 ], [ 1.9006, 43.9058 ], [ 1.9008, 43.906 ], [ 1.9014, 43.9068 ], [ 1.9016, 43.9072 ], [ 1.9019, 43.9075 ], [ 1.902, 43.9076 ], [ 1.9021, 43.9078 ], [ 1.9023, 43.9083 ], [ 1.9027, 43.9089 ], [ 1.9031, 43.9094 ], [ 1.9035, 43.9099 ], [ 1.9036, 43.91 ], [ 1.9036, 43.91 ], [ 1.9037, 43.91 ], [ 1.9043, 43.9094 ], [ 1.9052, 43.9087 ], [ 1.9055, 43.9084 ], [ 1.9042, 43.9062 ], [ 1.9041, 43.9061 ], [ 1.904, 43.9061 ], [ 1.9038, 43.9061 ], [ 1.9037, 43.9061 ], [ 1.9035, 43.9061 ], [ 1.9033, 43.9061 ], [ 1.9032, 43.9061 ], [ 1.9031, 43.9061 ], [ 1.9028, 43.906 ], [ 1.9022, 43.9058 ], [ 1.9016, 43.9056 ], [ 1.9012, 43.9055 ], [ 1.9008, 43.9054 ], [ 1.9004, 43.9053 ], [ 1.9001, 43.9052 ], [ 1.8993, 43.9051 ], [ 1.8992, 43.9051 ], [ 1.8987, 43.905 ], [ 1.8984, 43.905 ], [ 1.8983, 43.9049 ], [ 1.8982, 43.9049 ], [ 1.898, 43.9049 ], [ 1.898, 43.9049 ], [ 1.898, 43.9048 ], [ 1.8979, 43.9048 ], [ 1.8978, 43.9047 ], [ 1.8978, 43.9046 ], [ 1.8977, 43.9045 ], [ 1.8974, 43.9039 ] ] ], "type": "Polygon" }, "id": "87", "properties": { "code_commune": "81099", "code_departement": "81", "code_qp": "QP081010", "commune_qp": "Gaillac", "nom_commune": "Gaillac", "nom_qp": "Lentajou - Catalanis" }, "type": "Feature" }, { "bbox": [ 0.5908, 43.6323, 0.5997, 43.6392 ], "geometry": { "coordinates": [ [ [ 0.5963, 43.6372 ], [ 0.5963, 43.6371 ], [ 0.5964, 43.637 ], [ 0.5963, 43.6369 ], [ 0.5961, 43.6356 ], [ 0.5959, 43.6349 ], [ 0.5959, 43.6347 ], [ 0.5959, 43.6345 ], [ 0.5958, 43.6344 ], [ 0.5956, 43.6342 ], [ 0.5953, 43.6337 ], [ 0.595, 43.6333 ], [ 0.5948, 43.633 ], [ 0.5947, 43.6329 ], [ 0.5944, 43.6326 ], [ 0.5942, 43.6325 ], [ 0.5938, 43.6324 ], [ 0.5932, 43.6323 ], [ 0.593, 43.6323 ], [ 0.5928, 43.6323 ], [ 0.5926, 43.6323 ], [ 0.5924, 43.6323 ], [ 0.5921, 43.6324 ], [ 0.5922, 43.6327 ], [ 0.5921, 43.6327 ], [ 0.592, 43.6328 ], [ 0.5923, 43.6339 ], [ 0.5921, 43.6339 ], [ 0.5921, 43.6342 ], [ 0.5922, 43.6342 ], [ 0.5914, 43.6343 ], [ 0.5915, 43.6347 ], [ 0.5914, 43.6347 ], [ 0.5915, 43.6349 ], [ 0.5914, 43.6349 ], [ 0.5915, 43.6352 ], [ 0.5909, 43.6353 ], [ 0.5908, 43.6353 ], [ 0.5908, 43.6353 ], [ 0.5911, 43.636 ], [ 0.5911, 43.6361 ], [ 0.5913, 43.636 ], [ 0.5916, 43.636 ], [ 0.5919, 43.6359 ], [ 0.592, 43.6363 ], [ 0.5925, 43.6363 ], [ 0.5925, 43.6363 ], [ 0.5929, 43.6362 ], [ 0.5931, 43.6367 ], [ 0.5931, 43.6367 ], [ 0.5933, 43.6372 ], [ 0.5932, 43.6373 ], [ 0.5933, 43.6375 ], [ 0.5934, 43.6376 ], [ 0.5939, 43.6375 ], [ 0.5941, 43.6381 ], [ 0.5941, 43.6382 ], [ 0.5946, 43.6381 ], [ 0.5949, 43.6379 ], [ 0.5957, 43.6375 ], [ 0.5961, 43.6373 ], [ 0.5964, 43.6376 ], [ 0.5966, 43.6375 ], [ 0.5967, 43.6375 ], [ 0.5968, 43.6376 ], [ 0.5967, 43.6377 ], [ 0.5972, 43.6381 ], [ 0.596, 43.6386 ], [ 0.5961, 43.6386 ], [ 0.5962, 43.6387 ], [ 0.5966, 43.639 ], [ 0.5968, 43.6391 ], [ 0.5969, 43.6392 ], [ 0.5975, 43.6389 ], [ 0.5977, 43.6389 ], [ 0.5982, 43.6386 ], [ 0.598, 43.6381 ], [ 0.5981, 43.6381 ], [ 0.5983, 43.6381 ], [ 0.5983, 43.6379 ], [ 0.5985, 43.6378 ], [ 0.5989, 43.6376 ], [ 0.5991, 43.6374 ], [ 0.5993, 43.6373 ], [ 0.5994, 43.6371 ], [ 0.5995, 43.6369 ], [ 0.5996, 43.6366 ], [ 0.5997, 43.6366 ], [ 0.5997, 43.6365 ], [ 0.5997, 43.6364 ], [ 0.5997, 43.6363 ], [ 0.5994, 43.6364 ], [ 0.5994, 43.6364 ], [ 0.5992, 43.6363 ], [ 0.5989, 43.6361 ], [ 0.5988, 43.6362 ], [ 0.5985, 43.6363 ], [ 0.5981, 43.6365 ], [ 0.5978, 43.6366 ], [ 0.5974, 43.6367 ], [ 0.5971, 43.6368 ], [ 0.5969, 43.6369 ], [ 0.5967, 43.6371 ], [ 0.5966, 43.6371 ], [ 0.5964, 43.6372 ], [ 0.5964, 43.6372 ], [ 0.5963, 43.6372 ] ] ], "type": "Polygon" }, "id": "88", "properties": { "code_commune": "32013", "code_departement": "32", "code_qp": "QP032001", "commune_qp": "Auch", "nom_commune": "Auch", "nom_qp": "Grand Garros" }, "type": "Feature" }, { "bbox": [ 3.2468, 43.3314, 3.2605, 43.3417 ], "geometry": { "coordinates": [ [ [ 3.259, 43.3402 ], [ 3.2587, 43.34 ], [ 3.2587, 43.34 ], [ 3.2586, 43.34 ], [ 3.2584, 43.3401 ], [ 3.2583, 43.3402 ], [ 3.2583, 43.3401 ], [ 3.2583, 43.3399 ], [ 3.2582, 43.3396 ], [ 3.2581, 43.3391 ], [ 3.2573, 43.3393 ], [ 3.257, 43.3389 ], [ 3.257, 43.3388 ], [ 3.2568, 43.3384 ], [ 3.2567, 43.3383 ], [ 3.2569, 43.3379 ], [ 3.2571, 43.338 ], [ 3.2574, 43.3377 ], [ 3.2578, 43.3378 ], [ 3.2579, 43.3379 ], [ 3.258, 43.3379 ], [ 3.2579, 43.3378 ], [ 3.2583, 43.3373 ], [ 3.2583, 43.3373 ], [ 3.2584, 43.3372 ], [ 3.2584, 43.3372 ], [ 3.2587, 43.3369 ], [ 3.2589, 43.3366 ], [ 3.2589, 43.3366 ], [ 3.2589, 43.3364 ], [ 3.2588, 43.336 ], [ 3.2596, 43.3359 ], [ 3.2599, 43.3358 ], [ 3.26, 43.3357 ], [ 3.2602, 43.3356 ], [ 3.2603, 43.3355 ], [ 3.2604, 43.3354 ], [ 3.2604, 43.3353 ], [ 3.2605, 43.3351 ], [ 3.2595, 43.3351 ], [ 3.2595, 43.3348 ], [ 3.2589, 43.3348 ], [ 3.2586, 43.3348 ], [ 3.2586, 43.3348 ], [ 3.2585, 43.335 ], [ 3.2585, 43.3352 ], [ 3.2584, 43.3352 ], [ 3.2578, 43.3352 ], [ 3.2575, 43.3353 ], [ 3.2574, 43.3352 ], [ 3.2573, 43.3352 ], [ 3.2569, 43.3352 ], [ 3.2567, 43.3352 ], [ 3.2567, 43.3353 ], [ 3.2566, 43.3349 ], [ 3.2567, 43.3348 ], [ 3.2567, 43.334 ], [ 3.2566, 43.3336 ], [ 3.2565, 43.3336 ], [ 3.2561, 43.3336 ], [ 3.2557, 43.3336 ], [ 3.2554, 43.3336 ], [ 3.2552, 43.3336 ], [ 3.2549, 43.3336 ], [ 3.2542, 43.3336 ], [ 3.2537, 43.3336 ], [ 3.2528, 43.3336 ], [ 3.2524, 43.3336 ], [ 3.2522, 43.3336 ], [ 3.252, 43.3336 ], [ 3.2519, 43.3336 ], [ 3.2514, 43.3336 ], [ 3.2513, 43.3336 ], [ 3.2512, 43.3336 ], [ 3.2508, 43.3336 ], [ 3.2506, 43.3333 ], [ 3.2506, 43.3333 ], [ 3.2506, 43.3332 ], [ 3.2506, 43.3331 ], [ 3.2506, 43.3329 ], [ 3.2506, 43.3328 ], [ 3.2506, 43.3326 ], [ 3.2506, 43.3325 ], [ 3.2506, 43.3321 ], [ 3.2506, 43.3318 ], [ 3.2506, 43.3317 ], [ 3.2506, 43.3315 ], [ 3.2506, 43.3315 ], [ 3.2505, 43.3315 ], [ 3.2505, 43.3314 ], [ 3.2498, 43.3314 ], [ 3.2495, 43.3314 ], [ 3.2493, 43.3314 ], [ 3.2491, 43.3315 ], [ 3.2491, 43.3317 ], [ 3.2488, 43.3318 ], [ 3.2488, 43.3319 ], [ 3.2487, 43.3319 ], [ 3.2487, 43.332 ], [ 3.2487, 43.3321 ], [ 3.2487, 43.3321 ], [ 3.2487, 43.3322 ], [ 3.2488, 43.3323 ], [ 3.2488, 43.3323 ], [ 3.2487, 43.3323 ], [ 3.2485, 43.3325 ], [ 3.2485, 43.3326 ], [ 3.2486, 43.3327 ], [ 3.2485, 43.3328 ], [ 3.2485, 43.3328 ], [ 3.2484, 43.3328 ], [ 3.2484, 43.3329 ], [ 3.2483, 43.3329 ], [ 3.2482, 43.3328 ], [ 3.2482, 43.3328 ], [ 3.2479, 43.3328 ], [ 3.2474, 43.3328 ], [ 3.2474, 43.3328 ], [ 3.2473, 43.3329 ], [ 3.2473, 43.333 ], [ 3.2472, 43.333 ], [ 3.2472, 43.3331 ], [ 3.2472, 43.3332 ], [ 3.2472, 43.3333 ], [ 3.2472, 43.3333 ], [ 3.2471, 43.3336 ], [ 3.2471, 43.3338 ], [ 3.2471, 43.334 ], [ 3.2471, 43.3342 ], [ 3.2471, 43.3343 ], [ 3.247, 43.3345 ], [ 3.247, 43.3346 ], [ 3.247, 43.3347 ], [ 3.247, 43.3348 ], [ 3.2471, 43.3349 ], [ 3.2471, 43.3349 ], [ 3.2472, 43.335 ], [ 3.2471, 43.335 ], [ 3.2472, 43.3351 ], [ 3.2468, 43.3352 ], [ 3.2468, 43.3352 ], [ 3.2468, 43.3357 ], [ 3.247, 43.3357 ], [ 3.247, 43.3357 ], [ 3.247, 43.3359 ], [ 3.2475, 43.3359 ], [ 3.2477, 43.3359 ], [ 3.2478, 43.3359 ], [ 3.2478, 43.3358 ], [ 3.2477, 43.3357 ], [ 3.2476, 43.3355 ], [ 3.2475, 43.3353 ], [ 3.2474, 43.3351 ], [ 3.2473, 43.3349 ], [ 3.2472, 43.3349 ], [ 3.2478, 43.3347 ], [ 3.2481, 43.3346 ], [ 3.2484, 43.3345 ], [ 3.2484, 43.3344 ], [ 3.2484, 43.3342 ], [ 3.249, 43.3342 ], [ 3.2493, 43.3341 ], [ 3.2494, 43.334 ], [ 3.2496, 43.334 ], [ 3.2497, 43.3339 ], [ 3.2498, 43.3339 ], [ 3.2499, 43.3339 ], [ 3.25, 43.3339 ], [ 3.2501, 43.3339 ], [ 3.2502, 43.3341 ], [ 3.2502, 43.3342 ], [ 3.2502, 43.3343 ], [ 3.2502, 43.3348 ], [ 3.2502, 43.3352 ], [ 3.2502, 43.3354 ], [ 3.2502, 43.3356 ], [ 3.2502, 43.3356 ], [ 3.2501, 43.3357 ], [ 3.2501, 43.3359 ], [ 3.2501, 43.3365 ], [ 3.2501, 43.3365 ], [ 3.2501, 43.3366 ], [ 3.2502, 43.3366 ], [ 3.2503, 43.3366 ], [ 3.2504, 43.3366 ], [ 3.2504, 43.337 ], [ 3.2502, 43.3371 ], [ 3.2502, 43.337 ], [ 3.2502, 43.3371 ], [ 3.2502, 43.3372 ], [ 3.2496, 43.3374 ], [ 3.2492, 43.3376 ], [ 3.2494, 43.3378 ], [ 3.2495, 43.3379 ], [ 3.2495, 43.3379 ], [ 3.2496, 43.3379 ], [ 3.25, 43.3379 ], [ 3.2501, 43.3379 ], [ 3.2502, 43.3379 ], [ 3.2502, 43.3379 ], [ 3.2503, 43.3379 ], [ 3.2505, 43.3379 ], [ 3.2507, 43.338 ], [ 3.2509, 43.338 ], [ 3.251, 43.338 ], [ 3.251, 43.338 ], [ 3.2511, 43.3381 ], [ 3.2516, 43.3387 ], [ 3.2521, 43.3393 ], [ 3.2523, 43.3392 ], [ 3.2527, 43.3391 ], [ 3.2527, 43.3391 ], [ 3.2527, 43.339 ], [ 3.2529, 43.339 ], [ 3.253, 43.339 ], [ 3.2532, 43.3389 ], [ 3.2533, 43.3388 ], [ 3.2534, 43.3387 ], [ 3.2534, 43.3387 ], [ 3.2536, 43.3386 ], [ 3.2537, 43.3384 ], [ 3.2538, 43.3384 ], [ 3.2539, 43.3382 ], [ 3.2541, 43.338 ], [ 3.2542, 43.338 ], [ 3.2542, 43.3379 ], [ 3.2547, 43.3374 ], [ 3.2547, 43.3374 ], [ 3.2549, 43.3374 ], [ 3.2556, 43.3378 ], [ 3.2556, 43.3381 ], [ 3.2557, 43.3392 ], [ 3.2557, 43.3393 ], [ 3.2557, 43.3394 ], [ 3.2557, 43.3395 ], [ 3.2558, 43.3399 ], [ 3.2559, 43.3411 ], [ 3.2559, 43.3414 ], [ 3.2559, 43.3415 ], [ 3.2563, 43.3415 ], [ 3.2569, 43.3415 ], [ 3.2574, 43.3416 ], [ 3.258, 43.3417 ], [ 3.2584, 43.3417 ], [ 3.2585, 43.3417 ], [ 3.2586, 43.3415 ], [ 3.2586, 43.3414 ], [ 3.2587, 43.3411 ], [ 3.2588, 43.3408 ], [ 3.2591, 43.3403 ], [ 3.259, 43.3402 ] ] ], "type": "Polygon" }, "id": "89", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034003", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Devèze" }, "type": "Feature" }, { "bbox": [ 1.3182, 43.4559, 1.3307, 43.4649 ], "geometry": { "coordinates": [ [ [ 1.321, 43.464 ], [ 1.3214, 43.4638 ], [ 1.3218, 43.4638 ], [ 1.3214, 43.4627 ], [ 1.3218, 43.4626 ], [ 1.3221, 43.4624 ], [ 1.3227, 43.4622 ], [ 1.3229, 43.4625 ], [ 1.3234, 43.4628 ], [ 1.3246, 43.4624 ], [ 1.3248, 43.4624 ], [ 1.3252, 43.4622 ], [ 1.3254, 43.4622 ], [ 1.3256, 43.4622 ], [ 1.326, 43.4621 ], [ 1.3262, 43.4621 ], [ 1.3263, 43.4621 ], [ 1.3263, 43.4618 ], [ 1.3262, 43.4614 ], [ 1.3262, 43.4614 ], [ 1.3265, 43.4614 ], [ 1.3265, 43.4614 ], [ 1.327, 43.4613 ], [ 1.3272, 43.4613 ], [ 1.3276, 43.4612 ], [ 1.3283, 43.4611 ], [ 1.3289, 43.461 ], [ 1.3289, 43.461 ], [ 1.3291, 43.4611 ], [ 1.3292, 43.4611 ], [ 1.3294, 43.4612 ], [ 1.33, 43.4614 ], [ 1.3301, 43.4612 ], [ 1.3303, 43.4612 ], [ 1.3304, 43.4612 ], [ 1.3305, 43.4612 ], [ 1.3305, 43.4612 ], [ 1.3307, 43.4611 ], [ 1.3301, 43.4608 ], [ 1.3299, 43.4607 ], [ 1.3296, 43.4606 ], [ 1.3292, 43.4605 ], [ 1.329, 43.4605 ], [ 1.3288, 43.4603 ], [ 1.3287, 43.4602 ], [ 1.3286, 43.4601 ], [ 1.3285, 43.4601 ], [ 1.3281, 43.4598 ], [ 1.3277, 43.4595 ], [ 1.3275, 43.4594 ], [ 1.3275, 43.4594 ], [ 1.3275, 43.4593 ], [ 1.3275, 43.4593 ], [ 1.3274, 43.4592 ], [ 1.3275, 43.4592 ], [ 1.327, 43.4587 ], [ 1.3266, 43.4586 ], [ 1.3262, 43.458 ], [ 1.3262, 43.4579 ], [ 1.3261, 43.4578 ], [ 1.3259, 43.4575 ], [ 1.3258, 43.4573 ], [ 1.3257, 43.4573 ], [ 1.3256, 43.4573 ], [ 1.3254, 43.4573 ], [ 1.3253, 43.457 ], [ 1.3253, 43.4568 ], [ 1.3252, 43.4567 ], [ 1.3252, 43.4565 ], [ 1.3252, 43.4564 ], [ 1.325, 43.4562 ], [ 1.3249, 43.4561 ], [ 1.3249, 43.456 ], [ 1.3247, 43.4559 ], [ 1.3234, 43.4563 ], [ 1.3236, 43.4566 ], [ 1.3238, 43.4568 ], [ 1.3241, 43.4572 ], [ 1.3246, 43.4576 ], [ 1.3255, 43.4583 ], [ 1.3262, 43.4589 ], [ 1.3262, 43.459 ], [ 1.3262, 43.459 ], [ 1.3257, 43.4594 ], [ 1.3254, 43.4597 ], [ 1.325, 43.46 ], [ 1.3246, 43.4603 ], [ 1.3246, 43.4605 ], [ 1.3245, 43.4606 ], [ 1.3247, 43.4607 ], [ 1.3246, 43.4609 ], [ 1.3246, 43.4609 ], [ 1.3245, 43.461 ], [ 1.3245, 43.461 ], [ 1.3244, 43.4611 ], [ 1.3244, 43.4612 ], [ 1.3242, 43.4614 ], [ 1.3241, 43.4614 ], [ 1.3241, 43.4614 ], [ 1.324, 43.4614 ], [ 1.3239, 43.4615 ], [ 1.3236, 43.4615 ], [ 1.3233, 43.4615 ], [ 1.3232, 43.4615 ], [ 1.323, 43.4616 ], [ 1.323, 43.4616 ], [ 1.3226, 43.4618 ], [ 1.3226, 43.4617 ], [ 1.3223, 43.4618 ], [ 1.3216, 43.462 ], [ 1.3215, 43.4623 ], [ 1.3212, 43.4622 ], [ 1.3208, 43.4621 ], [ 1.3201, 43.4619 ], [ 1.32, 43.4618 ], [ 1.3202, 43.4613 ], [ 1.3202, 43.4613 ], [ 1.3201, 43.4613 ], [ 1.3201, 43.4612 ], [ 1.3202, 43.461 ], [ 1.3198, 43.4609 ], [ 1.3192, 43.4613 ], [ 1.319, 43.4616 ], [ 1.3194, 43.4617 ], [ 1.3199, 43.4618 ], [ 1.32, 43.4619 ], [ 1.3201, 43.4624 ], [ 1.3201, 43.4628 ], [ 1.3209, 43.4628 ], [ 1.321, 43.4628 ], [ 1.3207, 43.4629 ], [ 1.3201, 43.4632 ], [ 1.3193, 43.4636 ], [ 1.3192, 43.4637 ], [ 1.3187, 43.4638 ], [ 1.3182, 43.4639 ], [ 1.3185, 43.4646 ], [ 1.3198, 43.4649 ], [ 1.3203, 43.4647 ], [ 1.3203, 43.4647 ], [ 1.3203, 43.4646 ], [ 1.3212, 43.4644 ], [ 1.321, 43.464 ] ] ], "type": "Polygon" }, "id": "90", "properties": { "code_commune": "31395", "code_departement": "31", "code_qp": "QP031002", "commune_qp": "Muret", "nom_commune": "Muret", "nom_qp": "Centre Ouest" }, "type": "Feature" }, { "bbox": [ 2.9064, 42.6896, 2.9104, 42.6948 ], "geometry": { "coordinates": [ [ [ 2.9104, 42.6943 ], [ 2.9102, 42.6942 ], [ 2.9089, 42.6926 ], [ 2.908, 42.6915 ], [ 2.9077, 42.6912 ], [ 2.9078, 42.6912 ], [ 2.908, 42.691 ], [ 2.909, 42.6906 ], [ 2.9089, 42.6906 ], [ 2.9088, 42.6905 ], [ 2.9073, 42.6896 ], [ 2.907, 42.6899 ], [ 2.9075, 42.6904 ], [ 2.9077, 42.6905 ], [ 2.908, 42.6909 ], [ 2.9077, 42.6911 ], [ 2.9075, 42.6912 ], [ 2.9069, 42.6915 ], [ 2.9065, 42.6917 ], [ 2.9064, 42.6919 ], [ 2.9064, 42.6921 ], [ 2.9065, 42.6927 ], [ 2.9066, 42.6928 ], [ 2.9066, 42.6929 ], [ 2.9066, 42.6929 ], [ 2.9072, 42.6936 ], [ 2.9072, 42.6937 ], [ 2.9073, 42.6938 ], [ 2.9073, 42.6938 ], [ 2.9073, 42.6938 ], [ 2.9072, 42.6938 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9071, 42.694 ], [ 2.907, 42.694 ], [ 2.9069, 42.6941 ], [ 2.9068, 42.6941 ], [ 2.9068, 42.6942 ], [ 2.9068, 42.6942 ], [ 2.9067, 42.6942 ], [ 2.9067, 42.6945 ], [ 2.9066, 42.6947 ], [ 2.9067, 42.6948 ], [ 2.9069, 42.6948 ], [ 2.9069, 42.6948 ], [ 2.907, 42.6948 ], [ 2.9071, 42.6948 ], [ 2.9079, 42.6948 ], [ 2.908, 42.6948 ], [ 2.9082, 42.6948 ], [ 2.9084, 42.6946 ], [ 2.9085, 42.6946 ], [ 2.9091, 42.6943 ], [ 2.9091, 42.6943 ], [ 2.9091, 42.6943 ], [ 2.9092, 42.6943 ], [ 2.9097, 42.6945 ], [ 2.9099, 42.6945 ], [ 2.9099, 42.6945 ], [ 2.91, 42.6945 ], [ 2.91, 42.6945 ], [ 2.9104, 42.6943 ] ] ], "type": "Polygon" }, "id": "91", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066010", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Champs De Mars" }, "type": "Feature" }, { "bbox": [ 3.8632, 43.6049, 3.8725, 43.609 ], "geometry": { "coordinates": [ [ [ 3.8669, 43.609 ], [ 3.8671, 43.6089 ], [ 3.8676, 43.6086 ], [ 3.8684, 43.6082 ], [ 3.8686, 43.6081 ], [ 3.8687, 43.6082 ], [ 3.8688, 43.6082 ], [ 3.869, 43.6085 ], [ 3.8685, 43.6086 ], [ 3.8687, 43.6088 ], [ 3.8689, 43.6088 ], [ 3.8688, 43.6087 ], [ 3.869, 43.6087 ], [ 3.8692, 43.6087 ], [ 3.8692, 43.6087 ], [ 3.8694, 43.6087 ], [ 3.8694, 43.6086 ], [ 3.8694, 43.6086 ], [ 3.8695, 43.6089 ], [ 3.8696, 43.6089 ], [ 3.8696, 43.609 ], [ 3.8697, 43.6089 ], [ 3.8696, 43.6088 ], [ 3.8696, 43.6088 ], [ 3.8698, 43.6087 ], [ 3.8698, 43.6087 ], [ 3.8699, 43.6087 ], [ 3.8698, 43.6087 ], [ 3.8701, 43.6086 ], [ 3.8701, 43.6086 ], [ 3.8701, 43.6085 ], [ 3.8703, 43.6085 ], [ 3.8703, 43.6085 ], [ 3.8704, 43.6085 ], [ 3.8705, 43.6085 ], [ 3.8706, 43.6085 ], [ 3.8707, 43.6085 ], [ 3.8707, 43.6085 ], [ 3.8709, 43.6085 ], [ 3.8709, 43.6085 ], [ 3.8713, 43.6085 ], [ 3.8713, 43.6084 ], [ 3.8716, 43.6084 ], [ 3.8716, 43.6085 ], [ 3.872, 43.6086 ], [ 3.8721, 43.6085 ], [ 3.8724, 43.6086 ], [ 3.8725, 43.6084 ], [ 3.8722, 43.6083 ], [ 3.8722, 43.6083 ], [ 3.8723, 43.6081 ], [ 3.8722, 43.6081 ], [ 3.872, 43.6082 ], [ 3.872, 43.6082 ], [ 3.8716, 43.6079 ], [ 3.8714, 43.6077 ], [ 3.8711, 43.6075 ], [ 3.8708, 43.6072 ], [ 3.8699, 43.6077 ], [ 3.8691, 43.6069 ], [ 3.8685, 43.6062 ], [ 3.868, 43.6064 ], [ 3.8679, 43.6063 ], [ 3.8677, 43.6062 ], [ 3.8677, 43.6062 ], [ 3.8676, 43.6061 ], [ 3.8675, 43.6061 ], [ 3.8674, 43.6061 ], [ 3.8673, 43.6062 ], [ 3.8672, 43.6059 ], [ 3.8671, 43.6058 ], [ 3.8661, 43.6052 ], [ 3.866, 43.6051 ], [ 3.8656, 43.605 ], [ 3.8654, 43.6049 ], [ 3.8653, 43.6049 ], [ 3.8652, 43.605 ], [ 3.8651, 43.605 ], [ 3.865, 43.605 ], [ 3.865, 43.6051 ], [ 3.8649, 43.6052 ], [ 3.8649, 43.6053 ], [ 3.8649, 43.6054 ], [ 3.8648, 43.6056 ], [ 3.8647, 43.6058 ], [ 3.8638, 43.6055 ], [ 3.8635, 43.6061 ], [ 3.8636, 43.6061 ], [ 3.8634, 43.6066 ], [ 3.8633, 43.6068 ], [ 3.8632, 43.6071 ], [ 3.8635, 43.6073 ], [ 3.8636, 43.6074 ], [ 3.8638, 43.6078 ], [ 3.8636, 43.6083 ], [ 3.8639, 43.6083 ], [ 3.864, 43.6085 ], [ 3.8642, 43.6085 ], [ 3.8661, 43.6085 ], [ 3.8667, 43.6085 ], [ 3.8667, 43.6086 ], [ 3.8667, 43.6086 ], [ 3.8667, 43.6087 ], [ 3.8668, 43.6087 ], [ 3.8668, 43.6087 ], [ 3.8669, 43.6087 ], [ 3.8669, 43.609 ] ] ], "type": "Polygon" }, "id": "92", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034010", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Figuerolles" }, "type": "Feature" }, { "bbox": [ 2.2124, 43.0514, 2.2229, 43.0613 ], "geometry": { "coordinates": [ [ [ 2.2203, 43.0524 ], [ 2.2201, 43.0523 ], [ 2.2202, 43.052 ], [ 2.22, 43.0519 ], [ 2.2201, 43.0517 ], [ 2.2203, 43.0515 ], [ 2.2203, 43.0514 ], [ 2.2203, 43.0514 ], [ 2.2202, 43.0514 ], [ 2.22, 43.0514 ], [ 2.2198, 43.0515 ], [ 2.2196, 43.0516 ], [ 2.2194, 43.0518 ], [ 2.2192, 43.052 ], [ 2.2188, 43.0523 ], [ 2.2185, 43.0521 ], [ 2.2184, 43.0521 ], [ 2.2183, 43.0521 ], [ 2.2182, 43.0521 ], [ 2.2182, 43.0521 ], [ 2.2181, 43.0521 ], [ 2.218, 43.0521 ], [ 2.218, 43.0521 ], [ 2.2179, 43.0525 ], [ 2.2178, 43.0527 ], [ 2.2173, 43.0526 ], [ 2.2168, 43.0524 ], [ 2.2165, 43.0522 ], [ 2.2165, 43.0523 ], [ 2.2161, 43.0521 ], [ 2.2157, 43.0523 ], [ 2.2153, 43.0526 ], [ 2.2156, 43.0528 ], [ 2.2147, 43.0534 ], [ 2.2145, 43.0536 ], [ 2.2143, 43.0538 ], [ 2.2139, 43.0542 ], [ 2.2135, 43.0546 ], [ 2.2145, 43.0546 ], [ 2.2144, 43.0549 ], [ 2.2147, 43.055 ], [ 2.2148, 43.0549 ], [ 2.2151, 43.055 ], [ 2.2151, 43.0549 ], [ 2.2153, 43.055 ], [ 2.2155, 43.0547 ], [ 2.216, 43.0547 ], [ 2.2158, 43.055 ], [ 2.2157, 43.0551 ], [ 2.2154, 43.0555 ], [ 2.2153, 43.0559 ], [ 2.2147, 43.0563 ], [ 2.2137, 43.0561 ], [ 2.2141, 43.0554 ], [ 2.2134, 43.0551 ], [ 2.213, 43.0551 ], [ 2.2129, 43.0552 ], [ 2.2127, 43.0557 ], [ 2.2125, 43.056 ], [ 2.2124, 43.0563 ], [ 2.2124, 43.0565 ], [ 2.2129, 43.0564 ], [ 2.2134, 43.0562 ], [ 2.2135, 43.0567 ], [ 2.2137, 43.0569 ], [ 2.2138, 43.057 ], [ 2.2139, 43.057 ], [ 2.2141, 43.057 ], [ 2.2155, 43.0575 ], [ 2.2156, 43.0574 ], [ 2.2157, 43.0573 ], [ 2.2157, 43.0573 ], [ 2.2167, 43.0564 ], [ 2.217, 43.0561 ], [ 2.2177, 43.0554 ], [ 2.2187, 43.0558 ], [ 2.219, 43.0558 ], [ 2.2192, 43.0559 ], [ 2.2193, 43.0559 ], [ 2.2199, 43.0559 ], [ 2.2201, 43.0559 ], [ 2.2201, 43.0561 ], [ 2.22, 43.0567 ], [ 2.2205, 43.0567 ], [ 2.2205, 43.0569 ], [ 2.2205, 43.057 ], [ 2.2205, 43.057 ], [ 2.2207, 43.057 ], [ 2.2208, 43.0571 ], [ 2.221, 43.0571 ], [ 2.221, 43.0572 ], [ 2.2211, 43.0572 ], [ 2.2212, 43.0573 ], [ 2.2213, 43.0575 ], [ 2.2213, 43.0577 ], [ 2.2214, 43.0578 ], [ 2.2213, 43.0579 ], [ 2.2213, 43.0579 ], [ 2.2207, 43.0579 ], [ 2.2206, 43.0584 ], [ 2.22, 43.0584 ], [ 2.22, 43.0586 ], [ 2.2205, 43.0587 ], [ 2.2205, 43.0587 ], [ 2.2207, 43.0589 ], [ 2.2207, 43.059 ], [ 2.2206, 43.0592 ], [ 2.2206, 43.0592 ], [ 2.2207, 43.0593 ], [ 2.2208, 43.0593 ], [ 2.2208, 43.0596 ], [ 2.2207, 43.0596 ], [ 2.2203, 43.0596 ], [ 2.2197, 43.0597 ], [ 2.2186, 43.0598 ], [ 2.2178, 43.0599 ], [ 2.218, 43.0607 ], [ 2.2181, 43.0613 ], [ 2.2184, 43.0613 ], [ 2.2186, 43.0612 ], [ 2.219, 43.0611 ], [ 2.2193, 43.0611 ], [ 2.2198, 43.061 ], [ 2.2198, 43.0604 ], [ 2.2201, 43.0604 ], [ 2.22, 43.0601 ], [ 2.2212, 43.06 ], [ 2.2211, 43.0597 ], [ 2.2211, 43.0597 ], [ 2.2211, 43.0596 ], [ 2.2211, 43.0595 ], [ 2.2212, 43.0592 ], [ 2.2213, 43.0587 ], [ 2.2214, 43.0582 ], [ 2.2214, 43.058 ], [ 2.2214, 43.0579 ], [ 2.2215, 43.0578 ], [ 2.2219, 43.0578 ], [ 2.2223, 43.0578 ], [ 2.2223, 43.058 ], [ 2.2228, 43.0579 ], [ 2.2228, 43.0577 ], [ 2.2228, 43.0569 ], [ 2.2229, 43.0561 ], [ 2.2227, 43.0561 ], [ 2.2227, 43.0562 ], [ 2.2226, 43.0562 ], [ 2.2225, 43.0562 ], [ 2.2224, 43.0563 ], [ 2.2224, 43.0564 ], [ 2.2223, 43.0574 ], [ 2.2213, 43.0575 ], [ 2.2212, 43.0573 ], [ 2.2211, 43.0571 ], [ 2.2209, 43.057 ], [ 2.2209, 43.0569 ], [ 2.2209, 43.0568 ], [ 2.2208, 43.0567 ], [ 2.2205, 43.0562 ], [ 2.2203, 43.0559 ], [ 2.2201, 43.0557 ], [ 2.2202, 43.0553 ], [ 2.2203, 43.055 ], [ 2.2205, 43.055 ], [ 2.2207, 43.055 ], [ 2.2207, 43.055 ], [ 2.221, 43.0551 ], [ 2.2211, 43.0548 ], [ 2.2212, 43.0547 ], [ 2.2213, 43.0545 ], [ 2.2213, 43.0544 ], [ 2.2213, 43.0544 ], [ 2.2209, 43.0544 ], [ 2.2207, 43.0543 ], [ 2.2201, 43.0542 ], [ 2.219, 43.054 ], [ 2.2193, 43.0538 ], [ 2.2194, 43.0536 ], [ 2.2197, 43.0532 ], [ 2.22, 43.0529 ], [ 2.2203, 43.0524 ] ] ], "type": "Polygon" }, "id": "93", "properties": { "code_commune": "11206", "code_departement": "11", "code_qp": "QP011001", "commune_qp": "Limoux", "nom_commune": "Limoux", "nom_qp": "Quartier Aude" }, "type": "Feature" }, { "bbox": [ 4.6115, 44.1552, 4.6259, 44.1628 ], "geometry": { "coordinates": [ [ [ 4.6258, 44.1607 ], [ 4.6257, 44.1605 ], [ 4.6254, 44.1602 ], [ 4.6254, 44.1601 ], [ 4.6252, 44.16 ], [ 4.6251, 44.1599 ], [ 4.625, 44.1598 ], [ 4.6248, 44.1597 ], [ 4.6246, 44.1593 ], [ 4.6225, 44.1564 ], [ 4.6223, 44.1563 ], [ 4.6221, 44.156 ], [ 4.6219, 44.1559 ], [ 4.6218, 44.1558 ], [ 4.6216, 44.1557 ], [ 4.6208, 44.1557 ], [ 4.6192, 44.1556 ], [ 4.619, 44.1555 ], [ 4.618, 44.1555 ], [ 4.6177, 44.1554 ], [ 4.6175, 44.1554 ], [ 4.6173, 44.1554 ], [ 4.6171, 44.1553 ], [ 4.617, 44.1552 ], [ 4.6169, 44.1553 ], [ 4.6169, 44.1554 ], [ 4.6168, 44.1554 ], [ 4.6168, 44.1555 ], [ 4.6167, 44.1556 ], [ 4.6168, 44.1558 ], [ 4.6169, 44.1559 ], [ 4.617, 44.1561 ], [ 4.6172, 44.1564 ], [ 4.6169, 44.1565 ], [ 4.6165, 44.1566 ], [ 4.6161, 44.1566 ], [ 4.6157, 44.1561 ], [ 4.6154, 44.1557 ], [ 4.6153, 44.1556 ], [ 4.6153, 44.1556 ], [ 4.6153, 44.1555 ], [ 4.6144, 44.1557 ], [ 4.6145, 44.156 ], [ 4.6147, 44.1565 ], [ 4.6143, 44.1566 ], [ 4.614, 44.1566 ], [ 4.614, 44.1566 ], [ 4.614, 44.1567 ], [ 4.6141, 44.1568 ], [ 4.6145, 44.157 ], [ 4.6146, 44.1571 ], [ 4.6147, 44.1572 ], [ 4.6151, 44.1577 ], [ 4.6152, 44.1579 ], [ 4.6151, 44.1579 ], [ 4.6152, 44.1582 ], [ 4.6152, 44.1582 ], [ 4.6134, 44.1585 ], [ 4.6133, 44.1585 ], [ 4.6133, 44.1585 ], [ 4.6134, 44.1587 ], [ 4.6136, 44.159 ], [ 4.6139, 44.1597 ], [ 4.6137, 44.1598 ], [ 4.6129, 44.1598 ], [ 4.612, 44.16 ], [ 4.6116, 44.1601 ], [ 4.6116, 44.1601 ], [ 4.6115, 44.1602 ], [ 4.6115, 44.1604 ], [ 4.6116, 44.161 ], [ 4.6117, 44.1628 ], [ 4.6125, 44.1627 ], [ 4.6123, 44.1612 ], [ 4.6123, 44.16 ], [ 4.6124, 44.1599 ], [ 4.6129, 44.1599 ], [ 4.6138, 44.1598 ], [ 4.6139, 44.1597 ], [ 4.6136, 44.159 ], [ 4.6146, 44.159 ], [ 4.6147, 44.159 ], [ 4.6156, 44.1589 ], [ 4.6157, 44.1588 ], [ 4.6179, 44.1581 ], [ 4.618, 44.158 ], [ 4.618, 44.1582 ], [ 4.6181, 44.1583 ], [ 4.6182, 44.1585 ], [ 4.6184, 44.1587 ], [ 4.6186, 44.1589 ], [ 4.6189, 44.1594 ], [ 4.6194, 44.1592 ], [ 4.6195, 44.1595 ], [ 4.6196, 44.1595 ], [ 4.6197, 44.1595 ], [ 4.6198, 44.1598 ], [ 4.6197, 44.1598 ], [ 4.6197, 44.1602 ], [ 4.6206, 44.1602 ], [ 4.6208, 44.1602 ], [ 4.621, 44.1601 ], [ 4.6211, 44.1602 ], [ 4.6211, 44.1602 ], [ 4.6212, 44.1604 ], [ 4.6215, 44.1603 ], [ 4.6215, 44.1604 ], [ 4.6225, 44.1603 ], [ 4.6226, 44.1603 ], [ 4.6226, 44.1601 ], [ 4.6226, 44.1598 ], [ 4.623, 44.1598 ], [ 4.6234, 44.1598 ], [ 4.6235, 44.16 ], [ 4.6238, 44.1599 ], [ 4.624, 44.1602 ], [ 4.624, 44.1602 ], [ 4.6243, 44.1602 ], [ 4.6243, 44.1604 ], [ 4.6242, 44.1606 ], [ 4.6243, 44.1607 ], [ 4.6243, 44.1609 ], [ 4.6252, 44.1607 ], [ 4.6252, 44.1608 ], [ 4.6254, 44.1607 ], [ 4.6255, 44.161 ], [ 4.6256, 44.161 ], [ 4.6257, 44.1609 ], [ 4.6258, 44.1609 ], [ 4.6258, 44.1608 ], [ 4.6259, 44.1608 ], [ 4.6258, 44.1607 ] ] ], "type": "Polygon" }, "id": "94", "properties": { "code_commune": "30028", "code_departement": "30", "code_qp": "QP030010", "commune_qp": "Bagnols-sur-Cèze", "nom_commune": "Bagnols-sur-Cèze", "nom_qp": "Escanaux - Coronelle - Citadelle - Vigan Braquet" }, "type": "Feature" }, { "bbox": [ 4.4107, 44.0178, 4.4182, 44.0292 ], "geometry": { "coordinates": [ [ [ 4.4182, 44.0186 ], [ 4.418, 44.018 ], [ 4.4179, 44.0178 ], [ 4.4176, 44.0179 ], [ 4.4174, 44.0179 ], [ 4.4165, 44.0182 ], [ 4.4163, 44.0182 ], [ 4.4162, 44.0183 ], [ 4.416, 44.0183 ], [ 4.4159, 44.0183 ], [ 4.4159, 44.0183 ], [ 4.4158, 44.0183 ], [ 4.4155, 44.0184 ], [ 4.4152, 44.0186 ], [ 4.4146, 44.0187 ], [ 4.4145, 44.0188 ], [ 4.4144, 44.0188 ], [ 4.4138, 44.019 ], [ 4.4136, 44.0191 ], [ 4.4133, 44.0192 ], [ 4.4131, 44.0193 ], [ 4.4129, 44.0194 ], [ 4.4125, 44.0195 ], [ 4.4122, 44.0196 ], [ 4.4118, 44.0197 ], [ 4.4111, 44.02 ], [ 4.4113, 44.0204 ], [ 4.4115, 44.0208 ], [ 4.4117, 44.0212 ], [ 4.4122, 44.022 ], [ 4.4119, 44.0222 ], [ 4.4116, 44.0224 ], [ 4.4116, 44.0224 ], [ 4.4113, 44.0227 ], [ 4.4112, 44.0228 ], [ 4.411, 44.0229 ], [ 4.4108, 44.0233 ], [ 4.4108, 44.0234 ], [ 4.4107, 44.0239 ], [ 4.4107, 44.024 ], [ 4.4107, 44.0242 ], [ 4.4108, 44.0243 ], [ 4.4109, 44.0245 ], [ 4.4111, 44.0247 ], [ 4.4112, 44.0248 ], [ 4.4113, 44.0248 ], [ 4.412, 44.0251 ], [ 4.4121, 44.0252 ], [ 4.4122, 44.0252 ], [ 4.4123, 44.0253 ], [ 4.4126, 44.0253 ], [ 4.4126, 44.0254 ], [ 4.4126, 44.0254 ], [ 4.4126, 44.0254 ], [ 4.413, 44.0255 ], [ 4.4131, 44.0256 ], [ 4.4133, 44.0256 ], [ 4.4138, 44.0256 ], [ 4.4137, 44.0257 ], [ 4.4137, 44.0259 ], [ 4.4136, 44.0261 ], [ 4.4135, 44.0262 ], [ 4.4135, 44.0263 ], [ 4.4135, 44.0264 ], [ 4.4136, 44.0265 ], [ 4.4136, 44.0265 ], [ 4.4137, 44.0266 ], [ 4.4138, 44.0267 ], [ 4.4139, 44.0268 ], [ 4.4141, 44.0269 ], [ 4.4145, 44.027 ], [ 4.4144, 44.0271 ], [ 4.4145, 44.0272 ], [ 4.4147, 44.0274 ], [ 4.4149, 44.0276 ], [ 4.4151, 44.0278 ], [ 4.4157, 44.0287 ], [ 4.4158, 44.0288 ], [ 4.4159, 44.0288 ], [ 4.4161, 44.029 ], [ 4.4162, 44.0291 ], [ 4.4163, 44.0292 ], [ 4.417, 44.029 ], [ 4.4175, 44.0288 ], [ 4.4175, 44.0288 ], [ 4.4175, 44.0287 ], [ 4.4176, 44.0286 ], [ 4.4176, 44.0282 ], [ 4.4176, 44.0276 ], [ 4.4176, 44.0274 ], [ 4.4175, 44.0271 ], [ 4.4175, 44.027 ], [ 4.4175, 44.0268 ], [ 4.4174, 44.0267 ], [ 4.4173, 44.0263 ], [ 4.4173, 44.0262 ], [ 4.4173, 44.0261 ], [ 4.4172, 44.026 ], [ 4.4172, 44.0257 ], [ 4.4171, 44.0252 ], [ 4.4171, 44.0251 ], [ 4.417, 44.0249 ], [ 4.417, 44.0248 ], [ 4.4169, 44.0247 ], [ 4.4169, 44.0247 ], [ 4.4168, 44.0246 ], [ 4.4167, 44.0246 ], [ 4.4166, 44.0245 ], [ 4.4158, 44.0243 ], [ 4.4155, 44.024 ], [ 4.4153, 44.0239 ], [ 4.415, 44.0237 ], [ 4.4146, 44.0234 ], [ 4.4142, 44.0231 ], [ 4.4141, 44.023 ], [ 4.4147, 44.0215 ], [ 4.4149, 44.0211 ], [ 4.4152, 44.0202 ], [ 4.4155, 44.0194 ], [ 4.416, 44.0196 ], [ 4.4164, 44.0198 ], [ 4.4168, 44.0196 ], [ 4.4172, 44.0194 ], [ 4.4174, 44.0193 ], [ 4.4174, 44.0193 ], [ 4.4175, 44.0193 ], [ 4.4175, 44.0192 ], [ 4.4176, 44.0192 ], [ 4.4177, 44.0191 ], [ 4.4179, 44.0189 ], [ 4.4181, 44.0187 ], [ 4.4182, 44.0186 ] ] ], "type": "Polygon" }, "id": "95", "properties": { "code_commune": "30334", "code_departement": "30", "code_qp": "QP030018", "commune_qp": "Uzès", "nom_commune": "Uzès", "nom_qp": "Quartier Prioritaire D'Uzès" }, "type": "Feature" }, { "bbox": [ 2.1515, 43.9406, 2.1586, 43.9467 ], "geometry": { "coordinates": [ [ [ 2.1567, 43.9451 ], [ 2.1558, 43.9446 ], [ 2.1559, 43.9446 ], [ 2.1556, 43.9445 ], [ 2.1558, 43.9443 ], [ 2.1558, 43.9441 ], [ 2.1555, 43.9439 ], [ 2.156, 43.9436 ], [ 2.1562, 43.9436 ], [ 2.1564, 43.9437 ], [ 2.1565, 43.9438 ], [ 2.1566, 43.9438 ], [ 2.1567, 43.9438 ], [ 2.1569, 43.9438 ], [ 2.1571, 43.9439 ], [ 2.1573, 43.9439 ], [ 2.1575, 43.9438 ], [ 2.1576, 43.9438 ], [ 2.1579, 43.9438 ], [ 2.158, 43.9438 ], [ 2.1581, 43.9438 ], [ 2.1581, 43.9438 ], [ 2.1582, 43.9438 ], [ 2.1582, 43.9437 ], [ 2.1583, 43.9436 ], [ 2.1585, 43.9435 ], [ 2.1586, 43.9433 ], [ 2.1586, 43.9432 ], [ 2.1586, 43.9431 ], [ 2.1586, 43.943 ], [ 2.1586, 43.9428 ], [ 2.1586, 43.9426 ], [ 2.1585, 43.9422 ], [ 2.1584, 43.9419 ], [ 2.158, 43.9418 ], [ 2.1571, 43.9413 ], [ 2.157, 43.9413 ], [ 2.1569, 43.9413 ], [ 2.1569, 43.9413 ], [ 2.1565, 43.9411 ], [ 2.1564, 43.9411 ], [ 2.1563, 43.941 ], [ 2.1564, 43.941 ], [ 2.1562, 43.9409 ], [ 2.156, 43.9412 ], [ 2.1558, 43.9411 ], [ 2.1557, 43.9411 ], [ 2.1557, 43.9411 ], [ 2.1556, 43.9409 ], [ 2.1555, 43.9406 ], [ 2.1554, 43.9406 ], [ 2.1554, 43.9407 ], [ 2.1552, 43.9407 ], [ 2.1551, 43.9407 ], [ 2.155, 43.9407 ], [ 2.1542, 43.9407 ], [ 2.1542, 43.941 ], [ 2.1539, 43.941 ], [ 2.1537, 43.941 ], [ 2.1535, 43.941 ], [ 2.1533, 43.9411 ], [ 2.1532, 43.9412 ], [ 2.1531, 43.9413 ], [ 2.153, 43.9414 ], [ 2.1529, 43.9415 ], [ 2.1529, 43.9416 ], [ 2.1529, 43.9417 ], [ 2.1529, 43.9417 ], [ 2.1529, 43.9418 ], [ 2.1526, 43.942 ], [ 2.1523, 43.9423 ], [ 2.1521, 43.9423 ], [ 2.1521, 43.9424 ], [ 2.1519, 43.9424 ], [ 2.1518, 43.9425 ], [ 2.1517, 43.9425 ], [ 2.1515, 43.9425 ], [ 2.1517, 43.943 ], [ 2.1517, 43.9431 ], [ 2.1519, 43.9431 ], [ 2.153, 43.943 ], [ 2.1532, 43.943 ], [ 2.154, 43.9434 ], [ 2.1541, 43.9434 ], [ 2.1543, 43.9435 ], [ 2.154, 43.9438 ], [ 2.1543, 43.9439 ], [ 2.1541, 43.944 ], [ 2.154, 43.9441 ], [ 2.1539, 43.9442 ], [ 2.1538, 43.9444 ], [ 2.1538, 43.9445 ], [ 2.1537, 43.9446 ], [ 2.1537, 43.9447 ], [ 2.1536, 43.9448 ], [ 2.1536, 43.9452 ], [ 2.1535, 43.9455 ], [ 2.1535, 43.9456 ], [ 2.1535, 43.9457 ], [ 2.1536, 43.9458 ], [ 2.1536, 43.9459 ], [ 2.1537, 43.9461 ], [ 2.1538, 43.9462 ], [ 2.1539, 43.9463 ], [ 2.1541, 43.9463 ], [ 2.1546, 43.9466 ], [ 2.1549, 43.9467 ], [ 2.1552, 43.9464 ], [ 2.1553, 43.9464 ], [ 2.1554, 43.9465 ], [ 2.1554, 43.9462 ], [ 2.1556, 43.9462 ], [ 2.1556, 43.9462 ], [ 2.1557, 43.9462 ], [ 2.1558, 43.9462 ], [ 2.1559, 43.9462 ], [ 2.1559, 43.9461 ], [ 2.1562, 43.9458 ], [ 2.1564, 43.9458 ], [ 2.1565, 43.9456 ], [ 2.1563, 43.9456 ], [ 2.1564, 43.9455 ], [ 2.1565, 43.9453 ], [ 2.1567, 43.9451 ] ] ], "type": "Polygon" }, "id": "96", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081006", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Cantepau" }, "type": "Feature" }, { "bbox": [ 2.2488, 43.6026, 2.2616, 43.6152 ], "geometry": { "coordinates": [ [ [ 2.255, 43.6138 ], [ 2.2548, 43.6142 ], [ 2.2547, 43.6144 ], [ 2.2546, 43.6145 ], [ 2.2544, 43.6147 ], [ 2.2543, 43.6148 ], [ 2.254, 43.615 ], [ 2.2543, 43.6152 ], [ 2.2545, 43.6151 ], [ 2.2549, 43.6149 ], [ 2.2552, 43.6148 ], [ 2.2551, 43.6145 ], [ 2.2558, 43.6144 ], [ 2.2562, 43.6135 ], [ 2.2563, 43.6135 ], [ 2.2565, 43.6133 ], [ 2.2562, 43.6132 ], [ 2.2563, 43.6131 ], [ 2.2562, 43.6131 ], [ 2.2563, 43.6129 ], [ 2.2566, 43.6129 ], [ 2.2567, 43.6129 ], [ 2.2568, 43.6129 ], [ 2.2569, 43.6129 ], [ 2.257, 43.6129 ], [ 2.257, 43.6128 ], [ 2.2571, 43.6128 ], [ 2.2571, 43.6127 ], [ 2.2571, 43.6127 ], [ 2.2572, 43.6125 ], [ 2.2573, 43.6124 ], [ 2.2574, 43.6123 ], [ 2.2575, 43.6122 ], [ 2.2577, 43.6121 ], [ 2.2579, 43.612 ], [ 2.2579, 43.6119 ], [ 2.2579, 43.6118 ], [ 2.258, 43.6107 ], [ 2.258, 43.6104 ], [ 2.258, 43.6103 ], [ 2.2579, 43.6103 ], [ 2.2567, 43.6103 ], [ 2.2567, 43.6103 ], [ 2.2565, 43.6103 ], [ 2.2564, 43.6103 ], [ 2.2563, 43.6102 ], [ 2.2562, 43.6102 ], [ 2.256, 43.6102 ], [ 2.2559, 43.6102 ], [ 2.256, 43.6097 ], [ 2.2561, 43.6089 ], [ 2.2561, 43.6089 ], [ 2.2564, 43.6088 ], [ 2.2565, 43.6088 ], [ 2.2564, 43.6087 ], [ 2.2564, 43.6086 ], [ 2.2565, 43.6086 ], [ 2.2565, 43.6085 ], [ 2.2568, 43.6084 ], [ 2.2569, 43.6084 ], [ 2.257, 43.6084 ], [ 2.2571, 43.6085 ], [ 2.2573, 43.6085 ], [ 2.2574, 43.6085 ], [ 2.2576, 43.6085 ], [ 2.2577, 43.6085 ], [ 2.2579, 43.6084 ], [ 2.258, 43.6081 ], [ 2.258, 43.6079 ], [ 2.2579, 43.6078 ], [ 2.2577, 43.6077 ], [ 2.2576, 43.6076 ], [ 2.2576, 43.6075 ], [ 2.2576, 43.6075 ], [ 2.2576, 43.6074 ], [ 2.2586, 43.6068 ], [ 2.2601, 43.606 ], [ 2.2605, 43.6058 ], [ 2.2611, 43.6054 ], [ 2.2613, 43.6052 ], [ 2.2614, 43.6052 ], [ 2.2615, 43.6051 ], [ 2.2616, 43.605 ], [ 2.2616, 43.6049 ], [ 2.2615, 43.6049 ], [ 2.2613, 43.6047 ], [ 2.2611, 43.6044 ], [ 2.2603, 43.6035 ], [ 2.2595, 43.6026 ], [ 2.259, 43.6029 ], [ 2.2583, 43.6032 ], [ 2.2589, 43.6038 ], [ 2.258, 43.6044 ], [ 2.2582, 43.6045 ], [ 2.257, 43.6049 ], [ 2.2556, 43.6053 ], [ 2.2558, 43.6058 ], [ 2.256, 43.6063 ], [ 2.2561, 43.6063 ], [ 2.2547, 43.6067 ], [ 2.254, 43.6061 ], [ 2.2537, 43.6063 ], [ 2.252, 43.6073 ], [ 2.2523, 43.6073 ], [ 2.2528, 43.6075 ], [ 2.2552, 43.608 ], [ 2.2551, 43.6082 ], [ 2.2551, 43.6082 ], [ 2.2551, 43.6082 ], [ 2.2554, 43.6084 ], [ 2.2554, 43.6086 ], [ 2.2553, 43.6086 ], [ 2.2549, 43.6087 ], [ 2.2547, 43.6087 ], [ 2.2545, 43.6087 ], [ 2.2539, 43.6087 ], [ 2.2538, 43.6096 ], [ 2.2538, 43.6098 ], [ 2.2531, 43.6096 ], [ 2.2529, 43.6098 ], [ 2.2512, 43.6096 ], [ 2.2515, 43.6099 ], [ 2.2505, 43.6104 ], [ 2.251, 43.611 ], [ 2.2525, 43.6102 ], [ 2.2526, 43.6101 ], [ 2.2529, 43.6099 ], [ 2.253, 43.6099 ], [ 2.2534, 43.6103 ], [ 2.2538, 43.6103 ], [ 2.2538, 43.6105 ], [ 2.2538, 43.6107 ], [ 2.2538, 43.6109 ], [ 2.2536, 43.611 ], [ 2.2524, 43.6116 ], [ 2.2536, 43.6119 ], [ 2.2536, 43.6119 ], [ 2.2534, 43.6123 ], [ 2.2535, 43.6123 ], [ 2.2533, 43.6127 ], [ 2.2533, 43.6128 ], [ 2.2522, 43.6131 ], [ 2.2523, 43.6134 ], [ 2.2517, 43.6135 ], [ 2.2513, 43.6136 ], [ 2.2513, 43.6137 ], [ 2.2514, 43.6138 ], [ 2.2504, 43.6141 ], [ 2.2502, 43.6139 ], [ 2.2502, 43.614 ], [ 2.2498, 43.6141 ], [ 2.2495, 43.6136 ], [ 2.2488, 43.6138 ], [ 2.2491, 43.6143 ], [ 2.2492, 43.6145 ], [ 2.2492, 43.6146 ], [ 2.2492, 43.6147 ], [ 2.2493, 43.6147 ], [ 2.2495, 43.6148 ], [ 2.2495, 43.6148 ], [ 2.2498, 43.6147 ], [ 2.2499, 43.6147 ], [ 2.2502, 43.6145 ], [ 2.2508, 43.6144 ], [ 2.2516, 43.6141 ], [ 2.2524, 43.6138 ], [ 2.2528, 43.6137 ], [ 2.2531, 43.6136 ], [ 2.2534, 43.6135 ], [ 2.2536, 43.6135 ], [ 2.2537, 43.6135 ], [ 2.255, 43.6138 ] ] ], "type": "Polygon" }, "id": "97", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081004", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Aillot Bisséous Lardaillé" }, "type": "Feature" }, { "bbox": [ 1.4126, 43.5904, 1.4202, 43.595 ], "geometry": { "coordinates": [ [ [ 1.4184, 43.591 ], [ 1.4183, 43.5909 ], [ 1.4177, 43.5907 ], [ 1.4174, 43.5906 ], [ 1.4169, 43.5904 ], [ 1.4164, 43.5915 ], [ 1.4169, 43.5916 ], [ 1.4165, 43.5922 ], [ 1.4165, 43.5922 ], [ 1.416, 43.5931 ], [ 1.4159, 43.5931 ], [ 1.415, 43.593 ], [ 1.4151, 43.5927 ], [ 1.4153, 43.5924 ], [ 1.4151, 43.5923 ], [ 1.4142, 43.5921 ], [ 1.4141, 43.5929 ], [ 1.4141, 43.593 ], [ 1.414, 43.593 ], [ 1.414, 43.5934 ], [ 1.4135, 43.5933 ], [ 1.4131, 43.5933 ], [ 1.4128, 43.5939 ], [ 1.4128, 43.5939 ], [ 1.4126, 43.5944 ], [ 1.4128, 43.5945 ], [ 1.4129, 43.5945 ], [ 1.4153, 43.5949 ], [ 1.4153, 43.5949 ], [ 1.4155, 43.5949 ], [ 1.4155, 43.5949 ], [ 1.4156, 43.5949 ], [ 1.4158, 43.5941 ], [ 1.4163, 43.5942 ], [ 1.4163, 43.5943 ], [ 1.4178, 43.5944 ], [ 1.4179, 43.5941 ], [ 1.4192, 43.5942 ], [ 1.4193, 43.5949 ], [ 1.4199, 43.595 ], [ 1.4199, 43.5948 ], [ 1.42, 43.5948 ], [ 1.4202, 43.594 ], [ 1.4202, 43.594 ], [ 1.4196, 43.5941 ], [ 1.4199, 43.5932 ], [ 1.4197, 43.5931 ], [ 1.4197, 43.5931 ], [ 1.4195, 43.593 ], [ 1.4196, 43.593 ], [ 1.4196, 43.5929 ], [ 1.4194, 43.5928 ], [ 1.4194, 43.5928 ], [ 1.4193, 43.5927 ], [ 1.4193, 43.5927 ], [ 1.4189, 43.5927 ], [ 1.4188, 43.5927 ], [ 1.4187, 43.5927 ], [ 1.4187, 43.5927 ], [ 1.4178, 43.5929 ], [ 1.4175, 43.5928 ], [ 1.4176, 43.5925 ], [ 1.4176, 43.5924 ], [ 1.4175, 43.5924 ], [ 1.4176, 43.5922 ], [ 1.4177, 43.5915 ], [ 1.4178, 43.5915 ], [ 1.4185, 43.5914 ], [ 1.4185, 43.5911 ], [ 1.4184, 43.591 ] ] ], "type": "Polygon" }, "id": "98", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031008", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Arènes" }, "type": "Feature" }, { "bbox": [ 2.3607, 43.502, 2.3691, 43.5087 ], "geometry": { "coordinates": [ [ [ 2.3622, 43.5087 ], [ 2.3624, 43.5085 ], [ 2.3627, 43.5087 ], [ 2.3634, 43.508 ], [ 2.3639, 43.5075 ], [ 2.364, 43.5073 ], [ 2.3643, 43.507 ], [ 2.3643, 43.5069 ], [ 2.3646, 43.5068 ], [ 2.3647, 43.5069 ], [ 2.3653, 43.5069 ], [ 2.3668, 43.5069 ], [ 2.3668, 43.5072 ], [ 2.3668, 43.5083 ], [ 2.3673, 43.5083 ], [ 2.3673, 43.508 ], [ 2.3672, 43.508 ], [ 2.3673, 43.5069 ], [ 2.3675, 43.507 ], [ 2.3676, 43.507 ], [ 2.3677, 43.5064 ], [ 2.3677, 43.5059 ], [ 2.3669, 43.5059 ], [ 2.3669, 43.5054 ], [ 2.3669, 43.5054 ], [ 2.3669, 43.5053 ], [ 2.367, 43.5052 ], [ 2.3671, 43.5048 ], [ 2.3672, 43.5042 ], [ 2.3673, 43.5041 ], [ 2.3673, 43.5041 ], [ 2.3674, 43.504 ], [ 2.3676, 43.504 ], [ 2.3677, 43.5041 ], [ 2.3678, 43.5044 ], [ 2.3679, 43.5045 ], [ 2.3681, 43.5045 ], [ 2.3682, 43.5044 ], [ 2.3682, 43.5044 ], [ 2.3681, 43.5043 ], [ 2.3681, 43.5042 ], [ 2.3681, 43.5042 ], [ 2.3681, 43.504 ], [ 2.3682, 43.5039 ], [ 2.3683, 43.5038 ], [ 2.3684, 43.5037 ], [ 2.3683, 43.5037 ], [ 2.3681, 43.5036 ], [ 2.3686, 43.5032 ], [ 2.3691, 43.5028 ], [ 2.3686, 43.502 ], [ 2.3673, 43.5035 ], [ 2.3672, 43.5036 ], [ 2.3669, 43.5039 ], [ 2.3668, 43.5042 ], [ 2.3667, 43.5045 ], [ 2.3667, 43.5044 ], [ 2.3665, 43.5043 ], [ 2.3663, 43.5044 ], [ 2.366, 43.5042 ], [ 2.366, 43.5042 ], [ 2.3662, 43.5039 ], [ 2.3668, 43.5034 ], [ 2.3668, 43.5033 ], [ 2.3666, 43.5031 ], [ 2.3665, 43.5031 ], [ 2.3662, 43.5031 ], [ 2.3647, 43.5033 ], [ 2.3647, 43.5033 ], [ 2.3639, 43.5035 ], [ 2.3637, 43.5036 ], [ 2.3637, 43.5036 ], [ 2.3636, 43.5034 ], [ 2.3634, 43.5034 ], [ 2.3634, 43.5034 ], [ 2.3631, 43.5034 ], [ 2.363, 43.5033 ], [ 2.3629, 43.5034 ], [ 2.3626, 43.5035 ], [ 2.3626, 43.5034 ], [ 2.3625, 43.5034 ], [ 2.3624, 43.5034 ], [ 2.3622, 43.5033 ], [ 2.3608, 43.5042 ], [ 2.361, 43.5045 ], [ 2.363, 43.5051 ], [ 2.3632, 43.5048 ], [ 2.3635, 43.5048 ], [ 2.3636, 43.5048 ], [ 2.3638, 43.5053 ], [ 2.3639, 43.5055 ], [ 2.3632, 43.5056 ], [ 2.3623, 43.506 ], [ 2.3623, 43.506 ], [ 2.3623, 43.506 ], [ 2.3623, 43.5061 ], [ 2.3624, 43.5064 ], [ 2.3613, 43.5066 ], [ 2.3613, 43.5066 ], [ 2.3611, 43.5067 ], [ 2.3611, 43.5068 ], [ 2.3613, 43.507 ], [ 2.3607, 43.5077 ], [ 2.3611, 43.5079 ], [ 2.3618, 43.5082 ], [ 2.3617, 43.5084 ], [ 2.3622, 43.5087 ] ] ], "type": "Polygon" }, "id": "99", "properties": { "code_commune": "81021", "code_departement": "81", "code_qp": "QP081001", "commune_qp": "Aussillon", "nom_commune": "Aussillon", "nom_qp": "La Falgalarié" }, "type": "Feature" }, { "bbox": [ 0.0774, 43.2212, 0.0918, 43.2328 ], "geometry": { "coordinates": [ [ [ 0.0818, 43.2324 ], [ 0.0818, 43.2323 ], [ 0.0816, 43.2321 ], [ 0.0816, 43.2319 ], [ 0.0816, 43.2318 ], [ 0.0822, 43.2317 ], [ 0.0822, 43.2316 ], [ 0.0823, 43.2314 ], [ 0.0825, 43.2315 ], [ 0.0826, 43.2315 ], [ 0.083, 43.2306 ], [ 0.0828, 43.2305 ], [ 0.083, 43.23 ], [ 0.0834, 43.2301 ], [ 0.0843, 43.2304 ], [ 0.0847, 43.2305 ], [ 0.085, 43.2306 ], [ 0.0852, 43.2306 ], [ 0.0868, 43.231 ], [ 0.087, 43.2313 ], [ 0.0873, 43.2316 ], [ 0.0874, 43.2319 ], [ 0.0874, 43.232 ], [ 0.0875, 43.2322 ], [ 0.0904, 43.2328 ], [ 0.0905, 43.2328 ], [ 0.0906, 43.2327 ], [ 0.0908, 43.2322 ], [ 0.0912, 43.2317 ], [ 0.0915, 43.2311 ], [ 0.0894, 43.2309 ], [ 0.0895, 43.2307 ], [ 0.0892, 43.2307 ], [ 0.0892, 43.2309 ], [ 0.0876, 43.2306 ], [ 0.0878, 43.2298 ], [ 0.088, 43.2295 ], [ 0.088, 43.2293 ], [ 0.088, 43.2292 ], [ 0.0881, 43.2287 ], [ 0.0883, 43.2285 ], [ 0.0885, 43.2284 ], [ 0.0886, 43.2283 ], [ 0.0888, 43.228 ], [ 0.0892, 43.2273 ], [ 0.0895, 43.2268 ], [ 0.0897, 43.2263 ], [ 0.0898, 43.2261 ], [ 0.0898, 43.226 ], [ 0.09, 43.2255 ], [ 0.0901, 43.2253 ], [ 0.0903, 43.2251 ], [ 0.0904, 43.2248 ], [ 0.0905, 43.2245 ], [ 0.0906, 43.2243 ], [ 0.0906, 43.2243 ], [ 0.0908, 43.2239 ], [ 0.0908, 43.2239 ], [ 0.0909, 43.2238 ], [ 0.0909, 43.2238 ], [ 0.0909, 43.2237 ], [ 0.091, 43.2236 ], [ 0.0911, 43.2236 ], [ 0.0911, 43.2234 ], [ 0.0912, 43.2231 ], [ 0.0911, 43.223 ], [ 0.0911, 43.223 ], [ 0.091, 43.2229 ], [ 0.091, 43.2228 ], [ 0.0911, 43.2227 ], [ 0.0911, 43.2227 ], [ 0.0912, 43.2227 ], [ 0.0914, 43.2226 ], [ 0.0915, 43.2224 ], [ 0.0917, 43.2219 ], [ 0.0918, 43.2216 ], [ 0.0918, 43.2214 ], [ 0.0918, 43.2212 ], [ 0.0915, 43.2213 ], [ 0.0915, 43.2213 ], [ 0.091, 43.2214 ], [ 0.091, 43.2215 ], [ 0.0909, 43.2217 ], [ 0.0907, 43.2223 ], [ 0.0905, 43.2227 ], [ 0.0905, 43.2228 ], [ 0.0904, 43.2233 ], [ 0.0902, 43.2235 ], [ 0.0902, 43.2235 ], [ 0.0902, 43.2235 ], [ 0.09, 43.2239 ], [ 0.0897, 43.2245 ], [ 0.0897, 43.2245 ], [ 0.0894, 43.2251 ], [ 0.0891, 43.2257 ], [ 0.0889, 43.2264 ], [ 0.0888, 43.2267 ], [ 0.0884, 43.2267 ], [ 0.088, 43.2266 ], [ 0.0879, 43.2272 ], [ 0.0879, 43.2275 ], [ 0.0879, 43.2275 ], [ 0.0875, 43.2276 ], [ 0.0872, 43.2276 ], [ 0.0872, 43.2277 ], [ 0.0869, 43.2279 ], [ 0.0868, 43.2281 ], [ 0.0867, 43.2281 ], [ 0.0866, 43.2281 ], [ 0.0851, 43.228 ], [ 0.0844, 43.2283 ], [ 0.0841, 43.2279 ], [ 0.084, 43.2279 ], [ 0.0835, 43.2278 ], [ 0.083, 43.2288 ], [ 0.0827, 43.2288 ], [ 0.0821, 43.2289 ], [ 0.0811, 43.2289 ], [ 0.0804, 43.2289 ], [ 0.0804, 43.2279 ], [ 0.0804, 43.2279 ], [ 0.0804, 43.2276 ], [ 0.0803, 43.2276 ], [ 0.0799, 43.2276 ], [ 0.0799, 43.2275 ], [ 0.0799, 43.2274 ], [ 0.0799, 43.227 ], [ 0.0799, 43.2264 ], [ 0.0799, 43.2262 ], [ 0.0799, 43.2258 ], [ 0.0798, 43.2256 ], [ 0.0798, 43.2255 ], [ 0.0797, 43.2255 ], [ 0.0797, 43.2254 ], [ 0.0798, 43.2253 ], [ 0.0799, 43.2253 ], [ 0.08, 43.2253 ], [ 0.0802, 43.2251 ], [ 0.0804, 43.2249 ], [ 0.0809, 43.2244 ], [ 0.0811, 43.2242 ], [ 0.0812, 43.2243 ], [ 0.0813, 43.2242 ], [ 0.0813, 43.224 ], [ 0.0815, 43.2239 ], [ 0.0816, 43.2238 ], [ 0.0814, 43.2237 ], [ 0.0815, 43.2235 ], [ 0.0813, 43.2234 ], [ 0.0811, 43.2234 ], [ 0.0811, 43.2232 ], [ 0.0812, 43.223 ], [ 0.0812, 43.2229 ], [ 0.0802, 43.2227 ], [ 0.0797, 43.2229 ], [ 0.0796, 43.223 ], [ 0.0795, 43.223 ], [ 0.0794, 43.2231 ], [ 0.0792, 43.2236 ], [ 0.0789, 43.2235 ], [ 0.0786, 43.2236 ], [ 0.0782, 43.2235 ], [ 0.0781, 43.2239 ], [ 0.0782, 43.2239 ], [ 0.078, 43.2243 ], [ 0.078, 43.2244 ], [ 0.078, 43.2244 ], [ 0.078, 43.2246 ], [ 0.0779, 43.2246 ], [ 0.078, 43.2246 ], [ 0.078, 43.2247 ], [ 0.0782, 43.2247 ], [ 0.0782, 43.2249 ], [ 0.0784, 43.2249 ], [ 0.0786, 43.2249 ], [ 0.0784, 43.2252 ], [ 0.0784, 43.2252 ], [ 0.0784, 43.2253 ], [ 0.0783, 43.2254 ], [ 0.0779, 43.2257 ], [ 0.0777, 43.2259 ], [ 0.0776, 43.2263 ], [ 0.0778, 43.2263 ], [ 0.0776, 43.227 ], [ 0.0775, 43.2278 ], [ 0.0775, 43.2278 ], [ 0.0774, 43.2284 ], [ 0.0775, 43.2284 ], [ 0.0779, 43.2284 ], [ 0.0784, 43.2285 ], [ 0.0785, 43.2285 ], [ 0.0793, 43.2289 ], [ 0.0795, 43.2289 ], [ 0.0794, 43.2291 ], [ 0.0793, 43.2293 ], [ 0.0788, 43.2302 ], [ 0.0795, 43.2303 ], [ 0.0806, 43.2305 ], [ 0.0818, 43.2307 ], [ 0.0816, 43.2308 ], [ 0.0815, 43.2309 ], [ 0.0811, 43.2311 ], [ 0.0811, 43.2311 ], [ 0.081, 43.2311 ], [ 0.0809, 43.2311 ], [ 0.0808, 43.2318 ], [ 0.0807, 43.2318 ], [ 0.0797, 43.2319 ], [ 0.0798, 43.2326 ], [ 0.0807, 43.2325 ], [ 0.0813, 43.2325 ], [ 0.0817, 43.2324 ], [ 0.0818, 43.2324 ] ] ], "type": "Polygon" }, "id": "100", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065003", "commune_qp": "Tarbes", "nom_commune": "Séméac, Tarbes", "nom_qp": "Tarbes Est" }, "type": "Feature" }, { "bbox": [ 1.3353, 43.5363, 1.3406, 43.5391 ], "geometry": { "coordinates": [ [ [ 1.3353, 43.5369 ], [ 1.3354, 43.537 ], [ 1.3363, 43.5379 ], [ 1.3361, 43.538 ], [ 1.336, 43.5381 ], [ 1.3365, 43.5386 ], [ 1.3366, 43.5387 ], [ 1.3367, 43.5388 ], [ 1.3371, 43.5391 ], [ 1.3374, 43.5391 ], [ 1.3374, 43.5391 ], [ 1.3376, 43.5391 ], [ 1.3376, 43.5391 ], [ 1.3376, 43.539 ], [ 1.3381, 43.5391 ], [ 1.3383, 43.5391 ], [ 1.3387, 43.5389 ], [ 1.3386, 43.5388 ], [ 1.3388, 43.5388 ], [ 1.3391, 43.5386 ], [ 1.3392, 43.5388 ], [ 1.3394, 43.5388 ], [ 1.3395, 43.5388 ], [ 1.3397, 43.5387 ], [ 1.34, 43.5385 ], [ 1.3403, 43.5384 ], [ 1.3406, 43.5382 ], [ 1.3403, 43.5381 ], [ 1.3391, 43.5375 ], [ 1.3366, 43.5363 ], [ 1.3355, 43.5369 ], [ 1.3354, 43.5369 ], [ 1.3353, 43.5369 ] ] ], "type": "Polygon" }, "id": "101", "properties": { "code_commune": "31157", "code_departement": "31", "code_qp": "QP031017", "commune_qp": "Cugnaux", "nom_commune": "Cugnaux", "nom_qp": "Vivier Maçon" }, "type": "Feature" }, { "bbox": [ 1.3134, 43.6043, 1.3237, 43.6067 ], "geometry": { "coordinates": [ [ [ 1.3236, 43.6052 ], [ 1.3233, 43.6051 ], [ 1.3231, 43.6051 ], [ 1.3226, 43.6051 ], [ 1.3214, 43.605 ], [ 1.3196, 43.6048 ], [ 1.3174, 43.6046 ], [ 1.3162, 43.6045 ], [ 1.3153, 43.6045 ], [ 1.3134, 43.6043 ], [ 1.3137, 43.6046 ], [ 1.314, 43.605 ], [ 1.3147, 43.6047 ], [ 1.3149, 43.6047 ], [ 1.315, 43.6047 ], [ 1.3151, 43.6047 ], [ 1.3154, 43.6047 ], [ 1.3156, 43.605 ], [ 1.3162, 43.6048 ], [ 1.3162, 43.605 ], [ 1.3161, 43.6057 ], [ 1.3161, 43.6059 ], [ 1.3161, 43.6061 ], [ 1.3162, 43.6062 ], [ 1.3168, 43.6063 ], [ 1.3195, 43.6065 ], [ 1.3212, 43.6066 ], [ 1.322, 43.6067 ], [ 1.3224, 43.6067 ], [ 1.3233, 43.6067 ], [ 1.3234, 43.6067 ], [ 1.3235, 43.6067 ], [ 1.3235, 43.6066 ], [ 1.3235, 43.6065 ], [ 1.3235, 43.6062 ], [ 1.3236, 43.6058 ], [ 1.3236, 43.6056 ], [ 1.3237, 43.6054 ], [ 1.3236, 43.6052 ] ] ], "type": "Polygon" }, "id": "102", "properties": { "code_commune": "31149", "code_departement": "31", "code_qp": "QP031016", "commune_qp": "Colomiers", "nom_commune": "Colomiers", "nom_qp": "En Jacca" }, "type": "Feature" }, { "bbox": [ 1.4387, 43.6182, 1.446, 43.6219 ], "geometry": { "coordinates": [ [ [ 1.4416, 43.6184 ], [ 1.4409, 43.6185 ], [ 1.441, 43.6196 ], [ 1.4411, 43.62 ], [ 1.4411, 43.6201 ], [ 1.4401, 43.6205 ], [ 1.4399, 43.62 ], [ 1.4394, 43.6201 ], [ 1.4394, 43.62 ], [ 1.4387, 43.6201 ], [ 1.4388, 43.6204 ], [ 1.4388, 43.6204 ], [ 1.439, 43.621 ], [ 1.4397, 43.6208 ], [ 1.4397, 43.6208 ], [ 1.4401, 43.6219 ], [ 1.4406, 43.6217 ], [ 1.4401, 43.6206 ], [ 1.4412, 43.6202 ], [ 1.4413, 43.6201 ], [ 1.4421, 43.62 ], [ 1.4437, 43.6195 ], [ 1.446, 43.6188 ], [ 1.446, 43.6188 ], [ 1.4458, 43.6187 ], [ 1.4456, 43.6187 ], [ 1.4453, 43.6186 ], [ 1.4451, 43.6185 ], [ 1.4447, 43.6184 ], [ 1.4447, 43.6184 ], [ 1.4428, 43.6188 ], [ 1.4427, 43.6186 ], [ 1.4425, 43.6182 ], [ 1.4423, 43.6182 ], [ 1.4416, 43.6184 ] ] ], "type": "Polygon" }, "id": "103", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031018", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Négreneys" }, "type": "Feature" }, { "bbox": [ 1.4672, 43.607, 1.4729, 43.6102 ], "geometry": { "coordinates": [ [ [ 1.4729, 43.6074 ], [ 1.4727, 43.6073 ], [ 1.4727, 43.6073 ], [ 1.4724, 43.6071 ], [ 1.4722, 43.607 ], [ 1.4712, 43.6072 ], [ 1.471, 43.6073 ], [ 1.4706, 43.6073 ], [ 1.4692, 43.6073 ], [ 1.4681, 43.6072 ], [ 1.4672, 43.6072 ], [ 1.4675, 43.6073 ], [ 1.4676, 43.6074 ], [ 1.4679, 43.6076 ], [ 1.4681, 43.6077 ], [ 1.4686, 43.6079 ], [ 1.4698, 43.6086 ], [ 1.4686, 43.6096 ], [ 1.4694, 43.6102 ], [ 1.4701, 43.6096 ], [ 1.4724, 43.6079 ], [ 1.4725, 43.6078 ], [ 1.4728, 43.6076 ], [ 1.4729, 43.6074 ] ] ], "type": "Polygon" }, "id": "104", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031019", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "La Gloire" }, "type": "Feature" } ], "type": "FeatureCollection" }, "hovertemplate": "%{hovertext}

Quartier Prioritaire=%{location}
Taux d'Activité des Femmes=%{customdata[0]}
Taux Total en Emploi Précaire=%{customdata[1]}
Taux d'Activité des Etrangers=%{z}", "hovertext": [ "Pradettes", "Grand Mirail", "Arènes", "Bourbaki", "Empalot", "Les Izards - La Vache", "Cépière Beauregard", "Saint Exupéry", "Soupetard", "Rangueil", "Négreneys", "La Gloire" ], "locations": [ "Pradettes", "Grand Mirail", "Arènes", "Bourbaki", "Empalot", "Les Izards - La Vache", "Cépière Beauregard", "Saint Exupéry", "Soupetard", "Rangueil", "Négreneys", "La Gloire" ], "name": "", "subplot": "mapbox", "type": "choroplethmapbox", "z": [ 39.5, 33.5, 34.1, 36.5, 37.4, 33.1, 45.3, null, 44.8, 24.2, 53.7, 54.2 ] } ], "layout": { "autosize": true, "coloraxis": { "colorbar": { "title": { "text": "Taux d'Activité des Etrangers" } }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ] }, "legend": { "tracegroupgap": 0 }, "mapbox": { "center": { "lat": 43.6, "lon": 1.433333 }, "domain": { "x": [ 0, 1 ], "y": [ 0, 1 ] }, "style": "carto-positron", "zoom": 11.5 }, "margin": { "b": 0, "l": 0, "r": 0, "t": 25 }, "template": { "data": { "bar": [ { "error_x": { "color": "#2a3f5f" }, "error_y": { "color": "#2a3f5f" }, "marker": { "line": { "color": "#E5ECF6", "width": 0.5 }, "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "bar" } ], "barpolar": [ { "marker": { "line": { "color": "#E5ECF6", "width": 0.5 }, "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "barpolar" } ], "carpet": [ { "aaxis": { "endlinecolor": "#2a3f5f", "gridcolor": "white", "linecolor": "white", "minorgridcolor": "white", "startlinecolor": "#2a3f5f" }, "baxis": { "endlinecolor": "#2a3f5f", "gridcolor": "white", "linecolor": "white", "minorgridcolor": "white", "startlinecolor": "#2a3f5f" }, "type": "carpet" } ], "choropleth": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "choropleth" } ], "contour": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "contour" } ], "contourcarpet": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "contourcarpet" } ], "heatmap": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "heatmap" } ], "heatmapgl": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "heatmapgl" } ], "histogram": [ { "marker": { "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "histogram" } ], "histogram2d": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "histogram2d" } ], "histogram2dcontour": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "histogram2dcontour" } ], "mesh3d": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "mesh3d" } ], "parcoords": [ { "line": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "parcoords" } ], "pie": [ { "automargin": true, "type": "pie" } ], "scatter": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatter" } ], "scatter3d": [ { "line": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatter3d" } ], "scattercarpet": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattercarpet" } ], "scattergeo": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattergeo" } ], "scattergl": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattergl" } ], "scattermapbox": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattermapbox" } ], "scatterpolar": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterpolar" } ], "scatterpolargl": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterpolargl" } ], "scatterternary": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterternary" } ], "surface": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "surface" } ], "table": [ { "cells": { "fill": { "color": "#EBF0F8" }, "line": { "color": "white" } }, "header": { "fill": { "color": "#C8D4E3" }, "line": { "color": "white" } }, "type": "table" } ] }, "layout": { "annotationdefaults": { "arrowcolor": "#2a3f5f", "arrowhead": 0, "arrowwidth": 1 }, "autotypenumbers": "strict", "coloraxis": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "colorscale": { "diverging": [ [ 0, "#8e0152" ], [ 0.1, "#c51b7d" ], [ 0.2, "#de77ae" ], [ 0.3, "#f1b6da" ], [ 0.4, "#fde0ef" ], [ 0.5, "#f7f7f7" ], [ 0.6, "#e6f5d0" ], [ 0.7, "#b8e186" ], [ 0.8, "#7fbc41" ], [ 0.9, "#4d9221" ], [ 1, "#276419" ] ], "sequential": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "sequentialminus": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ] }, "colorway": [ "#636efa", "#EF553B", "#00cc96", "#ab63fa", "#FFA15A", "#19d3f3", "#FF6692", "#B6E880", "#FF97FF", "#FECB52" ], "font": { "color": "#2a3f5f" }, "geo": { "bgcolor": "white", "lakecolor": "white", "landcolor": "#E5ECF6", "showlakes": true, "showland": true, "subunitcolor": "white" }, "hoverlabel": { "align": "left" }, "hovermode": "closest", "mapbox": { "style": "light" }, "paper_bgcolor": "white", "plot_bgcolor": "#E5ECF6", "polar": { "angularaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "bgcolor": "#E5ECF6", "radialaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" } }, "scene": { "xaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" }, "yaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" }, "zaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" } }, "shapedefaults": { "line": { "color": "#2a3f5f" } }, "ternary": { "aaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "baxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "bgcolor": "#E5ECF6", "caxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" } }, "title": { "x": 0.05 }, "xaxis": { "automargin": true, "gridcolor": "white", "linecolor": "white", "ticks": "", "title": { "standoff": 15 }, "zerolinecolor": "white", "zerolinewidth": 2 }, "yaxis": { "automargin": true, "gridcolor": "white", "linecolor": "white", "ticks": "", "title": { "standoff": 15 }, "zerolinecolor": "white", "zerolinewidth": 2 } } } } }, "image/png": "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", "text/html": [ "
" ] }, "metadata": {}, "output_type": "display_data" } ], "source": [ "tieks(df_toulouse, latitude=43.600000, longitude=1.433333, colored_var=\"tx_et_empl\")\n" ] }, { "cell_type": "code", "execution_count": 18, "id": "7b4dca3e", "metadata": {}, "outputs": [], "source": [ "df_castres = df[df[\"nom_commune\"]==\"Castres\"]\n" ] }, { "cell_type": "code", "execution_count": 19, "id": "1d151618", "metadata": {}, "outputs": [ { "data": { "application/vnd.plotly.v1+json": { "config": { "plotlyServerURL": "https://plot.ly" }, "data": [ { "coloraxis": "coloraxis", "customdata": [ [ 27.6, 31.4 ], [ 34.3, 36.3 ], [ 33.3, 26.9 ], [ 51, 27.7 ] ], "featureidkey": "properties.nom_qp", "geojson": { "bbox": [ -0.0437, 42.5983, 4.6525, 44.4672 ], "features": [ { "bbox": [ 2.8882, 42.7035, 2.9005, 42.7101 ], "geometry": { "coordinates": [ [ [ 2.9005, 42.7081 ], [ 2.9004, 42.7077 ], [ 2.9004, 42.7075 ], [ 2.9003, 42.7074 ], [ 2.9003, 42.7069 ], [ 2.9, 42.7069 ], [ 2.9001, 42.7067 ], [ 2.9002, 42.7065 ], [ 2.9002, 42.7064 ], [ 2.9002, 42.7063 ], [ 2.9002, 42.7062 ], [ 2.9001, 42.7062 ], [ 2.9001, 42.7061 ], [ 2.8994, 42.7059 ], [ 2.8979, 42.7055 ], [ 2.8976, 42.7054 ], [ 2.8972, 42.7053 ], [ 2.8964, 42.7051 ], [ 2.8961, 42.705 ], [ 2.8957, 42.7049 ], [ 2.8957, 42.7049 ], [ 2.8953, 42.7047 ], [ 2.8949, 42.7046 ], [ 2.8948, 42.7045 ], [ 2.8946, 42.7045 ], [ 2.8944, 42.7044 ], [ 2.8941, 42.7044 ], [ 2.8938, 42.7043 ], [ 2.8934, 42.7042 ], [ 2.8933, 42.7042 ], [ 2.8932, 42.7042 ], [ 2.8931, 42.7041 ], [ 2.8927, 42.7042 ], [ 2.8926, 42.7043 ], [ 2.8923, 42.7043 ], [ 2.8916, 42.7041 ], [ 2.8915, 42.7041 ], [ 2.8906, 42.7039 ], [ 2.8905, 42.7039 ], [ 2.8896, 42.7037 ], [ 2.8889, 42.7035 ], [ 2.8887, 42.7039 ], [ 2.8886, 42.7042 ], [ 2.8891, 42.7044 ], [ 2.8898, 42.7046 ], [ 2.8904, 42.7049 ], [ 2.8904, 42.705 ], [ 2.8905, 42.7049 ], [ 2.8907, 42.705 ], [ 2.8908, 42.705 ], [ 2.8914, 42.7053 ], [ 2.8916, 42.7053 ], [ 2.8914, 42.7056 ], [ 2.8912, 42.7056 ], [ 2.891, 42.7056 ], [ 2.8905, 42.7056 ], [ 2.8898, 42.7056 ], [ 2.8893, 42.7056 ], [ 2.8892, 42.7056 ], [ 2.889, 42.7057 ], [ 2.8888, 42.7059 ], [ 2.8887, 42.7059 ], [ 2.8887, 42.706 ], [ 2.8885, 42.706 ], [ 2.8884, 42.706 ], [ 2.8884, 42.706 ], [ 2.8883, 42.7061 ], [ 2.8882, 42.7064 ], [ 2.8887, 42.7065 ], [ 2.8888, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8893, 42.7062 ], [ 2.8893, 42.7061 ], [ 2.8893, 42.7061 ], [ 2.8905, 42.7062 ], [ 2.891, 42.7062 ], [ 2.8911, 42.7063 ], [ 2.8918, 42.7064 ], [ 2.8918, 42.7065 ], [ 2.892, 42.7065 ], [ 2.8925, 42.7066 ], [ 2.8925, 42.7067 ], [ 2.8926, 42.7067 ], [ 2.8928, 42.7069 ], [ 2.8932, 42.7072 ], [ 2.8931, 42.7073 ], [ 2.893, 42.7076 ], [ 2.8929, 42.7079 ], [ 2.8923, 42.7077 ], [ 2.892, 42.7077 ], [ 2.8919, 42.7077 ], [ 2.8919, 42.7077 ], [ 2.8918, 42.7077 ], [ 2.8918, 42.7077 ], [ 2.8916, 42.7077 ], [ 2.8916, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8914, 42.7076 ], [ 2.8913, 42.7075 ], [ 2.8912, 42.7078 ], [ 2.8911, 42.7081 ], [ 2.8911, 42.7082 ], [ 2.8909, 42.7086 ], [ 2.8907, 42.7092 ], [ 2.8906, 42.7093 ], [ 2.8906, 42.7095 ], [ 2.8905, 42.7096 ], [ 2.8908, 42.7096 ], [ 2.8909, 42.7096 ], [ 2.891, 42.7095 ], [ 2.8913, 42.7097 ], [ 2.8916, 42.7098 ], [ 2.8917, 42.7099 ], [ 2.8921, 42.71 ], [ 2.8921, 42.71 ], [ 2.8921, 42.7101 ], [ 2.8924, 42.7101 ], [ 2.8924, 42.71 ], [ 2.8924, 42.71 ], [ 2.8925, 42.7097 ], [ 2.8926, 42.7095 ], [ 2.8926, 42.7094 ], [ 2.8926, 42.7094 ], [ 2.8927, 42.7093 ], [ 2.8929, 42.7093 ], [ 2.893, 42.7094 ], [ 2.893, 42.7094 ], [ 2.893, 42.7094 ], [ 2.8933, 42.7088 ], [ 2.8936, 42.7082 ], [ 2.8938, 42.7081 ], [ 2.8937, 42.7081 ], [ 2.894, 42.7079 ], [ 2.894, 42.7079 ], [ 2.8946, 42.7083 ], [ 2.8946, 42.7083 ], [ 2.8948, 42.7083 ], [ 2.8952, 42.7084 ], [ 2.8955, 42.7084 ], [ 2.8958, 42.7085 ], [ 2.8958, 42.7085 ], [ 2.8959, 42.7084 ], [ 2.8964, 42.7082 ], [ 2.8967, 42.7081 ], [ 2.8965, 42.7078 ], [ 2.8965, 42.7078 ], [ 2.8963, 42.7076 ], [ 2.8962, 42.7075 ], [ 2.896, 42.7072 ], [ 2.8958, 42.707 ], [ 2.8957, 42.7068 ], [ 2.8959, 42.7068 ], [ 2.8959, 42.7068 ], [ 2.8957, 42.7066 ], [ 2.8957, 42.7065 ], [ 2.8958, 42.7065 ], [ 2.8962, 42.7063 ], [ 2.8963, 42.7063 ], [ 2.8964, 42.7062 ], [ 2.8965, 42.7062 ], [ 2.8967, 42.7062 ], [ 2.8968, 42.7063 ], [ 2.8968, 42.7063 ], [ 2.8969, 42.7066 ], [ 2.897, 42.7069 ], [ 2.8973, 42.7071 ], [ 2.8973, 42.7072 ], [ 2.8977, 42.7073 ], [ 2.898, 42.707 ], [ 2.899, 42.7074 ], [ 2.8992, 42.7075 ], [ 2.8992, 42.7075 ], [ 2.8992, 42.7076 ], [ 2.8995, 42.7077 ], [ 2.8995, 42.7077 ], [ 2.8999, 42.7079 ], [ 2.9005, 42.7081 ] ] ], "type": "Polygon" }, "id": "0", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066007", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Bas-Vernet Nouveau QPV" }, "type": "Feature" }, { "bbox": [ 4.0233, 44.2076, 4.0343, 44.2164 ], "geometry": { "coordinates": [ [ [ 4.0343, 44.2092 ], [ 4.0343, 44.2091 ], [ 4.0343, 44.209 ], [ 4.0342, 44.209 ], [ 4.0328, 44.2087 ], [ 4.0319, 44.2084 ], [ 4.0303, 44.208 ], [ 4.0298, 44.2079 ], [ 4.0294, 44.2077 ], [ 4.0288, 44.2076 ], [ 4.0285, 44.2076 ], [ 4.0282, 44.2076 ], [ 4.028, 44.2076 ], [ 4.0278, 44.2076 ], [ 4.0276, 44.2076 ], [ 4.0274, 44.2076 ], [ 4.027, 44.2077 ], [ 4.0267, 44.2078 ], [ 4.0265, 44.2079 ], [ 4.026, 44.2081 ], [ 4.0255, 44.2084 ], [ 4.0254, 44.2085 ], [ 4.0256, 44.2089 ], [ 4.0258, 44.2092 ], [ 4.0258, 44.2093 ], [ 4.0258, 44.2095 ], [ 4.0258, 44.2095 ], [ 4.0257, 44.2096 ], [ 4.0255, 44.2098 ], [ 4.0252, 44.21 ], [ 4.0251, 44.2102 ], [ 4.0245, 44.2103 ], [ 4.0247, 44.2105 ], [ 4.0247, 44.2105 ], [ 4.0246, 44.2106 ], [ 4.0245, 44.2106 ], [ 4.0243, 44.2107 ], [ 4.0245, 44.2108 ], [ 4.0245, 44.2108 ], [ 4.0249, 44.2111 ], [ 4.0249, 44.2111 ], [ 4.0251, 44.2114 ], [ 4.0248, 44.2115 ], [ 4.0245, 44.2117 ], [ 4.0242, 44.2119 ], [ 4.0238, 44.2122 ], [ 4.0237, 44.2123 ], [ 4.0233, 44.2126 ], [ 4.0239, 44.213 ], [ 4.0244, 44.2125 ], [ 4.0241, 44.2123 ], [ 4.024, 44.2123 ], [ 4.024, 44.2123 ], [ 4.0241, 44.2121 ], [ 4.0241, 44.2122 ], [ 4.0242, 44.2121 ], [ 4.0243, 44.212 ], [ 4.0244, 44.212 ], [ 4.0244, 44.212 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0246, 44.2118 ], [ 4.0246, 44.2118 ], [ 4.0246, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0248, 44.2118 ], [ 4.025, 44.2118 ], [ 4.0251, 44.2119 ], [ 4.0252, 44.212 ], [ 4.0252, 44.212 ], [ 4.0253, 44.212 ], [ 4.0253, 44.2119 ], [ 4.0254, 44.2119 ], [ 4.0255, 44.212 ], [ 4.0257, 44.2118 ], [ 4.0257, 44.2118 ], [ 4.0258, 44.2118 ], [ 4.0258, 44.2118 ], [ 4.0259, 44.2118 ], [ 4.026, 44.2119 ], [ 4.0261, 44.2119 ], [ 4.0262, 44.2119 ], [ 4.0262, 44.2119 ], [ 4.0263, 44.2118 ], [ 4.0264, 44.2118 ], [ 4.0265, 44.2118 ], [ 4.0266, 44.2118 ], [ 4.0267, 44.2118 ], [ 4.0269, 44.2118 ], [ 4.027, 44.2119 ], [ 4.0276, 44.212 ], [ 4.028, 44.2121 ], [ 4.0282, 44.2121 ], [ 4.0284, 44.2125 ], [ 4.0284, 44.2126 ], [ 4.0284, 44.2128 ], [ 4.0284, 44.2128 ], [ 4.0284, 44.2132 ], [ 4.0285, 44.2134 ], [ 4.0286, 44.2136 ], [ 4.0288, 44.2136 ], [ 4.0288, 44.2136 ], [ 4.0288, 44.2137 ], [ 4.0289, 44.2137 ], [ 4.029, 44.2139 ], [ 4.0291, 44.2141 ], [ 4.0292, 44.2142 ], [ 4.0292, 44.2142 ], [ 4.0291, 44.2143 ], [ 4.029, 44.2144 ], [ 4.029, 44.2144 ], [ 4.0289, 44.2145 ], [ 4.0289, 44.2146 ], [ 4.0286, 44.2146 ], [ 4.0281, 44.2147 ], [ 4.0278, 44.2147 ], [ 4.0278, 44.2148 ], [ 4.0278, 44.2148 ], [ 4.0278, 44.2151 ], [ 4.0278, 44.2153 ], [ 4.0278, 44.2154 ], [ 4.0276, 44.2154 ], [ 4.0276, 44.2156 ], [ 4.0273, 44.2156 ], [ 4.0273, 44.216 ], [ 4.0273, 44.216 ], [ 4.0275, 44.216 ], [ 4.0283, 44.216 ], [ 4.0283, 44.216 ], [ 4.0284, 44.216 ], [ 4.0284, 44.216 ], [ 4.0285, 44.2161 ], [ 4.0286, 44.2161 ], [ 4.0287, 44.2162 ], [ 4.0288, 44.2162 ], [ 4.0295, 44.2162 ], [ 4.0296, 44.2162 ], [ 4.0299, 44.2162 ], [ 4.0305, 44.216 ], [ 4.0306, 44.2159 ], [ 4.031, 44.2158 ], [ 4.0311, 44.2158 ], [ 4.0312, 44.216 ], [ 4.0312, 44.216 ], [ 4.0315, 44.2164 ], [ 4.0318, 44.2164 ], [ 4.0321, 44.2163 ], [ 4.0325, 44.2161 ], [ 4.0321, 44.2157 ], [ 4.0331, 44.2154 ], [ 4.0331, 44.2152 ], [ 4.0331, 44.2152 ], [ 4.033, 44.215 ], [ 4.033, 44.2146 ], [ 4.0329, 44.2144 ], [ 4.0336, 44.2145 ], [ 4.034, 44.2143 ], [ 4.0336, 44.2139 ], [ 4.0336, 44.2139 ], [ 4.0337, 44.2139 ], [ 4.0339, 44.2138 ], [ 4.0339, 44.2138 ], [ 4.034, 44.2135 ], [ 4.034, 44.2135 ], [ 4.0341, 44.2135 ], [ 4.0342, 44.2135 ], [ 4.0342, 44.2135 ], [ 4.0343, 44.2135 ], [ 4.0343, 44.2135 ], [ 4.0343, 44.2134 ], [ 4.0343, 44.2134 ], [ 4.0342, 44.2133 ], [ 4.034, 44.2131 ], [ 4.0339, 44.2131 ], [ 4.0339, 44.213 ], [ 4.0338, 44.2128 ], [ 4.0337, 44.2127 ], [ 4.0336, 44.2127 ], [ 4.0334, 44.2126 ], [ 4.0332, 44.2124 ], [ 4.0327, 44.2121 ], [ 4.0326, 44.212 ], [ 4.0325, 44.2119 ], [ 4.0323, 44.2119 ], [ 4.0316, 44.2114 ], [ 4.0315, 44.2113 ], [ 4.0315, 44.2112 ], [ 4.0314, 44.2109 ], [ 4.0317, 44.2109 ], [ 4.032, 44.2105 ], [ 4.0323, 44.2104 ], [ 4.0325, 44.2103 ], [ 4.033, 44.2101 ], [ 4.0331, 44.2101 ], [ 4.0333, 44.21 ], [ 4.0334, 44.2097 ], [ 4.0336, 44.2097 ], [ 4.0337, 44.2096 ], [ 4.0339, 44.2095 ], [ 4.0339, 44.2095 ], [ 4.0342, 44.2093 ], [ 4.0343, 44.2092 ] ] ], "type": "Polygon" }, "id": "1", "properties": { "code_commune": "30132", "code_departement": "30", "code_qp": "QP030016", "commune_qp": "La Grand-Combe", "nom_commune": "La Grand-Combe", "nom_qp": "Centre Ville - Arboux" }, "type": "Feature" }, { "bbox": [ 4.4296, 43.6741, 4.438, 43.6845 ], "geometry": { "coordinates": [ [ [ 4.438, 43.6827 ], [ 4.438, 43.6826 ], [ 4.438, 43.6826 ], [ 4.4376, 43.6824 ], [ 4.4375, 43.6823 ], [ 4.4374, 43.6823 ], [ 4.4373, 43.6823 ], [ 4.4371, 43.6819 ], [ 4.4367, 43.6817 ], [ 4.4362, 43.6815 ], [ 4.4353, 43.6813 ], [ 4.4351, 43.6809 ], [ 4.4351, 43.6804 ], [ 4.4353, 43.6801 ], [ 4.4363, 43.68 ], [ 4.4362, 43.6799 ], [ 4.4361, 43.6796 ], [ 4.436, 43.6794 ], [ 4.4359, 43.6794 ], [ 4.4359, 43.6793 ], [ 4.4359, 43.6792 ], [ 4.4358, 43.6791 ], [ 4.4358, 43.6791 ], [ 4.4356, 43.679 ], [ 4.4355, 43.679 ], [ 4.4353, 43.679 ], [ 4.4349, 43.679 ], [ 4.4343, 43.6791 ], [ 4.4341, 43.6791 ], [ 4.4336, 43.679 ], [ 4.4337, 43.6789 ], [ 4.4336, 43.6788 ], [ 4.4336, 43.6787 ], [ 4.4336, 43.6786 ], [ 4.4336, 43.6786 ], [ 4.4335, 43.6784 ], [ 4.4335, 43.6783 ], [ 4.4335, 43.6782 ], [ 4.4335, 43.6781 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6777 ], [ 4.4336, 43.6776 ], [ 4.4336, 43.6776 ], [ 4.4335, 43.6775 ], [ 4.4335, 43.6774 ], [ 4.4334, 43.6772 ], [ 4.4334, 43.6772 ], [ 4.4336, 43.6771 ], [ 4.4338, 43.6771 ], [ 4.4338, 43.677 ], [ 4.4337, 43.6766 ], [ 4.4336, 43.6765 ], [ 4.4336, 43.6763 ], [ 4.4336, 43.6761 ], [ 4.4336, 43.6761 ], [ 4.4333, 43.6757 ], [ 4.4332, 43.6756 ], [ 4.4326, 43.6752 ], [ 4.4324, 43.6751 ], [ 4.4325, 43.6748 ], [ 4.4325, 43.6748 ], [ 4.4324, 43.6747 ], [ 4.4324, 43.6746 ], [ 4.4325, 43.6746 ], [ 4.4325, 43.6744 ], [ 4.4324, 43.6743 ], [ 4.4324, 43.6742 ], [ 4.4324, 43.6741 ], [ 4.4322, 43.6743 ], [ 4.4317, 43.6748 ], [ 4.4312, 43.6752 ], [ 4.4309, 43.6755 ], [ 4.4306, 43.6759 ], [ 4.4304, 43.6761 ], [ 4.4299, 43.6765 ], [ 4.4298, 43.6766 ], [ 4.4297, 43.6768 ], [ 4.4297, 43.6771 ], [ 4.4296, 43.6772 ], [ 4.4296, 43.6779 ], [ 4.4298, 43.6779 ], [ 4.4299, 43.678 ], [ 4.4299, 43.678 ], [ 4.4299, 43.6781 ], [ 4.43, 43.6781 ], [ 4.4301, 43.6782 ], [ 4.4303, 43.6783 ], [ 4.4305, 43.6784 ], [ 4.4306, 43.6784 ], [ 4.4307, 43.6785 ], [ 4.4309, 43.6785 ], [ 4.4309, 43.6786 ], [ 4.431, 43.6786 ], [ 4.4311, 43.6788 ], [ 4.4311, 43.6788 ], [ 4.4312, 43.6788 ], [ 4.4312, 43.679 ], [ 4.4312, 43.679 ], [ 4.4314, 43.6791 ], [ 4.4318, 43.6791 ], [ 4.432, 43.6792 ], [ 4.4322, 43.6792 ], [ 4.4326, 43.6792 ], [ 4.4327, 43.6792 ], [ 4.4331, 43.6801 ], [ 4.4332, 43.6801 ], [ 4.4332, 43.6802 ], [ 4.4333, 43.6804 ], [ 4.4334, 43.6805 ], [ 4.4326, 43.6811 ], [ 4.433, 43.6812 ], [ 4.4327, 43.6813 ], [ 4.4326, 43.6814 ], [ 4.4325, 43.6815 ], [ 4.4325, 43.6815 ], [ 4.4322, 43.6816 ], [ 4.4321, 43.6815 ], [ 4.4319, 43.6815 ], [ 4.4318, 43.6816 ], [ 4.4318, 43.6816 ], [ 4.4318, 43.6816 ], [ 4.4319, 43.6817 ], [ 4.432, 43.6818 ], [ 4.4319, 43.6818 ], [ 4.4319, 43.6819 ], [ 4.4315, 43.6821 ], [ 4.4315, 43.6821 ], [ 4.4315, 43.6822 ], [ 4.4316, 43.6822 ], [ 4.4313, 43.6825 ], [ 4.4331, 43.6825 ], [ 4.4336, 43.6825 ], [ 4.4336, 43.6825 ], [ 4.4337, 43.6826 ], [ 4.4339, 43.6826 ], [ 4.4342, 43.6826 ], [ 4.4342, 43.6826 ], [ 4.4343, 43.6827 ], [ 4.4346, 43.6828 ], [ 4.4349, 43.6828 ], [ 4.4354, 43.6831 ], [ 4.4356, 43.6832 ], [ 4.4359, 43.6833 ], [ 4.4361, 43.6835 ], [ 4.4362, 43.6836 ], [ 4.4366, 43.6839 ], [ 4.4369, 43.6841 ], [ 4.4372, 43.6842 ], [ 4.4376, 43.6845 ], [ 4.4378, 43.6844 ], [ 4.4376, 43.6841 ], [ 4.4376, 43.6841 ], [ 4.4378, 43.684 ], [ 4.4379, 43.6839 ], [ 4.4379, 43.6835 ], [ 4.438, 43.6827 ] ] ], "type": "Polygon" }, "id": "2", "properties": { "code_commune": "30258", "code_departement": "30", "code_qp": "QP030009", "commune_qp": "Saint-Gilles", "nom_commune": "Saint-Gilles", "nom_qp": "Sabatot - Centre Ancien" }, "type": "Feature" }, { "bbox": [ 2.3637, 43.2054, 2.3794, 43.2191 ], "geometry": { "coordinates": [ [ [ 2.3743, 43.218 ], [ 2.3742, 43.2177 ], [ 2.3741, 43.2174 ], [ 2.3741, 43.2174 ], [ 2.374, 43.2175 ], [ 2.3738, 43.2173 ], [ 2.3732, 43.2176 ], [ 2.3725, 43.2179 ], [ 2.3723, 43.218 ], [ 2.3717, 43.2173 ], [ 2.3714, 43.2171 ], [ 2.3713, 43.2171 ], [ 2.3712, 43.217 ], [ 2.3708, 43.2165 ], [ 2.3704, 43.2162 ], [ 2.3702, 43.2163 ], [ 2.3702, 43.2163 ], [ 2.3699, 43.2165 ], [ 2.3693, 43.2156 ], [ 2.3697, 43.2155 ], [ 2.37, 43.2153 ], [ 2.3689, 43.2141 ], [ 2.3688, 43.214 ], [ 2.3693, 43.2138 ], [ 2.3697, 43.2136 ], [ 2.3702, 43.2133 ], [ 2.3705, 43.2132 ], [ 2.3709, 43.213 ], [ 2.3711, 43.2129 ], [ 2.3716, 43.213 ], [ 2.3721, 43.2131 ], [ 2.3736, 43.2144 ], [ 2.3753, 43.2136 ], [ 2.3778, 43.2125 ], [ 2.3782, 43.2123 ], [ 2.3788, 43.212 ], [ 2.379, 43.2118 ], [ 2.3789, 43.2116 ], [ 2.3794, 43.2114 ], [ 2.3792, 43.2112 ], [ 2.3792, 43.2111 ], [ 2.3792, 43.2105 ], [ 2.3791, 43.2099 ], [ 2.3788, 43.21 ], [ 2.3786, 43.2097 ], [ 2.3783, 43.2088 ], [ 2.3782, 43.2088 ], [ 2.3781, 43.2082 ], [ 2.3777, 43.2083 ], [ 2.3776, 43.2079 ], [ 2.3776, 43.2079 ], [ 2.3776, 43.2075 ], [ 2.3774, 43.2075 ], [ 2.3774, 43.2073 ], [ 2.3774, 43.2073 ], [ 2.3774, 43.2072 ], [ 2.3776, 43.2072 ], [ 2.3775, 43.2069 ], [ 2.3775, 43.2068 ], [ 2.3783, 43.2068 ], [ 2.3783, 43.2068 ], [ 2.3786, 43.2068 ], [ 2.3787, 43.2067 ], [ 2.3788, 43.2062 ], [ 2.379, 43.2055 ], [ 2.3786, 43.2055 ], [ 2.3784, 43.2055 ], [ 2.3764, 43.2057 ], [ 2.3757, 43.2058 ], [ 2.3752, 43.2057 ], [ 2.3747, 43.2057 ], [ 2.3739, 43.2056 ], [ 2.373, 43.2054 ], [ 2.3728, 43.2054 ], [ 2.3724, 43.2061 ], [ 2.3723, 43.2064 ], [ 2.372, 43.2071 ], [ 2.3727, 43.207 ], [ 2.3734, 43.2069 ], [ 2.374, 43.2068 ], [ 2.3744, 43.2067 ], [ 2.3745, 43.2067 ], [ 2.3749, 43.2065 ], [ 2.3751, 43.2073 ], [ 2.3758, 43.2072 ], [ 2.3758, 43.2072 ], [ 2.3763, 43.2071 ], [ 2.3765, 43.2071 ], [ 2.3769, 43.207 ], [ 2.3768, 43.2072 ], [ 2.3769, 43.2075 ], [ 2.3767, 43.2076 ], [ 2.3768, 43.2082 ], [ 2.377, 43.2082 ], [ 2.377, 43.2087 ], [ 2.377, 43.2088 ], [ 2.3778, 43.2088 ], [ 2.3781, 43.2095 ], [ 2.378, 43.2096 ], [ 2.3782, 43.2098 ], [ 2.3781, 43.2098 ], [ 2.3784, 43.2102 ], [ 2.3776, 43.2105 ], [ 2.3773, 43.2106 ], [ 2.3768, 43.2108 ], [ 2.3757, 43.2112 ], [ 2.3721, 43.2126 ], [ 2.3718, 43.2126 ], [ 2.3717, 43.2126 ], [ 2.3713, 43.2124 ], [ 2.3712, 43.2124 ], [ 2.3717, 43.212 ], [ 2.3711, 43.2114 ], [ 2.3711, 43.2114 ], [ 2.3709, 43.2112 ], [ 2.3709, 43.2112 ], [ 2.3706, 43.211 ], [ 2.3701, 43.2113 ], [ 2.3701, 43.2113 ], [ 2.37, 43.2113 ], [ 2.3692, 43.2117 ], [ 2.3691, 43.2117 ], [ 2.3693, 43.2119 ], [ 2.3694, 43.212 ], [ 2.3691, 43.2121 ], [ 2.3686, 43.2123 ], [ 2.3685, 43.2124 ], [ 2.3685, 43.2124 ], [ 2.3683, 43.2123 ], [ 2.3683, 43.2123 ], [ 2.3683, 43.2123 ], [ 2.3681, 43.2123 ], [ 2.3678, 43.2124 ], [ 2.3676, 43.2124 ], [ 2.3669, 43.2126 ], [ 2.3668, 43.2126 ], [ 2.3664, 43.2127 ], [ 2.3666, 43.2131 ], [ 2.3667, 43.2133 ], [ 2.3662, 43.2136 ], [ 2.3661, 43.2136 ], [ 2.3665, 43.2144 ], [ 2.3665, 43.2145 ], [ 2.3666, 43.2147 ], [ 2.3668, 43.2149 ], [ 2.3664, 43.215 ], [ 2.3654, 43.2152 ], [ 2.3654, 43.2155 ], [ 2.3653, 43.2156 ], [ 2.3651, 43.2157 ], [ 2.365, 43.2157 ], [ 2.3646, 43.2158 ], [ 2.3645, 43.2158 ], [ 2.3645, 43.2158 ], [ 2.3644, 43.2158 ], [ 2.3644, 43.2159 ], [ 2.3644, 43.2159 ], [ 2.3644, 43.216 ], [ 2.3644, 43.2161 ], [ 2.3637, 43.2161 ], [ 2.3638, 43.2162 ], [ 2.3639, 43.2167 ], [ 2.3642, 43.2165 ], [ 2.3646, 43.2164 ], [ 2.3647, 43.2163 ], [ 2.3652, 43.2162 ], [ 2.3654, 43.2164 ], [ 2.3656, 43.2165 ], [ 2.3659, 43.2163 ], [ 2.3661, 43.2164 ], [ 2.3663, 43.2164 ], [ 2.3669, 43.2161 ], [ 2.3672, 43.2168 ], [ 2.3675, 43.2175 ], [ 2.3676, 43.2177 ], [ 2.3676, 43.2178 ], [ 2.368, 43.2184 ], [ 2.3681, 43.2185 ], [ 2.3679, 43.2188 ], [ 2.3678, 43.2188 ], [ 2.368, 43.2188 ], [ 2.3683, 43.2189 ], [ 2.3688, 43.2189 ], [ 2.3697, 43.2189 ], [ 2.3701, 43.219 ], [ 2.3709, 43.219 ], [ 2.3713, 43.219 ], [ 2.3719, 43.2191 ], [ 2.3722, 43.2191 ], [ 2.3722, 43.219 ], [ 2.3725, 43.2188 ], [ 2.3735, 43.2184 ], [ 2.3743, 43.218 ] ] ], "type": "Polygon" }, "id": "3", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011002", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "La Conte - Ozanam" }, "type": "Feature" }, { "bbox": [ 4.2702, 43.6938, 4.2823, 43.701 ], "geometry": { "coordinates": [ [ [ 4.2819, 43.7001 ], [ 4.2818, 43.7 ], [ 4.2818, 43.6999 ], [ 4.2817, 43.6999 ], [ 4.2817, 43.6998 ], [ 4.2818, 43.6996 ], [ 4.2818, 43.6996 ], [ 4.2818, 43.6996 ], [ 4.2819, 43.6995 ], [ 4.2823, 43.6994 ], [ 4.2822, 43.6994 ], [ 4.2821, 43.6993 ], [ 4.282, 43.6993 ], [ 4.2815, 43.6992 ], [ 4.2818, 43.6986 ], [ 4.2815, 43.6985 ], [ 4.2813, 43.6985 ], [ 4.2813, 43.6984 ], [ 4.2817, 43.6974 ], [ 4.2817, 43.6974 ], [ 4.281, 43.6972 ], [ 4.2808, 43.6972 ], [ 4.2806, 43.6971 ], [ 4.2804, 43.6971 ], [ 4.2802, 43.697 ], [ 4.28, 43.697 ], [ 4.2793, 43.6971 ], [ 4.2786, 43.6972 ], [ 4.2785, 43.6974 ], [ 4.2785, 43.6975 ], [ 4.2783, 43.6974 ], [ 4.2782, 43.6974 ], [ 4.2782, 43.6974 ], [ 4.2782, 43.6972 ], [ 4.2782, 43.6971 ], [ 4.2782, 43.6969 ], [ 4.2782, 43.6969 ], [ 4.2782, 43.6968 ], [ 4.2772, 43.6966 ], [ 4.2771, 43.6968 ], [ 4.2769, 43.6973 ], [ 4.2759, 43.6971 ], [ 4.2758, 43.6971 ], [ 4.2759, 43.6969 ], [ 4.2759, 43.6968 ], [ 4.2756, 43.6967 ], [ 4.2757, 43.6964 ], [ 4.2758, 43.6963 ], [ 4.2752, 43.6962 ], [ 4.2753, 43.6961 ], [ 4.2754, 43.696 ], [ 4.2748, 43.6958 ], [ 4.2745, 43.6963 ], [ 4.2742, 43.6967 ], [ 4.2741, 43.697 ], [ 4.274, 43.6971 ], [ 4.2739, 43.697 ], [ 4.2737, 43.697 ], [ 4.2734, 43.6969 ], [ 4.2735, 43.6966 ], [ 4.2736, 43.6965 ], [ 4.2737, 43.6964 ], [ 4.2739, 43.696 ], [ 4.2738, 43.696 ], [ 4.2739, 43.6959 ], [ 4.2737, 43.6956 ], [ 4.2738, 43.6956 ], [ 4.2734, 43.695 ], [ 4.273, 43.6951 ], [ 4.2728, 43.6947 ], [ 4.2731, 43.6946 ], [ 4.273, 43.6946 ], [ 4.2729, 43.6943 ], [ 4.2731, 43.6942 ], [ 4.2729, 43.6938 ], [ 4.2722, 43.6941 ], [ 4.2721, 43.6942 ], [ 4.2707, 43.6947 ], [ 4.2702, 43.695 ], [ 4.2703, 43.6953 ], [ 4.2702, 43.6953 ], [ 4.2705, 43.696 ], [ 4.2705, 43.6961 ], [ 4.2707, 43.6965 ], [ 4.271, 43.697 ], [ 4.2711, 43.6974 ], [ 4.2715, 43.6975 ], [ 4.2716, 43.6976 ], [ 4.272, 43.6976 ], [ 4.2725, 43.6977 ], [ 4.2726, 43.6977 ], [ 4.2728, 43.6978 ], [ 4.2729, 43.6978 ], [ 4.2732, 43.6979 ], [ 4.2733, 43.698 ], [ 4.2733, 43.698 ], [ 4.2734, 43.698 ], [ 4.2734, 43.698 ], [ 4.2735, 43.698 ], [ 4.2735, 43.698 ], [ 4.2737, 43.6976 ], [ 4.2753, 43.6981 ], [ 4.2755, 43.6982 ], [ 4.2765, 43.6985 ], [ 4.2763, 43.6988 ], [ 4.2763, 43.6989 ], [ 4.2763, 43.699 ], [ 4.2772, 43.6992 ], [ 4.2772, 43.6993 ], [ 4.2775, 43.6993 ], [ 4.2775, 43.6994 ], [ 4.2775, 43.6994 ], [ 4.2775, 43.6995 ], [ 4.2777, 43.6995 ], [ 4.278, 43.6996 ], [ 4.2783, 43.6996 ], [ 4.2783, 43.6997 ], [ 4.2797, 43.7 ], [ 4.2798, 43.7001 ], [ 4.2798, 43.7001 ], [ 4.2798, 43.7001 ], [ 4.2797, 43.7004 ], [ 4.2802, 43.7005 ], [ 4.2803, 43.7005 ], [ 4.2805, 43.7007 ], [ 4.2809, 43.7009 ], [ 4.2811, 43.701 ], [ 4.2811, 43.701 ], [ 4.2812, 43.701 ], [ 4.2814, 43.701 ], [ 4.2817, 43.7009 ], [ 4.2818, 43.7009 ], [ 4.2818, 43.7007 ], [ 4.2818, 43.7006 ], [ 4.2818, 43.7006 ], [ 4.2819, 43.7004 ], [ 4.282, 43.7003 ], [ 4.282, 43.7001 ], [ 4.2819, 43.7001 ] ] ], "type": "Polygon" }, "id": "4", "properties": { "code_commune": "30341", "code_departement": "30", "code_qp": "QP030015", "commune_qp": "Vauvert", "nom_commune": "Vauvert", "nom_qp": "Les Costières" }, "type": "Feature" }, { "bbox": [ 3.6599, 43.4106, 3.667, 43.4154 ], "geometry": { "coordinates": [ [ [ 3.667, 43.4154 ], [ 3.667, 43.4145 ], [ 3.667, 43.4143 ], [ 3.6669, 43.4141 ], [ 3.6668, 43.4139 ], [ 3.6665, 43.4137 ], [ 3.666, 43.4133 ], [ 3.6653, 43.4128 ], [ 3.6652, 43.4127 ], [ 3.6653, 43.4126 ], [ 3.6654, 43.4124 ], [ 3.6653, 43.4122 ], [ 3.6653, 43.4121 ], [ 3.6653, 43.412 ], [ 3.6644, 43.4114 ], [ 3.6638, 43.4118 ], [ 3.6635, 43.4115 ], [ 3.664, 43.4111 ], [ 3.6637, 43.4109 ], [ 3.6631, 43.4113 ], [ 3.6623, 43.4106 ], [ 3.6619, 43.4109 ], [ 3.6613, 43.4114 ], [ 3.6606, 43.4119 ], [ 3.6606, 43.4119 ], [ 3.6602, 43.4121 ], [ 3.6601, 43.4121 ], [ 3.66, 43.4121 ], [ 3.66, 43.4122 ], [ 3.6599, 43.4124 ], [ 3.6599, 43.4125 ], [ 3.6608, 43.4131 ], [ 3.661, 43.4132 ], [ 3.6623, 43.4141 ], [ 3.6624, 43.4141 ], [ 3.6625, 43.4142 ], [ 3.6626, 43.4142 ], [ 3.6627, 43.4143 ], [ 3.6628, 43.4145 ], [ 3.6632, 43.4144 ], [ 3.6635, 43.4142 ], [ 3.6636, 43.4142 ], [ 3.6637, 43.4143 ], [ 3.6642, 43.4146 ], [ 3.6644, 43.4145 ], [ 3.6648, 43.4143 ], [ 3.665, 43.4144 ], [ 3.6652, 43.4142 ], [ 3.6669, 43.4154 ], [ 3.667, 43.4154 ], [ 3.667, 43.4154 ] ] ], "type": "Polygon" }, "id": "5", "properties": { "code_commune": "34301", "code_departement": "34", "code_qp": "QP034017", "commune_qp": "Sète", "nom_commune": "Sète", "nom_qp": "Ile De Thau" }, "type": "Feature" }, { "bbox": [ 2.8805, 42.7129, 2.902, 42.7278 ], "geometry": { "coordinates": [ [ [ 2.902, 42.7151 ], [ 2.902, 42.7149 ], [ 2.902, 42.7148 ], [ 2.9019, 42.7146 ], [ 2.9019, 42.7145 ], [ 2.9018, 42.7144 ], [ 2.9018, 42.7143 ], [ 2.9016, 42.7141 ], [ 2.9016, 42.7139 ], [ 2.9014, 42.7137 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9012, 42.7135 ], [ 2.9011, 42.7134 ], [ 2.9009, 42.7133 ], [ 2.9008, 42.7132 ], [ 2.9006, 42.713 ], [ 2.9005, 42.713 ], [ 2.9005, 42.7129 ], [ 2.9005, 42.7129 ], [ 2.9004, 42.713 ], [ 2.9002, 42.7131 ], [ 2.8998, 42.7135 ], [ 2.8993, 42.714 ], [ 2.8993, 42.714 ], [ 2.8991, 42.7144 ], [ 2.8987, 42.7143 ], [ 2.8984, 42.7142 ], [ 2.8983, 42.7142 ], [ 2.898, 42.7141 ], [ 2.8978, 42.714 ], [ 2.8974, 42.7139 ], [ 2.8972, 42.7139 ], [ 2.897, 42.7138 ], [ 2.8967, 42.7138 ], [ 2.8966, 42.7138 ], [ 2.8965, 42.7137 ], [ 2.8963, 42.7137 ], [ 2.8961, 42.7137 ], [ 2.8959, 42.7137 ], [ 2.8958, 42.7138 ], [ 2.8958, 42.7139 ], [ 2.8958, 42.714 ], [ 2.8957, 42.7142 ], [ 2.8957, 42.7145 ], [ 2.8956, 42.7146 ], [ 2.8956, 42.715 ], [ 2.8955, 42.7153 ], [ 2.8955, 42.7155 ], [ 2.8955, 42.7157 ], [ 2.8955, 42.7159 ], [ 2.8956, 42.7162 ], [ 2.8956, 42.7164 ], [ 2.8957, 42.7165 ], [ 2.8957, 42.7167 ], [ 2.8953, 42.7167 ], [ 2.8951, 42.7168 ], [ 2.8948, 42.7169 ], [ 2.8946, 42.7168 ], [ 2.8943, 42.7168 ], [ 2.8939, 42.7169 ], [ 2.8934, 42.7171 ], [ 2.8931, 42.7172 ], [ 2.8927, 42.7173 ], [ 2.8924, 42.7174 ], [ 2.8918, 42.7174 ], [ 2.8913, 42.7175 ], [ 2.8909, 42.7175 ], [ 2.8908, 42.7174 ], [ 2.8909, 42.7173 ], [ 2.8908, 42.7173 ], [ 2.8908, 42.7173 ], [ 2.8906, 42.7173 ], [ 2.8902, 42.7174 ], [ 2.8893, 42.7175 ], [ 2.8881, 42.7176 ], [ 2.8881, 42.7178 ], [ 2.8881, 42.718 ], [ 2.888, 42.7182 ], [ 2.8881, 42.7183 ], [ 2.8882, 42.7184 ], [ 2.8882, 42.7185 ], [ 2.8882, 42.7185 ], [ 2.8882, 42.7186 ], [ 2.8883, 42.7188 ], [ 2.8882, 42.7188 ], [ 2.8882, 42.7189 ], [ 2.8882, 42.7189 ], [ 2.8881, 42.719 ], [ 2.888, 42.7198 ], [ 2.8875, 42.7198 ], [ 2.8874, 42.7198 ], [ 2.8873, 42.7198 ], [ 2.8873, 42.7198 ], [ 2.8872, 42.7199 ], [ 2.8868, 42.7198 ], [ 2.8865, 42.7197 ], [ 2.8863, 42.7204 ], [ 2.8861, 42.7208 ], [ 2.886, 42.7208 ], [ 2.8858, 42.7208 ], [ 2.8857, 42.7208 ], [ 2.8857, 42.7208 ], [ 2.8856, 42.7207 ], [ 2.8853, 42.7205 ], [ 2.8852, 42.7206 ], [ 2.8849, 42.7209 ], [ 2.8848, 42.721 ], [ 2.8842, 42.721 ], [ 2.8843, 42.721 ], [ 2.8842, 42.721 ], [ 2.8836, 42.7212 ], [ 2.8834, 42.7213 ], [ 2.8831, 42.7213 ], [ 2.8834, 42.7213 ], [ 2.8835, 42.7213 ], [ 2.8837, 42.7214 ], [ 2.8837, 42.7215 ], [ 2.8836, 42.7219 ], [ 2.8835, 42.7219 ], [ 2.8835, 42.7221 ], [ 2.8834, 42.7222 ], [ 2.8834, 42.7224 ], [ 2.8827, 42.7224 ], [ 2.8825, 42.7224 ], [ 2.8823, 42.7224 ], [ 2.8818, 42.7224 ], [ 2.8817, 42.7224 ], [ 2.8815, 42.7224 ], [ 2.8811, 42.7224 ], [ 2.8811, 42.7227 ], [ 2.8811, 42.7229 ], [ 2.8811, 42.7231 ], [ 2.8811, 42.7231 ], [ 2.881, 42.7231 ], [ 2.881, 42.7233 ], [ 2.8809, 42.7234 ], [ 2.8811, 42.7234 ], [ 2.881, 42.7237 ], [ 2.8811, 42.7237 ], [ 2.8813, 42.7237 ], [ 2.8814, 42.7237 ], [ 2.8813, 42.7238 ], [ 2.8813, 42.724 ], [ 2.8815, 42.724 ], [ 2.8813, 42.7245 ], [ 2.8812, 42.7246 ], [ 2.8819, 42.7247 ], [ 2.8816, 42.725 ], [ 2.881, 42.7255 ], [ 2.8806, 42.7258 ], [ 2.8807, 42.7259 ], [ 2.8807, 42.7259 ], [ 2.8806, 42.726 ], [ 2.8806, 42.7261 ], [ 2.8805, 42.7261 ], [ 2.8805, 42.7262 ], [ 2.8805, 42.7262 ], [ 2.8805, 42.7263 ], [ 2.8806, 42.7264 ], [ 2.8806, 42.7265 ], [ 2.8806, 42.7266 ], [ 2.8806, 42.7267 ], [ 2.8807, 42.727 ], [ 2.8807, 42.7273 ], [ 2.8813, 42.7272 ], [ 2.8814, 42.7272 ], [ 2.8817, 42.7272 ], [ 2.8818, 42.7272 ], [ 2.8822, 42.7271 ], [ 2.8823, 42.7271 ], [ 2.8825, 42.727 ], [ 2.8827, 42.727 ], [ 2.8827, 42.727 ], [ 2.8829, 42.7271 ], [ 2.883, 42.727 ], [ 2.8831, 42.7271 ], [ 2.8836, 42.7274 ], [ 2.8836, 42.7274 ], [ 2.8838, 42.7275 ], [ 2.8841, 42.7277 ], [ 2.8842, 42.7277 ], [ 2.8844, 42.7277 ], [ 2.8849, 42.7278 ], [ 2.885, 42.7278 ], [ 2.8851, 42.7278 ], [ 2.8854, 42.7277 ], [ 2.8854, 42.7276 ], [ 2.8854, 42.7275 ], [ 2.8854, 42.7269 ], [ 2.8861, 42.7268 ], [ 2.8859, 42.7267 ], [ 2.8858, 42.7266 ], [ 2.8859, 42.7264 ], [ 2.886, 42.7261 ], [ 2.886, 42.7261 ], [ 2.8861, 42.7261 ], [ 2.886, 42.7259 ], [ 2.886, 42.7258 ], [ 2.886, 42.7258 ], [ 2.886, 42.7258 ], [ 2.8859, 42.7257 ], [ 2.8858, 42.7254 ], [ 2.8858, 42.7252 ], [ 2.8858, 42.7252 ], [ 2.8857, 42.7249 ], [ 2.8857, 42.7247 ], [ 2.8856, 42.7244 ], [ 2.8856, 42.7242 ], [ 2.8855, 42.7241 ], [ 2.8855, 42.7241 ], [ 2.8853, 42.7242 ], [ 2.8849, 42.7242 ], [ 2.8841, 42.7243 ], [ 2.884, 42.7243 ], [ 2.884, 42.7243 ], [ 2.8838, 42.7231 ], [ 2.8837, 42.723 ], [ 2.884, 42.7228 ], [ 2.8843, 42.7225 ], [ 2.8848, 42.7221 ], [ 2.885, 42.7219 ], [ 2.8851, 42.7219 ], [ 2.8853, 42.722 ], [ 2.8853, 42.722 ], [ 2.8854, 42.722 ], [ 2.8855, 42.7221 ], [ 2.8855, 42.7221 ], [ 2.8856, 42.7221 ], [ 2.8856, 42.7221 ], [ 2.8857, 42.7222 ], [ 2.8858, 42.7222 ], [ 2.886, 42.7222 ], [ 2.8861, 42.7222 ], [ 2.8862, 42.7222 ], [ 2.8863, 42.7223 ], [ 2.8866, 42.7222 ], [ 2.8866, 42.7222 ], [ 2.8869, 42.7222 ], [ 2.8871, 42.7223 ], [ 2.8871, 42.7224 ], [ 2.8875, 42.7224 ], [ 2.8877, 42.7224 ], [ 2.888, 42.7224 ], [ 2.8883, 42.7225 ], [ 2.8883, 42.7223 ], [ 2.8884, 42.7222 ], [ 2.8885, 42.722 ], [ 2.8886, 42.7219 ], [ 2.8888, 42.7216 ], [ 2.8888, 42.7216 ], [ 2.8886, 42.7215 ], [ 2.8885, 42.7214 ], [ 2.8883, 42.7214 ], [ 2.8882, 42.7213 ], [ 2.8879, 42.7212 ], [ 2.8879, 42.7211 ], [ 2.8881, 42.721 ], [ 2.8882, 42.7209 ], [ 2.8883, 42.7209 ], [ 2.8885, 42.7209 ], [ 2.8888, 42.7208 ], [ 2.889, 42.7208 ], [ 2.8891, 42.7208 ], [ 2.8892, 42.7207 ], [ 2.8892, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8895, 42.7207 ], [ 2.8895, 42.7206 ], [ 2.8897, 42.7205 ], [ 2.8897, 42.7204 ], [ 2.8898, 42.7204 ], [ 2.89, 42.7204 ], [ 2.8901, 42.7203 ], [ 2.8904, 42.7202 ], [ 2.8907, 42.7201 ], [ 2.8909, 42.7201 ], [ 2.891, 42.7201 ], [ 2.8911, 42.7201 ], [ 2.8911, 42.72 ], [ 2.8912, 42.72 ], [ 2.8913, 42.72 ], [ 2.8918, 42.7198 ], [ 2.8919, 42.7197 ], [ 2.8923, 42.7196 ], [ 2.8923, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8925, 42.7196 ], [ 2.8928, 42.7194 ], [ 2.893, 42.7192 ], [ 2.8924, 42.7189 ], [ 2.8924, 42.7188 ], [ 2.8923, 42.7188 ], [ 2.8922, 42.7188 ], [ 2.892, 42.7188 ], [ 2.8918, 42.7188 ], [ 2.8918, 42.7187 ], [ 2.8917, 42.7184 ], [ 2.8918, 42.7184 ], [ 2.8921, 42.7183 ], [ 2.8925, 42.7182 ], [ 2.8933, 42.7181 ], [ 2.8933, 42.7182 ], [ 2.8942, 42.7184 ], [ 2.8953, 42.7186 ], [ 2.8953, 42.7184 ], [ 2.8955, 42.718 ], [ 2.8956, 42.7176 ], [ 2.8956, 42.7176 ], [ 2.8956, 42.7173 ], [ 2.8956, 42.7173 ], [ 2.8957, 42.7173 ], [ 2.8959, 42.7174 ], [ 2.8961, 42.7174 ], [ 2.8963, 42.7175 ], [ 2.8967, 42.7176 ], [ 2.8972, 42.7177 ], [ 2.8975, 42.7178 ], [ 2.8978, 42.7178 ], [ 2.898, 42.7179 ], [ 2.8984, 42.7179 ], [ 2.8987, 42.718 ], [ 2.8988, 42.7175 ], [ 2.8993, 42.7177 ], [ 2.8995, 42.7174 ], [ 2.8997, 42.7172 ], [ 2.9, 42.7169 ], [ 2.9001, 42.7168 ], [ 2.9002, 42.7167 ], [ 2.9003, 42.7166 ], [ 2.9011, 42.7167 ], [ 2.9011, 42.7165 ], [ 2.901, 42.7165 ], [ 2.9011, 42.7164 ], [ 2.9011, 42.7162 ], [ 2.9011, 42.716 ], [ 2.901, 42.7159 ], [ 2.9007, 42.7156 ], [ 2.9004, 42.7153 ], [ 2.9005, 42.7151 ], [ 2.9006, 42.7152 ], [ 2.9008, 42.7153 ], [ 2.9011, 42.7154 ], [ 2.9015, 42.7153 ], [ 2.9016, 42.7153 ], [ 2.9018, 42.7152 ], [ 2.902, 42.7152 ], [ 2.902, 42.7151 ] ] ], "type": "Polygon" }, "id": "6", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066005", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Diagonale Du Haut - Moyen-Vernet" }, "type": "Feature" }, { "bbox": [ 2.8756, 42.6876, 2.8837, 42.7006 ], "geometry": { "coordinates": [ [ [ 2.8837, 42.6899 ], [ 2.8836, 42.6899 ], [ 2.8831, 42.6897 ], [ 2.8827, 42.6896 ], [ 2.8826, 42.6896 ], [ 2.8825, 42.6895 ], [ 2.8824, 42.6896 ], [ 2.8818, 42.6896 ], [ 2.8816, 42.6895 ], [ 2.8816, 42.6894 ], [ 2.8816, 42.6893 ], [ 2.8816, 42.6893 ], [ 2.8817, 42.6893 ], [ 2.8816, 42.6891 ], [ 2.8816, 42.689 ], [ 2.8816, 42.6889 ], [ 2.8816, 42.6888 ], [ 2.8816, 42.6888 ], [ 2.8816, 42.6885 ], [ 2.8816, 42.6884 ], [ 2.8816, 42.6883 ], [ 2.8818, 42.6882 ], [ 2.8818, 42.6881 ], [ 2.8818, 42.6878 ], [ 2.8814, 42.6878 ], [ 2.8813, 42.6878 ], [ 2.8813, 42.6876 ], [ 2.8809, 42.6876 ], [ 2.8809, 42.6877 ], [ 2.8809, 42.6881 ], [ 2.8806, 42.688 ], [ 2.8805, 42.688 ], [ 2.8804, 42.6883 ], [ 2.8804, 42.6884 ], [ 2.8794, 42.6881 ], [ 2.8794, 42.6882 ], [ 2.879, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6882 ], [ 2.8789, 42.6883 ], [ 2.8786, 42.6882 ], [ 2.8782, 42.6881 ], [ 2.8781, 42.6883 ], [ 2.878, 42.6885 ], [ 2.8779, 42.6888 ], [ 2.8777, 42.6891 ], [ 2.8777, 42.6891 ], [ 2.8782, 42.6893 ], [ 2.8787, 42.6896 ], [ 2.8792, 42.6898 ], [ 2.8797, 42.6901 ], [ 2.88, 42.6902 ], [ 2.8804, 42.6904 ], [ 2.8808, 42.6906 ], [ 2.881, 42.6908 ], [ 2.8812, 42.6909 ], [ 2.8815, 42.691 ], [ 2.8815, 42.6911 ], [ 2.8813, 42.6915 ], [ 2.8813, 42.6916 ], [ 2.8812, 42.6916 ], [ 2.8808, 42.6917 ], [ 2.8806, 42.6917 ], [ 2.8804, 42.6918 ], [ 2.8803, 42.6919 ], [ 2.8802, 42.692 ], [ 2.8801, 42.6921 ], [ 2.8799, 42.6924 ], [ 2.8796, 42.6926 ], [ 2.8794, 42.6927 ], [ 2.8791, 42.6927 ], [ 2.8789, 42.6928 ], [ 2.8789, 42.6928 ], [ 2.8788, 42.6928 ], [ 2.8788, 42.6928 ], [ 2.8787, 42.6929 ], [ 2.8786, 42.6929 ], [ 2.8788, 42.6931 ], [ 2.8787, 42.6932 ], [ 2.8785, 42.6935 ], [ 2.878, 42.6934 ], [ 2.8771, 42.6931 ], [ 2.8769, 42.693 ], [ 2.8768, 42.6931 ], [ 2.8767, 42.6931 ], [ 2.8767, 42.6932 ], [ 2.8766, 42.6933 ], [ 2.8765, 42.6934 ], [ 2.8765, 42.6934 ], [ 2.8765, 42.6935 ], [ 2.8765, 42.6938 ], [ 2.8765, 42.694 ], [ 2.8765, 42.6941 ], [ 2.8765, 42.6944 ], [ 2.8763, 42.6943 ], [ 2.8763, 42.6944 ], [ 2.8762, 42.6946 ], [ 2.8761, 42.6949 ], [ 2.876, 42.6953 ], [ 2.876, 42.6955 ], [ 2.876, 42.6956 ], [ 2.8761, 42.6956 ], [ 2.8763, 42.6956 ], [ 2.8764, 42.6956 ], [ 2.8764, 42.6956 ], [ 2.8765, 42.6957 ], [ 2.8766, 42.6957 ], [ 2.8767, 42.6958 ], [ 2.8769, 42.6959 ], [ 2.8768, 42.696 ], [ 2.8768, 42.6964 ], [ 2.8768, 42.6968 ], [ 2.8768, 42.6969 ], [ 2.8768, 42.697 ], [ 2.8767, 42.6972 ], [ 2.8766, 42.6973 ], [ 2.8766, 42.6973 ], [ 2.8765, 42.6974 ], [ 2.8763, 42.6974 ], [ 2.876, 42.6974 ], [ 2.876, 42.6977 ], [ 2.876, 42.698 ], [ 2.8759, 42.6983 ], [ 2.8759, 42.6985 ], [ 2.8759, 42.6986 ], [ 2.8758, 42.6986 ], [ 2.8757, 42.699 ], [ 2.8756, 42.6991 ], [ 2.8761, 42.6991 ], [ 2.8766, 42.6992 ], [ 2.8771, 42.6993 ], [ 2.8772, 42.6993 ], [ 2.8774, 42.6993 ], [ 2.8778, 42.6994 ], [ 2.8778, 42.6994 ], [ 2.878, 42.6995 ], [ 2.8782, 42.6996 ], [ 2.8785, 42.6996 ], [ 2.8789, 42.6998 ], [ 2.8791, 42.6999 ], [ 2.8794, 42.7 ], [ 2.8799, 42.7001 ], [ 2.8808, 42.7004 ], [ 2.8815, 42.7006 ], [ 2.8817, 42.7006 ], [ 2.8817, 42.7003 ], [ 2.8814, 42.7003 ], [ 2.8814, 42.7003 ], [ 2.8809, 42.7001 ], [ 2.881, 42.6996 ], [ 2.8811, 42.6993 ], [ 2.8811, 42.6992 ], [ 2.8803, 42.6991 ], [ 2.8798, 42.6991 ], [ 2.8794, 42.699 ], [ 2.8789, 42.6989 ], [ 2.8785, 42.6989 ], [ 2.8781, 42.6988 ], [ 2.878, 42.6988 ], [ 2.8778, 42.6988 ], [ 2.8778, 42.6987 ], [ 2.8778, 42.6985 ], [ 2.8778, 42.6982 ], [ 2.8779, 42.698 ], [ 2.8779, 42.6976 ], [ 2.878, 42.6977 ], [ 2.8783, 42.6977 ], [ 2.8784, 42.6972 ], [ 2.8787, 42.6967 ], [ 2.8798, 42.6968 ], [ 2.8798, 42.6968 ], [ 2.8799, 42.6968 ], [ 2.8801, 42.6968 ], [ 2.8804, 42.6968 ], [ 2.8805, 42.6968 ], [ 2.881, 42.6969 ], [ 2.8812, 42.6969 ], [ 2.8812, 42.6969 ], [ 2.8814, 42.6969 ], [ 2.8815, 42.6969 ], [ 2.8815, 42.6969 ], [ 2.8815, 42.6971 ], [ 2.8816, 42.6971 ], [ 2.8816, 42.6972 ], [ 2.8822, 42.6973 ], [ 2.8822, 42.6972 ], [ 2.8823, 42.6969 ], [ 2.8823, 42.6969 ], [ 2.8826, 42.697 ], [ 2.8829, 42.6965 ], [ 2.8831, 42.6963 ], [ 2.8831, 42.6962 ], [ 2.8833, 42.696 ], [ 2.8832, 42.6959 ], [ 2.8828, 42.6958 ], [ 2.8829, 42.6956 ], [ 2.8832, 42.6957 ], [ 2.8833, 42.6955 ], [ 2.8832, 42.6955 ], [ 2.8832, 42.6954 ], [ 2.883, 42.6953 ], [ 2.8823, 42.6952 ], [ 2.8823, 42.6952 ], [ 2.8821, 42.6951 ], [ 2.882, 42.6953 ], [ 2.8813, 42.6952 ], [ 2.8811, 42.6951 ], [ 2.8812, 42.6946 ], [ 2.8813, 42.6942 ], [ 2.8814, 42.6939 ], [ 2.8815, 42.6937 ], [ 2.8808, 42.6936 ], [ 2.8805, 42.6935 ], [ 2.881, 42.6922 ], [ 2.8816, 42.6921 ], [ 2.8817, 42.6921 ], [ 2.8817, 42.692 ], [ 2.8818, 42.6919 ], [ 2.8824, 42.6917 ], [ 2.8826, 42.6917 ], [ 2.8827, 42.6915 ], [ 2.8827, 42.6916 ], [ 2.8831, 42.691 ], [ 2.883, 42.691 ], [ 2.8833, 42.6905 ], [ 2.8835, 42.6901 ], [ 2.8836, 42.69 ], [ 2.8837, 42.6899 ] ] ], "type": "Polygon" }, "id": "7", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066003", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Gare" }, "type": "Feature" }, { "bbox": [ 2.3465, 43.2102, 2.3579, 43.2164 ], "geometry": { "coordinates": [ [ [ 2.3579, 43.2105 ], [ 2.3578, 43.2103 ], [ 2.3577, 43.2102 ], [ 2.3571, 43.2102 ], [ 2.3567, 43.2102 ], [ 2.3562, 43.2102 ], [ 2.356, 43.2103 ], [ 2.3558, 43.2103 ], [ 2.3552, 43.2104 ], [ 2.3552, 43.2105 ], [ 2.3473, 43.2105 ], [ 2.3472, 43.2105 ], [ 2.347, 43.211 ], [ 2.3468, 43.2118 ], [ 2.3466, 43.2118 ], [ 2.3465, 43.2124 ], [ 2.3466, 43.2125 ], [ 2.3465, 43.2126 ], [ 2.3465, 43.2127 ], [ 2.3466, 43.2128 ], [ 2.3468, 43.2128 ], [ 2.3471, 43.2134 ], [ 2.3471, 43.2134 ], [ 2.3475, 43.2142 ], [ 2.3474, 43.2142 ], [ 2.348, 43.2151 ], [ 2.348, 43.2151 ], [ 2.3479, 43.2151 ], [ 2.3483, 43.2157 ], [ 2.3487, 43.2164 ], [ 2.3489, 43.2164 ], [ 2.3489, 43.2164 ], [ 2.353, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3536, 43.2163 ], [ 2.3539, 43.2156 ], [ 2.3544, 43.2148 ], [ 2.3544, 43.2148 ], [ 2.3548, 43.2141 ], [ 2.355, 43.2138 ], [ 2.3554, 43.213 ], [ 2.3554, 43.2126 ], [ 2.3555, 43.2126 ], [ 2.3554, 43.2126 ], [ 2.3552, 43.2118 ], [ 2.3555, 43.2119 ], [ 2.3556, 43.2119 ], [ 2.3558, 43.2118 ], [ 2.3573, 43.2116 ], [ 2.3575, 43.2116 ], [ 2.3575, 43.2117 ], [ 2.3576, 43.2116 ], [ 2.3576, 43.2114 ], [ 2.3579, 43.2105 ] ] ], "type": "Polygon" }, "id": "8", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011004", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Bastide Pont-Vieux" }, "type": "Feature" }, { "bbox": [ 2.9955, 43.1804, 3.0095, 43.1877 ], "geometry": { "coordinates": [ [ [ 3.0095, 43.1855 ], [ 3.0095, 43.1854 ], [ 3.0095, 43.1853 ], [ 3.0095, 43.1853 ], [ 3.0094, 43.1852 ], [ 3.0094, 43.1851 ], [ 3.0093, 43.185 ], [ 3.0091, 43.1848 ], [ 3.009, 43.1846 ], [ 3.0089, 43.1845 ], [ 3.0082, 43.1847 ], [ 3.0082, 43.1847 ], [ 3.0078, 43.1848 ], [ 3.0077, 43.1848 ], [ 3.0076, 43.1847 ], [ 3.0075, 43.1846 ], [ 3.0075, 43.1845 ], [ 3.0074, 43.1844 ], [ 3.0076, 43.1844 ], [ 3.0075, 43.1843 ], [ 3.0075, 43.1842 ], [ 3.0074, 43.1841 ], [ 3.0073, 43.1841 ], [ 3.0072, 43.184 ], [ 3.0072, 43.1839 ], [ 3.007, 43.1838 ], [ 3.007, 43.1837 ], [ 3.0068, 43.1837 ], [ 3.0067, 43.1835 ], [ 3.0066, 43.1834 ], [ 3.0066, 43.1834 ], [ 3.0065, 43.1833 ], [ 3.0065, 43.1833 ], [ 3.0064, 43.1833 ], [ 3.0059, 43.1834 ], [ 3.0058, 43.1834 ], [ 3.0057, 43.1835 ], [ 3.0056, 43.1833 ], [ 3.0056, 43.1833 ], [ 3.0055, 43.1833 ], [ 3.0055, 43.1833 ], [ 3.0054, 43.1832 ], [ 3.0054, 43.1832 ], [ 3.0054, 43.1832 ], [ 3.0053, 43.1831 ], [ 3.0053, 43.1832 ], [ 3.0053, 43.1831 ], [ 3.0052, 43.1831 ], [ 3.0051, 43.1831 ], [ 3.005, 43.1829 ], [ 3.004, 43.1823 ], [ 3.0039, 43.1822 ], [ 3.0037, 43.1819 ], [ 3.0036, 43.1819 ], [ 3.0036, 43.1819 ], [ 3.0035, 43.1819 ], [ 3.0034, 43.1819 ], [ 3.0032, 43.1817 ], [ 3.0032, 43.1817 ], [ 3.0031, 43.1818 ], [ 3.003, 43.1817 ], [ 3.0029, 43.1817 ], [ 3.0029, 43.1817 ], [ 3.0028, 43.1816 ], [ 3.0027, 43.1815 ], [ 3.0026, 43.1816 ], [ 3.0023, 43.1817 ], [ 3.0023, 43.1816 ], [ 3.0021, 43.1813 ], [ 3.0018, 43.181 ], [ 3.0015, 43.1808 ], [ 3.0014, 43.1807 ], [ 3.0013, 43.1807 ], [ 3.001, 43.1807 ], [ 3.001, 43.1808 ], [ 3.0011, 43.1812 ], [ 3.0008, 43.1813 ], [ 3.0004, 43.1813 ], [ 3.0001, 43.1814 ], [ 2.9999, 43.1814 ], [ 2.9996, 43.1813 ], [ 2.9995, 43.1814 ], [ 2.9993, 43.1814 ], [ 2.9993, 43.1814 ], [ 2.9992, 43.1814 ], [ 2.9992, 43.1813 ], [ 2.9992, 43.1812 ], [ 2.9991, 43.1812 ], [ 2.999, 43.1808 ], [ 2.9987, 43.1809 ], [ 2.9983, 43.181 ], [ 2.9977, 43.1812 ], [ 2.9976, 43.181 ], [ 2.9975, 43.1807 ], [ 2.9973, 43.1804 ], [ 2.997, 43.1804 ], [ 2.9966, 43.1804 ], [ 2.9968, 43.1808 ], [ 2.9971, 43.1812 ], [ 2.997, 43.1813 ], [ 2.9968, 43.1813 ], [ 2.9961, 43.1814 ], [ 2.9955, 43.1815 ], [ 2.9956, 43.1818 ], [ 2.9955, 43.1819 ], [ 2.9955, 43.1823 ], [ 2.9957, 43.1823 ], [ 2.9957, 43.1828 ], [ 2.9957, 43.183 ], [ 2.9958, 43.183 ], [ 2.9959, 43.183 ], [ 2.9959, 43.1832 ], [ 2.9959, 43.1832 ], [ 2.9959, 43.1832 ], [ 2.9963, 43.1833 ], [ 2.9965, 43.1834 ], [ 2.9967, 43.1835 ], [ 2.9968, 43.1836 ], [ 2.9969, 43.1836 ], [ 2.9971, 43.1836 ], [ 2.9971, 43.1836 ], [ 2.9972, 43.1836 ], [ 2.9977, 43.1835 ], [ 2.9978, 43.1836 ], [ 2.9989, 43.1844 ], [ 2.9992, 43.1847 ], [ 2.9995, 43.1849 ], [ 2.9996, 43.1848 ], [ 2.9997, 43.1847 ], [ 2.9998, 43.1847 ], [ 2.9999, 43.1847 ], [ 3.0001, 43.1846 ], [ 3.0002, 43.1846 ], [ 3.0005, 43.1844 ], [ 3.0008, 43.1843 ], [ 3.0012, 43.1841 ], [ 3.0016, 43.184 ], [ 3.0017, 43.1839 ], [ 3.0019, 43.1839 ], [ 3.0023, 43.1837 ], [ 3.0026, 43.1839 ], [ 3.0027, 43.184 ], [ 3.0028, 43.1841 ], [ 3.0028, 43.1842 ], [ 3.0032, 43.1852 ], [ 3.0033, 43.1852 ], [ 3.0033, 43.1853 ], [ 3.0037, 43.1851 ], [ 3.0037, 43.1852 ], [ 3.0038, 43.1854 ], [ 3.0039, 43.1855 ], [ 3.004, 43.1857 ], [ 3.004, 43.1858 ], [ 3.0041, 43.1858 ], [ 3.0042, 43.1859 ], [ 3.0043, 43.1859 ], [ 3.0044, 43.1859 ], [ 3.0045, 43.1859 ], [ 3.0045, 43.186 ], [ 3.0045, 43.1862 ], [ 3.0045, 43.1863 ], [ 3.0046, 43.1864 ], [ 3.0046, 43.1864 ], [ 3.0047, 43.1865 ], [ 3.0048, 43.1866 ], [ 3.0049, 43.1867 ], [ 3.0049, 43.1868 ], [ 3.005, 43.1869 ], [ 3.0051, 43.187 ], [ 3.0052, 43.1871 ], [ 3.0053, 43.1873 ], [ 3.0056, 43.187 ], [ 3.0064, 43.1873 ], [ 3.0072, 43.1877 ], [ 3.0073, 43.1877 ], [ 3.0074, 43.1876 ], [ 3.0075, 43.1873 ], [ 3.0076, 43.1872 ], [ 3.0078, 43.1871 ], [ 3.0079, 43.1871 ], [ 3.008, 43.1871 ], [ 3.008, 43.1871 ], [ 3.0082, 43.1871 ], [ 3.0087, 43.1864 ], [ 3.0093, 43.1858 ], [ 3.0094, 43.1856 ], [ 3.0095, 43.1855 ] ] ], "type": "Polygon" }, "id": "9", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011008", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Centre" }, "type": "Feature" }, { "bbox": [ 3.0116, 43.192, 3.0172, 43.1962 ], "geometry": { "coordinates": [ [ [ 3.0167, 43.1938 ], [ 3.0165, 43.1936 ], [ 3.0165, 43.1934 ], [ 3.0163, 43.1933 ], [ 3.0159, 43.1928 ], [ 3.0157, 43.1927 ], [ 3.0155, 43.1924 ], [ 3.0152, 43.192 ], [ 3.0141, 43.1924 ], [ 3.014, 43.1925 ], [ 3.0139, 43.1924 ], [ 3.0137, 43.1921 ], [ 3.013, 43.1924 ], [ 3.0123, 43.1926 ], [ 3.0129, 43.1937 ], [ 3.0126, 43.1938 ], [ 3.0126, 43.1938 ], [ 3.0128, 43.1944 ], [ 3.0131, 43.195 ], [ 3.0126, 43.1952 ], [ 3.0126, 43.1952 ], [ 3.0126, 43.1954 ], [ 3.0116, 43.1956 ], [ 3.0123, 43.1962 ], [ 3.0123, 43.1962 ], [ 3.0133, 43.196 ], [ 3.0131, 43.1954 ], [ 3.0135, 43.1953 ], [ 3.0143, 43.1952 ], [ 3.0144, 43.1952 ], [ 3.0145, 43.1952 ], [ 3.0149, 43.1951 ], [ 3.0149, 43.1951 ], [ 3.0149, 43.1954 ], [ 3.015, 43.1957 ], [ 3.015, 43.1957 ], [ 3.0158, 43.1952 ], [ 3.0159, 43.1952 ], [ 3.0162, 43.195 ], [ 3.0166, 43.1947 ], [ 3.017, 43.1945 ], [ 3.0171, 43.1944 ], [ 3.0172, 43.1943 ], [ 3.0172, 43.1941 ], [ 3.0171, 43.194 ], [ 3.017, 43.1939 ], [ 3.0169, 43.1938 ], [ 3.0167, 43.1938 ] ] ], "type": "Polygon" }, "id": "10", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011009", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Est" }, "type": "Feature" }, { "bbox": [ 4.3233, 43.8189, 4.342, 43.8338 ], "geometry": { "coordinates": [ [ [ 4.3277, 43.8276 ], [ 4.3268, 43.8273 ], [ 4.3267, 43.8274 ], [ 4.3259, 43.8287 ], [ 4.3256, 43.8292 ], [ 4.3252, 43.8299 ], [ 4.3251, 43.8301 ], [ 4.3249, 43.8301 ], [ 4.3245, 43.8303 ], [ 4.3242, 43.8303 ], [ 4.3238, 43.8305 ], [ 4.3235, 43.8307 ], [ 4.3233, 43.8308 ], [ 4.3233, 43.8311 ], [ 4.3234, 43.8312 ], [ 4.3239, 43.8319 ], [ 4.324, 43.8321 ], [ 4.324, 43.8323 ], [ 4.3242, 43.8324 ], [ 4.3244, 43.8325 ], [ 4.3246, 43.8326 ], [ 4.3251, 43.8329 ], [ 4.3253, 43.8329 ], [ 4.3254, 43.8329 ], [ 4.3256, 43.8329 ], [ 4.3257, 43.8328 ], [ 4.3258, 43.8327 ], [ 4.326, 43.8325 ], [ 4.3263, 43.8321 ], [ 4.3263, 43.832 ], [ 4.3264, 43.8321 ], [ 4.3268, 43.8322 ], [ 4.3269, 43.832 ], [ 4.327, 43.832 ], [ 4.3273, 43.832 ], [ 4.3273, 43.832 ], [ 4.3278, 43.8322 ], [ 4.3283, 43.8324 ], [ 4.3283, 43.8323 ], [ 4.3285, 43.8324 ], [ 4.3287, 43.8329 ], [ 4.3284, 43.833 ], [ 4.3289, 43.8333 ], [ 4.3286, 43.8336 ], [ 4.3291, 43.8338 ], [ 4.3293, 43.8336 ], [ 4.3301, 43.8334 ], [ 4.3308, 43.8331 ], [ 4.3306, 43.8329 ], [ 4.3307, 43.8325 ], [ 4.3308, 43.8325 ], [ 4.3309, 43.8324 ], [ 4.331, 43.8323 ], [ 4.3317, 43.8326 ], [ 4.3317, 43.8325 ], [ 4.3317, 43.8325 ], [ 4.3317, 43.8324 ], [ 4.3316, 43.8323 ], [ 4.3316, 43.8322 ], [ 4.3319, 43.8322 ], [ 4.332, 43.8322 ], [ 4.3321, 43.8322 ], [ 4.3323, 43.8322 ], [ 4.3329, 43.8321 ], [ 4.3329, 43.8321 ], [ 4.3329, 43.832 ], [ 4.3329, 43.8319 ], [ 4.3332, 43.8315 ], [ 4.3333, 43.8314 ], [ 4.3334, 43.8312 ], [ 4.3337, 43.8307 ], [ 4.3332, 43.8306 ], [ 4.3333, 43.8305 ], [ 4.333, 43.8304 ], [ 4.3323, 43.8301 ], [ 4.333, 43.8291 ], [ 4.3331, 43.8288 ], [ 4.3332, 43.8286 ], [ 4.3332, 43.8285 ], [ 4.3334, 43.8288 ], [ 4.3335, 43.8289 ], [ 4.3335, 43.8289 ], [ 4.3336, 43.829 ], [ 4.3337, 43.8291 ], [ 4.3339, 43.8291 ], [ 4.334, 43.8292 ], [ 4.3341, 43.8292 ], [ 4.3344, 43.8292 ], [ 4.3345, 43.8292 ], [ 4.335, 43.8291 ], [ 4.3356, 43.8289 ], [ 4.3356, 43.8288 ], [ 4.3356, 43.8287 ], [ 4.3358, 43.8284 ], [ 4.3365, 43.8285 ], [ 4.3367, 43.8285 ], [ 4.3368, 43.8286 ], [ 4.3369, 43.8287 ], [ 4.3377, 43.8292 ], [ 4.338, 43.8289 ], [ 4.338, 43.8288 ], [ 4.3381, 43.8287 ], [ 4.3382, 43.8288 ], [ 4.3383, 43.8286 ], [ 4.3384, 43.8287 ], [ 4.3384, 43.8287 ], [ 4.3379, 43.8284 ], [ 4.338, 43.828 ], [ 4.3383, 43.828 ], [ 4.3386, 43.8281 ], [ 4.3387, 43.8282 ], [ 4.3387, 43.8281 ], [ 4.3386, 43.8278 ], [ 4.3386, 43.8278 ], [ 4.3387, 43.8275 ], [ 4.3388, 43.8275 ], [ 4.3388, 43.8272 ], [ 4.3384, 43.8274 ], [ 4.3381, 43.8275 ], [ 4.3379, 43.8275 ], [ 4.3378, 43.8274 ], [ 4.3381, 43.8268 ], [ 4.3382, 43.8265 ], [ 4.3372, 43.8262 ], [ 4.3363, 43.8259 ], [ 4.3363, 43.8258 ], [ 4.337, 43.8246 ], [ 4.3375, 43.8247 ], [ 4.3377, 43.8249 ], [ 4.3387, 43.8252 ], [ 4.3389, 43.8253 ], [ 4.3391, 43.8252 ], [ 4.3395, 43.8251 ], [ 4.3398, 43.8251 ], [ 4.3401, 43.8251 ], [ 4.3403, 43.8251 ], [ 4.3404, 43.8252 ], [ 4.3407, 43.8253 ], [ 4.3413, 43.8252 ], [ 4.3419, 43.8251 ], [ 4.342, 43.825 ], [ 4.3419, 43.8248 ], [ 4.3414, 43.8247 ], [ 4.3418, 43.8243 ], [ 4.3414, 43.8242 ], [ 4.3413, 43.8241 ], [ 4.341, 43.824 ], [ 4.3414, 43.8235 ], [ 4.341, 43.8234 ], [ 4.3406, 43.8233 ], [ 4.3402, 43.8232 ], [ 4.3404, 43.8229 ], [ 4.3407, 43.8225 ], [ 4.3408, 43.8221 ], [ 4.3411, 43.8217 ], [ 4.3413, 43.8214 ], [ 4.3417, 43.821 ], [ 4.3417, 43.8209 ], [ 4.3412, 43.8207 ], [ 4.3406, 43.8205 ], [ 4.3403, 43.8203 ], [ 4.34, 43.8202 ], [ 4.3394, 43.8199 ], [ 4.3388, 43.8196 ], [ 4.3385, 43.8195 ], [ 4.3382, 43.8193 ], [ 4.3379, 43.8191 ], [ 4.3375, 43.8189 ], [ 4.337, 43.8193 ], [ 4.3368, 43.8195 ], [ 4.3364, 43.8198 ], [ 4.3362, 43.82 ], [ 4.3361, 43.8202 ], [ 4.3359, 43.8203 ], [ 4.3356, 43.8202 ], [ 4.3353, 43.8202 ], [ 4.3347, 43.8202 ], [ 4.3342, 43.8203 ], [ 4.3327, 43.8205 ], [ 4.3322, 43.8206 ], [ 4.3316, 43.8208 ], [ 4.331, 43.821 ], [ 4.3306, 43.8211 ], [ 4.3303, 43.8212 ], [ 4.3299, 43.8215 ], [ 4.3295, 43.8218 ], [ 4.3289, 43.8223 ], [ 4.3285, 43.8228 ], [ 4.3282, 43.8233 ], [ 4.3283, 43.8235 ], [ 4.3284, 43.8236 ], [ 4.3289, 43.8238 ], [ 4.3295, 43.8241 ], [ 4.3305, 43.8248 ], [ 4.3313, 43.8255 ], [ 4.3321, 43.826 ], [ 4.3323, 43.8261 ], [ 4.3326, 43.8263 ], [ 4.3328, 43.8265 ], [ 4.333, 43.8267 ], [ 4.3332, 43.8268 ], [ 4.3336, 43.8271 ], [ 4.334, 43.8265 ], [ 4.3343, 43.8259 ], [ 4.3346, 43.826 ], [ 4.3347, 43.826 ], [ 4.3349, 43.8258 ], [ 4.335, 43.8257 ], [ 4.335, 43.8257 ], [ 4.3352, 43.8256 ], [ 4.3358, 43.8258 ], [ 4.3361, 43.8259 ], [ 4.3362, 43.826 ], [ 4.3362, 43.8261 ], [ 4.3358, 43.8268 ], [ 4.3356, 43.8267 ], [ 4.3355, 43.8268 ], [ 4.3357, 43.8269 ], [ 4.3358, 43.827 ], [ 4.3358, 43.8271 ], [ 4.3351, 43.8273 ], [ 4.3352, 43.8274 ], [ 4.3353, 43.8276 ], [ 4.3355, 43.8278 ], [ 4.3356, 43.828 ], [ 4.3356, 43.8282 ], [ 4.3352, 43.8283 ], [ 4.3349, 43.8281 ], [ 4.3347, 43.8279 ], [ 4.3335, 43.8272 ], [ 4.3337, 43.8276 ], [ 4.3338, 43.8278 ], [ 4.3339, 43.8278 ], [ 4.3339, 43.8279 ], [ 4.3339, 43.8279 ], [ 4.3338, 43.828 ], [ 4.3334, 43.8279 ], [ 4.3332, 43.8278 ], [ 4.3331, 43.8279 ], [ 4.333, 43.828 ], [ 4.3329, 43.828 ], [ 4.3331, 43.8282 ], [ 4.3329, 43.8283 ], [ 4.3327, 43.8282 ], [ 4.3325, 43.8281 ], [ 4.3321, 43.8279 ], [ 4.3319, 43.8286 ], [ 4.3317, 43.8289 ], [ 4.3316, 43.829 ], [ 4.3315, 43.8289 ], [ 4.3314, 43.8289 ], [ 4.3314, 43.829 ], [ 4.3313, 43.8292 ], [ 4.3313, 43.8292 ], [ 4.3313, 43.8293 ], [ 4.3312, 43.8293 ], [ 4.3312, 43.8293 ], [ 4.3311, 43.8293 ], [ 4.331, 43.8293 ], [ 4.3309, 43.8294 ], [ 4.3308, 43.8294 ], [ 4.3308, 43.8294 ], [ 4.3308, 43.8295 ], [ 4.3307, 43.8295 ], [ 4.3306, 43.8295 ], [ 4.3305, 43.8296 ], [ 4.3304, 43.8296 ], [ 4.3304, 43.8296 ], [ 4.3309, 43.8298 ], [ 4.3309, 43.8299 ], [ 4.3308, 43.83 ], [ 4.3307, 43.8301 ], [ 4.3307, 43.8304 ], [ 4.3306, 43.8306 ], [ 4.3304, 43.8308 ], [ 4.3304, 43.8309 ], [ 4.3303, 43.8309 ], [ 4.3292, 43.8305 ], [ 4.3293, 43.8303 ], [ 4.3287, 43.8291 ], [ 4.33, 43.8287 ], [ 4.3301, 43.8287 ], [ 4.3303, 43.8288 ], [ 4.3304, 43.8285 ], [ 4.3304, 43.8285 ], [ 4.3305, 43.8284 ], [ 4.3307, 43.8281 ], [ 4.3307, 43.828 ], [ 4.3307, 43.8278 ], [ 4.331, 43.8274 ], [ 4.3308, 43.8273 ], [ 4.3304, 43.8275 ], [ 4.3301, 43.8276 ], [ 4.3299, 43.8276 ], [ 4.3298, 43.8279 ], [ 4.3292, 43.8279 ], [ 4.3292, 43.8274 ], [ 4.3281, 43.827 ], [ 4.3277, 43.8276 ] ] ], "type": "Polygon" }, "id": "11", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030003", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Pissevin - Valdegour" }, "type": "Feature" }, { "bbox": [ 3.9824, 44.0535, 3.9873, 44.0594 ], "geometry": { "coordinates": [ [ [ 3.9824, 44.0536 ], [ 3.9825, 44.0537 ], [ 3.9828, 44.0539 ], [ 3.9829, 44.054 ], [ 3.983, 44.0541 ], [ 3.9831, 44.0543 ], [ 3.9833, 44.0544 ], [ 3.9833, 44.0544 ], [ 3.9833, 44.0545 ], [ 3.9834, 44.0545 ], [ 3.9836, 44.0548 ], [ 3.9835, 44.0548 ], [ 3.9836, 44.0549 ], [ 3.9834, 44.055 ], [ 3.9836, 44.0552 ], [ 3.9838, 44.0551 ], [ 3.9838, 44.0553 ], [ 3.9839, 44.0554 ], [ 3.9839, 44.0554 ], [ 3.9838, 44.0555 ], [ 3.9838, 44.0556 ], [ 3.9838, 44.0556 ], [ 3.9839, 44.0558 ], [ 3.984, 44.0558 ], [ 3.9841, 44.0559 ], [ 3.9843, 44.0559 ], [ 3.9843, 44.056 ], [ 3.9843, 44.056 ], [ 3.9842, 44.0561 ], [ 3.9844, 44.0562 ], [ 3.9845, 44.0564 ], [ 3.9846, 44.0565 ], [ 3.9846, 44.0566 ], [ 3.9846, 44.0567 ], [ 3.9846, 44.0568 ], [ 3.9847, 44.0569 ], [ 3.9847, 44.0569 ], [ 3.9849, 44.0568 ], [ 3.9849, 44.0568 ], [ 3.985, 44.0568 ], [ 3.985, 44.0569 ], [ 3.985, 44.0569 ], [ 3.985, 44.057 ], [ 3.9851, 44.057 ], [ 3.9851, 44.0571 ], [ 3.9852, 44.0572 ], [ 3.9852, 44.0573 ], [ 3.9853, 44.0574 ], [ 3.9853, 44.0574 ], [ 3.9853, 44.0575 ], [ 3.9853, 44.0575 ], [ 3.9848, 44.0575 ], [ 3.9848, 44.0576 ], [ 3.9848, 44.0577 ], [ 3.985, 44.0578 ], [ 3.9851, 44.0578 ], [ 3.9853, 44.0578 ], [ 3.9851, 44.0582 ], [ 3.985, 44.0583 ], [ 3.9849, 44.0584 ], [ 3.9849, 44.0585 ], [ 3.9848, 44.0585 ], [ 3.9847, 44.0587 ], [ 3.9845, 44.0589 ], [ 3.9845, 44.0593 ], [ 3.9847, 44.0594 ], [ 3.9851, 44.0591 ], [ 3.9852, 44.059 ], [ 3.9853, 44.0589 ], [ 3.9852, 44.0588 ], [ 3.9854, 44.0587 ], [ 3.9856, 44.0584 ], [ 3.9858, 44.0583 ], [ 3.9859, 44.0581 ], [ 3.986, 44.058 ], [ 3.9861, 44.0578 ], [ 3.9862, 44.0576 ], [ 3.9863, 44.0574 ], [ 3.9865, 44.057 ], [ 3.9867, 44.0564 ], [ 3.9868, 44.0562 ], [ 3.9869, 44.056 ], [ 3.9869, 44.0559 ], [ 3.987, 44.0557 ], [ 3.987, 44.0556 ], [ 3.987, 44.0554 ], [ 3.9872, 44.0554 ], [ 3.9872, 44.0551 ], [ 3.9871, 44.055 ], [ 3.9871, 44.0548 ], [ 3.9871, 44.0546 ], [ 3.9871, 44.0546 ], [ 3.9872, 44.0545 ], [ 3.9873, 44.0542 ], [ 3.9873, 44.054 ], [ 3.9873, 44.054 ], [ 3.987, 44.0538 ], [ 3.9863, 44.0536 ], [ 3.9859, 44.0535 ], [ 3.9861, 44.0536 ], [ 3.9859, 44.0536 ], [ 3.9856, 44.0536 ], [ 3.9854, 44.0536 ], [ 3.9853, 44.0536 ], [ 3.9851, 44.0536 ], [ 3.9849, 44.0537 ], [ 3.9848, 44.0537 ], [ 3.9847, 44.0536 ], [ 3.9846, 44.0535 ], [ 3.9846, 44.0535 ], [ 3.9845, 44.0535 ], [ 3.984, 44.0537 ], [ 3.9839, 44.0537 ], [ 3.9839, 44.0537 ], [ 3.9837, 44.0537 ], [ 3.983, 44.0537 ], [ 3.983, 44.0537 ], [ 3.9829, 44.0537 ], [ 3.9824, 44.0535 ], [ 3.9824, 44.0536 ] ] ], "type": "Polygon" }, "id": "12", "properties": { "code_commune": "30010", "code_departement": "30", "code_qp": "QP030002", "commune_qp": "Anduze", "nom_commune": "Anduze", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 4.1241, 43.6696, 4.1407, 43.6799 ], "geometry": { "coordinates": [ [ [ 4.1386, 43.6762 ], [ 4.1385, 43.676 ], [ 4.1383, 43.6759 ], [ 4.1382, 43.6759 ], [ 4.1379, 43.6755 ], [ 4.138, 43.6751 ], [ 4.138, 43.6749 ], [ 4.138, 43.6745 ], [ 4.1378, 43.6741 ], [ 4.1374, 43.6734 ], [ 4.1373, 43.6732 ], [ 4.1369, 43.6728 ], [ 4.1367, 43.6726 ], [ 4.1366, 43.6725 ], [ 4.1366, 43.6725 ], [ 4.1366, 43.6722 ], [ 4.1371, 43.6721 ], [ 4.1373, 43.6721 ], [ 4.1383, 43.6722 ], [ 4.1396, 43.6723 ], [ 4.1404, 43.6724 ], [ 4.1405, 43.6715 ], [ 4.1407, 43.6705 ], [ 4.1402, 43.6705 ], [ 4.1402, 43.6706 ], [ 4.1391, 43.6705 ], [ 4.1391, 43.6705 ], [ 4.1383, 43.6704 ], [ 4.1383, 43.6704 ], [ 4.1379, 43.6704 ], [ 4.1378, 43.6705 ], [ 4.1378, 43.6709 ], [ 4.1379, 43.6709 ], [ 4.1379, 43.6709 ], [ 4.1378, 43.671 ], [ 4.1377, 43.671 ], [ 4.1376, 43.6709 ], [ 4.1376, 43.6709 ], [ 4.1375, 43.6709 ], [ 4.1375, 43.6709 ], [ 4.1368, 43.6708 ], [ 4.1367, 43.671 ], [ 4.1367, 43.6711 ], [ 4.1367, 43.6713 ], [ 4.1367, 43.6715 ], [ 4.1367, 43.6716 ], [ 4.1367, 43.6717 ], [ 4.1367, 43.672 ], [ 4.1367, 43.6721 ], [ 4.1366, 43.6722 ], [ 4.1365, 43.6722 ], [ 4.1365, 43.6722 ], [ 4.1363, 43.6722 ], [ 4.1363, 43.6724 ], [ 4.1361, 43.6726 ], [ 4.136, 43.6726 ], [ 4.136, 43.6727 ], [ 4.136, 43.6728 ], [ 4.1359, 43.6737 ], [ 4.1356, 43.6737 ], [ 4.1356, 43.6736 ], [ 4.1356, 43.6736 ], [ 4.1356, 43.6736 ], [ 4.1354, 43.6734 ], [ 4.1347, 43.6734 ], [ 4.1342, 43.6734 ], [ 4.1342, 43.6734 ], [ 4.1342, 43.6732 ], [ 4.1339, 43.6732 ], [ 4.1337, 43.6732 ], [ 4.1334, 43.6732 ], [ 4.1334, 43.6732 ], [ 4.1332, 43.6733 ], [ 4.1332, 43.6732 ], [ 4.133, 43.6734 ], [ 4.1328, 43.6733 ], [ 4.133, 43.6728 ], [ 4.1327, 43.6727 ], [ 4.1325, 43.6731 ], [ 4.1323, 43.6732 ], [ 4.1322, 43.6732 ], [ 4.1322, 43.6733 ], [ 4.1321, 43.6735 ], [ 4.1321, 43.6736 ], [ 4.132, 43.6737 ], [ 4.132, 43.674 ], [ 4.1321, 43.674 ], [ 4.1321, 43.674 ], [ 4.1325, 43.674 ], [ 4.1325, 43.6741 ], [ 4.1325, 43.6743 ], [ 4.1324, 43.6744 ], [ 4.1324, 43.6745 ], [ 4.1324, 43.6746 ], [ 4.1323, 43.6747 ], [ 4.1323, 43.6748 ], [ 4.1321, 43.6748 ], [ 4.1318, 43.6747 ], [ 4.1315, 43.6747 ], [ 4.1314, 43.6746 ], [ 4.1312, 43.6746 ], [ 4.1313, 43.6742 ], [ 4.1299, 43.6743 ], [ 4.1298, 43.6743 ], [ 4.1298, 43.6744 ], [ 4.1299, 43.6744 ], [ 4.13, 43.6744 ], [ 4.1299, 43.6746 ], [ 4.1297, 43.6751 ], [ 4.1294, 43.6749 ], [ 4.1294, 43.6752 ], [ 4.1288, 43.6753 ], [ 4.1287, 43.6751 ], [ 4.1281, 43.6752 ], [ 4.1278, 43.6754 ], [ 4.1273, 43.675 ], [ 4.1273, 43.6749 ], [ 4.1278, 43.6745 ], [ 4.1281, 43.6743 ], [ 4.1282, 43.6743 ], [ 4.1282, 43.6742 ], [ 4.1284, 43.6739 ], [ 4.1282, 43.6738 ], [ 4.1284, 43.6738 ], [ 4.1285, 43.6737 ], [ 4.1288, 43.6733 ], [ 4.129, 43.6729 ], [ 4.1291, 43.6727 ], [ 4.1293, 43.6724 ], [ 4.1296, 43.672 ], [ 4.1295, 43.672 ], [ 4.1294, 43.672 ], [ 4.129, 43.6718 ], [ 4.1286, 43.6716 ], [ 4.1284, 43.6716 ], [ 4.1277, 43.6714 ], [ 4.1276, 43.6713 ], [ 4.1272, 43.6713 ], [ 4.127, 43.6712 ], [ 4.1271, 43.671 ], [ 4.1271, 43.6709 ], [ 4.1273, 43.6708 ], [ 4.1275, 43.6708 ], [ 4.1276, 43.6708 ], [ 4.1278, 43.6704 ], [ 4.1281, 43.6701 ], [ 4.1282, 43.67 ], [ 4.1272, 43.6698 ], [ 4.1258, 43.6696 ], [ 4.1254, 43.671 ], [ 4.1254, 43.6711 ], [ 4.1253, 43.6711 ], [ 4.1251, 43.6711 ], [ 4.1249, 43.6711 ], [ 4.1246, 43.6711 ], [ 4.1243, 43.671 ], [ 4.1243, 43.6712 ], [ 4.1242, 43.6715 ], [ 4.1242, 43.6719 ], [ 4.1243, 43.6721 ], [ 4.1244, 43.6721 ], [ 4.1244, 43.6721 ], [ 4.1251, 43.672 ], [ 4.1263, 43.6724 ], [ 4.1262, 43.6726 ], [ 4.1265, 43.6727 ], [ 4.1276, 43.673 ], [ 4.1281, 43.6731 ], [ 4.1279, 43.6736 ], [ 4.1278, 43.6739 ], [ 4.1276, 43.674 ], [ 4.1274, 43.674 ], [ 4.1271, 43.6739 ], [ 4.1269, 43.674 ], [ 4.1267, 43.6741 ], [ 4.1263, 43.6743 ], [ 4.1262, 43.6744 ], [ 4.1266, 43.6746 ], [ 4.1261, 43.675 ], [ 4.1256, 43.6754 ], [ 4.1252, 43.6757 ], [ 4.1252, 43.6758 ], [ 4.1247, 43.6756 ], [ 4.1244, 43.6754 ], [ 4.1241, 43.6755 ], [ 4.1243, 43.6757 ], [ 4.1241, 43.6758 ], [ 4.1244, 43.6761 ], [ 4.1246, 43.676 ], [ 4.1251, 43.6764 ], [ 4.1252, 43.6764 ], [ 4.1265, 43.6761 ], [ 4.1283, 43.6758 ], [ 4.1285, 43.6758 ], [ 4.1291, 43.6757 ], [ 4.1301, 43.6754 ], [ 4.1303, 43.6754 ], [ 4.1315, 43.6755 ], [ 4.1317, 43.6756 ], [ 4.1319, 43.6758 ], [ 4.1322, 43.676 ], [ 4.1324, 43.6762 ], [ 4.1329, 43.6764 ], [ 4.1333, 43.6766 ], [ 4.1337, 43.6769 ], [ 4.1335, 43.6772 ], [ 4.1333, 43.6774 ], [ 4.1332, 43.6776 ], [ 4.1331, 43.6779 ], [ 4.1342, 43.6781 ], [ 4.1342, 43.6781 ], [ 4.1344, 43.6781 ], [ 4.1342, 43.6784 ], [ 4.1341, 43.6787 ], [ 4.1339, 43.6786 ], [ 4.1338, 43.6787 ], [ 4.1337, 43.6787 ], [ 4.1336, 43.6789 ], [ 4.1335, 43.6788 ], [ 4.1332, 43.6791 ], [ 4.133, 43.6792 ], [ 4.1328, 43.6791 ], [ 4.1327, 43.6794 ], [ 4.1326, 43.6794 ], [ 4.1326, 43.6794 ], [ 4.1324, 43.6797 ], [ 4.1334, 43.6799 ], [ 4.1334, 43.6797 ], [ 4.1334, 43.6797 ], [ 4.1335, 43.6795 ], [ 4.1339, 43.6796 ], [ 4.134, 43.6794 ], [ 4.1341, 43.6791 ], [ 4.1343, 43.6792 ], [ 4.1344, 43.679 ], [ 4.1348, 43.6792 ], [ 4.1349, 43.6789 ], [ 4.1351, 43.679 ], [ 4.1354, 43.6782 ], [ 4.1355, 43.6778 ], [ 4.1365, 43.678 ], [ 4.1365, 43.6779 ], [ 4.1366, 43.6779 ], [ 4.1367, 43.6773 ], [ 4.1369, 43.6774 ], [ 4.1371, 43.6774 ], [ 4.1375, 43.6776 ], [ 4.1379, 43.6777 ], [ 4.1378, 43.6776 ], [ 4.1378, 43.6776 ], [ 4.1382, 43.677 ], [ 4.1382, 43.677 ], [ 4.1386, 43.6762 ] ] ], "type": "Polygon" }, "id": "13", "properties": { "code_commune": "34145", "code_departement": "34", "code_qp": "QP034021", "commune_qp": "Lunel", "nom_commune": "Lunel", "nom_qp": "Centre Et Périphérie" }, "type": "Feature" }, { "bbox": [ 4.6254, 43.8078, 4.6319, 43.8124 ], "geometry": { "coordinates": [ [ [ 4.6319, 43.8112 ], [ 4.6319, 43.8111 ], [ 4.6318, 43.8107 ], [ 4.6317, 43.8107 ], [ 4.6317, 43.8107 ], [ 4.6317, 43.8106 ], [ 4.6313, 43.8103 ], [ 4.6311, 43.8094 ], [ 4.6311, 43.8093 ], [ 4.6311, 43.8085 ], [ 4.6304, 43.8084 ], [ 4.6304, 43.8084 ], [ 4.6296, 43.8082 ], [ 4.6297, 43.8079 ], [ 4.6293, 43.8078 ], [ 4.6287, 43.8078 ], [ 4.6286, 43.8078 ], [ 4.6278, 43.8078 ], [ 4.6274, 43.8078 ], [ 4.6273, 43.8078 ], [ 4.6273, 43.8079 ], [ 4.6272, 43.8079 ], [ 4.6272, 43.808 ], [ 4.6271, 43.8081 ], [ 4.627, 43.8083 ], [ 4.6269, 43.8085 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8087 ], [ 4.6271, 43.8088 ], [ 4.6272, 43.8088 ], [ 4.6274, 43.8089 ], [ 4.6275, 43.809 ], [ 4.6278, 43.809 ], [ 4.6279, 43.8091 ], [ 4.628, 43.809 ], [ 4.6281, 43.8093 ], [ 4.6279, 43.8093 ], [ 4.6277, 43.8094 ], [ 4.6274, 43.8095 ], [ 4.6268, 43.8095 ], [ 4.6268, 43.8096 ], [ 4.6267, 43.8096 ], [ 4.6267, 43.8097 ], [ 4.6266, 43.8098 ], [ 4.6266, 43.8098 ], [ 4.6266, 43.8098 ], [ 4.6265, 43.8098 ], [ 4.6265, 43.8098 ], [ 4.6264, 43.8098 ], [ 4.6263, 43.8098 ], [ 4.6261, 43.8098 ], [ 4.6259, 43.8098 ], [ 4.6254, 43.8098 ], [ 4.6254, 43.8105 ], [ 4.6255, 43.811 ], [ 4.6255, 43.811 ], [ 4.6256, 43.811 ], [ 4.6266, 43.811 ], [ 4.6271, 43.811 ], [ 4.6275, 43.8109 ], [ 4.6275, 43.8111 ], [ 4.6276, 43.8116 ], [ 4.6276, 43.8119 ], [ 4.6283, 43.8118 ], [ 4.6286, 43.8118 ], [ 4.6288, 43.8119 ], [ 4.6289, 43.8124 ], [ 4.6295, 43.8122 ], [ 4.6294, 43.8122 ], [ 4.6298, 43.8121 ], [ 4.6305, 43.8119 ], [ 4.6318, 43.8116 ], [ 4.6318, 43.8116 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8112 ] ] ], "type": "Polygon" }, "id": "14", "properties": { "code_commune": "30032", "code_departement": "30", "code_qp": "QP030012", "commune_qp": "Beaucaire", "nom_commune": "Beaucaire", "nom_qp": "La Moulinelle" }, "type": "Feature" }, { "bbox": [ 2.7551, 43.1974, 2.7711, 43.2053 ], "geometry": { "coordinates": [ [ [ 2.7564, 43.2037 ], [ 2.7557, 43.2044 ], [ 2.7554, 43.2049 ], [ 2.7551, 43.2052 ], [ 2.7557, 43.2053 ], [ 2.7559, 43.2052 ], [ 2.7567, 43.2051 ], [ 2.7571, 43.205 ], [ 2.7586, 43.2044 ], [ 2.7599, 43.204 ], [ 2.7605, 43.2038 ], [ 2.7615, 43.2034 ], [ 2.7621, 43.2032 ], [ 2.7625, 43.2031 ], [ 2.7631, 43.203 ], [ 2.7638, 43.2029 ], [ 2.7642, 43.2029 ], [ 2.765, 43.2027 ], [ 2.7659, 43.2025 ], [ 2.7658, 43.2023 ], [ 2.7655, 43.2023 ], [ 2.7647, 43.2014 ], [ 2.7654, 43.201 ], [ 2.766, 43.2005 ], [ 2.7666, 43.2008 ], [ 2.7671, 43.2005 ], [ 2.7677, 43.201 ], [ 2.7681, 43.2008 ], [ 2.7683, 43.2009 ], [ 2.7685, 43.201 ], [ 2.7688, 43.2007 ], [ 2.7696, 43.2011 ], [ 2.7703, 43.2014 ], [ 2.7709, 43.2015 ], [ 2.7711, 43.2014 ], [ 2.7711, 43.2013 ], [ 2.7709, 43.2009 ], [ 2.7709, 43.2007 ], [ 2.77, 43.2005 ], [ 2.7689, 43.2002 ], [ 2.7686, 43.2001 ], [ 2.7687, 43.1999 ], [ 2.7681, 43.1997 ], [ 2.768, 43.1996 ], [ 2.767, 43.1994 ], [ 2.767, 43.1994 ], [ 2.7667, 43.1993 ], [ 2.7647, 43.199 ], [ 2.7634, 43.1987 ], [ 2.7632, 43.1986 ], [ 2.7609, 43.1981 ], [ 2.7604, 43.198 ], [ 2.7577, 43.1974 ], [ 2.758, 43.1982 ], [ 2.7581, 43.1983 ], [ 2.7586, 43.1994 ], [ 2.7578, 43.1997 ], [ 2.7569, 43.2001 ], [ 2.7566, 43.2002 ], [ 2.7558, 43.2006 ], [ 2.7558, 43.2005 ], [ 2.7556, 43.2006 ], [ 2.7555, 43.2006 ], [ 2.7552, 43.2008 ], [ 2.7551, 43.2009 ], [ 2.7553, 43.201 ], [ 2.7552, 43.2019 ], [ 2.7552, 43.202 ], [ 2.7552, 43.202 ], [ 2.7552, 43.2021 ], [ 2.7551, 43.2027 ], [ 2.7551, 43.2028 ], [ 2.7551, 43.2029 ], [ 2.7558, 43.2027 ], [ 2.7564, 43.2037 ] ] ], "type": "Polygon" }, "id": "15", "properties": { "code_commune": "11203", "code_departement": "11", "code_qp": "QP011010", "commune_qp": "Lézignan-Corbières", "nom_commune": "Lézignan-Corbières", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.2331, 43.3431, 3.2394, 43.3527 ], "geometry": { "coordinates": [ [ [ 3.2393, 43.3502 ], [ 3.2394, 43.3501 ], [ 3.2393, 43.3495 ], [ 3.239, 43.3494 ], [ 3.2389, 43.3493 ], [ 3.2379, 43.3491 ], [ 3.2377, 43.3492 ], [ 3.2374, 43.3494 ], [ 3.2372, 43.3497 ], [ 3.2371, 43.3497 ], [ 3.237, 43.3498 ], [ 3.2369, 43.3497 ], [ 3.2368, 43.3496 ], [ 3.2366, 43.3496 ], [ 3.2361, 43.3492 ], [ 3.2365, 43.3488 ], [ 3.2365, 43.3488 ], [ 3.2366, 43.3487 ], [ 3.2367, 43.3486 ], [ 3.2368, 43.3486 ], [ 3.237, 43.3483 ], [ 3.2372, 43.3481 ], [ 3.2367, 43.3479 ], [ 3.2366, 43.3478 ], [ 3.2369, 43.3476 ], [ 3.2371, 43.3474 ], [ 3.2367, 43.3471 ], [ 3.2365, 43.3471 ], [ 3.2363, 43.3473 ], [ 3.2363, 43.3472 ], [ 3.2361, 43.3471 ], [ 3.2362, 43.347 ], [ 3.2355, 43.3466 ], [ 3.2359, 43.3462 ], [ 3.2364, 43.3455 ], [ 3.2366, 43.3453 ], [ 3.2364, 43.3452 ], [ 3.2362, 43.3451 ], [ 3.2359, 43.3451 ], [ 3.2358, 43.345 ], [ 3.2359, 43.3448 ], [ 3.2363, 43.3443 ], [ 3.2365, 43.3444 ], [ 3.2366, 43.3444 ], [ 3.2367, 43.3441 ], [ 3.2368, 43.3439 ], [ 3.2368, 43.3436 ], [ 3.237, 43.3434 ], [ 3.2368, 43.3434 ], [ 3.2363, 43.3432 ], [ 3.2362, 43.3432 ], [ 3.2354, 43.3431 ], [ 3.2348, 43.3431 ], [ 3.2346, 43.3431 ], [ 3.2344, 43.3431 ], [ 3.2343, 43.3432 ], [ 3.234, 43.3433 ], [ 3.2338, 43.3433 ], [ 3.2337, 43.3434 ], [ 3.2338, 43.3435 ], [ 3.2338, 43.3436 ], [ 3.2339, 43.3438 ], [ 3.234, 43.3442 ], [ 3.2341, 43.3447 ], [ 3.2341, 43.3448 ], [ 3.234, 43.3454 ], [ 3.2339, 43.3456 ], [ 3.2339, 43.3457 ], [ 3.2338, 43.3459 ], [ 3.2338, 43.3461 ], [ 3.2335, 43.3465 ], [ 3.2331, 43.347 ], [ 3.2335, 43.3471 ], [ 3.2342, 43.3474 ], [ 3.2343, 43.3475 ], [ 3.2355, 43.348 ], [ 3.2354, 43.3481 ], [ 3.2352, 43.3483 ], [ 3.235, 43.3486 ], [ 3.2348, 43.349 ], [ 3.2344, 43.3497 ], [ 3.2341, 43.35 ], [ 3.2338, 43.3504 ], [ 3.2335, 43.3508 ], [ 3.2334, 43.351 ], [ 3.2335, 43.3511 ], [ 3.2333, 43.3514 ], [ 3.2333, 43.3514 ], [ 3.2333, 43.3515 ], [ 3.2333, 43.3515 ], [ 3.2337, 43.3517 ], [ 3.2338, 43.3517 ], [ 3.2339, 43.3517 ], [ 3.234, 43.3517 ], [ 3.2342, 43.3514 ], [ 3.2343, 43.3514 ], [ 3.235, 43.3517 ], [ 3.2351, 43.3517 ], [ 3.2352, 43.3518 ], [ 3.2353, 43.352 ], [ 3.2355, 43.3521 ], [ 3.2356, 43.3519 ], [ 3.2362, 43.3522 ], [ 3.237, 43.3525 ], [ 3.2374, 43.3527 ], [ 3.2374, 43.3527 ], [ 3.2375, 43.3526 ], [ 3.2377, 43.3523 ], [ 3.2379, 43.3521 ], [ 3.2378, 43.352 ], [ 3.2371, 43.3517 ], [ 3.2373, 43.3515 ], [ 3.2378, 43.3508 ], [ 3.2383, 43.3502 ], [ 3.2389, 43.3504 ], [ 3.239, 43.3504 ], [ 3.2392, 43.3504 ], [ 3.2392, 43.3504 ], [ 3.2393, 43.3502 ] ] ], "type": "Polygon" }, "id": "16", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034002", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Iranget Grangette" }, "type": "Feature" }, { "bbox": [ 4.6382, 43.8051, 4.6484, 43.8134 ], "geometry": { "coordinates": [ [ [ 4.6387, 43.8096 ], [ 4.6393, 43.8096 ], [ 4.6398, 43.8096 ], [ 4.64, 43.8096 ], [ 4.6401, 43.8096 ], [ 4.6403, 43.8096 ], [ 4.6404, 43.8097 ], [ 4.6407, 43.8097 ], [ 4.6413, 43.8097 ], [ 4.6415, 43.8097 ], [ 4.6424, 43.8097 ], [ 4.6429, 43.8097 ], [ 4.6431, 43.8097 ], [ 4.6432, 43.8102 ], [ 4.6432, 43.8103 ], [ 4.6433, 43.8105 ], [ 4.6426, 43.8105 ], [ 4.6421, 43.8104 ], [ 4.6418, 43.8104 ], [ 4.6417, 43.8104 ], [ 4.6416, 43.8105 ], [ 4.6414, 43.8107 ], [ 4.6411, 43.8108 ], [ 4.641, 43.8109 ], [ 4.6409, 43.8109 ], [ 4.6408, 43.8109 ], [ 4.6407, 43.8109 ], [ 4.6405, 43.8108 ], [ 4.6404, 43.8108 ], [ 4.6404, 43.8108 ], [ 4.6407, 43.8111 ], [ 4.6413, 43.8115 ], [ 4.6414, 43.8117 ], [ 4.6413, 43.8119 ], [ 4.6413, 43.8121 ], [ 4.6413, 43.8122 ], [ 4.6411, 43.8126 ], [ 4.6409, 43.8128 ], [ 4.6408, 43.8129 ], [ 4.6408, 43.813 ], [ 4.6408, 43.8131 ], [ 4.6411, 43.8132 ], [ 4.6411, 43.8132 ], [ 4.6412, 43.8132 ], [ 4.6413, 43.8132 ], [ 4.6414, 43.8132 ], [ 4.6414, 43.8133 ], [ 4.6414, 43.8133 ], [ 4.6415, 43.8133 ], [ 4.6417, 43.8134 ], [ 4.6418, 43.8134 ], [ 4.642, 43.8132 ], [ 4.642, 43.8128 ], [ 4.642, 43.8128 ], [ 4.6421, 43.8126 ], [ 4.6422, 43.8126 ], [ 4.6422, 43.8126 ], [ 4.6417, 43.8122 ], [ 4.6416, 43.8122 ], [ 4.6417, 43.8122 ], [ 4.6414, 43.8121 ], [ 4.6414, 43.8119 ], [ 4.6415, 43.8117 ], [ 4.6417, 43.812 ], [ 4.6418, 43.812 ], [ 4.6423, 43.8123 ], [ 4.6426, 43.8125 ], [ 4.6427, 43.8125 ], [ 4.6428, 43.8125 ], [ 4.6429, 43.8126 ], [ 4.644, 43.8115 ], [ 4.6442, 43.8113 ], [ 4.6444, 43.8112 ], [ 4.6456, 43.81 ], [ 4.6457, 43.8099 ], [ 4.6458, 43.8099 ], [ 4.6462, 43.8097 ], [ 4.6461, 43.8096 ], [ 4.6462, 43.8096 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8094 ], [ 4.6465, 43.8088 ], [ 4.6466, 43.8085 ], [ 4.6466, 43.8084 ], [ 4.6467, 43.8082 ], [ 4.6467, 43.8082 ], [ 4.6475, 43.8075 ], [ 4.6475, 43.8075 ], [ 4.6477, 43.8074 ], [ 4.6477, 43.8073 ], [ 4.6478, 43.8072 ], [ 4.6481, 43.8066 ], [ 4.6482, 43.8063 ], [ 4.6483, 43.806 ], [ 4.6484, 43.8056 ], [ 4.6483, 43.8051 ], [ 4.6472, 43.8052 ], [ 4.6469, 43.8053 ], [ 4.6468, 43.8053 ], [ 4.6467, 43.8052 ], [ 4.6465, 43.8053 ], [ 4.6461, 43.8053 ], [ 4.6453, 43.8055 ], [ 4.6445, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6422, 43.8059 ], [ 4.6419, 43.806 ], [ 4.6418, 43.806 ], [ 4.6417, 43.806 ], [ 4.6416, 43.806 ], [ 4.6415, 43.806 ], [ 4.641, 43.8061 ], [ 4.6403, 43.8062 ], [ 4.6395, 43.8063 ], [ 4.6388, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6386, 43.8064 ], [ 4.6385, 43.8065 ], [ 4.6385, 43.8065 ], [ 4.6384, 43.8066 ], [ 4.6384, 43.8066 ], [ 4.6384, 43.8067 ], [ 4.6383, 43.8068 ], [ 4.6383, 43.8068 ], [ 4.6383, 43.8069 ], [ 4.6382, 43.807 ], [ 4.6382, 43.8071 ], [ 4.6383, 43.8076 ], [ 4.6383, 43.8081 ], [ 4.6385, 43.809 ], [ 4.6386, 43.8094 ], [ 4.6386, 43.8096 ], [ 4.6387, 43.8096 ] ] ], "type": "Polygon" }, "id": "17", "properties": { "code_commune": "30032", "code_departement": "30", "code_qp": "QP030013", "commune_qp": "Beaucaire", "nom_commune": "Beaucaire", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 4.0674, 44.1171, 4.0918, 44.1538 ], "geometry": { "coordinates": [ [ [ 4.0918, 44.1425 ], [ 4.0916, 44.1424 ], [ 4.0914, 44.1423 ], [ 4.0912, 44.1421 ], [ 4.091, 44.142 ], [ 4.0908, 44.1419 ], [ 4.0907, 44.1418 ], [ 4.0906, 44.1417 ], [ 4.0903, 44.1414 ], [ 4.0898, 44.1409 ], [ 4.0895, 44.1406 ], [ 4.089, 44.1403 ], [ 4.0886, 44.14 ], [ 4.0886, 44.14 ], [ 4.0884, 44.1399 ], [ 4.0883, 44.1398 ], [ 4.088, 44.1397 ], [ 4.0879, 44.1396 ], [ 4.0869, 44.1391 ], [ 4.0864, 44.1389 ], [ 4.0856, 44.1384 ], [ 4.0854, 44.1382 ], [ 4.0851, 44.138 ], [ 4.0847, 44.1377 ], [ 4.0846, 44.1377 ], [ 4.0845, 44.1377 ], [ 4.0843, 44.1377 ], [ 4.084, 44.1375 ], [ 4.084, 44.1373 ], [ 4.084, 44.1372 ], [ 4.084, 44.1371 ], [ 4.0838, 44.1364 ], [ 4.0837, 44.1363 ], [ 4.0837, 44.1362 ], [ 4.0835, 44.1355 ], [ 4.0835, 44.1354 ], [ 4.0836, 44.1353 ], [ 4.0835, 44.1351 ], [ 4.0841, 44.1351 ], [ 4.084, 44.135 ], [ 4.0841, 44.135 ], [ 4.0841, 44.1349 ], [ 4.0842, 44.1348 ], [ 4.0843, 44.1347 ], [ 4.0844, 44.1347 ], [ 4.0845, 44.1346 ], [ 4.0846, 44.1346 ], [ 4.0849, 44.1345 ], [ 4.085, 44.1344 ], [ 4.0851, 44.1343 ], [ 4.0851, 44.1342 ], [ 4.0852, 44.1341 ], [ 4.0853, 44.1341 ], [ 4.0853, 44.1341 ], [ 4.0853, 44.134 ], [ 4.0854, 44.134 ], [ 4.0854, 44.134 ], [ 4.0854, 44.1339 ], [ 4.0855, 44.1339 ], [ 4.0856, 44.1338 ], [ 4.0856, 44.1337 ], [ 4.0858, 44.1335 ], [ 4.0856, 44.1335 ], [ 4.0858, 44.1333 ], [ 4.0856, 44.1331 ], [ 4.0856, 44.133 ], [ 4.0854, 44.1328 ], [ 4.0854, 44.1328 ], [ 4.0855, 44.1328 ], [ 4.0852, 44.1324 ], [ 4.0849, 44.1325 ], [ 4.0845, 44.1326 ], [ 4.0841, 44.1327 ], [ 4.084, 44.1327 ], [ 4.0839, 44.1327 ], [ 4.0837, 44.1327 ], [ 4.0831, 44.1326 ], [ 4.083, 44.1326 ], [ 4.083, 44.1325 ], [ 4.0829, 44.1324 ], [ 4.0829, 44.1323 ], [ 4.0828, 44.1323 ], [ 4.0826, 44.132 ], [ 4.0825, 44.1319 ], [ 4.0824, 44.1318 ], [ 4.0824, 44.1318 ], [ 4.0823, 44.1318 ], [ 4.0821, 44.1317 ], [ 4.0819, 44.1316 ], [ 4.0818, 44.1315 ], [ 4.0818, 44.1316 ], [ 4.0816, 44.1316 ], [ 4.0814, 44.1317 ], [ 4.0814, 44.1317 ], [ 4.0813, 44.1316 ], [ 4.0812, 44.1316 ], [ 4.0812, 44.1316 ], [ 4.0811, 44.1316 ], [ 4.081, 44.1314 ], [ 4.0808, 44.1313 ], [ 4.0807, 44.1312 ], [ 4.0807, 44.1311 ], [ 4.0806, 44.131 ], [ 4.0806, 44.1308 ], [ 4.0805, 44.1307 ], [ 4.0805, 44.1304 ], [ 4.0805, 44.1303 ], [ 4.0805, 44.1302 ], [ 4.0804, 44.1301 ], [ 4.0804, 44.13 ], [ 4.0802, 44.1299 ], [ 4.0803, 44.1298 ], [ 4.0803, 44.1296 ], [ 4.0804, 44.1295 ], [ 4.0804, 44.1294 ], [ 4.0804, 44.1294 ], [ 4.0802, 44.1295 ], [ 4.0802, 44.1295 ], [ 4.0798, 44.1292 ], [ 4.0797, 44.1291 ], [ 4.0796, 44.1291 ], [ 4.0796, 44.129 ], [ 4.0794, 44.1289 ], [ 4.0793, 44.1288 ], [ 4.0793, 44.1287 ], [ 4.0792, 44.1286 ], [ 4.0792, 44.1285 ], [ 4.0791, 44.1285 ], [ 4.0791, 44.1283 ], [ 4.079, 44.1281 ], [ 4.0791, 44.1279 ], [ 4.0792, 44.1274 ], [ 4.0792, 44.1274 ], [ 4.0792, 44.1273 ], [ 4.0795, 44.1269 ], [ 4.0797, 44.1267 ], [ 4.0797, 44.1266 ], [ 4.0798, 44.1265 ], [ 4.0799, 44.1263 ], [ 4.0799, 44.1262 ], [ 4.0801, 44.125 ], [ 4.0802, 44.1246 ], [ 4.0802, 44.1245 ], [ 4.0803, 44.124 ], [ 4.0804, 44.1239 ], [ 4.0805, 44.1238 ], [ 4.0806, 44.1237 ], [ 4.0816, 44.1236 ], [ 4.0819, 44.1236 ], [ 4.0821, 44.1236 ], [ 4.0822, 44.1236 ], [ 4.0823, 44.1236 ], [ 4.0825, 44.1236 ], [ 4.0828, 44.1236 ], [ 4.0829, 44.1236 ], [ 4.083, 44.1234 ], [ 4.0832, 44.1229 ], [ 4.0834, 44.1225 ], [ 4.0846, 44.1228 ], [ 4.0847, 44.1227 ], [ 4.0847, 44.1219 ], [ 4.0847, 44.1213 ], [ 4.0845, 44.1213 ], [ 4.0845, 44.1213 ], [ 4.0843, 44.1213 ], [ 4.0841, 44.1213 ], [ 4.0839, 44.1212 ], [ 4.0836, 44.1212 ], [ 4.0834, 44.1212 ], [ 4.0831, 44.1212 ], [ 4.0828, 44.1212 ], [ 4.0825, 44.1212 ], [ 4.0822, 44.1212 ], [ 4.0819, 44.1212 ], [ 4.0816, 44.1212 ], [ 4.0815, 44.1212 ], [ 4.0815, 44.1213 ], [ 4.0809, 44.1214 ], [ 4.0806, 44.1213 ], [ 4.0805, 44.1199 ], [ 4.0805, 44.1196 ], [ 4.0805, 44.1196 ], [ 4.0804, 44.1196 ], [ 4.0803, 44.1196 ], [ 4.0802, 44.1193 ], [ 4.0801, 44.1192 ], [ 4.0802, 44.1191 ], [ 4.0804, 44.1189 ], [ 4.0809, 44.1187 ], [ 4.0807, 44.1184 ], [ 4.0805, 44.1183 ], [ 4.0805, 44.1182 ], [ 4.0804, 44.1182 ], [ 4.0806, 44.1179 ], [ 4.0804, 44.1178 ], [ 4.0804, 44.1178 ], [ 4.0806, 44.1176 ], [ 4.0808, 44.1174 ], [ 4.0807, 44.1173 ], [ 4.0806, 44.1173 ], [ 4.0805, 44.1173 ], [ 4.0802, 44.1174 ], [ 4.0801, 44.1174 ], [ 4.0799, 44.1174 ], [ 4.0798, 44.1173 ], [ 4.0797, 44.1173 ], [ 4.0796, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.079, 44.1171 ], [ 4.0789, 44.1171 ], [ 4.0789, 44.1172 ], [ 4.0788, 44.1174 ], [ 4.0788, 44.1175 ], [ 4.0788, 44.1176 ], [ 4.0788, 44.1176 ], [ 4.0789, 44.1177 ], [ 4.0793, 44.118 ], [ 4.0794, 44.118 ], [ 4.0794, 44.1181 ], [ 4.0795, 44.1183 ], [ 4.0795, 44.1183 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0793, 44.1185 ], [ 4.0792, 44.1185 ], [ 4.0791, 44.1185 ], [ 4.079, 44.1185 ], [ 4.0788, 44.1186 ], [ 4.0787, 44.1186 ], [ 4.0784, 44.1187 ], [ 4.0782, 44.1187 ], [ 4.0782, 44.1189 ], [ 4.0781, 44.119 ], [ 4.0782, 44.1193 ], [ 4.0782, 44.1194 ], [ 4.0783, 44.1195 ], [ 4.0785, 44.1198 ], [ 4.0784, 44.1198 ], [ 4.0785, 44.12 ], [ 4.0782, 44.121 ], [ 4.078, 44.121 ], [ 4.0773, 44.121 ], [ 4.0768, 44.121 ], [ 4.0767, 44.121 ], [ 4.0765, 44.121 ], [ 4.0763, 44.1211 ], [ 4.076, 44.1212 ], [ 4.0756, 44.1214 ], [ 4.075, 44.1217 ], [ 4.0747, 44.1219 ], [ 4.0741, 44.1223 ], [ 4.0737, 44.1225 ], [ 4.0735, 44.1227 ], [ 4.0733, 44.1228 ], [ 4.0731, 44.123 ], [ 4.073, 44.1231 ], [ 4.0729, 44.1232 ], [ 4.0729, 44.1232 ], [ 4.0728, 44.1234 ], [ 4.0713, 44.1232 ], [ 4.0712, 44.123 ], [ 4.071, 44.1231 ], [ 4.0708, 44.1231 ], [ 4.0708, 44.1232 ], [ 4.0702, 44.1232 ], [ 4.07, 44.1232 ], [ 4.0699, 44.1232 ], [ 4.0699, 44.1232 ], [ 4.0698, 44.1233 ], [ 4.0698, 44.1233 ], [ 4.0697, 44.1233 ], [ 4.0696, 44.1233 ], [ 4.0694, 44.1233 ], [ 4.0693, 44.1233 ], [ 4.0693, 44.1234 ], [ 4.0692, 44.1235 ], [ 4.0692, 44.1236 ], [ 4.0692, 44.1237 ], [ 4.0692, 44.1237 ], [ 4.0692, 44.1238 ], [ 4.0692, 44.1239 ], [ 4.0692, 44.1239 ], [ 4.0692, 44.124 ], [ 4.0692, 44.1241 ], [ 4.0692, 44.1241 ], [ 4.0689, 44.1246 ], [ 4.0688, 44.1246 ], [ 4.0685, 44.1245 ], [ 4.0685, 44.1245 ], [ 4.0684, 44.1245 ], [ 4.0683, 44.1247 ], [ 4.0682, 44.1247 ], [ 4.0681, 44.1248 ], [ 4.068, 44.1248 ], [ 4.068, 44.1248 ], [ 4.068, 44.1249 ], [ 4.0679, 44.1249 ], [ 4.0679, 44.1251 ], [ 4.0679, 44.1251 ], [ 4.0679, 44.1252 ], [ 4.0678, 44.1252 ], [ 4.0677, 44.1253 ], [ 4.0676, 44.1253 ], [ 4.0679, 44.1256 ], [ 4.068, 44.1256 ], [ 4.0683, 44.1259 ], [ 4.0683, 44.1259 ], [ 4.0684, 44.1258 ], [ 4.0683, 44.1259 ], [ 4.0682, 44.126 ], [ 4.0682, 44.126 ], [ 4.0681, 44.1261 ], [ 4.0684, 44.1263 ], [ 4.0684, 44.1263 ], [ 4.0683, 44.1264 ], [ 4.0686, 44.1266 ], [ 4.0688, 44.1265 ], [ 4.069, 44.1264 ], [ 4.0693, 44.1261 ], [ 4.0695, 44.1259 ], [ 4.0698, 44.1256 ], [ 4.0699, 44.1256 ], [ 4.0702, 44.1258 ], [ 4.0703, 44.1258 ], [ 4.0703, 44.1259 ], [ 4.0703, 44.126 ], [ 4.0703, 44.126 ], [ 4.0703, 44.1261 ], [ 4.0703, 44.1262 ], [ 4.0703, 44.1262 ], [ 4.0702, 44.1263 ], [ 4.0702, 44.1264 ], [ 4.0703, 44.1265 ], [ 4.0703, 44.1266 ], [ 4.0703, 44.1266 ], [ 4.0702, 44.1266 ], [ 4.0702, 44.1268 ], [ 4.0701, 44.127 ], [ 4.0701, 44.1271 ], [ 4.0701, 44.1272 ], [ 4.0701, 44.1272 ], [ 4.0701, 44.1272 ], [ 4.0702, 44.1273 ], [ 4.0703, 44.1274 ], [ 4.0703, 44.1275 ], [ 4.0703, 44.1276 ], [ 4.0703, 44.1276 ], [ 4.0704, 44.1279 ], [ 4.0703, 44.1279 ], [ 4.0702, 44.128 ], [ 4.0702, 44.1281 ], [ 4.0704, 44.1282 ], [ 4.0704, 44.1282 ], [ 4.0703, 44.1283 ], [ 4.0703, 44.1284 ], [ 4.0702, 44.1284 ], [ 4.0701, 44.1286 ], [ 4.0701, 44.1285 ], [ 4.07, 44.1287 ], [ 4.0701, 44.1288 ], [ 4.0702, 44.1288 ], [ 4.0702, 44.1289 ], [ 4.0701, 44.1289 ], [ 4.07, 44.1292 ], [ 4.0699, 44.1294 ], [ 4.0698, 44.1293 ], [ 4.0695, 44.1294 ], [ 4.0694, 44.1295 ], [ 4.0693, 44.1295 ], [ 4.0691, 44.1295 ], [ 4.069, 44.1296 ], [ 4.069, 44.1296 ], [ 4.0686, 44.1296 ], [ 4.0684, 44.1297 ], [ 4.0682, 44.1297 ], [ 4.068, 44.1297 ], [ 4.0676, 44.1298 ], [ 4.0676, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.13 ], [ 4.0674, 44.1303 ], [ 4.0674, 44.1304 ], [ 4.0674, 44.1304 ], [ 4.0675, 44.1305 ], [ 4.0676, 44.1305 ], [ 4.0676, 44.1305 ], [ 4.0677, 44.1304 ], [ 4.0679, 44.1303 ], [ 4.068, 44.1303 ], [ 4.0683, 44.1303 ], [ 4.069, 44.1304 ], [ 4.0689, 44.1304 ], [ 4.0689, 44.1305 ], [ 4.0689, 44.1306 ], [ 4.069, 44.1307 ], [ 4.069, 44.1309 ], [ 4.069, 44.1313 ], [ 4.069, 44.1318 ], [ 4.0697, 44.1318 ], [ 4.0699, 44.1318 ], [ 4.0699, 44.1318 ], [ 4.0699, 44.1329 ], [ 4.0704, 44.1329 ], [ 4.0707, 44.133 ], [ 4.0707, 44.133 ], [ 4.0707, 44.1331 ], [ 4.0708, 44.1331 ], [ 4.0708, 44.1331 ], [ 4.0708, 44.1332 ], [ 4.0709, 44.1332 ], [ 4.0712, 44.1332 ], [ 4.0713, 44.1332 ], [ 4.0715, 44.1333 ], [ 4.0717, 44.1334 ], [ 4.0719, 44.1335 ], [ 4.0717, 44.1337 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1342 ], [ 4.0716, 44.1344 ], [ 4.0717, 44.1344 ], [ 4.0717, 44.1345 ], [ 4.0716, 44.1345 ], [ 4.0716, 44.1346 ], [ 4.0715, 44.1346 ], [ 4.0714, 44.1346 ], [ 4.0711, 44.1345 ], [ 4.071, 44.1345 ], [ 4.0709, 44.1345 ], [ 4.071, 44.1347 ], [ 4.0711, 44.1348 ], [ 4.0712, 44.135 ], [ 4.0715, 44.1354 ], [ 4.0715, 44.1356 ], [ 4.0716, 44.1357 ], [ 4.0716, 44.1358 ], [ 4.0716, 44.1359 ], [ 4.0717, 44.136 ], [ 4.0718, 44.1362 ], [ 4.0719, 44.1363 ], [ 4.0721, 44.1362 ], [ 4.0723, 44.136 ], [ 4.0725, 44.1359 ], [ 4.0726, 44.1357 ], [ 4.0727, 44.1356 ], [ 4.0729, 44.1356 ], [ 4.073, 44.1353 ], [ 4.0732, 44.1352 ], [ 4.0733, 44.1352 ], [ 4.0736, 44.135 ], [ 4.0737, 44.135 ], [ 4.0737, 44.1351 ], [ 4.0737, 44.1351 ], [ 4.0737, 44.1351 ], [ 4.0738, 44.1352 ], [ 4.0738, 44.1352 ], [ 4.0742, 44.1355 ], [ 4.0743, 44.1356 ], [ 4.0745, 44.1358 ], [ 4.0745, 44.1358 ], [ 4.0747, 44.1359 ], [ 4.0744, 44.1361 ], [ 4.0742, 44.1365 ], [ 4.0741, 44.1369 ], [ 4.074, 44.1372 ], [ 4.0739, 44.1375 ], [ 4.0739, 44.1377 ], [ 4.0739, 44.1381 ], [ 4.074, 44.1385 ], [ 4.0741, 44.1394 ], [ 4.0743, 44.1401 ], [ 4.0744, 44.1407 ], [ 4.0744, 44.1409 ], [ 4.0744, 44.141 ], [ 4.0744, 44.1412 ], [ 4.0745, 44.1414 ], [ 4.0746, 44.1418 ], [ 4.0749, 44.1422 ], [ 4.0749, 44.1424 ], [ 4.0749, 44.1425 ], [ 4.0749, 44.1425 ], [ 4.0747, 44.143 ], [ 4.0744, 44.1437 ], [ 4.0743, 44.1439 ], [ 4.0742, 44.144 ], [ 4.0741, 44.1441 ], [ 4.074, 44.1442 ], [ 4.0739, 44.1443 ], [ 4.0738, 44.1444 ], [ 4.0735, 44.1445 ], [ 4.0732, 44.1447 ], [ 4.073, 44.1449 ], [ 4.0728, 44.1449 ], [ 4.0727, 44.145 ], [ 4.0725, 44.145 ], [ 4.0721, 44.145 ], [ 4.0721, 44.1451 ], [ 4.0723, 44.1451 ], [ 4.0726, 44.1451 ], [ 4.0727, 44.1451 ], [ 4.0728, 44.1451 ], [ 4.0729, 44.1451 ], [ 4.0729, 44.1451 ], [ 4.073, 44.145 ], [ 4.0731, 44.145 ], [ 4.0732, 44.145 ], [ 4.0734, 44.145 ], [ 4.0737, 44.1449 ], [ 4.0739, 44.1448 ], [ 4.0741, 44.1447 ], [ 4.0742, 44.1446 ], [ 4.0743, 44.1447 ], [ 4.0745, 44.1445 ], [ 4.0747, 44.1444 ], [ 4.0747, 44.1444 ], [ 4.0756, 44.1438 ], [ 4.0758, 44.1437 ], [ 4.076, 44.1435 ], [ 4.0762, 44.1433 ], [ 4.0763, 44.1432 ], [ 4.0766, 44.1428 ], [ 4.0769, 44.1423 ], [ 4.0771, 44.1419 ], [ 4.078, 44.1398 ], [ 4.0782, 44.1394 ], [ 4.0779, 44.1395 ], [ 4.0776, 44.1395 ], [ 4.0775, 44.1394 ], [ 4.0775, 44.1393 ], [ 4.0778, 44.1388 ], [ 4.0774, 44.1388 ], [ 4.0774, 44.1385 ], [ 4.0769, 44.1383 ], [ 4.0771, 44.138 ], [ 4.0772, 44.1377 ], [ 4.0773, 44.1375 ], [ 4.0773, 44.1373 ], [ 4.0774, 44.1369 ], [ 4.0773, 44.1365 ], [ 4.0771, 44.1364 ], [ 4.0766, 44.1362 ], [ 4.0764, 44.1362 ], [ 4.0761, 44.136 ], [ 4.0753, 44.1354 ], [ 4.0755, 44.1351 ], [ 4.0758, 44.1349 ], [ 4.0762, 44.1347 ], [ 4.0764, 44.1346 ], [ 4.077, 44.1343 ], [ 4.0783, 44.1337 ], [ 4.0786, 44.134 ], [ 4.0786, 44.1341 ], [ 4.0788, 44.1344 ], [ 4.0792, 44.135 ], [ 4.0795, 44.1355 ], [ 4.0797, 44.1357 ], [ 4.0798, 44.136 ], [ 4.08, 44.1371 ], [ 4.08, 44.1375 ], [ 4.08, 44.1383 ], [ 4.0799, 44.1385 ], [ 4.0798, 44.1389 ], [ 4.0798, 44.1391 ], [ 4.0804, 44.1392 ], [ 4.0808, 44.1396 ], [ 4.0811, 44.1395 ], [ 4.0813, 44.1393 ], [ 4.0813, 44.1393 ], [ 4.0814, 44.1393 ], [ 4.082, 44.1394 ], [ 4.0822, 44.1395 ], [ 4.0825, 44.1397 ], [ 4.0828, 44.1398 ], [ 4.0832, 44.1399 ], [ 4.0835, 44.1401 ], [ 4.0835, 44.1402 ], [ 4.0835, 44.1403 ], [ 4.0837, 44.1403 ], [ 4.084, 44.1405 ], [ 4.0842, 44.1406 ], [ 4.0847, 44.1406 ], [ 4.0847, 44.1407 ], [ 4.0846, 44.1409 ], [ 4.0841, 44.1416 ], [ 4.0838, 44.1418 ], [ 4.0837, 44.1419 ], [ 4.0836, 44.1421 ], [ 4.0833, 44.1429 ], [ 4.0833, 44.143 ], [ 4.0833, 44.1431 ], [ 4.0833, 44.1435 ], [ 4.0833, 44.1436 ], [ 4.0832, 44.1437 ], [ 4.0831, 44.1438 ], [ 4.0829, 44.1441 ], [ 4.0825, 44.1445 ], [ 4.0824, 44.1448 ], [ 4.0823, 44.1449 ], [ 4.0823, 44.1449 ], [ 4.0822, 44.1453 ], [ 4.0822, 44.1454 ], [ 4.0822, 44.1454 ], [ 4.0822, 44.1455 ], [ 4.0822, 44.1455 ], [ 4.082, 44.1458 ], [ 4.0819, 44.1459 ], [ 4.0818, 44.1459 ], [ 4.0811, 44.1462 ], [ 4.0809, 44.1463 ], [ 4.0809, 44.1464 ], [ 4.0807, 44.1471 ], [ 4.0807, 44.1473 ], [ 4.0806, 44.1477 ], [ 4.0807, 44.1477 ], [ 4.0806, 44.148 ], [ 4.0808, 44.148 ], [ 4.0807, 44.1484 ], [ 4.0802, 44.1484 ], [ 4.0801, 44.1489 ], [ 4.0799, 44.1489 ], [ 4.0794, 44.149 ], [ 4.0794, 44.1491 ], [ 4.0795, 44.1492 ], [ 4.0796, 44.1494 ], [ 4.0798, 44.1497 ], [ 4.0803, 44.1496 ], [ 4.0804, 44.1499 ], [ 4.0804, 44.15 ], [ 4.0806, 44.1504 ], [ 4.0809, 44.1504 ], [ 4.0809, 44.1504 ], [ 4.0809, 44.1506 ], [ 4.0809, 44.1509 ], [ 4.0809, 44.1509 ], [ 4.0809, 44.1511 ], [ 4.081, 44.1514 ], [ 4.081, 44.1515 ], [ 4.0813, 44.1514 ], [ 4.0816, 44.1513 ], [ 4.0817, 44.1512 ], [ 4.0817, 44.1513 ], [ 4.0821, 44.1517 ], [ 4.0826, 44.152 ], [ 4.0826, 44.1521 ], [ 4.083, 44.1524 ], [ 4.0831, 44.1524 ], [ 4.0836, 44.1532 ], [ 4.0834, 44.1533 ], [ 4.0836, 44.1537 ], [ 4.0837, 44.1538 ], [ 4.0839, 44.1536 ], [ 4.0841, 44.1535 ], [ 4.0843, 44.1534 ], [ 4.0845, 44.1532 ], [ 4.0848, 44.1531 ], [ 4.0849, 44.153 ], [ 4.0849, 44.153 ], [ 4.085, 44.1529 ], [ 4.0849, 44.1528 ], [ 4.0849, 44.1527 ], [ 4.0848, 44.1527 ], [ 4.0847, 44.1525 ], [ 4.084, 44.1521 ], [ 4.0841, 44.1516 ], [ 4.0838, 44.1515 ], [ 4.0839, 44.151 ], [ 4.0838, 44.1507 ], [ 4.0838, 44.1504 ], [ 4.0836, 44.1502 ], [ 4.0836, 44.1502 ], [ 4.0835, 44.1502 ], [ 4.0835, 44.1502 ], [ 4.0834, 44.1502 ], [ 4.0833, 44.1502 ], [ 4.0832, 44.1498 ], [ 4.0831, 44.1495 ], [ 4.0831, 44.1494 ], [ 4.083, 44.1492 ], [ 4.083, 44.1492 ], [ 4.0829, 44.1492 ], [ 4.0829, 44.1491 ], [ 4.0829, 44.1491 ], [ 4.0828, 44.149 ], [ 4.0823, 44.149 ], [ 4.0821, 44.1491 ], [ 4.0821, 44.149 ], [ 4.0822, 44.1489 ], [ 4.0818, 44.1488 ], [ 4.0816, 44.1488 ], [ 4.0817, 44.1486 ], [ 4.0819, 44.148 ], [ 4.082, 44.1479 ], [ 4.0821, 44.148 ], [ 4.0822, 44.148 ], [ 4.0824, 44.148 ], [ 4.0824, 44.1479 ], [ 4.0825, 44.1475 ], [ 4.0825, 44.1475 ], [ 4.0827, 44.1475 ], [ 4.0828, 44.1475 ], [ 4.0833, 44.1475 ], [ 4.0833, 44.1474 ], [ 4.0833, 44.1474 ], [ 4.0834, 44.1473 ], [ 4.0835, 44.1472 ], [ 4.0837, 44.147 ], [ 4.084, 44.1467 ], [ 4.0843, 44.1465 ], [ 4.0838, 44.1463 ], [ 4.0839, 44.1462 ], [ 4.0839, 44.1462 ], [ 4.0843, 44.1459 ], [ 4.0844, 44.1459 ], [ 4.0845, 44.1458 ], [ 4.0845, 44.1457 ], [ 4.0845, 44.1455 ], [ 4.0851, 44.1455 ], [ 4.0851, 44.1454 ], [ 4.085, 44.1452 ], [ 4.0851, 44.1452 ], [ 4.0851, 44.145 ], [ 4.0851, 44.1446 ], [ 4.0858, 44.1443 ], [ 4.0861, 44.1439 ], [ 4.0865, 44.1439 ], [ 4.087, 44.1439 ], [ 4.0877, 44.1439 ], [ 4.0883, 44.1439 ], [ 4.0886, 44.1439 ], [ 4.0887, 44.1439 ], [ 4.0887, 44.1441 ], [ 4.0887, 44.1445 ], [ 4.0891, 44.1445 ], [ 4.0894, 44.1443 ], [ 4.0894, 44.1442 ], [ 4.0897, 44.1441 ], [ 4.0898, 44.144 ], [ 4.0899, 44.144 ], [ 4.0901, 44.144 ], [ 4.0905, 44.1437 ], [ 4.0905, 44.1437 ], [ 4.0906, 44.1437 ], [ 4.0907, 44.1437 ], [ 4.0909, 44.1436 ], [ 4.091, 44.1436 ], [ 4.091, 44.1436 ], [ 4.0911, 44.1436 ], [ 4.0911, 44.1435 ], [ 4.0912, 44.1435 ], [ 4.0912, 44.1434 ], [ 4.0913, 44.1433 ], [ 4.0913, 44.1433 ], [ 4.0915, 44.143 ], [ 4.0917, 44.1428 ], [ 4.0918, 44.1426 ], [ 4.0918, 44.1425 ] ] ], "type": "Polygon" }, "id": "18", "properties": { "code_commune": "30007", "code_departement": "30", "code_qp": "QP030001", "commune_qp": "Alès", "nom_commune": "Alès", "nom_qp": "Près Saint Jean - Cévennes - Tamaris - Cauvel-la Royale - Rochebelle - Centre ville" }, "type": "Feature" }, { "bbox": [ 4.3733, 43.8361, 4.3789, 43.8394 ], "geometry": { "coordinates": [ [ [ 4.3741, 43.8372 ], [ 4.3741, 43.8372 ], [ 4.374, 43.8372 ], [ 4.3739, 43.8373 ], [ 4.3738, 43.8375 ], [ 4.3737, 43.8377 ], [ 4.3733, 43.8383 ], [ 4.3745, 43.8382 ], [ 4.3752, 43.8381 ], [ 4.3753, 43.838 ], [ 4.3752, 43.8381 ], [ 4.3748, 43.8384 ], [ 4.3745, 43.8387 ], [ 4.3741, 43.839 ], [ 4.3746, 43.8391 ], [ 4.375, 43.8391 ], [ 4.3756, 43.8386 ], [ 4.3757, 43.8386 ], [ 4.3756, 43.838 ], [ 4.376, 43.838 ], [ 4.3762, 43.8376 ], [ 4.3765, 43.8374 ], [ 4.3768, 43.8375 ], [ 4.3767, 43.838 ], [ 4.3768, 43.838 ], [ 4.377, 43.8385 ], [ 4.377, 43.8388 ], [ 4.3771, 43.8394 ], [ 4.3773, 43.8394 ], [ 4.3777, 43.8394 ], [ 4.3777, 43.8391 ], [ 4.3781, 43.839 ], [ 4.3777, 43.8383 ], [ 4.378, 43.8382 ], [ 4.3778, 43.8379 ], [ 4.3779, 43.8379 ], [ 4.3789, 43.8378 ], [ 4.3788, 43.8367 ], [ 4.3784, 43.8369 ], [ 4.3781, 43.8371 ], [ 4.3776, 43.8366 ], [ 4.3774, 43.8363 ], [ 4.3768, 43.8369 ], [ 4.3764, 43.8372 ], [ 4.3759, 43.837 ], [ 4.376, 43.8369 ], [ 4.3761, 43.8368 ], [ 4.3764, 43.8365 ], [ 4.3762, 43.8364 ], [ 4.3758, 43.8361 ], [ 4.3739, 43.8369 ], [ 4.3741, 43.8372 ] ] ], "type": "Polygon" }, "id": "19", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030007", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Route De Beaucaire" }, "type": "Feature" }, { "bbox": [ 1.3974, 43.592, 1.4081, 43.5977 ], "geometry": { "coordinates": [ [ [ 1.4005, 43.5923 ], [ 1.3994, 43.592 ], [ 1.3994, 43.592 ], [ 1.3993, 43.5921 ], [ 1.3992, 43.5922 ], [ 1.3991, 43.5923 ], [ 1.3989, 43.5928 ], [ 1.3984, 43.5935 ], [ 1.3983, 43.5938 ], [ 1.3982, 43.5945 ], [ 1.398, 43.5944 ], [ 1.3979, 43.5947 ], [ 1.3978, 43.5948 ], [ 1.3977, 43.5953 ], [ 1.3977, 43.5954 ], [ 1.3976, 43.5959 ], [ 1.3975, 43.596 ], [ 1.3976, 43.596 ], [ 1.3976, 43.5962 ], [ 1.3976, 43.5963 ], [ 1.3975, 43.5967 ], [ 1.3974, 43.5972 ], [ 1.3974, 43.5977 ], [ 1.3975, 43.5975 ], [ 1.3976, 43.5975 ], [ 1.3977, 43.5974 ], [ 1.3977, 43.5974 ], [ 1.3982, 43.5971 ], [ 1.3987, 43.5969 ], [ 1.3991, 43.5967 ], [ 1.3992, 43.5967 ], [ 1.3993, 43.5967 ], [ 1.4, 43.5968 ], [ 1.4002, 43.5969 ], [ 1.4002, 43.5969 ], [ 1.4004, 43.5966 ], [ 1.4005, 43.5962 ], [ 1.4006, 43.5962 ], [ 1.4006, 43.5962 ], [ 1.4007, 43.5961 ], [ 1.4011, 43.5961 ], [ 1.4012, 43.5961 ], [ 1.4013, 43.5961 ], [ 1.4023, 43.5961 ], [ 1.4025, 43.5961 ], [ 1.403, 43.5965 ], [ 1.4038, 43.5965 ], [ 1.4039, 43.5959 ], [ 1.404, 43.5954 ], [ 1.4042, 43.5954 ], [ 1.4043, 43.5952 ], [ 1.4045, 43.5951 ], [ 1.4047, 43.5949 ], [ 1.4054, 43.5945 ], [ 1.4058, 43.5944 ], [ 1.4058, 43.5944 ], [ 1.4069, 43.5939 ], [ 1.4077, 43.5938 ], [ 1.4078, 43.5937 ], [ 1.4078, 43.5937 ], [ 1.4081, 43.5936 ], [ 1.4079, 43.5936 ], [ 1.407, 43.5934 ], [ 1.4043, 43.5929 ], [ 1.402, 43.5925 ], [ 1.4019, 43.5925 ], [ 1.4016, 43.5925 ], [ 1.4005, 43.5923 ] ] ], "type": "Polygon" }, "id": "20", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031012", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Cépière Beauregard" }, "type": "Feature" }, { "bbox": [ 4.3709, 43.825, 4.3853, 43.834 ], "geometry": { "coordinates": [ [ [ 4.3811, 43.8269 ], [ 4.3805, 43.8276 ], [ 4.3816, 43.8281 ], [ 4.3818, 43.8282 ], [ 4.3826, 43.8285 ], [ 4.3822, 43.8289 ], [ 4.3813, 43.8285 ], [ 4.3809, 43.829 ], [ 4.3805, 43.8294 ], [ 4.3802, 43.8298 ], [ 4.3798, 43.8297 ], [ 4.3795, 43.8295 ], [ 4.3793, 43.8293 ], [ 4.379, 43.8292 ], [ 4.3785, 43.8288 ], [ 4.3783, 43.8286 ], [ 4.378, 43.8288 ], [ 4.3776, 43.8287 ], [ 4.3772, 43.8285 ], [ 4.3771, 43.8285 ], [ 4.3771, 43.8284 ], [ 4.3773, 43.8283 ], [ 4.3776, 43.8279 ], [ 4.3768, 43.8273 ], [ 4.3771, 43.8271 ], [ 4.3768, 43.8267 ], [ 4.3766, 43.8268 ], [ 4.3765, 43.8266 ], [ 4.3764, 43.8267 ], [ 4.3763, 43.8267 ], [ 4.3761, 43.8265 ], [ 4.376, 43.8266 ], [ 4.3752, 43.827 ], [ 4.375, 43.8273 ], [ 4.3745, 43.8273 ], [ 4.3743, 43.8272 ], [ 4.3741, 43.827 ], [ 4.3735, 43.8266 ], [ 4.3745, 43.8257 ], [ 4.3734, 43.8251 ], [ 4.3733, 43.8251 ], [ 4.3732, 43.8251 ], [ 4.3731, 43.8253 ], [ 4.3722, 43.826 ], [ 4.3721, 43.826 ], [ 4.3719, 43.8261 ], [ 4.3717, 43.8264 ], [ 4.3717, 43.8265 ], [ 4.3718, 43.8266 ], [ 4.3718, 43.8267 ], [ 4.3717, 43.8268 ], [ 4.3717, 43.8268 ], [ 4.3717, 43.8268 ], [ 4.3719, 43.8269 ], [ 4.372, 43.827 ], [ 4.3719, 43.8271 ], [ 4.3719, 43.8272 ], [ 4.3718, 43.8273 ], [ 4.3716, 43.8274 ], [ 4.3716, 43.8274 ], [ 4.3713, 43.8275 ], [ 4.3711, 43.8276 ], [ 4.3709, 43.8277 ], [ 4.3712, 43.8279 ], [ 4.3715, 43.8277 ], [ 4.3717, 43.8278 ], [ 4.3719, 43.8278 ], [ 4.3721, 43.8276 ], [ 4.3724, 43.8278 ], [ 4.3732, 43.8283 ], [ 4.3742, 43.8277 ], [ 4.3743, 43.8276 ], [ 4.3743, 43.8275 ], [ 4.3744, 43.8275 ], [ 4.3748, 43.8275 ], [ 4.3752, 43.8275 ], [ 4.3756, 43.8277 ], [ 4.376, 43.828 ], [ 4.3787, 43.8296 ], [ 4.3793, 43.8299 ], [ 4.3801, 43.8304 ], [ 4.3796, 43.8309 ], [ 4.379, 43.8306 ], [ 4.3783, 43.8312 ], [ 4.3803, 43.8323 ], [ 4.3802, 43.8325 ], [ 4.3801, 43.8326 ], [ 4.3799, 43.833 ], [ 4.3798, 43.8331 ], [ 4.3809, 43.8337 ], [ 4.3815, 43.834 ], [ 4.3828, 43.8331 ], [ 4.3837, 43.8336 ], [ 4.384, 43.8332 ], [ 4.3834, 43.8328 ], [ 4.3823, 43.8321 ], [ 4.3825, 43.8319 ], [ 4.3818, 43.8316 ], [ 4.3812, 43.8313 ], [ 4.3811, 43.8312 ], [ 4.3817, 43.8308 ], [ 4.3819, 43.8306 ], [ 4.3825, 43.8299 ], [ 4.3827, 43.8297 ], [ 4.3819, 43.8294 ], [ 4.382, 43.8293 ], [ 4.382, 43.8293 ], [ 4.3826, 43.8291 ], [ 4.3831, 43.8288 ], [ 4.3832, 43.8287 ], [ 4.3836, 43.8284 ], [ 4.384, 43.8279 ], [ 4.3844, 43.8273 ], [ 4.3849, 43.8268 ], [ 4.3853, 43.8264 ], [ 4.385, 43.8264 ], [ 4.3848, 43.8264 ], [ 4.3845, 43.8263 ], [ 4.384, 43.8261 ], [ 4.3835, 43.8259 ], [ 4.3827, 43.8255 ], [ 4.3818, 43.8251 ], [ 4.3816, 43.825 ], [ 4.3814, 43.825 ], [ 4.3813, 43.8251 ], [ 4.3813, 43.8253 ], [ 4.3814, 43.8253 ], [ 4.3821, 43.8257 ], [ 4.382, 43.8258 ], [ 4.3816, 43.8264 ], [ 4.3811, 43.8269 ] ] ], "type": "Polygon" }, "id": "21", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030008", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Némausus-Jonquilles - Haute Magaille - Oliviers" }, "type": "Feature" }, { "bbox": [ 2.3249, 43.2066, 2.3357, 43.2114 ], "geometry": { "coordinates": [ [ [ 2.3351, 43.21 ], [ 2.335, 43.2098 ], [ 2.335, 43.2095 ], [ 2.3357, 43.2094 ], [ 2.3357, 43.2092 ], [ 2.3356, 43.2089 ], [ 2.3351, 43.2089 ], [ 2.335, 43.2089 ], [ 2.335, 43.2088 ], [ 2.335, 43.2087 ], [ 2.335, 43.2085 ], [ 2.335, 43.2081 ], [ 2.3349, 43.208 ], [ 2.3339, 43.2081 ], [ 2.3332, 43.2083 ], [ 2.3324, 43.2084 ], [ 2.3321, 43.2085 ], [ 2.3321, 43.2081 ], [ 2.3317, 43.2082 ], [ 2.3305, 43.2082 ], [ 2.3303, 43.2082 ], [ 2.3302, 43.2082 ], [ 2.3296, 43.2083 ], [ 2.3289, 43.2083 ], [ 2.3289, 43.2081 ], [ 2.3287, 43.208 ], [ 2.3285, 43.208 ], [ 2.3283, 43.2079 ], [ 2.3279, 43.2076 ], [ 2.3279, 43.2075 ], [ 2.3277, 43.2075 ], [ 2.3276, 43.2075 ], [ 2.3276, 43.2074 ], [ 2.3275, 43.2074 ], [ 2.3272, 43.2072 ], [ 2.327, 43.2071 ], [ 2.3269, 43.207 ], [ 2.3268, 43.2069 ], [ 2.3268, 43.2066 ], [ 2.3264, 43.2066 ], [ 2.3265, 43.2069 ], [ 2.3265, 43.207 ], [ 2.3265, 43.2071 ], [ 2.3265, 43.2073 ], [ 2.3258, 43.2073 ], [ 2.3249, 43.2073 ], [ 2.3251, 43.2074 ], [ 2.3252, 43.2076 ], [ 2.3255, 43.2078 ], [ 2.3258, 43.208 ], [ 2.3262, 43.2083 ], [ 2.3263, 43.2084 ], [ 2.3266, 43.2087 ], [ 2.3272, 43.2092 ], [ 2.3275, 43.2094 ], [ 2.3278, 43.2096 ], [ 2.3281, 43.2099 ], [ 2.3286, 43.2104 ], [ 2.3287, 43.2104 ], [ 2.3293, 43.2109 ], [ 2.3297, 43.2112 ], [ 2.3299, 43.2114 ], [ 2.3304, 43.2113 ], [ 2.3304, 43.2113 ], [ 2.3305, 43.2113 ], [ 2.3305, 43.211 ], [ 2.3304, 43.2095 ], [ 2.3305, 43.2095 ], [ 2.3313, 43.2094 ], [ 2.332, 43.2094 ], [ 2.3324, 43.2094 ], [ 2.3324, 43.21 ], [ 2.3333, 43.2099 ], [ 2.3333, 43.2101 ], [ 2.3338, 43.2101 ], [ 2.3351, 43.21 ] ] ], "type": "Polygon" }, "id": "22", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011003", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Le Viguier - Saint-Jacques" }, "type": "Feature" }, { "bbox": [ 1.3251, 43.6093, 1.3344, 43.6178 ], "geometry": { "coordinates": [ [ [ 1.3338, 43.6133 ], [ 1.3339, 43.6133 ], [ 1.3339, 43.6132 ], [ 1.3338, 43.6131 ], [ 1.3338, 43.613 ], [ 1.3339, 43.6129 ], [ 1.3344, 43.6128 ], [ 1.3342, 43.6123 ], [ 1.3341, 43.6122 ], [ 1.334, 43.6121 ], [ 1.3338, 43.6116 ], [ 1.3337, 43.6115 ], [ 1.3336, 43.6115 ], [ 1.3333, 43.6116 ], [ 1.3333, 43.6117 ], [ 1.3328, 43.6118 ], [ 1.3326, 43.6117 ], [ 1.3324, 43.6117 ], [ 1.3319, 43.6118 ], [ 1.3319, 43.6119 ], [ 1.332, 43.6122 ], [ 1.3319, 43.6123 ], [ 1.3319, 43.6123 ], [ 1.3317, 43.6123 ], [ 1.3315, 43.6123 ], [ 1.3316, 43.6124 ], [ 1.3311, 43.6125 ], [ 1.331, 43.6125 ], [ 1.331, 43.6124 ], [ 1.3309, 43.6123 ], [ 1.3308, 43.6121 ], [ 1.3306, 43.6119 ], [ 1.3293, 43.6109 ], [ 1.3274, 43.6094 ], [ 1.3273, 43.6093 ], [ 1.3272, 43.6093 ], [ 1.3271, 43.6093 ], [ 1.3269, 43.6094 ], [ 1.3267, 43.6094 ], [ 1.3265, 43.6093 ], [ 1.3263, 43.6093 ], [ 1.3262, 43.6093 ], [ 1.3257, 43.6096 ], [ 1.3256, 43.6097 ], [ 1.3256, 43.6099 ], [ 1.3253, 43.6099 ], [ 1.3251, 43.61 ], [ 1.3254, 43.6105 ], [ 1.3256, 43.6107 ], [ 1.3254, 43.6108 ], [ 1.3256, 43.6111 ], [ 1.3256, 43.6111 ], [ 1.3258, 43.611 ], [ 1.3262, 43.6108 ], [ 1.3264, 43.6111 ], [ 1.3265, 43.6114 ], [ 1.3266, 43.6119 ], [ 1.3266, 43.6121 ], [ 1.3267, 43.6122 ], [ 1.3268, 43.6122 ], [ 1.327, 43.6129 ], [ 1.3273, 43.6129 ], [ 1.3272, 43.613 ], [ 1.3275, 43.6132 ], [ 1.3274, 43.6133 ], [ 1.3273, 43.6134 ], [ 1.3268, 43.6136 ], [ 1.3269, 43.6138 ], [ 1.3271, 43.614 ], [ 1.3272, 43.6141 ], [ 1.3274, 43.6142 ], [ 1.328, 43.6143 ], [ 1.3283, 43.6144 ], [ 1.3281, 43.6145 ], [ 1.3279, 43.6146 ], [ 1.3282, 43.615 ], [ 1.3264, 43.6158 ], [ 1.3263, 43.6159 ], [ 1.3262, 43.616 ], [ 1.3266, 43.6163 ], [ 1.3272, 43.6167 ], [ 1.3273, 43.6169 ], [ 1.3274, 43.6172 ], [ 1.3274, 43.6174 ], [ 1.3272, 43.6176 ], [ 1.3272, 43.6178 ], [ 1.3281, 43.6177 ], [ 1.3288, 43.6175 ], [ 1.3294, 43.6173 ], [ 1.3293, 43.6172 ], [ 1.3292, 43.6169 ], [ 1.3291, 43.6165 ], [ 1.3288, 43.6154 ], [ 1.3287, 43.6151 ], [ 1.3287, 43.615 ], [ 1.3285, 43.6149 ], [ 1.3288, 43.6148 ], [ 1.3309, 43.6145 ], [ 1.3315, 43.6144 ], [ 1.3314, 43.6143 ], [ 1.3312, 43.6139 ], [ 1.3311, 43.6134 ], [ 1.3314, 43.6132 ], [ 1.3316, 43.6132 ], [ 1.3318, 43.6129 ], [ 1.3319, 43.6128 ], [ 1.3321, 43.6131 ], [ 1.3323, 43.6137 ], [ 1.3323, 43.6137 ], [ 1.3327, 43.6136 ], [ 1.333, 43.6136 ], [ 1.3333, 43.6135 ], [ 1.3338, 43.6133 ] ] ], "type": "Polygon" }, "id": "23", "properties": { "code_commune": "31149", "code_departement": "31", "code_qp": "QP031005", "commune_qp": "Colomiers", "nom_commune": "Colomiers", "nom_qp": "Val D'Aran - Poitou - Pyrénées" }, "type": "Feature" }, { "bbox": [ 1.0964, 44.098, 1.1024, 44.1054 ], "geometry": { "coordinates": [ [ [ 1.1, 44.1052 ], [ 1.0996, 44.1045 ], [ 1.1001, 44.1044 ], [ 1.1, 44.1041 ], [ 1.1, 44.1041 ], [ 1.0999, 44.104 ], [ 1.1004, 44.104 ], [ 1.1016, 44.1039 ], [ 1.1017, 44.1032 ], [ 1.1017, 44.103 ], [ 1.1021, 44.1007 ], [ 1.1022, 44.1 ], [ 1.1022, 44.1 ], [ 1.1024, 44.0988 ], [ 1.1019, 44.0987 ], [ 1.1017, 44.0989 ], [ 1.1014, 44.0991 ], [ 1.1017, 44.0993 ], [ 1.1013, 44.0997 ], [ 1.1006, 44.0991 ], [ 1.1006, 44.099 ], [ 1.101, 44.0988 ], [ 1.1, 44.098 ], [ 1.0997, 44.0981 ], [ 1.0996, 44.0981 ], [ 1.0995, 44.0982 ], [ 1.0995, 44.0982 ], [ 1.0995, 44.0983 ], [ 1.1015, 44.0999 ], [ 1.1016, 44.1001 ], [ 1.1011, 44.1001 ], [ 1.1002, 44.1004 ], [ 1.0999, 44.1004 ], [ 1.0998, 44.1005 ], [ 1.0994, 44.1006 ], [ 1.0994, 44.1008 ], [ 1.0996, 44.1012 ], [ 1.099, 44.1013 ], [ 1.0986, 44.1014 ], [ 1.0984, 44.1014 ], [ 1.0983, 44.1012 ], [ 1.0983, 44.1011 ], [ 1.0978, 44.1013 ], [ 1.0977, 44.1013 ], [ 1.0967, 44.1017 ], [ 1.0969, 44.102 ], [ 1.098, 44.1018 ], [ 1.0984, 44.1027 ], [ 1.0979, 44.1028 ], [ 1.0978, 44.1029 ], [ 1.0975, 44.1036 ], [ 1.0974, 44.1036 ], [ 1.0974, 44.103 ], [ 1.0974, 44.1029 ], [ 1.0966, 44.1031 ], [ 1.0964, 44.1031 ], [ 1.0965, 44.1045 ], [ 1.0975, 44.1043 ], [ 1.0979, 44.1042 ], [ 1.0982, 44.1042 ], [ 1.0986, 44.1042 ], [ 1.0986, 44.1042 ], [ 1.0986, 44.1044 ], [ 1.0987, 44.1045 ], [ 1.0988, 44.1045 ], [ 1.0989, 44.1046 ], [ 1.099, 44.1047 ], [ 1.0992, 44.1047 ], [ 1.0993, 44.1048 ], [ 1.0994, 44.105 ], [ 1.0995, 44.1052 ], [ 1.0996, 44.1054 ], [ 1.1, 44.1052 ] ] ], "type": "Polygon" }, "id": "24", "properties": { "code_commune": "82112", "code_departement": "82", "code_qp": "QP082004", "commune_qp": "Moissac", "nom_commune": "Moissac", "nom_qp": "Sarlac" }, "type": "Feature" }, { "bbox": [ 1.4363, 43.5742, 1.4452, 43.584 ], "geometry": { "coordinates": [ [ [ 1.4389, 43.5821 ], [ 1.4392, 43.5824 ], [ 1.4394, 43.5832 ], [ 1.4396, 43.584 ], [ 1.4415, 43.5839 ], [ 1.4437, 43.5838 ], [ 1.4441, 43.5839 ], [ 1.4444, 43.5839 ], [ 1.4444, 43.5833 ], [ 1.4445, 43.5833 ], [ 1.4445, 43.5832 ], [ 1.4445, 43.5832 ], [ 1.4445, 43.5831 ], [ 1.4445, 43.5829 ], [ 1.4444, 43.5829 ], [ 1.4444, 43.5828 ], [ 1.4445, 43.5828 ], [ 1.4444, 43.5827 ], [ 1.4444, 43.5826 ], [ 1.4443, 43.5826 ], [ 1.4443, 43.5824 ], [ 1.4446, 43.5825 ], [ 1.4446, 43.5824 ], [ 1.4443, 43.5824 ], [ 1.4443, 43.5822 ], [ 1.4444, 43.5822 ], [ 1.4444, 43.5821 ], [ 1.4445, 43.5821 ], [ 1.4446, 43.5819 ], [ 1.4446, 43.5816 ], [ 1.4447, 43.5814 ], [ 1.4448, 43.5813 ], [ 1.4443, 43.5812 ], [ 1.4448, 43.5807 ], [ 1.4452, 43.5803 ], [ 1.4449, 43.5803 ], [ 1.4446, 43.5802 ], [ 1.4445, 43.5803 ], [ 1.4443, 43.5803 ], [ 1.4443, 43.5806 ], [ 1.444, 43.5806 ], [ 1.4436, 43.5806 ], [ 1.4435, 43.58 ], [ 1.4434, 43.5796 ], [ 1.4432, 43.5787 ], [ 1.4432, 43.5784 ], [ 1.4429, 43.578 ], [ 1.4431, 43.5778 ], [ 1.4435, 43.5777 ], [ 1.4441, 43.5771 ], [ 1.4446, 43.5765 ], [ 1.444, 43.576 ], [ 1.4439, 43.576 ], [ 1.443, 43.5761 ], [ 1.443, 43.5761 ], [ 1.4429, 43.5763 ], [ 1.4428, 43.5774 ], [ 1.4426, 43.5774 ], [ 1.4408, 43.5777 ], [ 1.4408, 43.5772 ], [ 1.4418, 43.5769 ], [ 1.4416, 43.5766 ], [ 1.4415, 43.5766 ], [ 1.4414, 43.5764 ], [ 1.4411, 43.5762 ], [ 1.4413, 43.5761 ], [ 1.4407, 43.5756 ], [ 1.4406, 43.5754 ], [ 1.4402, 43.5751 ], [ 1.4387, 43.5742 ], [ 1.438, 43.5744 ], [ 1.4374, 43.5746 ], [ 1.4377, 43.575 ], [ 1.4363, 43.5755 ], [ 1.4363, 43.5771 ], [ 1.4366, 43.5785 ], [ 1.4369, 43.5792 ], [ 1.4376, 43.5802 ], [ 1.4385, 43.5813 ], [ 1.4389, 43.5821 ] ] ], "type": "Polygon" }, "id": "25", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031010", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Empalot" }, "type": "Feature" }, { "bbox": [ 2.8651, 42.6886, 2.8724, 42.6985 ], "geometry": { "coordinates": [ [ [ 2.8724, 42.6973 ], [ 2.8723, 42.6972 ], [ 2.8721, 42.6972 ], [ 2.8718, 42.6972 ], [ 2.8716, 42.6972 ], [ 2.8714, 42.6972 ], [ 2.8712, 42.6971 ], [ 2.871, 42.6971 ], [ 2.871, 42.6971 ], [ 2.8709, 42.697 ], [ 2.8709, 42.6967 ], [ 2.8709, 42.6966 ], [ 2.8709, 42.6964 ], [ 2.8709, 42.6962 ], [ 2.8709, 42.696 ], [ 2.8709, 42.696 ], [ 2.8705, 42.696 ], [ 2.8705, 42.6959 ], [ 2.8704, 42.6958 ], [ 2.8704, 42.6956 ], [ 2.8704, 42.6955 ], [ 2.8703, 42.6953 ], [ 2.8703, 42.6952 ], [ 2.8702, 42.6949 ], [ 2.8703, 42.6948 ], [ 2.8703, 42.6946 ], [ 2.8703, 42.6945 ], [ 2.8704, 42.6945 ], [ 2.8705, 42.6944 ], [ 2.8706, 42.6944 ], [ 2.8707, 42.6944 ], [ 2.8707, 42.6943 ], [ 2.8708, 42.6943 ], [ 2.8709, 42.6942 ], [ 2.8709, 42.6942 ], [ 2.8709, 42.6941 ], [ 2.8708, 42.694 ], [ 2.8708, 42.694 ], [ 2.8707, 42.6938 ], [ 2.8705, 42.6935 ], [ 2.8704, 42.6933 ], [ 2.8703, 42.6932 ], [ 2.8703, 42.6932 ], [ 2.8703, 42.6932 ], [ 2.8702, 42.693 ], [ 2.8703, 42.6926 ], [ 2.8702, 42.6924 ], [ 2.8702, 42.692 ], [ 2.8703, 42.6921 ], [ 2.8706, 42.6918 ], [ 2.8705, 42.6918 ], [ 2.8697, 42.6914 ], [ 2.8693, 42.6912 ], [ 2.8695, 42.6908 ], [ 2.8698, 42.6904 ], [ 2.8702, 42.6901 ], [ 2.8702, 42.69 ], [ 2.8701, 42.69 ], [ 2.8701, 42.6899 ], [ 2.8698, 42.6897 ], [ 2.8693, 42.6894 ], [ 2.8681, 42.6889 ], [ 2.8665, 42.6886 ], [ 2.8659, 42.6892 ], [ 2.8657, 42.6891 ], [ 2.8651, 42.6897 ], [ 2.8661, 42.6902 ], [ 2.8663, 42.6902 ], [ 2.8665, 42.69 ], [ 2.8673, 42.6904 ], [ 2.8671, 42.6906 ], [ 2.867, 42.6907 ], [ 2.8667, 42.6908 ], [ 2.8664, 42.6908 ], [ 2.8669, 42.6917 ], [ 2.8668, 42.6917 ], [ 2.867, 42.6919 ], [ 2.867, 42.692 ], [ 2.8675, 42.692 ], [ 2.8676, 42.6922 ], [ 2.8677, 42.6923 ], [ 2.8679, 42.693 ], [ 2.8679, 42.693 ], [ 2.868, 42.693 ], [ 2.8681, 42.693 ], [ 2.8683, 42.6933 ], [ 2.8685, 42.6938 ], [ 2.8685, 42.6939 ], [ 2.8687, 42.6943 ], [ 2.8687, 42.6944 ], [ 2.8688, 42.6944 ], [ 2.8688, 42.6945 ], [ 2.869, 42.6944 ], [ 2.8692, 42.6949 ], [ 2.8693, 42.6951 ], [ 2.869, 42.6952 ], [ 2.8691, 42.6955 ], [ 2.8691, 42.6955 ], [ 2.8691, 42.6958 ], [ 2.869, 42.6958 ], [ 2.869, 42.696 ], [ 2.869, 42.696 ], [ 2.8684, 42.6961 ], [ 2.8685, 42.6963 ], [ 2.8685, 42.6963 ], [ 2.8685, 42.6967 ], [ 2.8685, 42.697 ], [ 2.8686, 42.6972 ], [ 2.8686, 42.6972 ], [ 2.8687, 42.6973 ], [ 2.8687, 42.6974 ], [ 2.8691, 42.6975 ], [ 2.8693, 42.6976 ], [ 2.8696, 42.6976 ], [ 2.8704, 42.6978 ], [ 2.8704, 42.6978 ], [ 2.8702, 42.6983 ], [ 2.8708, 42.6984 ], [ 2.8714, 42.6984 ], [ 2.8717, 42.6985 ], [ 2.8719, 42.6985 ], [ 2.872, 42.6982 ], [ 2.8723, 42.698 ], [ 2.8724, 42.6973 ] ] ], "type": "Polygon" }, "id": "26", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066002", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Saint Assiscle" }, "type": "Feature" }, { "bbox": [ 1.4277, 43.6221, 1.4323, 43.6243 ], "geometry": { "coordinates": [ [ [ 1.4277, 43.6222 ], [ 1.4277, 43.6225 ], [ 1.4278, 43.6233 ], [ 1.4277, 43.6235 ], [ 1.4277, 43.6236 ], [ 1.4277, 43.6237 ], [ 1.4277, 43.6238 ], [ 1.4282, 43.624 ], [ 1.4285, 43.6237 ], [ 1.4294, 43.624 ], [ 1.4295, 43.6235 ], [ 1.4305, 43.6238 ], [ 1.4305, 43.624 ], [ 1.4304, 43.6242 ], [ 1.4309, 43.6243 ], [ 1.431, 43.6242 ], [ 1.4311, 43.624 ], [ 1.4318, 43.6241 ], [ 1.432, 43.6237 ], [ 1.4322, 43.6233 ], [ 1.4323, 43.6232 ], [ 1.431, 43.6229 ], [ 1.4311, 43.6228 ], [ 1.4313, 43.6224 ], [ 1.4312, 43.6223 ], [ 1.4307, 43.6221 ], [ 1.4304, 43.6223 ], [ 1.4303, 43.6223 ], [ 1.4301, 43.6223 ], [ 1.43, 43.6223 ], [ 1.4298, 43.6223 ], [ 1.4298, 43.6223 ], [ 1.4288, 43.6223 ], [ 1.4277, 43.6222 ] ] ], "type": "Polygon" }, "id": "27", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031009", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Bourbaki" }, "type": "Feature" }, { "bbox": [ 2.8755, 42.7021, 2.8828, 42.7073 ], "geometry": { "coordinates": [ [ [ 2.8763, 42.7073 ], [ 2.8766, 42.7073 ], [ 2.8774, 42.7072 ], [ 2.8781, 42.7068 ], [ 2.8783, 42.7067 ], [ 2.8788, 42.7065 ], [ 2.879, 42.7064 ], [ 2.8803, 42.7064 ], [ 2.8804, 42.7064 ], [ 2.8803, 42.7065 ], [ 2.8803, 42.7066 ], [ 2.8814, 42.707 ], [ 2.8815, 42.7069 ], [ 2.8815, 42.7069 ], [ 2.8816, 42.7068 ], [ 2.8817, 42.7067 ], [ 2.8818, 42.7066 ], [ 2.8819, 42.7065 ], [ 2.882, 42.7064 ], [ 2.882, 42.7062 ], [ 2.8821, 42.7062 ], [ 2.8822, 42.7062 ], [ 2.8824, 42.7055 ], [ 2.8824, 42.7053 ], [ 2.8828, 42.7053 ], [ 2.8828, 42.7052 ], [ 2.8828, 42.7051 ], [ 2.8827, 42.7051 ], [ 2.8826, 42.705 ], [ 2.8825, 42.7049 ], [ 2.8825, 42.7044 ], [ 2.8823, 42.7043 ], [ 2.8822, 42.7043 ], [ 2.8821, 42.7043 ], [ 2.8821, 42.7042 ], [ 2.8819, 42.7042 ], [ 2.8816, 42.7041 ], [ 2.8815, 42.7041 ], [ 2.8813, 42.7044 ], [ 2.8812, 42.7044 ], [ 2.881, 42.7044 ], [ 2.8804, 42.7044 ], [ 2.8803, 42.7045 ], [ 2.8802, 42.7045 ], [ 2.8802, 42.7044 ], [ 2.8802, 42.7042 ], [ 2.8802, 42.7039 ], [ 2.8802, 42.7029 ], [ 2.8802, 42.7026 ], [ 2.8803, 42.7023 ], [ 2.8803, 42.7021 ], [ 2.88, 42.7021 ], [ 2.8796, 42.7022 ], [ 2.8795, 42.7022 ], [ 2.8794, 42.7023 ], [ 2.8792, 42.7024 ], [ 2.8789, 42.7026 ], [ 2.8786, 42.7027 ], [ 2.8784, 42.7028 ], [ 2.8783, 42.703 ], [ 2.8783, 42.7031 ], [ 2.8781, 42.7041 ], [ 2.8781, 42.7043 ], [ 2.8781, 42.7044 ], [ 2.8781, 42.7046 ], [ 2.8781, 42.7048 ], [ 2.878, 42.7049 ], [ 2.878, 42.7051 ], [ 2.8779, 42.7052 ], [ 2.8778, 42.7054 ], [ 2.8777, 42.7055 ], [ 2.8776, 42.7055 ], [ 2.8775, 42.7055 ], [ 2.8774, 42.7055 ], [ 2.8767, 42.7053 ], [ 2.8764, 42.7053 ], [ 2.8761, 42.7054 ], [ 2.8759, 42.7056 ], [ 2.8758, 42.7056 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7058 ], [ 2.8756, 42.7059 ], [ 2.8755, 42.7062 ], [ 2.8755, 42.7063 ], [ 2.8756, 42.7063 ], [ 2.876, 42.7069 ], [ 2.8763, 42.7073 ], [ 2.8763, 42.7073 ], [ 2.8763, 42.7073 ] ] ], "type": "Polygon" }, "id": "28", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066004", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Bas-Vernet Ancien Zus" }, "type": "Feature" }, { "bbox": [ 3.1999, 43.3319, 3.2299, 43.3509 ], "geometry": { "coordinates": [ [ [ 3.2251, 43.3387 ], [ 3.2251, 43.3386 ], [ 3.2253, 43.3386 ], [ 3.2257, 43.3386 ], [ 3.2259, 43.3385 ], [ 3.2261, 43.3384 ], [ 3.2264, 43.3383 ], [ 3.2264, 43.3382 ], [ 3.2262, 43.3378 ], [ 3.2262, 43.3377 ], [ 3.2262, 43.3377 ], [ 3.2262, 43.3377 ], [ 3.2265, 43.3375 ], [ 3.2265, 43.3375 ], [ 3.2264, 43.3373 ], [ 3.2272, 43.3368 ], [ 3.2273, 43.3368 ], [ 3.2279, 43.3364 ], [ 3.2282, 43.3366 ], [ 3.2287, 43.337 ], [ 3.2294, 43.3365 ], [ 3.2296, 43.3364 ], [ 3.2298, 43.3362 ], [ 3.2299, 43.3361 ], [ 3.2299, 43.3361 ], [ 3.2298, 43.3358 ], [ 3.2295, 43.3352 ], [ 3.2294, 43.3349 ], [ 3.2288, 43.3345 ], [ 3.2272, 43.3355 ], [ 3.227, 43.3355 ], [ 3.2269, 43.3356 ], [ 3.2265, 43.3358 ], [ 3.2264, 43.3359 ], [ 3.2262, 43.336 ], [ 3.2257, 43.3363 ], [ 3.2254, 43.3365 ], [ 3.2249, 43.3368 ], [ 3.2247, 43.3368 ], [ 3.223, 43.3378 ], [ 3.2228, 43.3379 ], [ 3.2219, 43.3384 ], [ 3.2214, 43.3387 ], [ 3.2212, 43.3389 ], [ 3.2206, 43.3392 ], [ 3.2203, 43.3394 ], [ 3.2203, 43.3393 ], [ 3.2202, 43.3391 ], [ 3.2202, 43.3391 ], [ 3.2197, 43.3391 ], [ 3.2196, 43.3391 ], [ 3.2195, 43.3392 ], [ 3.2195, 43.3392 ], [ 3.2195, 43.3392 ], [ 3.2189, 43.339 ], [ 3.2184, 43.3389 ], [ 3.2184, 43.3388 ], [ 3.2188, 43.3384 ], [ 3.2191, 43.338 ], [ 3.2191, 43.338 ], [ 3.2191, 43.3379 ], [ 3.2191, 43.3376 ], [ 3.219, 43.3374 ], [ 3.219, 43.3371 ], [ 3.2189, 43.337 ], [ 3.2189, 43.3352 ], [ 3.2219, 43.3348 ], [ 3.2221, 43.3346 ], [ 3.2222, 43.3344 ], [ 3.2228, 43.3339 ], [ 3.2235, 43.3334 ], [ 3.224, 43.3331 ], [ 3.2239, 43.3331 ], [ 3.2226, 43.3332 ], [ 3.2215, 43.3332 ], [ 3.2191, 43.3327 ], [ 3.2177, 43.3322 ], [ 3.2161, 43.3329 ], [ 3.2158, 43.333 ], [ 3.2153, 43.3335 ], [ 3.2134, 43.3351 ], [ 3.2128, 43.3355 ], [ 3.2117, 43.3349 ], [ 3.2116, 43.3348 ], [ 3.2114, 43.3347 ], [ 3.2113, 43.3346 ], [ 3.211, 43.3345 ], [ 3.2107, 43.3344 ], [ 3.2106, 43.3344 ], [ 3.2105, 43.3345 ], [ 3.2104, 43.3345 ], [ 3.2101, 43.3347 ], [ 3.2101, 43.3346 ], [ 3.2099, 43.3345 ], [ 3.2095, 43.3342 ], [ 3.2092, 43.3345 ], [ 3.2088, 43.3347 ], [ 3.2087, 43.3348 ], [ 3.2081, 43.3349 ], [ 3.2075, 43.3351 ], [ 3.2074, 43.335 ], [ 3.207, 43.3347 ], [ 3.2068, 43.3345 ], [ 3.2064, 43.3342 ], [ 3.2055, 43.3335 ], [ 3.2051, 43.3332 ], [ 3.2047, 43.333 ], [ 3.2039, 43.3325 ], [ 3.2034, 43.3322 ], [ 3.2029, 43.332 ], [ 3.2027, 43.3319 ], [ 3.2026, 43.332 ], [ 3.2027, 43.3321 ], [ 3.2027, 43.3321 ], [ 3.203, 43.3325 ], [ 3.2037, 43.3333 ], [ 3.2036, 43.3333 ], [ 3.2014, 43.3342 ], [ 3.2014, 43.3342 ], [ 3.2012, 43.3343 ], [ 3.2012, 43.3343 ], [ 3.2012, 43.3344 ], [ 3.2011, 43.3345 ], [ 3.2009, 43.3347 ], [ 3.2008, 43.3348 ], [ 3.2004, 43.3351 ], [ 3.2002, 43.3354 ], [ 3.1999, 43.3356 ], [ 3.2007, 43.336 ], [ 3.2008, 43.336 ], [ 3.201, 43.3361 ], [ 3.2023, 43.3367 ], [ 3.2025, 43.3368 ], [ 3.2023, 43.337 ], [ 3.2022, 43.3371 ], [ 3.2019, 43.3374 ], [ 3.2019, 43.3375 ], [ 3.2019, 43.3376 ], [ 3.2018, 43.3376 ], [ 3.2019, 43.3377 ], [ 3.2019, 43.3377 ], [ 3.2019, 43.3377 ], [ 3.202, 43.3378 ], [ 3.2023, 43.3378 ], [ 3.2031, 43.3378 ], [ 3.2034, 43.338 ], [ 3.2035, 43.3382 ], [ 3.2037, 43.3385 ], [ 3.2043, 43.3384 ], [ 3.2044, 43.3384 ], [ 3.2046, 43.3386 ], [ 3.2047, 43.3387 ], [ 3.2052, 43.339 ], [ 3.2053, 43.3391 ], [ 3.2053, 43.3391 ], [ 3.2056, 43.3388 ], [ 3.2058, 43.3386 ], [ 3.2059, 43.3386 ], [ 3.2061, 43.3386 ], [ 3.2063, 43.3387 ], [ 3.2072, 43.3389 ], [ 3.2074, 43.339 ], [ 3.2088, 43.3395 ], [ 3.2088, 43.3396 ], [ 3.2087, 43.3397 ], [ 3.2086, 43.3399 ], [ 3.2086, 43.34 ], [ 3.2085, 43.3401 ], [ 3.2084, 43.3403 ], [ 3.2083, 43.3405 ], [ 3.2081, 43.3408 ], [ 3.208, 43.3411 ], [ 3.2079, 43.3419 ], [ 3.2078, 43.3426 ], [ 3.2082, 43.3426 ], [ 3.2081, 43.343 ], [ 3.2081, 43.3431 ], [ 3.2081, 43.3432 ], [ 3.2082, 43.3434 ], [ 3.2084, 43.3437 ], [ 3.2092, 43.3436 ], [ 3.2092, 43.3438 ], [ 3.2092, 43.344 ], [ 3.2093, 43.3443 ], [ 3.2094, 43.3443 ], [ 3.2096, 43.3443 ], [ 3.2096, 43.3445 ], [ 3.2095, 43.3446 ], [ 3.2096, 43.3447 ], [ 3.2096, 43.3448 ], [ 3.2092, 43.345 ], [ 3.2093, 43.3451 ], [ 3.2096, 43.3454 ], [ 3.2091, 43.3458 ], [ 3.2086, 43.3462 ], [ 3.2083, 43.3464 ], [ 3.2083, 43.3464 ], [ 3.2083, 43.3465 ], [ 3.2083, 43.3466 ], [ 3.2083, 43.3467 ], [ 3.2082, 43.3468 ], [ 3.208, 43.347 ], [ 3.2079, 43.347 ], [ 3.2078, 43.3471 ], [ 3.2082, 43.3475 ], [ 3.2084, 43.3477 ], [ 3.2085, 43.3478 ], [ 3.2086, 43.3479 ], [ 3.2081, 43.348 ], [ 3.208, 43.348 ], [ 3.2077, 43.3481 ], [ 3.2078, 43.3484 ], [ 3.2079, 43.3488 ], [ 3.2079, 43.3491 ], [ 3.2079, 43.3491 ], [ 3.2078, 43.3492 ], [ 3.2077, 43.3492 ], [ 3.2076, 43.3492 ], [ 3.2076, 43.3496 ], [ 3.2076, 43.3497 ], [ 3.2076, 43.35 ], [ 3.2076, 43.3501 ], [ 3.208, 43.35 ], [ 3.2083, 43.35 ], [ 3.2083, 43.3503 ], [ 3.2084, 43.3504 ], [ 3.2084, 43.3506 ], [ 3.2084, 43.3508 ], [ 3.2087, 43.3507 ], [ 3.209, 43.3506 ], [ 3.2093, 43.3506 ], [ 3.2094, 43.3506 ], [ 3.2095, 43.3505 ], [ 3.2096, 43.3505 ], [ 3.2096, 43.3503 ], [ 3.2096, 43.3502 ], [ 3.2096, 43.35 ], [ 3.2096, 43.3498 ], [ 3.2096, 43.3497 ], [ 3.2096, 43.3497 ], [ 3.2096, 43.3494 ], [ 3.2096, 43.3493 ], [ 3.2095, 43.3493 ], [ 3.2093, 43.3493 ], [ 3.209, 43.3492 ], [ 3.209, 43.3489 ], [ 3.2089, 43.3485 ], [ 3.2092, 43.3485 ], [ 3.2094, 43.3485 ], [ 3.2096, 43.3484 ], [ 3.2096, 43.3484 ], [ 3.2096, 43.3483 ], [ 3.2096, 43.3482 ], [ 3.2096, 43.3481 ], [ 3.2096, 43.3479 ], [ 3.2095, 43.3477 ], [ 3.2095, 43.3476 ], [ 3.2098, 43.3472 ], [ 3.2098, 43.3471 ], [ 3.2105, 43.3468 ], [ 3.2107, 43.3467 ], [ 3.2107, 43.3467 ], [ 3.2111, 43.3471 ], [ 3.2113, 43.347 ], [ 3.2115, 43.347 ], [ 3.2115, 43.3471 ], [ 3.2117, 43.347 ], [ 3.2117, 43.347 ], [ 3.2118, 43.3471 ], [ 3.2119, 43.347 ], [ 3.212, 43.3469 ], [ 3.212, 43.3469 ], [ 3.2121, 43.347 ], [ 3.2123, 43.347 ], [ 3.2126, 43.3472 ], [ 3.2127, 43.3472 ], [ 3.2128, 43.3473 ], [ 3.2129, 43.3472 ], [ 3.2133, 43.3471 ], [ 3.2133, 43.3471 ], [ 3.2133, 43.3473 ], [ 3.2134, 43.3472 ], [ 3.2135, 43.3473 ], [ 3.2135, 43.3474 ], [ 3.2136, 43.3474 ], [ 3.2138, 43.3474 ], [ 3.2137, 43.3475 ], [ 3.2139, 43.3475 ], [ 3.214, 43.3476 ], [ 3.214, 43.3476 ], [ 3.214, 43.3477 ], [ 3.2141, 43.3478 ], [ 3.2142, 43.3484 ], [ 3.2148, 43.3483 ], [ 3.2149, 43.3486 ], [ 3.2149, 43.3486 ], [ 3.2149, 43.349 ], [ 3.2151, 43.3489 ], [ 3.2151, 43.349 ], [ 3.2152, 43.349 ], [ 3.2153, 43.349 ], [ 3.2162, 43.3488 ], [ 3.2163, 43.3487 ], [ 3.2163, 43.3488 ], [ 3.2165, 43.3491 ], [ 3.2166, 43.3493 ], [ 3.2167, 43.3495 ], [ 3.2168, 43.3496 ], [ 3.217, 43.3499 ], [ 3.2171, 43.3501 ], [ 3.2173, 43.3502 ], [ 3.2173, 43.3503 ], [ 3.2174, 43.3503 ], [ 3.2174, 43.3504 ], [ 3.2176, 43.3505 ], [ 3.2177, 43.3505 ], [ 3.2185, 43.3507 ], [ 3.219, 43.3509 ], [ 3.2191, 43.3508 ], [ 3.219, 43.3506 ], [ 3.219, 43.3506 ], [ 3.2187, 43.3503 ], [ 3.2189, 43.3502 ], [ 3.2193, 43.3499 ], [ 3.2197, 43.3496 ], [ 3.2198, 43.3495 ], [ 3.22, 43.3493 ], [ 3.2203, 43.3491 ], [ 3.2206, 43.3489 ], [ 3.2207, 43.3489 ], [ 3.2206, 43.3488 ], [ 3.2209, 43.3485 ], [ 3.2212, 43.3483 ], [ 3.2213, 43.3482 ], [ 3.2218, 43.3484 ], [ 3.2218, 43.3485 ], [ 3.222, 43.3485 ], [ 3.2221, 43.3485 ], [ 3.2223, 43.3487 ], [ 3.2227, 43.3489 ], [ 3.2228, 43.3489 ], [ 3.2228, 43.3489 ], [ 3.2229, 43.3488 ], [ 3.2232, 43.3487 ], [ 3.2232, 43.3486 ], [ 3.2231, 43.3486 ], [ 3.223, 43.3485 ], [ 3.2229, 43.3484 ], [ 3.2219, 43.3479 ], [ 3.2215, 43.3477 ], [ 3.221, 43.3475 ], [ 3.2205, 43.3472 ], [ 3.2203, 43.3471 ], [ 3.22, 43.3469 ], [ 3.2197, 43.3468 ], [ 3.2195, 43.3467 ], [ 3.2194, 43.3466 ], [ 3.2191, 43.3465 ], [ 3.219, 43.3464 ], [ 3.219, 43.3463 ], [ 3.2192, 43.346 ], [ 3.2194, 43.3456 ], [ 3.2199, 43.3448 ], [ 3.2201, 43.3444 ], [ 3.2204, 43.344 ], [ 3.2207, 43.3435 ], [ 3.2212, 43.3425 ], [ 3.2213, 43.3424 ], [ 3.2215, 43.3421 ], [ 3.2218, 43.3416 ], [ 3.2219, 43.3414 ], [ 3.2221, 43.3414 ], [ 3.2225, 43.3415 ], [ 3.2225, 43.3415 ], [ 3.2231, 43.3417 ], [ 3.2236, 43.3418 ], [ 3.2237, 43.3418 ], [ 3.2238, 43.3417 ], [ 3.2248, 43.3419 ], [ 3.2248, 43.3418 ], [ 3.2244, 43.3415 ], [ 3.2241, 43.3413 ], [ 3.2243, 43.341 ], [ 3.2244, 43.3407 ], [ 3.224, 43.3404 ], [ 3.2246, 43.3399 ], [ 3.2245, 43.3399 ], [ 3.2242, 43.3397 ], [ 3.2241, 43.3396 ], [ 3.224, 43.3395 ], [ 3.2246, 43.3392 ], [ 3.2247, 43.3391 ], [ 3.2247, 43.339 ], [ 3.225, 43.3388 ], [ 3.2251, 43.3387 ] ] ], "type": "Polygon" }, "id": "29", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034001", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.8106, 43.6198, 3.8251, 43.6441 ], "geometry": { "coordinates": [ [ [ 3.8116, 43.6234 ], [ 3.8115, 43.6235 ], [ 3.8114, 43.6237 ], [ 3.8114, 43.6238 ], [ 3.8114, 43.6239 ], [ 3.8121, 43.6247 ], [ 3.8129, 43.6257 ], [ 3.8137, 43.6265 ], [ 3.8138, 43.6266 ], [ 3.8139, 43.6268 ], [ 3.814, 43.6268 ], [ 3.8143, 43.6269 ], [ 3.8156, 43.627 ], [ 3.8162, 43.627 ], [ 3.8168, 43.627 ], [ 3.8175, 43.627 ], [ 3.8176, 43.6283 ], [ 3.8176, 43.629 ], [ 3.8176, 43.6291 ], [ 3.8177, 43.6292 ], [ 3.8185, 43.6301 ], [ 3.8161, 43.6303 ], [ 3.8163, 43.6307 ], [ 3.8163, 43.6308 ], [ 3.8163, 43.6308 ], [ 3.8164, 43.631 ], [ 3.8164, 43.6313 ], [ 3.8163, 43.6314 ], [ 3.8162, 43.6316 ], [ 3.8159, 43.6318 ], [ 3.8152, 43.6323 ], [ 3.8148, 43.6326 ], [ 3.8144, 43.6329 ], [ 3.8141, 43.633 ], [ 3.8138, 43.6334 ], [ 3.8138, 43.6335 ], [ 3.8136, 43.6337 ], [ 3.8136, 43.6338 ], [ 3.8136, 43.6338 ], [ 3.8134, 43.634 ], [ 3.8131, 43.6342 ], [ 3.813, 43.6343 ], [ 3.8129, 43.6344 ], [ 3.8129, 43.635 ], [ 3.8128, 43.635 ], [ 3.8124, 43.6351 ], [ 3.8122, 43.6351 ], [ 3.8121, 43.6352 ], [ 3.812, 43.6352 ], [ 3.8122, 43.6352 ], [ 3.8124, 43.6352 ], [ 3.8127, 43.6352 ], [ 3.8131, 43.6352 ], [ 3.8133, 43.6352 ], [ 3.8134, 43.6353 ], [ 3.8136, 43.6354 ], [ 3.8137, 43.6355 ], [ 3.8138, 43.6356 ], [ 3.8138, 43.6358 ], [ 3.8139, 43.6364 ], [ 3.8139, 43.6364 ], [ 3.814, 43.6365 ], [ 3.8141, 43.6367 ], [ 3.8143, 43.6373 ], [ 3.8148, 43.6378 ], [ 3.8149, 43.6381 ], [ 3.8145, 43.6384 ], [ 3.8144, 43.6385 ], [ 3.8141, 43.6385 ], [ 3.8138, 43.6386 ], [ 3.8137, 43.6387 ], [ 3.8136, 43.6388 ], [ 3.8135, 43.6389 ], [ 3.8135, 43.639 ], [ 3.8117, 43.639 ], [ 3.8117, 43.6393 ], [ 3.8117, 43.6394 ], [ 3.8115, 43.6394 ], [ 3.8115, 43.6393 ], [ 3.8106, 43.6393 ], [ 3.8106, 43.6396 ], [ 3.8106, 43.6398 ], [ 3.8107, 43.64 ], [ 3.8107, 43.64 ], [ 3.8108, 43.6401 ], [ 3.8109, 43.6403 ], [ 3.8114, 43.6407 ], [ 3.812, 43.6413 ], [ 3.8123, 43.6415 ], [ 3.8129, 43.6418 ], [ 3.8137, 43.6421 ], [ 3.8157, 43.6428 ], [ 3.8156, 43.6429 ], [ 3.8158, 43.643 ], [ 3.8183, 43.644 ], [ 3.8189, 43.6441 ], [ 3.8208, 43.6433 ], [ 3.8215, 43.6433 ], [ 3.8216, 43.6432 ], [ 3.8206, 43.6429 ], [ 3.8205, 43.6429 ], [ 3.8205, 43.6428 ], [ 3.8202, 43.6427 ], [ 3.8201, 43.6427 ], [ 3.8201, 43.6426 ], [ 3.8201, 43.6424 ], [ 3.82, 43.6423 ], [ 3.8199, 43.6422 ], [ 3.8198, 43.6421 ], [ 3.8195, 43.6419 ], [ 3.8192, 43.6421 ], [ 3.8192, 43.6408 ], [ 3.8203, 43.6408 ], [ 3.8203, 43.6387 ], [ 3.8199, 43.6382 ], [ 3.8199, 43.6373 ], [ 3.8197, 43.6373 ], [ 3.8195, 43.6371 ], [ 3.8195, 43.6371 ], [ 3.8192, 43.6368 ], [ 3.8187, 43.6364 ], [ 3.8184, 43.6361 ], [ 3.8183, 43.6361 ], [ 3.8182, 43.6359 ], [ 3.8179, 43.6358 ], [ 3.8177, 43.6358 ], [ 3.8176, 43.6358 ], [ 3.8172, 43.636 ], [ 3.817, 43.6361 ], [ 3.8168, 43.6358 ], [ 3.8167, 43.6357 ], [ 3.8164, 43.6355 ], [ 3.8164, 43.6354 ], [ 3.8163, 43.6353 ], [ 3.8162, 43.6351 ], [ 3.8162, 43.6348 ], [ 3.8163, 43.6347 ], [ 3.8165, 43.6345 ], [ 3.8166, 43.6344 ], [ 3.8168, 43.6343 ], [ 3.8172, 43.6343 ], [ 3.8176, 43.6342 ], [ 3.8192, 43.6342 ], [ 3.8199, 43.6342 ], [ 3.8226, 43.6344 ], [ 3.8232, 43.6344 ], [ 3.8236, 43.6343 ], [ 3.8238, 43.6342 ], [ 3.8243, 43.6339 ], [ 3.8246, 43.6338 ], [ 3.8247, 43.6336 ], [ 3.8247, 43.6334 ], [ 3.8245, 43.6319 ], [ 3.8251, 43.6317 ], [ 3.8251, 43.6305 ], [ 3.8224, 43.6305 ], [ 3.8224, 43.6298 ], [ 3.8221, 43.6284 ], [ 3.8221, 43.6282 ], [ 3.822, 43.6282 ], [ 3.8219, 43.6276 ], [ 3.8217, 43.6269 ], [ 3.8216, 43.6262 ], [ 3.8216, 43.6262 ], [ 3.8214, 43.6259 ], [ 3.8214, 43.6258 ], [ 3.8213, 43.6255 ], [ 3.8203, 43.6239 ], [ 3.8193, 43.6224 ], [ 3.8189, 43.6218 ], [ 3.8186, 43.6215 ], [ 3.8177, 43.6198 ], [ 3.8172, 43.6201 ], [ 3.8154, 43.6212 ], [ 3.8148, 43.6215 ], [ 3.8148, 43.6215 ], [ 3.8131, 43.6226 ], [ 3.8116, 43.6234 ] ] ], "type": "Polygon" }, "id": "30", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034005", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Mosson" }, "type": "Feature" }, { "bbox": [ 3.8217, 43.6117, 3.8279, 43.6151 ], "geometry": { "coordinates": [ [ [ 3.8258, 43.6149 ], [ 3.8259, 43.6149 ], [ 3.8259, 43.6144 ], [ 3.8266, 43.614 ], [ 3.8267, 43.614 ], [ 3.8265, 43.6137 ], [ 3.8267, 43.6136 ], [ 3.8271, 43.6135 ], [ 3.8272, 43.6135 ], [ 3.8273, 43.6135 ], [ 3.8278, 43.6133 ], [ 3.8277, 43.613 ], [ 3.8274, 43.6127 ], [ 3.8272, 43.6125 ], [ 3.8274, 43.6125 ], [ 3.8278, 43.6124 ], [ 3.8279, 43.6124 ], [ 3.8278, 43.6123 ], [ 3.8278, 43.6123 ], [ 3.8277, 43.6122 ], [ 3.8276, 43.6121 ], [ 3.8275, 43.6122 ], [ 3.8274, 43.6121 ], [ 3.8271, 43.6122 ], [ 3.827, 43.6121 ], [ 3.8268, 43.6122 ], [ 3.8266, 43.6124 ], [ 3.8261, 43.6117 ], [ 3.8256, 43.6118 ], [ 3.8252, 43.6118 ], [ 3.8248, 43.6119 ], [ 3.8244, 43.612 ], [ 3.8242, 43.6121 ], [ 3.8238, 43.6123 ], [ 3.8237, 43.6124 ], [ 3.8233, 43.6125 ], [ 3.823, 43.6128 ], [ 3.8228, 43.6129 ], [ 3.8225, 43.6132 ], [ 3.8225, 43.6134 ], [ 3.8222, 43.6138 ], [ 3.8218, 43.6146 ], [ 3.8217, 43.6147 ], [ 3.8217, 43.6148 ], [ 3.8218, 43.6149 ], [ 3.8219, 43.615 ], [ 3.822, 43.6151 ], [ 3.8221, 43.6151 ], [ 3.8222, 43.6151 ], [ 3.8229, 43.615 ], [ 3.8236, 43.615 ], [ 3.8239, 43.6149 ], [ 3.8244, 43.6149 ], [ 3.8246, 43.6148 ], [ 3.8249, 43.6148 ], [ 3.8257, 43.6148 ], [ 3.8258, 43.6149 ] ] ], "type": "Polygon" }, "id": "31", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034004", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Celleneuve" }, "type": "Feature" }, { "bbox": [ 3.8326, 43.6122, 3.841, 43.6202 ], "geometry": { "coordinates": [ [ [ 3.8373, 43.6202 ], [ 3.8374, 43.6201 ], [ 3.8375, 43.62 ], [ 3.8377, 43.6197 ], [ 3.8381, 43.6193 ], [ 3.8382, 43.6192 ], [ 3.8392, 43.6179 ], [ 3.8394, 43.6179 ], [ 3.8399, 43.6172 ], [ 3.8402, 43.6168 ], [ 3.8408, 43.6163 ], [ 3.841, 43.6162 ], [ 3.8404, 43.6158 ], [ 3.8402, 43.6156 ], [ 3.84, 43.6155 ], [ 3.8399, 43.6154 ], [ 3.8398, 43.6152 ], [ 3.8395, 43.6146 ], [ 3.839, 43.6138 ], [ 3.839, 43.6137 ], [ 3.8389, 43.6136 ], [ 3.8388, 43.6128 ], [ 3.8387, 43.6126 ], [ 3.8384, 43.6124 ], [ 3.838, 43.6122 ], [ 3.8354, 43.6137 ], [ 3.8353, 43.6134 ], [ 3.8338, 43.6135 ], [ 3.8337, 43.6135 ], [ 3.8328, 43.6135 ], [ 3.8326, 43.6134 ], [ 3.8327, 43.614 ], [ 3.8327, 43.6147 ], [ 3.8344, 43.6146 ], [ 3.8348, 43.6158 ], [ 3.8348, 43.6159 ], [ 3.8348, 43.6159 ], [ 3.8347, 43.616 ], [ 3.8346, 43.616 ], [ 3.8345, 43.6161 ], [ 3.8342, 43.6165 ], [ 3.8347, 43.6167 ], [ 3.835, 43.6169 ], [ 3.8347, 43.6172 ], [ 3.8347, 43.6173 ], [ 3.8346, 43.6173 ], [ 3.8345, 43.6173 ], [ 3.8345, 43.6173 ], [ 3.8343, 43.6172 ], [ 3.8341, 43.6174 ], [ 3.8342, 43.6175 ], [ 3.8343, 43.6175 ], [ 3.8348, 43.6178 ], [ 3.8343, 43.618 ], [ 3.8355, 43.6188 ], [ 3.8355, 43.6189 ], [ 3.8357, 43.619 ], [ 3.8356, 43.619 ], [ 3.8373, 43.6202 ] ] ], "type": "Polygon" }, "id": "32", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034006", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Petit Bard Pergola" }, "type": "Feature" }, { "bbox": [ 1.3266, 43.4645, 1.3373, 43.4715 ], "geometry": { "coordinates": [ [ [ 1.3327, 43.4714 ], [ 1.3323, 43.4708 ], [ 1.3324, 43.4707 ], [ 1.3324, 43.4707 ], [ 1.335, 43.4698 ], [ 1.3351, 43.4698 ], [ 1.3352, 43.4698 ], [ 1.3356, 43.4705 ], [ 1.3358, 43.4707 ], [ 1.336, 43.4708 ], [ 1.3361, 43.4709 ], [ 1.3365, 43.471 ], [ 1.337, 43.4711 ], [ 1.3373, 43.4711 ], [ 1.337, 43.4704 ], [ 1.3369, 43.4703 ], [ 1.3369, 43.4703 ], [ 1.3363, 43.4689 ], [ 1.3361, 43.4685 ], [ 1.3354, 43.4687 ], [ 1.3351, 43.4682 ], [ 1.335, 43.4681 ], [ 1.3345, 43.4683 ], [ 1.3339, 43.4684 ], [ 1.3337, 43.4686 ], [ 1.3325, 43.469 ], [ 1.3323, 43.4687 ], [ 1.3322, 43.4687 ], [ 1.3318, 43.4686 ], [ 1.332, 43.4679 ], [ 1.332, 43.4678 ], [ 1.3321, 43.4678 ], [ 1.3321, 43.4677 ], [ 1.3321, 43.4677 ], [ 1.3321, 43.4676 ], [ 1.3319, 43.4675 ], [ 1.3319, 43.4673 ], [ 1.3316, 43.4673 ], [ 1.3315, 43.4673 ], [ 1.3313, 43.4671 ], [ 1.3314, 43.467 ], [ 1.3315, 43.4668 ], [ 1.3317, 43.4662 ], [ 1.3317, 43.466 ], [ 1.3318, 43.4657 ], [ 1.3305, 43.4655 ], [ 1.3301, 43.4655 ], [ 1.3299, 43.4654 ], [ 1.3295, 43.4653 ], [ 1.3291, 43.4652 ], [ 1.3303, 43.4649 ], [ 1.3304, 43.4648 ], [ 1.3303, 43.4647 ], [ 1.3303, 43.4647 ], [ 1.3302, 43.4645 ], [ 1.3301, 43.4645 ], [ 1.3293, 43.4647 ], [ 1.3289, 43.4648 ], [ 1.3288, 43.4648 ], [ 1.3286, 43.4646 ], [ 1.3284, 43.4645 ], [ 1.3267, 43.465 ], [ 1.3266, 43.4651 ], [ 1.3266, 43.4652 ], [ 1.3269, 43.4656 ], [ 1.3275, 43.4654 ], [ 1.3288, 43.4651 ], [ 1.3292, 43.4653 ], [ 1.3297, 43.4654 ], [ 1.3299, 43.4656 ], [ 1.33, 43.4658 ], [ 1.3298, 43.4659 ], [ 1.3301, 43.4666 ], [ 1.3303, 43.4671 ], [ 1.3303, 43.4672 ], [ 1.3304, 43.4673 ], [ 1.3304, 43.4673 ], [ 1.3308, 43.4674 ], [ 1.3308, 43.4674 ], [ 1.3306, 43.4682 ], [ 1.3306, 43.4682 ], [ 1.3309, 43.4683 ], [ 1.3308, 43.4688 ], [ 1.3308, 43.469 ], [ 1.3307, 43.4694 ], [ 1.3295, 43.4696 ], [ 1.3294, 43.4697 ], [ 1.3288, 43.4699 ], [ 1.3278, 43.4701 ], [ 1.3278, 43.4702 ], [ 1.3282, 43.4711 ], [ 1.3283, 43.4711 ], [ 1.3288, 43.471 ], [ 1.3298, 43.4708 ], [ 1.33, 43.4707 ], [ 1.33, 43.4706 ], [ 1.3302, 43.4707 ], [ 1.3303, 43.4706 ], [ 1.3304, 43.4708 ], [ 1.3304, 43.4709 ], [ 1.3305, 43.4708 ], [ 1.3306, 43.4707 ], [ 1.3307, 43.4709 ], [ 1.3308, 43.4709 ], [ 1.3311, 43.4715 ], [ 1.3312, 43.4715 ], [ 1.3316, 43.4713 ], [ 1.3317, 43.4713 ], [ 1.3321, 43.4712 ], [ 1.3323, 43.4715 ], [ 1.3327, 43.4714 ] ] ], "type": "Polygon" }, "id": "33", "properties": { "code_commune": "31395", "code_departement": "31", "code_qp": "QP031001", "commune_qp": "Muret", "nom_commune": "Muret", "nom_qp": "Saint Jean" }, "type": "Feature" }, { "bbox": [ 2.2268, 43.5938, 2.234, 43.5983 ], "geometry": { "coordinates": [ [ [ 2.2322, 43.5969 ], [ 2.2331, 43.5963 ], [ 2.2333, 43.5964 ], [ 2.234, 43.5958 ], [ 2.2338, 43.5955 ], [ 2.2337, 43.5955 ], [ 2.2331, 43.5949 ], [ 2.2328, 43.5951 ], [ 2.232, 43.5955 ], [ 2.2306, 43.5962 ], [ 2.2304, 43.5959 ], [ 2.2303, 43.5958 ], [ 2.2306, 43.5956 ], [ 2.2307, 43.5957 ], [ 2.2314, 43.5953 ], [ 2.2313, 43.5952 ], [ 2.2324, 43.5947 ], [ 2.2316, 43.5938 ], [ 2.2305, 43.5944 ], [ 2.2304, 43.5944 ], [ 2.2295, 43.5949 ], [ 2.2278, 43.5958 ], [ 2.2274, 43.5954 ], [ 2.2273, 43.5955 ], [ 2.2276, 43.5958 ], [ 2.2276, 43.5958 ], [ 2.2269, 43.5962 ], [ 2.2268, 43.5963 ], [ 2.2268, 43.5963 ], [ 2.227, 43.5964 ], [ 2.2279, 43.5968 ], [ 2.2282, 43.597 ], [ 2.2285, 43.5971 ], [ 2.2287, 43.5972 ], [ 2.2288, 43.5972 ], [ 2.2291, 43.5975 ], [ 2.2306, 43.5983 ], [ 2.231, 43.5979 ], [ 2.2312, 43.5979 ], [ 2.2312, 43.5978 ], [ 2.2318, 43.5973 ], [ 2.2322, 43.5969 ], [ 2.2322, 43.5969 ] ] ], "type": "Polygon" }, "id": "34", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081002", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Laden Petit Train" }, "type": "Feature" }, { "bbox": [ 2.3542, 43.2246, 2.3595, 43.2285 ], "geometry": { "coordinates": [ [ [ 2.3586, 43.2264 ], [ 2.3582, 43.226 ], [ 2.3575, 43.2254 ], [ 2.3572, 43.2252 ], [ 2.3571, 43.2251 ], [ 2.3565, 43.2255 ], [ 2.3564, 43.2254 ], [ 2.3563, 43.2254 ], [ 2.3561, 43.2252 ], [ 2.3558, 43.225 ], [ 2.3557, 43.2249 ], [ 2.3561, 43.2247 ], [ 2.3557, 43.2246 ], [ 2.3557, 43.2246 ], [ 2.3554, 43.2246 ], [ 2.3554, 43.2246 ], [ 2.3552, 43.2246 ], [ 2.3551, 43.2246 ], [ 2.355, 43.2247 ], [ 2.3546, 43.2246 ], [ 2.3544, 43.2247 ], [ 2.3547, 43.225 ], [ 2.355, 43.2253 ], [ 2.3546, 43.2256 ], [ 2.3544, 43.2258 ], [ 2.3542, 43.226 ], [ 2.3544, 43.2261 ], [ 2.3543, 43.2262 ], [ 2.3542, 43.2263 ], [ 2.3545, 43.2265 ], [ 2.3546, 43.2265 ], [ 2.3545, 43.2268 ], [ 2.3548, 43.2268 ], [ 2.3548, 43.2271 ], [ 2.3547, 43.2275 ], [ 2.3547, 43.2276 ], [ 2.3549, 43.2277 ], [ 2.3552, 43.2277 ], [ 2.3554, 43.2277 ], [ 2.3559, 43.2277 ], [ 2.3568, 43.2278 ], [ 2.3569, 43.2279 ], [ 2.357, 43.2279 ], [ 2.3571, 43.2279 ], [ 2.3579, 43.2284 ], [ 2.358, 43.2284 ], [ 2.3581, 43.2284 ], [ 2.3582, 43.2285 ], [ 2.3583, 43.2285 ], [ 2.3584, 43.2285 ], [ 2.3585, 43.2285 ], [ 2.3585, 43.2285 ], [ 2.3586, 43.2285 ], [ 2.3587, 43.2285 ], [ 2.3588, 43.2285 ], [ 2.359, 43.2285 ], [ 2.3595, 43.2283 ], [ 2.3592, 43.2277 ], [ 2.3589, 43.2271 ], [ 2.3588, 43.2269 ], [ 2.3586, 43.2267 ], [ 2.3586, 43.2265 ], [ 2.3586, 43.2264 ] ] ], "type": "Polygon" }, "id": "35", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011006", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Grazailles" }, "type": "Feature" }, { "bbox": [ 3.8767, 43.6256, 3.8824, 43.6304 ], "geometry": { "coordinates": [ [ [ 3.8817, 43.6275 ], [ 3.8818, 43.6273 ], [ 3.8819, 43.6269 ], [ 3.8821, 43.6265 ], [ 3.8824, 43.626 ], [ 3.8814, 43.6258 ], [ 3.8803, 43.6257 ], [ 3.8795, 43.6256 ], [ 3.8791, 43.6256 ], [ 3.879, 43.6256 ], [ 3.8792, 43.6261 ], [ 3.8792, 43.6262 ], [ 3.8794, 43.6267 ], [ 3.8794, 43.6268 ], [ 3.8795, 43.627 ], [ 3.8795, 43.6271 ], [ 3.8797, 43.6274 ], [ 3.8798, 43.6275 ], [ 3.8799, 43.6275 ], [ 3.8799, 43.6276 ], [ 3.8799, 43.6276 ], [ 3.8797, 43.6277 ], [ 3.8792, 43.6279 ], [ 3.879, 43.628 ], [ 3.8789, 43.628 ], [ 3.8789, 43.6281 ], [ 3.8788, 43.6282 ], [ 3.8787, 43.6282 ], [ 3.8781, 43.6282 ], [ 3.8781, 43.6284 ], [ 3.8781, 43.6285 ], [ 3.878, 43.6285 ], [ 3.8774, 43.6287 ], [ 3.8767, 43.6289 ], [ 3.8768, 43.629 ], [ 3.8771, 43.6296 ], [ 3.8775, 43.6295 ], [ 3.8775, 43.6295 ], [ 3.8776, 43.6295 ], [ 3.8776, 43.6295 ], [ 3.8777, 43.6296 ], [ 3.8779, 43.6295 ], [ 3.878, 43.6299 ], [ 3.8781, 43.63 ], [ 3.8782, 43.6301 ], [ 3.8783, 43.6302 ], [ 3.8785, 43.6303 ], [ 3.8787, 43.6304 ], [ 3.8788, 43.6304 ], [ 3.8789, 43.6303 ], [ 3.8789, 43.6303 ], [ 3.879, 43.6303 ], [ 3.8792, 43.6301 ], [ 3.8794, 43.6299 ], [ 3.8797, 43.6297 ], [ 3.8801, 43.6293 ], [ 3.8802, 43.6292 ], [ 3.8807, 43.6289 ], [ 3.8811, 43.6286 ], [ 3.8812, 43.6285 ], [ 3.8813, 43.6284 ], [ 3.8814, 43.6283 ], [ 3.8815, 43.6282 ], [ 3.8816, 43.6279 ], [ 3.8816, 43.6277 ], [ 3.8817, 43.6275 ] ] ], "type": "Polygon" }, "id": "36", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034014", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Aiguelongue" }, "type": "Feature" }, { "bbox": [ 1.3822, 43.5783, 1.3906, 43.5831 ], "geometry": { "coordinates": [ [ [ 1.3896, 43.5828 ], [ 1.3896, 43.5827 ], [ 1.3895, 43.5826 ], [ 1.3893, 43.5824 ], [ 1.3894, 43.5824 ], [ 1.3906, 43.5819 ], [ 1.3903, 43.5815 ], [ 1.3902, 43.5814 ], [ 1.3898, 43.5808 ], [ 1.3895, 43.5802 ], [ 1.3886, 43.5804 ], [ 1.3885, 43.5805 ], [ 1.3884, 43.5804 ], [ 1.3881, 43.58 ], [ 1.3883, 43.5793 ], [ 1.3884, 43.5792 ], [ 1.3885, 43.5792 ], [ 1.3888, 43.5791 ], [ 1.3889, 43.5791 ], [ 1.3889, 43.579 ], [ 1.3885, 43.5783 ], [ 1.387, 43.5787 ], [ 1.3871, 43.579 ], [ 1.387, 43.579 ], [ 1.3867, 43.5791 ], [ 1.3861, 43.5792 ], [ 1.386, 43.5792 ], [ 1.3859, 43.5792 ], [ 1.3855, 43.5791 ], [ 1.3855, 43.5791 ], [ 1.3854, 43.5791 ], [ 1.3853, 43.5791 ], [ 1.3852, 43.5792 ], [ 1.3851, 43.5794 ], [ 1.3848, 43.5793 ], [ 1.3847, 43.5792 ], [ 1.3847, 43.5792 ], [ 1.3841, 43.579 ], [ 1.3838, 43.5791 ], [ 1.3837, 43.5788 ], [ 1.3834, 43.5787 ], [ 1.3822, 43.579 ], [ 1.3822, 43.5791 ], [ 1.3822, 43.5791 ], [ 1.3823, 43.5792 ], [ 1.3824, 43.5793 ], [ 1.3825, 43.5795 ], [ 1.3826, 43.5796 ], [ 1.3826, 43.5798 ], [ 1.3827, 43.5799 ], [ 1.3828, 43.5799 ], [ 1.3833, 43.5801 ], [ 1.3833, 43.5801 ], [ 1.3835, 43.5801 ], [ 1.3836, 43.5802 ], [ 1.3839, 43.5803 ], [ 1.384, 43.5803 ], [ 1.3841, 43.5804 ], [ 1.3842, 43.5806 ], [ 1.3844, 43.5807 ], [ 1.3846, 43.5808 ], [ 1.3848, 43.5808 ], [ 1.3855, 43.5811 ], [ 1.3857, 43.5811 ], [ 1.3859, 43.5812 ], [ 1.3858, 43.5813 ], [ 1.3858, 43.5814 ], [ 1.3858, 43.5815 ], [ 1.386, 43.5822 ], [ 1.3861, 43.5831 ], [ 1.3896, 43.5828 ] ] ], "type": "Polygon" }, "id": "37", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031006", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Pradettes" }, "type": "Feature" }, { "bbox": [ 1.3909, 43.5583, 1.4183, 43.5864 ], "geometry": { "coordinates": [ [ [ 1.4183, 43.5824 ], [ 1.4174, 43.5806 ], [ 1.4168, 43.5804 ], [ 1.4165, 43.5798 ], [ 1.4173, 43.5796 ], [ 1.4169, 43.5789 ], [ 1.4167, 43.5784 ], [ 1.4171, 43.5783 ], [ 1.4164, 43.5766 ], [ 1.416, 43.5767 ], [ 1.4159, 43.5764 ], [ 1.4158, 43.5764 ], [ 1.4154, 43.5757 ], [ 1.4152, 43.5757 ], [ 1.415, 43.5758 ], [ 1.4147, 43.5753 ], [ 1.4137, 43.5736 ], [ 1.4123, 43.574 ], [ 1.4122, 43.5737 ], [ 1.4116, 43.5725 ], [ 1.4142, 43.5718 ], [ 1.4134, 43.5704 ], [ 1.4155, 43.5698 ], [ 1.4165, 43.5706 ], [ 1.4171, 43.571 ], [ 1.4175, 43.5713 ], [ 1.4176, 43.5714 ], [ 1.4179, 43.5718 ], [ 1.4181, 43.5718 ], [ 1.4182, 43.5717 ], [ 1.418, 43.5712 ], [ 1.4174, 43.5699 ], [ 1.4162, 43.5692 ], [ 1.4158, 43.5691 ], [ 1.4151, 43.5691 ], [ 1.4147, 43.569 ], [ 1.4137, 43.5685 ], [ 1.4122, 43.5674 ], [ 1.4115, 43.5665 ], [ 1.4107, 43.5666 ], [ 1.4107, 43.5668 ], [ 1.4103, 43.5668 ], [ 1.4102, 43.5669 ], [ 1.4075, 43.5674 ], [ 1.4062, 43.5674 ], [ 1.4026, 43.5674 ], [ 1.4026, 43.5666 ], [ 1.4025, 43.5665 ], [ 1.4024, 43.5662 ], [ 1.4021, 43.5662 ], [ 1.4021, 43.5662 ], [ 1.4018, 43.5662 ], [ 1.4018, 43.5656 ], [ 1.4016, 43.5656 ], [ 1.4016, 43.5652 ], [ 1.4026, 43.5652 ], [ 1.4026, 43.5646 ], [ 1.4036, 43.5646 ], [ 1.403, 43.5638 ], [ 1.4027, 43.5635 ], [ 1.4018, 43.5623 ], [ 1.4018, 43.5612 ], [ 1.4017, 43.561 ], [ 1.4027, 43.5606 ], [ 1.4018, 43.5593 ], [ 1.4016, 43.5589 ], [ 1.4011, 43.5583 ], [ 1.4005, 43.5584 ], [ 1.3985, 43.5589 ], [ 1.3961, 43.5594 ], [ 1.3952, 43.5597 ], [ 1.393, 43.5607 ], [ 1.3909, 43.5619 ], [ 1.3937, 43.5658 ], [ 1.3965, 43.5659 ], [ 1.3966, 43.5661 ], [ 1.3971, 43.5668 ], [ 1.3973, 43.5675 ], [ 1.3971, 43.5679 ], [ 1.397, 43.5684 ], [ 1.3963, 43.5684 ], [ 1.3962, 43.5693 ], [ 1.3962, 43.5704 ], [ 1.3959, 43.5704 ], [ 1.3959, 43.5711 ], [ 1.3954, 43.5711 ], [ 1.3954, 43.5712 ], [ 1.3952, 43.5714 ], [ 1.3949, 43.5713 ], [ 1.3949, 43.5717 ], [ 1.3951, 43.5718 ], [ 1.3951, 43.5722 ], [ 1.395, 43.5722 ], [ 1.395, 43.5722 ], [ 1.3949, 43.5722 ], [ 1.3946, 43.5722 ], [ 1.3945, 43.5722 ], [ 1.3944, 43.5722 ], [ 1.3944, 43.5723 ], [ 1.3944, 43.5724 ], [ 1.3943, 43.5726 ], [ 1.3943, 43.573 ], [ 1.3958, 43.5743 ], [ 1.3957, 43.5744 ], [ 1.3957, 43.5746 ], [ 1.3959, 43.5747 ], [ 1.3947, 43.5779 ], [ 1.3947, 43.5787 ], [ 1.3966, 43.5812 ], [ 1.3978, 43.5827 ], [ 1.3992, 43.5838 ], [ 1.3994, 43.5838 ], [ 1.4001, 43.5838 ], [ 1.4004, 43.5837 ], [ 1.4004, 43.583 ], [ 1.4003, 43.5823 ], [ 1.4007, 43.5822 ], [ 1.4012, 43.5818 ], [ 1.401, 43.5813 ], [ 1.3999, 43.5797 ], [ 1.3994, 43.5797 ], [ 1.3997, 43.5803 ], [ 1.3996, 43.5803 ], [ 1.3995, 43.5805 ], [ 1.3992, 43.5804 ], [ 1.399, 43.5803 ], [ 1.3988, 43.5803 ], [ 1.3978, 43.5804 ], [ 1.3975, 43.5804 ], [ 1.3971, 43.5802 ], [ 1.3967, 43.58 ], [ 1.3966, 43.58 ], [ 1.3966, 43.5799 ], [ 1.3965, 43.5798 ], [ 1.3965, 43.5788 ], [ 1.3965, 43.5787 ], [ 1.3964, 43.5786 ], [ 1.3965, 43.5785 ], [ 1.3967, 43.5785 ], [ 1.3976, 43.5785 ], [ 1.397, 43.5765 ], [ 1.3971, 43.5757 ], [ 1.3966, 43.5757 ], [ 1.3959, 43.5754 ], [ 1.3959, 43.5752 ], [ 1.3962, 43.575 ], [ 1.3964, 43.5749 ], [ 1.3966, 43.5748 ], [ 1.397, 43.5747 ], [ 1.399, 43.5746 ], [ 1.401, 43.5745 ], [ 1.4011, 43.5748 ], [ 1.401, 43.5753 ], [ 1.401, 43.5756 ], [ 1.4012, 43.5756 ], [ 1.4012, 43.5761 ], [ 1.402, 43.5761 ], [ 1.402, 43.5761 ], [ 1.4025, 43.5761 ], [ 1.4025, 43.5753 ], [ 1.402, 43.5753 ], [ 1.4021, 43.575 ], [ 1.4021, 43.5749 ], [ 1.4022, 43.5748 ], [ 1.4025, 43.5746 ], [ 1.4026, 43.5745 ], [ 1.4028, 43.5743 ], [ 1.4053, 43.5742 ], [ 1.4058, 43.5738 ], [ 1.4082, 43.5717 ], [ 1.4084, 43.5714 ], [ 1.4086, 43.5713 ], [ 1.4087, 43.5709 ], [ 1.4091, 43.5709 ], [ 1.4093, 43.5708 ], [ 1.4098, 43.5707 ], [ 1.41, 43.5706 ], [ 1.4108, 43.5705 ], [ 1.4111, 43.5712 ], [ 1.4113, 43.5716 ], [ 1.4096, 43.5743 ], [ 1.4092, 43.5749 ], [ 1.4079, 43.5772 ], [ 1.4059, 43.58 ], [ 1.4037, 43.5836 ], [ 1.4052, 43.5836 ], [ 1.4061, 43.5842 ], [ 1.4055, 43.5851 ], [ 1.4062, 43.5853 ], [ 1.4067, 43.5844 ], [ 1.4067, 43.5843 ], [ 1.4067, 43.5843 ], [ 1.4062, 43.5841 ], [ 1.4063, 43.5839 ], [ 1.4067, 43.5835 ], [ 1.4074, 43.5838 ], [ 1.4074, 43.584 ], [ 1.4081, 43.5845 ], [ 1.4084, 43.5846 ], [ 1.409, 43.5848 ], [ 1.41, 43.585 ], [ 1.4097, 43.5857 ], [ 1.4097, 43.5857 ], [ 1.4097, 43.5858 ], [ 1.4099, 43.5858 ], [ 1.4114, 43.5864 ], [ 1.4115, 43.5864 ], [ 1.4116, 43.5864 ], [ 1.412, 43.5854 ], [ 1.4128, 43.5855 ], [ 1.4135, 43.5858 ], [ 1.4145, 43.5862 ], [ 1.4162, 43.5851 ], [ 1.4155, 43.5843 ], [ 1.4149, 43.5834 ], [ 1.4154, 43.5833 ], [ 1.4164, 43.583 ], [ 1.4171, 43.5827 ], [ 1.4179, 43.5825 ], [ 1.4183, 43.5824 ] ] ], "type": "Polygon" }, "id": "38", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031007", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Grand Mirail" }, "type": "Feature" }, { "bbox": [ 2.1293, 43.9124, 2.1414, 43.919 ], "geometry": { "coordinates": [ [ [ 2.1316, 43.917 ], [ 2.1331, 43.9166 ], [ 2.1328, 43.9157 ], [ 2.1332, 43.9156 ], [ 2.1333, 43.9155 ], [ 2.1337, 43.9154 ], [ 2.1338, 43.9153 ], [ 2.1339, 43.9153 ], [ 2.1349, 43.915 ], [ 2.135, 43.915 ], [ 2.1358, 43.9147 ], [ 2.1357, 43.9146 ], [ 2.1355, 43.9138 ], [ 2.1354, 43.9137 ], [ 2.1361, 43.9137 ], [ 2.1369, 43.9152 ], [ 2.137, 43.9152 ], [ 2.1372, 43.9154 ], [ 2.1377, 43.9151 ], [ 2.1383, 43.9154 ], [ 2.1377, 43.9158 ], [ 2.1383, 43.9162 ], [ 2.1387, 43.916 ], [ 2.1389, 43.9159 ], [ 2.1387, 43.9157 ], [ 2.1398, 43.9152 ], [ 2.1389, 43.9145 ], [ 2.1387, 43.9144 ], [ 2.1386, 43.9142 ], [ 2.1385, 43.9141 ], [ 2.1397, 43.9139 ], [ 2.1397, 43.9137 ], [ 2.1401, 43.9137 ], [ 2.1406, 43.9136 ], [ 2.1414, 43.9136 ], [ 2.1414, 43.9133 ], [ 2.1414, 43.9131 ], [ 2.1413, 43.9131 ], [ 2.1413, 43.913 ], [ 2.1391, 43.9124 ], [ 2.139, 43.9126 ], [ 2.139, 43.9127 ], [ 2.139, 43.9128 ], [ 2.1391, 43.9128 ], [ 2.1386, 43.9129 ], [ 2.1383, 43.913 ], [ 2.1382, 43.913 ], [ 2.1383, 43.9132 ], [ 2.138, 43.9133 ], [ 2.1379, 43.9132 ], [ 2.1378, 43.9133 ], [ 2.1378, 43.9131 ], [ 2.1373, 43.9132 ], [ 2.1373, 43.9131 ], [ 2.137, 43.9131 ], [ 2.137, 43.913 ], [ 2.1365, 43.9131 ], [ 2.1365, 43.9129 ], [ 2.1362, 43.9129 ], [ 2.1362, 43.913 ], [ 2.136, 43.9131 ], [ 2.1353, 43.9132 ], [ 2.135, 43.9128 ], [ 2.1333, 43.9135 ], [ 2.1332, 43.9136 ], [ 2.1332, 43.9137 ], [ 2.133, 43.9138 ], [ 2.1332, 43.9143 ], [ 2.1332, 43.9143 ], [ 2.1327, 43.9144 ], [ 2.1326, 43.9145 ], [ 2.1326, 43.9145 ], [ 2.1325, 43.9146 ], [ 2.1323, 43.9148 ], [ 2.1324, 43.9148 ], [ 2.1323, 43.9149 ], [ 2.1319, 43.9154 ], [ 2.1316, 43.9157 ], [ 2.1316, 43.916 ], [ 2.1316, 43.916 ], [ 2.1316, 43.9161 ], [ 2.1315, 43.9161 ], [ 2.1313, 43.9161 ], [ 2.1313, 43.916 ], [ 2.1312, 43.916 ], [ 2.131, 43.9159 ], [ 2.1298, 43.9159 ], [ 2.1298, 43.9159 ], [ 2.1296, 43.9159 ], [ 2.1296, 43.9162 ], [ 2.1295, 43.9162 ], [ 2.1293, 43.9167 ], [ 2.1293, 43.9172 ], [ 2.1293, 43.9176 ], [ 2.1294, 43.918 ], [ 2.1296, 43.9184 ], [ 2.1299, 43.9188 ], [ 2.1301, 43.9189 ], [ 2.1302, 43.919 ], [ 2.1307, 43.919 ], [ 2.1307, 43.9187 ], [ 2.1307, 43.9186 ], [ 2.1307, 43.9184 ], [ 2.1308, 43.9183 ], [ 2.1309, 43.9182 ], [ 2.1312, 43.918 ], [ 2.1313, 43.918 ], [ 2.1314, 43.9179 ], [ 2.1315, 43.9178 ], [ 2.1316, 43.9177 ], [ 2.1316, 43.9176 ], [ 2.1316, 43.9174 ], [ 2.1316, 43.9173 ], [ 2.1316, 43.9171 ], [ 2.1315, 43.9171 ], [ 2.1316, 43.917 ] ] ], "type": "Polygon" }, "id": "39", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081007", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Veyrières Rayssac" }, "type": "Feature" }, { "bbox": [ 2.2374, 43.6027, 2.2451, 43.6086 ], "geometry": { "coordinates": [ [ [ 2.2376, 43.6086 ], [ 2.2378, 43.6086 ], [ 2.2378, 43.6086 ], [ 2.2381, 43.6085 ], [ 2.2383, 43.6085 ], [ 2.2382, 43.6081 ], [ 2.2382, 43.608 ], [ 2.2389, 43.6079 ], [ 2.2389, 43.6078 ], [ 2.2388, 43.6076 ], [ 2.2391, 43.6075 ], [ 2.2391, 43.6076 ], [ 2.2393, 43.608 ], [ 2.2394, 43.6083 ], [ 2.2409, 43.6079 ], [ 2.2418, 43.6076 ], [ 2.2417, 43.6074 ], [ 2.2422, 43.6073 ], [ 2.2424, 43.6067 ], [ 2.2425, 43.6065 ], [ 2.2425, 43.6064 ], [ 2.2425, 43.6059 ], [ 2.2424, 43.6056 ], [ 2.2426, 43.6056 ], [ 2.2426, 43.6052 ], [ 2.2425, 43.6048 ], [ 2.2429, 43.6048 ], [ 2.2429, 43.6052 ], [ 2.243, 43.6054 ], [ 2.243, 43.6058 ], [ 2.243, 43.606 ], [ 2.243, 43.6061 ], [ 2.2431, 43.6061 ], [ 2.2431, 43.6063 ], [ 2.2431, 43.6065 ], [ 2.2431, 43.6064 ], [ 2.2433, 43.6064 ], [ 2.2439, 43.6062 ], [ 2.2446, 43.6059 ], [ 2.2449, 43.6058 ], [ 2.2451, 43.6057 ], [ 2.2451, 43.6056 ], [ 2.2451, 43.6055 ], [ 2.2449, 43.6054 ], [ 2.2446, 43.6043 ], [ 2.2447, 43.6043 ], [ 2.2443, 43.6039 ], [ 2.2436, 43.6033 ], [ 2.2435, 43.6032 ], [ 2.2431, 43.603 ], [ 2.2431, 43.6027 ], [ 2.2429, 43.6027 ], [ 2.243, 43.603 ], [ 2.2428, 43.603 ], [ 2.2428, 43.6032 ], [ 2.2429, 43.6033 ], [ 2.2429, 43.6035 ], [ 2.2429, 43.6047 ], [ 2.2425, 43.6047 ], [ 2.2424, 43.604 ], [ 2.2423, 43.604 ], [ 2.2422, 43.604 ], [ 2.242, 43.604 ], [ 2.2419, 43.604 ], [ 2.2414, 43.604 ], [ 2.2407, 43.6042 ], [ 2.2407, 43.6043 ], [ 2.2408, 43.6048 ], [ 2.2409, 43.6051 ], [ 2.2409, 43.6053 ], [ 2.2408, 43.6053 ], [ 2.2405, 43.6055 ], [ 2.2403, 43.6056 ], [ 2.2401, 43.6058 ], [ 2.2393, 43.6059 ], [ 2.2387, 43.6061 ], [ 2.2384, 43.6062 ], [ 2.2388, 43.607 ], [ 2.2389, 43.6073 ], [ 2.2383, 43.6074 ], [ 2.2379, 43.6075 ], [ 2.2374, 43.6077 ], [ 2.2376, 43.6086 ] ] ], "type": "Polygon" }, "id": "40", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081005", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.8545, 43.6049, 3.8625, 43.6078 ], "geometry": { "coordinates": [ [ [ 3.8551, 43.6078 ], [ 3.8559, 43.6075 ], [ 3.8564, 43.6073 ], [ 3.8565, 43.6072 ], [ 3.8568, 43.6071 ], [ 3.8573, 43.6068 ], [ 3.8568, 43.6064 ], [ 3.857, 43.6063 ], [ 3.8574, 43.606 ], [ 3.8576, 43.6059 ], [ 3.8577, 43.6058 ], [ 3.8578, 43.6058 ], [ 3.8579, 43.6058 ], [ 3.8581, 43.6059 ], [ 3.8582, 43.606 ], [ 3.8587, 43.6062 ], [ 3.8596, 43.6067 ], [ 3.8595, 43.6067 ], [ 3.8596, 43.6068 ], [ 3.8598, 43.6068 ], [ 3.8603, 43.6064 ], [ 3.8609, 43.6069 ], [ 3.8612, 43.6071 ], [ 3.8613, 43.6072 ], [ 3.8614, 43.6073 ], [ 3.8616, 43.6071 ], [ 3.8618, 43.6069 ], [ 3.8619, 43.6067 ], [ 3.8619, 43.6066 ], [ 3.8621, 43.6063 ], [ 3.8622, 43.6064 ], [ 3.8625, 43.6059 ], [ 3.8623, 43.6058 ], [ 3.8619, 43.6057 ], [ 3.8615, 43.6056 ], [ 3.8608, 43.6054 ], [ 3.8604, 43.6053 ], [ 3.8601, 43.6052 ], [ 3.8598, 43.6051 ], [ 3.8596, 43.6051 ], [ 3.8592, 43.605 ], [ 3.859, 43.605 ], [ 3.8588, 43.605 ], [ 3.8586, 43.605 ], [ 3.8585, 43.605 ], [ 3.8584, 43.605 ], [ 3.8581, 43.605 ], [ 3.8576, 43.6049 ], [ 3.8573, 43.6049 ], [ 3.8569, 43.6049 ], [ 3.8564, 43.6049 ], [ 3.8561, 43.6049 ], [ 3.8562, 43.6057 ], [ 3.8551, 43.6062 ], [ 3.855, 43.606 ], [ 3.8545, 43.6062 ], [ 3.8554, 43.6073 ], [ 3.855, 43.6075 ], [ 3.8549, 43.6076 ], [ 3.8551, 43.6078 ] ] ], "type": "Polygon" }, "id": "41", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034009", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Gély" }, "type": "Feature" }, { "bbox": [ 4.194, 44.2582, 4.203, 44.2626 ], "geometry": { "coordinates": [ [ [ 4.197, 44.2616 ], [ 4.1971, 44.2617 ], [ 4.197, 44.2617 ], [ 4.1972, 44.2617 ], [ 4.1972, 44.2617 ], [ 4.1969, 44.2619 ], [ 4.1969, 44.2619 ], [ 4.1968, 44.262 ], [ 4.1966, 44.2619 ], [ 4.1965, 44.2618 ], [ 4.1962, 44.2617 ], [ 4.1961, 44.2617 ], [ 4.1959, 44.2616 ], [ 4.1958, 44.2615 ], [ 4.1957, 44.2615 ], [ 4.1957, 44.2614 ], [ 4.1957, 44.2612 ], [ 4.1956, 44.2613 ], [ 4.1956, 44.2613 ], [ 4.1956, 44.2617 ], [ 4.1956, 44.2617 ], [ 4.1956, 44.2618 ], [ 4.1957, 44.262 ], [ 4.196, 44.2619 ], [ 4.1963, 44.2618 ], [ 4.1964, 44.2619 ], [ 4.1968, 44.2625 ], [ 4.197, 44.2626 ], [ 4.1974, 44.2624 ], [ 4.1972, 44.2623 ], [ 4.1974, 44.2622 ], [ 4.1975, 44.262 ], [ 4.1976, 44.262 ], [ 4.1977, 44.2621 ], [ 4.1978, 44.2621 ], [ 4.198, 44.2622 ], [ 4.1983, 44.2622 ], [ 4.1984, 44.2622 ], [ 4.1984, 44.2622 ], [ 4.1985, 44.2621 ], [ 4.1985, 44.262 ], [ 4.1987, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1989, 44.262 ], [ 4.199, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2622 ], [ 4.1992, 44.2623 ], [ 4.1992, 44.2622 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1995, 44.2623 ], [ 4.1995, 44.2623 ], [ 4.1996, 44.2623 ], [ 4.1997, 44.2623 ], [ 4.2, 44.2624 ], [ 4.2001, 44.2624 ], [ 4.2001, 44.2624 ], [ 4.2002, 44.2624 ], [ 4.2002, 44.2624 ], [ 4.2004, 44.2624 ], [ 4.2004, 44.2624 ], [ 4.2006, 44.2625 ], [ 4.2006, 44.2624 ], [ 4.2007, 44.2624 ], [ 4.2007, 44.2625 ], [ 4.2008, 44.2625 ], [ 4.201, 44.2624 ], [ 4.201, 44.2624 ], [ 4.2011, 44.2624 ], [ 4.2012, 44.2623 ], [ 4.2012, 44.2623 ], [ 4.2013, 44.2623 ], [ 4.2017, 44.2623 ], [ 4.2015, 44.2619 ], [ 4.2012, 44.262 ], [ 4.2011, 44.262 ], [ 4.2011, 44.262 ], [ 4.2011, 44.262 ], [ 4.201, 44.2619 ], [ 4.201, 44.2618 ], [ 4.201, 44.2617 ], [ 4.201, 44.2617 ], [ 4.2013, 44.2613 ], [ 4.2013, 44.2613 ], [ 4.2012, 44.2613 ], [ 4.201, 44.2613 ], [ 4.2004, 44.2612 ], [ 4.2001, 44.2612 ], [ 4.2001, 44.2611 ], [ 4.2002, 44.261 ], [ 4.2004, 44.2606 ], [ 4.1999, 44.2605 ], [ 4.2, 44.2603 ], [ 4.2, 44.2602 ], [ 4.2001, 44.2602 ], [ 4.2006, 44.2603 ], [ 4.2007, 44.2601 ], [ 4.2008, 44.2599 ], [ 4.2009, 44.2599 ], [ 4.2016, 44.2594 ], [ 4.2017, 44.2591 ], [ 4.2017, 44.259 ], [ 4.203, 44.2584 ], [ 4.2029, 44.2582 ], [ 4.2026, 44.2582 ], [ 4.202, 44.2582 ], [ 4.202, 44.2584 ], [ 4.2022, 44.2585 ], [ 4.2021, 44.2585 ], [ 4.202, 44.2585 ], [ 4.202, 44.2585 ], [ 4.2019, 44.2585 ], [ 4.2019, 44.2586 ], [ 4.2019, 44.2586 ], [ 4.202, 44.2586 ], [ 4.202, 44.2587 ], [ 4.2014, 44.2587 ], [ 4.2014, 44.2588 ], [ 4.2011, 44.2588 ], [ 4.2011, 44.2587 ], [ 4.201, 44.2586 ], [ 4.2005, 44.2587 ], [ 4.2004, 44.2584 ], [ 4.2, 44.2584 ], [ 4.1996, 44.2584 ], [ 4.1994, 44.2584 ], [ 4.1994, 44.2584 ], [ 4.1993, 44.2584 ], [ 4.1993, 44.2584 ], [ 4.1992, 44.2584 ], [ 4.199, 44.2584 ], [ 4.1988, 44.2584 ], [ 4.1985, 44.2586 ], [ 4.1984, 44.2586 ], [ 4.1985, 44.259 ], [ 4.1984, 44.2591 ], [ 4.1983, 44.2595 ], [ 4.1975, 44.2593 ], [ 4.1968, 44.2592 ], [ 4.1966, 44.2595 ], [ 4.1965, 44.2595 ], [ 4.1965, 44.2595 ], [ 4.1949, 44.2592 ], [ 4.1946, 44.259 ], [ 4.1944, 44.2592 ], [ 4.1943, 44.2593 ], [ 4.1944, 44.2594 ], [ 4.1943, 44.2595 ], [ 4.194, 44.2599 ], [ 4.1943, 44.26 ], [ 4.1943, 44.26 ], [ 4.1944, 44.2603 ], [ 4.1944, 44.2604 ], [ 4.1947, 44.2604 ], [ 4.1947, 44.2604 ], [ 4.1948, 44.2604 ], [ 4.1949, 44.2605 ], [ 4.1948, 44.2606 ], [ 4.1948, 44.2606 ], [ 4.1947, 44.2607 ], [ 4.1945, 44.2608 ], [ 4.1944, 44.2609 ], [ 4.1944, 44.2609 ], [ 4.1944, 44.261 ], [ 4.1946, 44.2612 ], [ 4.1947, 44.2613 ], [ 4.1952, 44.2611 ], [ 4.1952, 44.2611 ], [ 4.1957, 44.2611 ], [ 4.1957, 44.261 ], [ 4.1956, 44.2609 ], [ 4.1957, 44.2608 ], [ 4.1958, 44.2609 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.196, 44.2607 ], [ 4.1961, 44.2607 ], [ 4.196, 44.2607 ], [ 4.1962, 44.2608 ], [ 4.1963, 44.2607 ], [ 4.1963, 44.2607 ], [ 4.1964, 44.2607 ], [ 4.1965, 44.2607 ], [ 4.1966, 44.2607 ], [ 4.1966, 44.2607 ], [ 4.1966, 44.2608 ], [ 4.1967, 44.2608 ], [ 4.1966, 44.2608 ], [ 4.1967, 44.2609 ], [ 4.1968, 44.261 ], [ 4.1968, 44.2611 ], [ 4.1969, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1969, 44.2612 ], [ 4.1969, 44.2613 ], [ 4.1968, 44.2616 ], [ 4.1969, 44.2616 ], [ 4.1968, 44.2617 ], [ 4.1969, 44.2617 ], [ 4.1969, 44.2616 ], [ 4.197, 44.2616 ], [ 4.197, 44.2616 ] ] ], "type": "Polygon" }, "id": "42", "properties": { "code_commune": "30227", "code_departement": "30", "code_qp": "QP030014", "commune_qp": "Saint-Ambroix", "nom_commune": "Saint-Ambroix", "nom_qp": "L'Ecusson" }, "type": "Feature" }, { "bbox": [ 1.3507, 44.0158, 1.3577, 44.0229 ], "geometry": { "coordinates": [ [ [ 1.3511, 44.0207 ], [ 1.3513, 44.0209 ], [ 1.3508, 44.0212 ], [ 1.3511, 44.0214 ], [ 1.3519, 44.021 ], [ 1.3522, 44.0213 ], [ 1.3526, 44.0217 ], [ 1.3529, 44.022 ], [ 1.3531, 44.0223 ], [ 1.3532, 44.0229 ], [ 1.354, 44.0228 ], [ 1.354, 44.0225 ], [ 1.3543, 44.0226 ], [ 1.3543, 44.0224 ], [ 1.3547, 44.0224 ], [ 1.3548, 44.0227 ], [ 1.3555, 44.0225 ], [ 1.3555, 44.0225 ], [ 1.3555, 44.0223 ], [ 1.3572, 44.0224 ], [ 1.3573, 44.0217 ], [ 1.3566, 44.0217 ], [ 1.356, 44.0218 ], [ 1.356, 44.0215 ], [ 1.3561, 44.0215 ], [ 1.3561, 44.0214 ], [ 1.3561, 44.0212 ], [ 1.3561, 44.021 ], [ 1.3559, 44.0206 ], [ 1.3558, 44.0204 ], [ 1.356, 44.0204 ], [ 1.3558, 44.02 ], [ 1.3559, 44.0199 ], [ 1.3558, 44.0198 ], [ 1.3558, 44.0197 ], [ 1.3559, 44.0195 ], [ 1.3561, 44.0194 ], [ 1.3562, 44.0193 ], [ 1.3562, 44.0193 ], [ 1.3565, 44.019 ], [ 1.357, 44.0194 ], [ 1.3577, 44.0189 ], [ 1.3575, 44.0189 ], [ 1.3571, 44.0192 ], [ 1.3568, 44.0189 ], [ 1.3566, 44.019 ], [ 1.3564, 44.019 ], [ 1.3562, 44.0188 ], [ 1.3561, 44.0188 ], [ 1.356, 44.0188 ], [ 1.3559, 44.0186 ], [ 1.3558, 44.0185 ], [ 1.3557, 44.0184 ], [ 1.3561, 44.0183 ], [ 1.3565, 44.0183 ], [ 1.357, 44.018 ], [ 1.3569, 44.0179 ], [ 1.3569, 44.0178 ], [ 1.3568, 44.0172 ], [ 1.3566, 44.0172 ], [ 1.3565, 44.0166 ], [ 1.3563, 44.0159 ], [ 1.3562, 44.0158 ], [ 1.3557, 44.016 ], [ 1.355, 44.0162 ], [ 1.3537, 44.0168 ], [ 1.3529, 44.0173 ], [ 1.3524, 44.0175 ], [ 1.3521, 44.0173 ], [ 1.3518, 44.0171 ], [ 1.3515, 44.0174 ], [ 1.3514, 44.0174 ], [ 1.3513, 44.0175 ], [ 1.3513, 44.0177 ], [ 1.3512, 44.0179 ], [ 1.3515, 44.0181 ], [ 1.3514, 44.0182 ], [ 1.3511, 44.0185 ], [ 1.3511, 44.0186 ], [ 1.351, 44.0187 ], [ 1.3509, 44.0189 ], [ 1.3507, 44.0191 ], [ 1.351, 44.0193 ], [ 1.3514, 44.0195 ], [ 1.3513, 44.0197 ], [ 1.3519, 44.0202 ], [ 1.3516, 44.0204 ], [ 1.3511, 44.0207 ] ] ], "type": "Polygon" }, "id": "43", "properties": { "code_commune": "82121", "code_departement": "82", "code_qp": "QP082001", "commune_qp": "Montauban", "nom_commune": "Montauban", "nom_qp": "Cœur de Ville" }, "type": "Feature" }, { "bbox": [ 1.6033, 42.9636, 1.6111, 42.9686 ], "geometry": { "coordinates": [ [ [ 1.6046, 42.9644 ], [ 1.6043, 42.9644 ], [ 1.6043, 42.9645 ], [ 1.6042, 42.9645 ], [ 1.604, 42.9647 ], [ 1.6039, 42.9649 ], [ 1.6038, 42.965 ], [ 1.6039, 42.965 ], [ 1.6039, 42.965 ], [ 1.604, 42.9651 ], [ 1.6041, 42.9651 ], [ 1.6042, 42.9651 ], [ 1.6042, 42.9651 ], [ 1.6042, 42.965 ], [ 1.6042, 42.965 ], [ 1.6043, 42.9649 ], [ 1.6043, 42.9649 ], [ 1.6044, 42.9648 ], [ 1.6044, 42.9649 ], [ 1.6044, 42.9648 ], [ 1.6044, 42.9649 ], [ 1.6045, 42.9649 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6047, 42.9651 ], [ 1.6047, 42.9651 ], [ 1.6047, 42.9651 ], [ 1.6048, 42.9651 ], [ 1.6048, 42.9651 ], [ 1.6049, 42.9652 ], [ 1.6049, 42.9652 ], [ 1.6049, 42.9653 ], [ 1.605, 42.9653 ], [ 1.605, 42.9653 ], [ 1.6051, 42.9653 ], [ 1.605, 42.9654 ], [ 1.6051, 42.9655 ], [ 1.6051, 42.9656 ], [ 1.6052, 42.9656 ], [ 1.6052, 42.9656 ], [ 1.6052, 42.9657 ], [ 1.6051, 42.9659 ], [ 1.6052, 42.9659 ], [ 1.6052, 42.966 ], [ 1.6052, 42.9662 ], [ 1.6051, 42.9663 ], [ 1.6051, 42.9663 ], [ 1.6051, 42.9664 ], [ 1.6051, 42.9665 ], [ 1.6051, 42.9666 ], [ 1.6051, 42.9666 ], [ 1.605, 42.9666 ], [ 1.6049, 42.9667 ], [ 1.6049, 42.9667 ], [ 1.6049, 42.9667 ], [ 1.6047, 42.9668 ], [ 1.6047, 42.9668 ], [ 1.6047, 42.9668 ], [ 1.6046, 42.9668 ], [ 1.6046, 42.9668 ], [ 1.6045, 42.967 ], [ 1.6044, 42.967 ], [ 1.6043, 42.9669 ], [ 1.6042, 42.9668 ], [ 1.604, 42.9667 ], [ 1.6038, 42.9667 ], [ 1.6035, 42.9668 ], [ 1.6034, 42.9668 ], [ 1.6033, 42.9669 ], [ 1.6035, 42.9671 ], [ 1.6036, 42.9672 ], [ 1.6039, 42.9673 ], [ 1.604, 42.9673 ], [ 1.604, 42.9674 ], [ 1.6041, 42.9674 ], [ 1.6042, 42.9674 ], [ 1.6042, 42.9674 ], [ 1.6043, 42.9674 ], [ 1.6044, 42.9674 ], [ 1.6045, 42.9674 ], [ 1.6044, 42.9671 ], [ 1.6045, 42.967 ], [ 1.6046, 42.9671 ], [ 1.6047, 42.9671 ], [ 1.6049, 42.9672 ], [ 1.6051, 42.9672 ], [ 1.6052, 42.9672 ], [ 1.6052, 42.9671 ], [ 1.6053, 42.9671 ], [ 1.6055, 42.9672 ], [ 1.6056, 42.9671 ], [ 1.6056, 42.967 ], [ 1.6058, 42.9671 ], [ 1.6058, 42.9671 ], [ 1.606, 42.9669 ], [ 1.6061, 42.9667 ], [ 1.6062, 42.9667 ], [ 1.6063, 42.9667 ], [ 1.6069, 42.9667 ], [ 1.6073, 42.9668 ], [ 1.6072, 42.9669 ], [ 1.6073, 42.967 ], [ 1.6075, 42.9669 ], [ 1.6076, 42.9669 ], [ 1.6076, 42.9669 ], [ 1.6078, 42.9668 ], [ 1.6079, 42.9667 ], [ 1.6079, 42.9667 ], [ 1.6081, 42.9666 ], [ 1.6081, 42.9666 ], [ 1.6081, 42.9666 ], [ 1.6082, 42.9665 ], [ 1.6084, 42.9664 ], [ 1.6084, 42.9663 ], [ 1.6085, 42.9664 ], [ 1.6087, 42.9661 ], [ 1.6092, 42.9664 ], [ 1.6092, 42.9664 ], [ 1.6091, 42.9666 ], [ 1.6088, 42.9669 ], [ 1.6086, 42.9671 ], [ 1.6086, 42.9673 ], [ 1.6084, 42.9672 ], [ 1.6083, 42.9672 ], [ 1.6081, 42.9673 ], [ 1.608, 42.9675 ], [ 1.6077, 42.9677 ], [ 1.6077, 42.9677 ], [ 1.6079, 42.9678 ], [ 1.6079, 42.9678 ], [ 1.6081, 42.9679 ], [ 1.6082, 42.9679 ], [ 1.6082, 42.968 ], [ 1.6082, 42.9686 ], [ 1.6084, 42.9686 ], [ 1.6084, 42.9686 ], [ 1.6086, 42.9686 ], [ 1.6086, 42.9682 ], [ 1.6086, 42.968 ], [ 1.6085, 42.9679 ], [ 1.6086, 42.9678 ], [ 1.6086, 42.9678 ], [ 1.6086, 42.9677 ], [ 1.6087, 42.9676 ], [ 1.6094, 42.9668 ], [ 1.6095, 42.9668 ], [ 1.6095, 42.9668 ], [ 1.6097, 42.9665 ], [ 1.6098, 42.9665 ], [ 1.6098, 42.9664 ], [ 1.6098, 42.9664 ], [ 1.6098, 42.9663 ], [ 1.61, 42.9662 ], [ 1.61, 42.9662 ], [ 1.61, 42.9661 ], [ 1.61, 42.9661 ], [ 1.6101, 42.966 ], [ 1.6102, 42.9659 ], [ 1.6104, 42.9658 ], [ 1.6104, 42.9657 ], [ 1.6105, 42.9656 ], [ 1.6106, 42.9655 ], [ 1.6107, 42.9654 ], [ 1.6107, 42.9654 ], [ 1.611, 42.965 ], [ 1.6109, 42.965 ], [ 1.611, 42.9649 ], [ 1.6111, 42.9647 ], [ 1.6109, 42.9646 ], [ 1.6107, 42.9649 ], [ 1.6104, 42.9651 ], [ 1.6102, 42.9653 ], [ 1.61, 42.9655 ], [ 1.6098, 42.9657 ], [ 1.6096, 42.9661 ], [ 1.6095, 42.9662 ], [ 1.6093, 42.9664 ], [ 1.6092, 42.9663 ], [ 1.6088, 42.9661 ], [ 1.6092, 42.9658 ], [ 1.6093, 42.9656 ], [ 1.6095, 42.9654 ], [ 1.6097, 42.9652 ], [ 1.6094, 42.965 ], [ 1.6094, 42.9651 ], [ 1.609, 42.9653 ], [ 1.609, 42.9653 ], [ 1.6089, 42.9651 ], [ 1.6089, 42.9649 ], [ 1.6089, 42.9648 ], [ 1.6089, 42.9648 ], [ 1.6089, 42.9647 ], [ 1.6089, 42.9645 ], [ 1.6089, 42.9643 ], [ 1.6089, 42.9643 ], [ 1.6086, 42.9642 ], [ 1.6086, 42.9641 ], [ 1.6085, 42.964 ], [ 1.6083, 42.964 ], [ 1.6081, 42.964 ], [ 1.6074, 42.9639 ], [ 1.6072, 42.9639 ], [ 1.6068, 42.9638 ], [ 1.6066, 42.9638 ], [ 1.6064, 42.9638 ], [ 1.6058, 42.9637 ], [ 1.6054, 42.9636 ], [ 1.6046, 42.9636 ], [ 1.6046, 42.9641 ], [ 1.6046, 42.9644 ] ] ], "type": "Polygon" }, "id": "44", "properties": { "code_commune": "09122", "code_departement": "09", "code_qp": "QP009002", "commune_qp": "Foix", "nom_commune": "Foix", "nom_qp": "Centre Ancien" }, "type": "Feature" }, { "bbox": [ 2.244, 43.5904, 2.2551, 43.5952 ], "geometry": { "coordinates": [ [ [ 2.244, 43.593 ], [ 2.2441, 43.5931 ], [ 2.2442, 43.5932 ], [ 2.2446, 43.593 ], [ 2.2452, 43.5927 ], [ 2.2458, 43.5925 ], [ 2.2464, 43.5924 ], [ 2.2467, 43.5924 ], [ 2.2471, 43.5924 ], [ 2.2475, 43.5925 ], [ 2.2481, 43.5927 ], [ 2.2483, 43.5927 ], [ 2.2484, 43.5927 ], [ 2.249, 43.5927 ], [ 2.249, 43.5926 ], [ 2.2491, 43.5925 ], [ 2.2496, 43.5925 ], [ 2.2497, 43.5926 ], [ 2.2497, 43.5929 ], [ 2.2499, 43.5931 ], [ 2.2503, 43.5929 ], [ 2.2503, 43.5928 ], [ 2.2505, 43.5927 ], [ 2.2505, 43.5926 ], [ 2.2506, 43.5925 ], [ 2.2501, 43.5921 ], [ 2.2501, 43.592 ], [ 2.2502, 43.5919 ], [ 2.2516, 43.5919 ], [ 2.2517, 43.5919 ], [ 2.2519, 43.5921 ], [ 2.252, 43.5928 ], [ 2.2525, 43.5933 ], [ 2.2523, 43.5934 ], [ 2.2528, 43.5938 ], [ 2.2529, 43.5937 ], [ 2.253, 43.5937 ], [ 2.2533, 43.594 ], [ 2.2536, 43.5943 ], [ 2.2532, 43.5946 ], [ 2.2531, 43.5946 ], [ 2.2531, 43.5947 ], [ 2.2531, 43.5952 ], [ 2.2537, 43.5951 ], [ 2.2539, 43.5951 ], [ 2.2543, 43.5949 ], [ 2.2544, 43.5948 ], [ 2.2546, 43.5947 ], [ 2.2546, 43.5945 ], [ 2.2548, 43.5941 ], [ 2.2551, 43.5934 ], [ 2.2545, 43.5928 ], [ 2.2542, 43.5929 ], [ 2.2542, 43.5928 ], [ 2.2542, 43.5928 ], [ 2.254, 43.5926 ], [ 2.2536, 43.5928 ], [ 2.2533, 43.5926 ], [ 2.2535, 43.5925 ], [ 2.2532, 43.5922 ], [ 2.2528, 43.5924 ], [ 2.2527, 43.5923 ], [ 2.2527, 43.5923 ], [ 2.253, 43.5921 ], [ 2.2531, 43.592 ], [ 2.2533, 43.5919 ], [ 2.2537, 43.5916 ], [ 2.254, 43.5915 ], [ 2.2542, 43.5913 ], [ 2.2542, 43.5913 ], [ 2.2542, 43.5912 ], [ 2.2542, 43.5911 ], [ 2.2534, 43.5907 ], [ 2.2528, 43.5905 ], [ 2.2524, 43.5904 ], [ 2.2521, 43.5906 ], [ 2.2523, 43.5909 ], [ 2.2522, 43.591 ], [ 2.2521, 43.5911 ], [ 2.2518, 43.5908 ], [ 2.2517, 43.5907 ], [ 2.2517, 43.5906 ], [ 2.2509, 43.5907 ], [ 2.2508, 43.5905 ], [ 2.2497, 43.5906 ], [ 2.2497, 43.5907 ], [ 2.2494, 43.5908 ], [ 2.2488, 43.591 ], [ 2.2485, 43.5912 ], [ 2.2483, 43.5913 ], [ 2.2483, 43.5913 ], [ 2.2482, 43.5914 ], [ 2.2482, 43.5916 ], [ 2.248, 43.5916 ], [ 2.2477, 43.5916 ], [ 2.2472, 43.5916 ], [ 2.247, 43.5916 ], [ 2.247, 43.5915 ], [ 2.2468, 43.5913 ], [ 2.2464, 43.5914 ], [ 2.2464, 43.5914 ], [ 2.2457, 43.5916 ], [ 2.2458, 43.5917 ], [ 2.2452, 43.5918 ], [ 2.2448, 43.5919 ], [ 2.2447, 43.5919 ], [ 2.2446, 43.5918 ], [ 2.2443, 43.5919 ], [ 2.2442, 43.592 ], [ 2.2441, 43.5921 ], [ 2.244, 43.5923 ], [ 2.244, 43.5924 ], [ 2.244, 43.5927 ], [ 2.244, 43.593 ] ] ], "type": "Polygon" }, "id": "45", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081003", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Lameilhé" }, "type": "Feature" }, { "bbox": [ 1.4792, 43.5738, 1.4848, 43.5778 ], "geometry": { "coordinates": [ [ [ 1.4801, 43.5777 ], [ 1.4802, 43.5778 ], [ 1.4804, 43.5778 ], [ 1.4815, 43.5772 ], [ 1.4816, 43.5772 ], [ 1.4818, 43.5772 ], [ 1.4818, 43.5772 ], [ 1.482, 43.5771 ], [ 1.482, 43.5771 ], [ 1.4821, 43.5769 ], [ 1.4822, 43.5769 ], [ 1.4822, 43.5768 ], [ 1.4827, 43.5765 ], [ 1.483, 43.5764 ], [ 1.4833, 43.5764 ], [ 1.4834, 43.5764 ], [ 1.4838, 43.5761 ], [ 1.484, 43.576 ], [ 1.4842, 43.5758 ], [ 1.4844, 43.5757 ], [ 1.4845, 43.5756 ], [ 1.4846, 43.5754 ], [ 1.4846, 43.5754 ], [ 1.4847, 43.5753 ], [ 1.4848, 43.5753 ], [ 1.4848, 43.5753 ], [ 1.4845, 43.5751 ], [ 1.4843, 43.575 ], [ 1.4841, 43.5749 ], [ 1.4843, 43.5748 ], [ 1.4836, 43.5747 ], [ 1.4837, 43.5744 ], [ 1.4837, 43.5744 ], [ 1.4838, 43.574 ], [ 1.4838, 43.5739 ], [ 1.4839, 43.5738 ], [ 1.4837, 43.5738 ], [ 1.4835, 43.5738 ], [ 1.4835, 43.5738 ], [ 1.4833, 43.5738 ], [ 1.4819, 43.5747 ], [ 1.4818, 43.5748 ], [ 1.4817, 43.5749 ], [ 1.4816, 43.5749 ], [ 1.4814, 43.575 ], [ 1.4812, 43.5751 ], [ 1.4802, 43.5756 ], [ 1.4794, 43.576 ], [ 1.4793, 43.5761 ], [ 1.4792, 43.5763 ], [ 1.4792, 43.5763 ], [ 1.4792, 43.5764 ], [ 1.4793, 43.5768 ], [ 1.4794, 43.5772 ], [ 1.4798, 43.5778 ], [ 1.4798, 43.5778 ], [ 1.4801, 43.5777 ] ] ], "type": "Polygon" }, "id": "46", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031013", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Saint Exupéry" }, "type": "Feature" }, { "bbox": [ 1.073, 44.0999, 1.0904, 44.1069 ], "geometry": { "coordinates": [ [ [ 1.0777, 44.102 ], [ 1.0779, 44.1021 ], [ 1.078, 44.1022 ], [ 1.0784, 44.1024 ], [ 1.0787, 44.1025 ], [ 1.0796, 44.1028 ], [ 1.0807, 44.1032 ], [ 1.0818, 44.1036 ], [ 1.0818, 44.1037 ], [ 1.0819, 44.1037 ], [ 1.082, 44.1038 ], [ 1.0821, 44.1037 ], [ 1.0826, 44.1039 ], [ 1.0832, 44.1043 ], [ 1.0837, 44.1045 ], [ 1.0838, 44.1047 ], [ 1.0838, 44.1047 ], [ 1.0838, 44.1051 ], [ 1.0838, 44.1054 ], [ 1.0839, 44.1062 ], [ 1.084, 44.1065 ], [ 1.0844, 44.1065 ], [ 1.0844, 44.1066 ], [ 1.0844, 44.1067 ], [ 1.0846, 44.1068 ], [ 1.0847, 44.1068 ], [ 1.0849, 44.1068 ], [ 1.0851, 44.1068 ], [ 1.0853, 44.1068 ], [ 1.0854, 44.1068 ], [ 1.0858, 44.1069 ], [ 1.086, 44.1068 ], [ 1.0862, 44.1068 ], [ 1.0871, 44.1068 ], [ 1.0871, 44.1067 ], [ 1.0871, 44.1065 ], [ 1.0871, 44.1063 ], [ 1.0874, 44.1063 ], [ 1.0874, 44.1063 ], [ 1.0901, 44.1063 ], [ 1.0901, 44.1061 ], [ 1.0902, 44.106 ], [ 1.0901, 44.106 ], [ 1.0901, 44.1059 ], [ 1.0902, 44.106 ], [ 1.0902, 44.1059 ], [ 1.0902, 44.1059 ], [ 1.0902, 44.1058 ], [ 1.0903, 44.1057 ], [ 1.0902, 44.1057 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1055 ], [ 1.0902, 44.1055 ], [ 1.0902, 44.1055 ], [ 1.0904, 44.1055 ], [ 1.0904, 44.1054 ], [ 1.0903, 44.1052 ], [ 1.0902, 44.1053 ], [ 1.0899, 44.1053 ], [ 1.0893, 44.1054 ], [ 1.0895, 44.1053 ], [ 1.0897, 44.105 ], [ 1.0888, 44.1045 ], [ 1.0884, 44.1044 ], [ 1.0885, 44.1042 ], [ 1.0887, 44.1041 ], [ 1.0886, 44.1041 ], [ 1.0883, 44.1039 ], [ 1.088, 44.1039 ], [ 1.0879, 44.1039 ], [ 1.0879, 44.1039 ], [ 1.0878, 44.1037 ], [ 1.0877, 44.1036 ], [ 1.0875, 44.1035 ], [ 1.0879, 44.1034 ], [ 1.0878, 44.1029 ], [ 1.0872, 44.1031 ], [ 1.0871, 44.1032 ], [ 1.0869, 44.1029 ], [ 1.0868, 44.1028 ], [ 1.0867, 44.1026 ], [ 1.0865, 44.1024 ], [ 1.0864, 44.1023 ], [ 1.0863, 44.1022 ], [ 1.086, 44.1021 ], [ 1.0855, 44.102 ], [ 1.0853, 44.102 ], [ 1.0852, 44.1018 ], [ 1.0851, 44.1016 ], [ 1.085, 44.1015 ], [ 1.0847, 44.1009 ], [ 1.0844, 44.1004 ], [ 1.0844, 44.1003 ], [ 1.0841, 44.1 ], [ 1.084, 44.1 ], [ 1.0838, 44.1 ], [ 1.0837, 44.1 ], [ 1.0835, 44.1 ], [ 1.0835, 44.1 ], [ 1.0833, 44.1 ], [ 1.083, 44.0999 ], [ 1.0823, 44.1 ], [ 1.0818, 44.1 ], [ 1.0817, 44.1 ], [ 1.0814, 44.1001 ], [ 1.0811, 44.1002 ], [ 1.0799, 44.1004 ], [ 1.0788, 44.1006 ], [ 1.0786, 44.1006 ], [ 1.0782, 44.1006 ], [ 1.0781, 44.1007 ], [ 1.078, 44.1005 ], [ 1.0778, 44.0999 ], [ 1.0771, 44.1 ], [ 1.0751, 44.1 ], [ 1.0747, 44.1001 ], [ 1.0738, 44.1002 ], [ 1.0731, 44.1001 ], [ 1.0732, 44.1005 ], [ 1.0731, 44.1008 ], [ 1.073, 44.1014 ], [ 1.0742, 44.1016 ], [ 1.0745, 44.1015 ], [ 1.0746, 44.1015 ], [ 1.0747, 44.1015 ], [ 1.0747, 44.1014 ], [ 1.0751, 44.1014 ], [ 1.0754, 44.1014 ], [ 1.0757, 44.1014 ], [ 1.0766, 44.1013 ], [ 1.0769, 44.1013 ], [ 1.0771, 44.1013 ], [ 1.0774, 44.1014 ], [ 1.0775, 44.1015 ], [ 1.0776, 44.1019 ], [ 1.0777, 44.102 ] ] ], "type": "Polygon" }, "id": "47", "properties": { "code_commune": "82112", "code_departement": "82", "code_qp": "QP082003", "commune_qp": "Moissac", "nom_commune": "Moissac", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.4487, 44.4585, 1.4596, 44.4672 ], "geometry": { "coordinates": [ [ [ 1.4509, 44.4638 ], [ 1.4503, 44.4641 ], [ 1.4506, 44.4645 ], [ 1.4512, 44.4652 ], [ 1.452, 44.4648 ], [ 1.4514, 44.4643 ], [ 1.4521, 44.464 ], [ 1.4524, 44.4639 ], [ 1.4525, 44.4638 ], [ 1.4529, 44.4637 ], [ 1.4537, 44.4633 ], [ 1.4543, 44.4639 ], [ 1.4545, 44.4638 ], [ 1.4553, 44.4633 ], [ 1.4554, 44.4633 ], [ 1.4555, 44.4632 ], [ 1.4558, 44.4632 ], [ 1.4559, 44.4633 ], [ 1.4559, 44.4634 ], [ 1.456, 44.4635 ], [ 1.456, 44.4635 ], [ 1.4559, 44.4635 ], [ 1.4558, 44.4635 ], [ 1.4556, 44.4635 ], [ 1.4562, 44.464 ], [ 1.4565, 44.4642 ], [ 1.4568, 44.4645 ], [ 1.4567, 44.4646 ], [ 1.4565, 44.4647 ], [ 1.4566, 44.4648 ], [ 1.4566, 44.4651 ], [ 1.4568, 44.4653 ], [ 1.457, 44.4654 ], [ 1.4576, 44.4654 ], [ 1.4578, 44.4653 ], [ 1.458, 44.4658 ], [ 1.458, 44.4661 ], [ 1.4581, 44.4663 ], [ 1.4583, 44.4665 ], [ 1.4577, 44.4668 ], [ 1.458, 44.467 ], [ 1.4581, 44.4672 ], [ 1.4589, 44.4671 ], [ 1.459, 44.4671 ], [ 1.4589, 44.4667 ], [ 1.4589, 44.4667 ], [ 1.4591, 44.4667 ], [ 1.4592, 44.4667 ], [ 1.4593, 44.4666 ], [ 1.4593, 44.4666 ], [ 1.4594, 44.4666 ], [ 1.4596, 44.4666 ], [ 1.4596, 44.4664 ], [ 1.4596, 44.4662 ], [ 1.4595, 44.466 ], [ 1.4594, 44.4654 ], [ 1.4594, 44.4653 ], [ 1.459, 44.4653 ], [ 1.4589, 44.4651 ], [ 1.4589, 44.4651 ], [ 1.4585, 44.4651 ], [ 1.4584, 44.4648 ], [ 1.4584, 44.4646 ], [ 1.4584, 44.4644 ], [ 1.4584, 44.4642 ], [ 1.4584, 44.464 ], [ 1.4585, 44.4639 ], [ 1.4585, 44.4638 ], [ 1.4586, 44.4637 ], [ 1.4586, 44.4636 ], [ 1.4583, 44.4633 ], [ 1.457, 44.4622 ], [ 1.4559, 44.4614 ], [ 1.4552, 44.4608 ], [ 1.4547, 44.4604 ], [ 1.4541, 44.4607 ], [ 1.4537, 44.4608 ], [ 1.4535, 44.461 ], [ 1.4531, 44.4611 ], [ 1.4529, 44.4612 ], [ 1.4529, 44.4612 ], [ 1.4521, 44.4613 ], [ 1.4521, 44.4614 ], [ 1.452, 44.4614 ], [ 1.4519, 44.4611 ], [ 1.4518, 44.461 ], [ 1.4518, 44.4609 ], [ 1.4517, 44.4609 ], [ 1.4522, 44.4607 ], [ 1.4526, 44.4606 ], [ 1.4533, 44.4603 ], [ 1.4531, 44.46 ], [ 1.4518, 44.4605 ], [ 1.4515, 44.4607 ], [ 1.4514, 44.4607 ], [ 1.4512, 44.4608 ], [ 1.4509, 44.4609 ], [ 1.4507, 44.4605 ], [ 1.4505, 44.4601 ], [ 1.4503, 44.46 ], [ 1.4501, 44.4597 ], [ 1.4497, 44.4593 ], [ 1.4491, 44.4586 ], [ 1.4489, 44.4585 ], [ 1.4488, 44.4587 ], [ 1.4487, 44.4588 ], [ 1.4487, 44.4589 ], [ 1.4488, 44.459 ], [ 1.4489, 44.4595 ], [ 1.449, 44.4595 ], [ 1.4494, 44.46 ], [ 1.4489, 44.4601 ], [ 1.4491, 44.4603 ], [ 1.4493, 44.4607 ], [ 1.4496, 44.4611 ], [ 1.4498, 44.4615 ], [ 1.4499, 44.4619 ], [ 1.4502, 44.4628 ], [ 1.4502, 44.463 ], [ 1.4503, 44.4631 ], [ 1.4508, 44.4637 ], [ 1.4509, 44.4638 ] ] ], "type": "Polygon" }, "id": "48", "properties": { "code_commune": "46042", "code_departement": "46", "code_qp": "QP046001", "commune_qp": "Cahors", "nom_commune": "Cahors", "nom_qp": "Terre Rouge" }, "type": "Feature" }, { "bbox": [ 2.3371, 43.2234, 2.3456, 43.2272 ], "geometry": { "coordinates": [ [ [ 2.3455, 43.2244 ], [ 2.3456, 43.2242 ], [ 2.3456, 43.2241 ], [ 2.3455, 43.224 ], [ 2.3454, 43.224 ], [ 2.3452, 43.224 ], [ 2.3451, 43.224 ], [ 2.3447, 43.224 ], [ 2.3447, 43.224 ], [ 2.3448, 43.2238 ], [ 2.3441, 43.2236 ], [ 2.3439, 43.2235 ], [ 2.3437, 43.2235 ], [ 2.3432, 43.2234 ], [ 2.3432, 43.2236 ], [ 2.344, 43.2239 ], [ 2.3443, 43.224 ], [ 2.3443, 43.2243 ], [ 2.3443, 43.2243 ], [ 2.3442, 43.2247 ], [ 2.3441, 43.2247 ], [ 2.3439, 43.2253 ], [ 2.3438, 43.2253 ], [ 2.3428, 43.2252 ], [ 2.3428, 43.2252 ], [ 2.3428, 43.2251 ], [ 2.3427, 43.2251 ], [ 2.3425, 43.2251 ], [ 2.3424, 43.2251 ], [ 2.3419, 43.225 ], [ 2.3419, 43.225 ], [ 2.3418, 43.225 ], [ 2.3416, 43.225 ], [ 2.3411, 43.2249 ], [ 2.3409, 43.2248 ], [ 2.3405, 43.2247 ], [ 2.3399, 43.2246 ], [ 2.3398, 43.2246 ], [ 2.3396, 43.2245 ], [ 2.3394, 43.2246 ], [ 2.3391, 43.2245 ], [ 2.3391, 43.2246 ], [ 2.339, 43.2248 ], [ 2.339, 43.2251 ], [ 2.3389, 43.2252 ], [ 2.3389, 43.2252 ], [ 2.3388, 43.2253 ], [ 2.3388, 43.2253 ], [ 2.3385, 43.2257 ], [ 2.3384, 43.2258 ], [ 2.3381, 43.2261 ], [ 2.338, 43.2261 ], [ 2.3376, 43.2265 ], [ 2.3374, 43.2266 ], [ 2.3372, 43.2269 ], [ 2.3371, 43.2271 ], [ 2.3372, 43.2271 ], [ 2.3382, 43.2272 ], [ 2.3383, 43.2269 ], [ 2.3393, 43.2269 ], [ 2.3396, 43.2269 ], [ 2.3401, 43.2269 ], [ 2.3403, 43.2269 ], [ 2.3407, 43.2269 ], [ 2.3411, 43.2268 ], [ 2.3419, 43.2266 ], [ 2.3425, 43.2265 ], [ 2.3429, 43.2264 ], [ 2.3433, 43.2263 ], [ 2.3438, 43.2262 ], [ 2.344, 43.2262 ], [ 2.3449, 43.2263 ], [ 2.345, 43.2263 ], [ 2.345, 43.2258 ], [ 2.345, 43.2255 ], [ 2.3451, 43.2251 ], [ 2.3451, 43.225 ], [ 2.3452, 43.2249 ], [ 2.3455, 43.2244 ] ] ], "type": "Polygon" }, "id": "49", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011005", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Fleming La Reille" }, "type": "Feature" }, { "bbox": [ 2.0317, 44.3495, 2.0405, 44.3571 ], "geometry": { "coordinates": [ [ [ 2.0348, 44.3523 ], [ 2.0343, 44.3523 ], [ 2.0345, 44.3527 ], [ 2.0347, 44.3531 ], [ 2.0346, 44.3532 ], [ 2.0349, 44.3534 ], [ 2.035, 44.3534 ], [ 2.0352, 44.3535 ], [ 2.0354, 44.3536 ], [ 2.0357, 44.3537 ], [ 2.0363, 44.3538 ], [ 2.0368, 44.3539 ], [ 2.0368, 44.3539 ], [ 2.0374, 44.354 ], [ 2.0377, 44.354 ], [ 2.0379, 44.3541 ], [ 2.0378, 44.3542 ], [ 2.0374, 44.3542 ], [ 2.0372, 44.3543 ], [ 2.037, 44.3546 ], [ 2.0368, 44.3548 ], [ 2.0367, 44.355 ], [ 2.0365, 44.3552 ], [ 2.0364, 44.3555 ], [ 2.0361, 44.3554 ], [ 2.036, 44.3554 ], [ 2.0357, 44.3554 ], [ 2.0352, 44.3556 ], [ 2.0348, 44.355 ], [ 2.0337, 44.3554 ], [ 2.0331, 44.3555 ], [ 2.0329, 44.3556 ], [ 2.0323, 44.3555 ], [ 2.0321, 44.3559 ], [ 2.0319, 44.3561 ], [ 2.0319, 44.3561 ], [ 2.032, 44.3562 ], [ 2.0318, 44.3564 ], [ 2.0317, 44.3566 ], [ 2.0319, 44.3568 ], [ 2.0326, 44.3566 ], [ 2.0327, 44.3565 ], [ 2.0327, 44.3566 ], [ 2.0329, 44.3571 ], [ 2.0331, 44.3571 ], [ 2.0332, 44.3569 ], [ 2.0334, 44.3569 ], [ 2.0336, 44.357 ], [ 2.0337, 44.3568 ], [ 2.0338, 44.3566 ], [ 2.0341, 44.3566 ], [ 2.0339, 44.3563 ], [ 2.034, 44.3562 ], [ 2.0346, 44.356 ], [ 2.0348, 44.3558 ], [ 2.0351, 44.3558 ], [ 2.0352, 44.3558 ], [ 2.0357, 44.356 ], [ 2.036, 44.3557 ], [ 2.0362, 44.3558 ], [ 2.0365, 44.356 ], [ 2.0364, 44.3561 ], [ 2.0363, 44.3564 ], [ 2.0373, 44.3567 ], [ 2.0375, 44.3563 ], [ 2.0373, 44.3557 ], [ 2.038, 44.3555 ], [ 2.0379, 44.3554 ], [ 2.0377, 44.3551 ], [ 2.0375, 44.355 ], [ 2.038, 44.3548 ], [ 2.0379, 44.3545 ], [ 2.038, 44.3545 ], [ 2.0379, 44.3544 ], [ 2.0381, 44.3543 ], [ 2.0382, 44.3544 ], [ 2.0385, 44.3544 ], [ 2.0387, 44.3544 ], [ 2.0387, 44.3544 ], [ 2.0387, 44.354 ], [ 2.0387, 44.3539 ], [ 2.0388, 44.3536 ], [ 2.0391, 44.353 ], [ 2.0394, 44.3526 ], [ 2.0396, 44.3522 ], [ 2.04, 44.3517 ], [ 2.0404, 44.3513 ], [ 2.0404, 44.3512 ], [ 2.0405, 44.3509 ], [ 2.0404, 44.3508 ], [ 2.0401, 44.3507 ], [ 2.0397, 44.3503 ], [ 2.0395, 44.3501 ], [ 2.0394, 44.35 ], [ 2.0385, 44.3498 ], [ 2.0381, 44.3497 ], [ 2.0378, 44.3497 ], [ 2.0371, 44.3495 ], [ 2.0365, 44.3495 ], [ 2.0362, 44.35 ], [ 2.0361, 44.35 ], [ 2.0365, 44.35 ], [ 2.0366, 44.3501 ], [ 2.0367, 44.3502 ], [ 2.0367, 44.3505 ], [ 2.0367, 44.3506 ], [ 2.0368, 44.3509 ], [ 2.0369, 44.3511 ], [ 2.0363, 44.3513 ], [ 2.0351, 44.3519 ], [ 2.0348, 44.3521 ], [ 2.0348, 44.3521 ], [ 2.0348, 44.3522 ], [ 2.0348, 44.3523 ] ] ], "type": "Polygon" }, "id": "50", "properties": { "code_commune": "12300", "code_departement": "12", "code_qp": "QP012002", "commune_qp": "Villefranche-de-Rouergue", "nom_commune": "Villefranche-de-Rouergue", "nom_qp": "La Bastide" }, "type": "Feature" }, { "bbox": [ 1.3795, 43.6375, 1.3879, 43.6403 ], "geometry": { "coordinates": [ [ [ 1.3819, 43.6376 ], [ 1.3815, 43.6377 ], [ 1.381, 43.6379 ], [ 1.3807, 43.638 ], [ 1.3804, 43.6381 ], [ 1.3801, 43.6382 ], [ 1.38, 43.6383 ], [ 1.3795, 43.6385 ], [ 1.3801, 43.6394 ], [ 1.3801, 43.6394 ], [ 1.3799, 43.6394 ], [ 1.38, 43.6395 ], [ 1.3804, 43.6396 ], [ 1.3805, 43.6396 ], [ 1.3806, 43.6393 ], [ 1.3807, 43.6393 ], [ 1.3808, 43.6395 ], [ 1.381, 43.6399 ], [ 1.3815, 43.6399 ], [ 1.3815, 43.6398 ], [ 1.3816, 43.6397 ], [ 1.3819, 43.6398 ], [ 1.3819, 43.6398 ], [ 1.3826, 43.6397 ], [ 1.3828, 43.6398 ], [ 1.3829, 43.6395 ], [ 1.3853, 43.6397 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6402 ], [ 1.3853, 43.6402 ], [ 1.3859, 43.6403 ], [ 1.3862, 43.6403 ], [ 1.3863, 43.6403 ], [ 1.3865, 43.6401 ], [ 1.3867, 43.6399 ], [ 1.387, 43.6397 ], [ 1.387, 43.6397 ], [ 1.3872, 43.6398 ], [ 1.3879, 43.6392 ], [ 1.3866, 43.639 ], [ 1.3857, 43.6389 ], [ 1.3856, 43.6389 ], [ 1.3856, 43.6389 ], [ 1.3856, 43.639 ], [ 1.3855, 43.639 ], [ 1.3854, 43.6391 ], [ 1.3853, 43.639 ], [ 1.3831, 43.6389 ], [ 1.3836, 43.6376 ], [ 1.3835, 43.6375 ], [ 1.3833, 43.6375 ], [ 1.383, 43.6375 ], [ 1.3824, 43.6376 ], [ 1.3819, 43.6376 ] ] ], "type": "Polygon" }, "id": "51", "properties": { "code_commune": "31069", "code_departement": "31", "code_qp": "QP031004", "commune_qp": "Blagnac", "nom_commune": "Blagnac", "nom_qp": "Barradels" }, "type": "Feature" }, { "bbox": [ 1.4736, 43.608, 1.4801, 43.6149 ], "geometry": { "coordinates": [ [ [ 1.4736, 43.6126 ], [ 1.4753, 43.6133 ], [ 1.4758, 43.6136 ], [ 1.4761, 43.6138 ], [ 1.4764, 43.6135 ], [ 1.478, 43.6143 ], [ 1.4792, 43.6149 ], [ 1.4799, 43.6142 ], [ 1.48, 43.6142 ], [ 1.4801, 43.614 ], [ 1.4785, 43.6132 ], [ 1.478, 43.6129 ], [ 1.4774, 43.6126 ], [ 1.4773, 43.6123 ], [ 1.4772, 43.612 ], [ 1.4776, 43.6116 ], [ 1.4786, 43.6106 ], [ 1.4791, 43.6101 ], [ 1.4779, 43.6096 ], [ 1.4774, 43.6093 ], [ 1.4781, 43.6086 ], [ 1.4767, 43.608 ], [ 1.4762, 43.6086 ], [ 1.476, 43.6087 ], [ 1.4759, 43.6088 ], [ 1.4753, 43.6095 ], [ 1.4753, 43.6095 ], [ 1.4753, 43.6096 ], [ 1.4753, 43.6096 ], [ 1.4755, 43.6097 ], [ 1.4769, 43.6104 ], [ 1.4762, 43.6112 ], [ 1.4767, 43.6114 ], [ 1.4774, 43.6117 ], [ 1.4771, 43.612 ], [ 1.4772, 43.6125 ], [ 1.4771, 43.6125 ], [ 1.4767, 43.6123 ], [ 1.476, 43.6119 ], [ 1.4756, 43.6117 ], [ 1.4754, 43.6116 ], [ 1.4748, 43.6122 ], [ 1.4742, 43.6119 ], [ 1.4736, 43.6126 ] ] ], "type": "Polygon" }, "id": "52", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031014", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Soupetard" }, "type": "Feature" }, { "bbox": [ 2.8921, 42.6847, 2.8956, 42.6892 ], "geometry": { "coordinates": [ [ [ 2.8956, 42.6868 ], [ 2.8955, 42.6868 ], [ 2.8954, 42.6866 ], [ 2.8955, 42.6867 ], [ 2.8948, 42.6861 ], [ 2.8946, 42.6859 ], [ 2.8945, 42.6858 ], [ 2.8945, 42.6857 ], [ 2.8944, 42.6857 ], [ 2.8944, 42.6855 ], [ 2.8943, 42.6852 ], [ 2.8947, 42.6852 ], [ 2.8946, 42.6852 ], [ 2.8945, 42.685 ], [ 2.8943, 42.6847 ], [ 2.8939, 42.6848 ], [ 2.8935, 42.685 ], [ 2.8933, 42.6851 ], [ 2.8933, 42.6853 ], [ 2.8933, 42.6854 ], [ 2.8934, 42.6858 ], [ 2.8929, 42.6858 ], [ 2.8928, 42.6858 ], [ 2.8923, 42.6858 ], [ 2.8921, 42.6859 ], [ 2.8922, 42.686 ], [ 2.8922, 42.6867 ], [ 2.8923, 42.6867 ], [ 2.8923, 42.6868 ], [ 2.8923, 42.6871 ], [ 2.8924, 42.6873 ], [ 2.8925, 42.6876 ], [ 2.8927, 42.6881 ], [ 2.8928, 42.688 ], [ 2.8928, 42.688 ], [ 2.8928, 42.6881 ], [ 2.8928, 42.6883 ], [ 2.893, 42.6886 ], [ 2.893, 42.6887 ], [ 2.8931, 42.6889 ], [ 2.8931, 42.6889 ], [ 2.8932, 42.6891 ], [ 2.8932, 42.6892 ], [ 2.8935, 42.689 ], [ 2.8936, 42.6889 ], [ 2.8937, 42.6889 ], [ 2.8937, 42.6888 ], [ 2.8937, 42.6888 ], [ 2.8947, 42.6881 ], [ 2.895, 42.6878 ], [ 2.8951, 42.6878 ], [ 2.8954, 42.6873 ], [ 2.8956, 42.6869 ], [ 2.8956, 42.6868 ] ] ], "type": "Polygon" }, "id": "53", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066006", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Rois De Majorque" }, "type": "Feature" }, { "bbox": [ 2.892, 42.7241, 2.9024, 42.729 ], "geometry": { "coordinates": [ [ [ 2.8942, 42.7246 ], [ 2.8936, 42.7241 ], [ 2.8931, 42.7245 ], [ 2.8923, 42.7251 ], [ 2.8923, 42.7251 ], [ 2.892, 42.7253 ], [ 2.8932, 42.7264 ], [ 2.8945, 42.7275 ], [ 2.8949, 42.7278 ], [ 2.8952, 42.728 ], [ 2.896, 42.7285 ], [ 2.8964, 42.7288 ], [ 2.897, 42.7283 ], [ 2.897, 42.7284 ], [ 2.8975, 42.7287 ], [ 2.8977, 42.7289 ], [ 2.8979, 42.729 ], [ 2.8991, 42.7281 ], [ 2.8993, 42.728 ], [ 2.8994, 42.7281 ], [ 2.8996, 42.7279 ], [ 2.8999, 42.7278 ], [ 2.9001, 42.7276 ], [ 2.9003, 42.7279 ], [ 2.9004, 42.7279 ], [ 2.9007, 42.7282 ], [ 2.9007, 42.7282 ], [ 2.9011, 42.7286 ], [ 2.9018, 42.7281 ], [ 2.9019, 42.728 ], [ 2.9021, 42.7278 ], [ 2.9022, 42.7277 ], [ 2.9023, 42.7274 ], [ 2.9024, 42.7273 ], [ 2.9008, 42.7271 ], [ 2.9007, 42.7271 ], [ 2.9, 42.727 ], [ 2.8999, 42.7269 ], [ 2.8997, 42.7269 ], [ 2.8983, 42.7267 ], [ 2.8983, 42.7266 ], [ 2.8988, 42.7262 ], [ 2.8985, 42.726 ], [ 2.8982, 42.7258 ], [ 2.8981, 42.7257 ], [ 2.8979, 42.7256 ], [ 2.8979, 42.7255 ], [ 2.8978, 42.7255 ], [ 2.8977, 42.7255 ], [ 2.8977, 42.7255 ], [ 2.8975, 42.7255 ], [ 2.8974, 42.7254 ], [ 2.8974, 42.7254 ], [ 2.8972, 42.7253 ], [ 2.8971, 42.7253 ], [ 2.897, 42.7254 ], [ 2.8969, 42.7255 ], [ 2.8965, 42.7257 ], [ 2.8963, 42.7259 ], [ 2.8962, 42.7258 ], [ 2.896, 42.726 ], [ 2.8953, 42.7255 ], [ 2.8953, 42.7255 ], [ 2.8942, 42.7246 ] ] ], "type": "Polygon" }, "id": "54", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066009", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Nouveau Logis" }, "type": "Feature" }, { "bbox": [ 3.8654, 43.6347, 3.8703, 43.6395 ], "geometry": { "coordinates": [ [ [ 3.8667, 43.635 ], [ 3.8668, 43.635 ], [ 3.8666, 43.6353 ], [ 3.8659, 43.6351 ], [ 3.8657, 43.6357 ], [ 3.8663, 43.6358 ], [ 3.8664, 43.6359 ], [ 3.8659, 43.6363 ], [ 3.8654, 43.6367 ], [ 3.8659, 43.6369 ], [ 3.8662, 43.637 ], [ 3.8667, 43.6373 ], [ 3.8665, 43.6375 ], [ 3.8671, 43.6378 ], [ 3.8673, 43.6383 ], [ 3.8686, 43.6389 ], [ 3.8691, 43.6391 ], [ 3.87, 43.6395 ], [ 3.8695, 43.6389 ], [ 3.869, 43.6384 ], [ 3.869, 43.6383 ], [ 3.8693, 43.6381 ], [ 3.8694, 43.6379 ], [ 3.8697, 43.638 ], [ 3.8699, 43.6381 ], [ 3.8699, 43.6381 ], [ 3.8699, 43.6379 ], [ 3.8697, 43.6378 ], [ 3.8701, 43.6377 ], [ 3.8703, 43.6376 ], [ 3.8703, 43.6372 ], [ 3.8696, 43.6364 ], [ 3.8687, 43.6364 ], [ 3.8684, 43.6358 ], [ 3.8683, 43.6357 ], [ 3.8682, 43.6355 ], [ 3.8682, 43.6352 ], [ 3.8682, 43.6349 ], [ 3.8681, 43.6348 ], [ 3.8679, 43.6347 ], [ 3.8676, 43.6347 ], [ 3.867, 43.6347 ], [ 3.8668, 43.6347 ], [ 3.8667, 43.6349 ], [ 3.8667, 43.6349 ], [ 3.8667, 43.635 ] ] ], "type": "Polygon" }, "id": "55", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034015", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Vert-Bois" }, "type": "Feature" }, { "bbox": [ 1.3685, 44.0085, 1.3867, 44.0176 ], "geometry": { "coordinates": [ [ [ 1.3867, 44.0146 ], [ 1.3866, 44.0144 ], [ 1.3861, 44.0143 ], [ 1.3849, 44.0141 ], [ 1.3845, 44.014 ], [ 1.3838, 44.0139 ], [ 1.3848, 44.0127 ], [ 1.3842, 44.0122 ], [ 1.3836, 44.0117 ], [ 1.3827, 44.011 ], [ 1.3832, 44.0107 ], [ 1.384, 44.0103 ], [ 1.3841, 44.0102 ], [ 1.3841, 44.0102 ], [ 1.3839, 44.0101 ], [ 1.3836, 44.0099 ], [ 1.3833, 44.0096 ], [ 1.383, 44.0093 ], [ 1.3827, 44.009 ], [ 1.3825, 44.0088 ], [ 1.3824, 44.0088 ], [ 1.3821, 44.0088 ], [ 1.3818, 44.0091 ], [ 1.3807, 44.0098 ], [ 1.3813, 44.0103 ], [ 1.3809, 44.0105 ], [ 1.3806, 44.0106 ], [ 1.3804, 44.0108 ], [ 1.3803, 44.0108 ], [ 1.3802, 44.0108 ], [ 1.3802, 44.0108 ], [ 1.3793, 44.0111 ], [ 1.3792, 44.0109 ], [ 1.3789, 44.011 ], [ 1.3789, 44.0111 ], [ 1.3786, 44.0111 ], [ 1.3786, 44.0114 ], [ 1.3782, 44.0114 ], [ 1.3779, 44.0105 ], [ 1.3779, 44.0103 ], [ 1.3786, 44.01 ], [ 1.3787, 44.01 ], [ 1.379, 44.0098 ], [ 1.3797, 44.0097 ], [ 1.3796, 44.0094 ], [ 1.3788, 44.0095 ], [ 1.3787, 44.0085 ], [ 1.3781, 44.0085 ], [ 1.3777, 44.0086 ], [ 1.3774, 44.0086 ], [ 1.3774, 44.0086 ], [ 1.3771, 44.0087 ], [ 1.3764, 44.0087 ], [ 1.3762, 44.0088 ], [ 1.376, 44.0089 ], [ 1.3757, 44.009 ], [ 1.3756, 44.0092 ], [ 1.3747, 44.0099 ], [ 1.3737, 44.011 ], [ 1.3735, 44.0104 ], [ 1.3734, 44.0102 ], [ 1.3734, 44.0102 ], [ 1.3733, 44.0101 ], [ 1.3732, 44.01 ], [ 1.3733, 44.0099 ], [ 1.3732, 44.0097 ], [ 1.3724, 44.0098 ], [ 1.3723, 44.0098 ], [ 1.3721, 44.0098 ], [ 1.3721, 44.0099 ], [ 1.3713, 44.0101 ], [ 1.3716, 44.0107 ], [ 1.3718, 44.0109 ], [ 1.3713, 44.0111 ], [ 1.3711, 44.0112 ], [ 1.3708, 44.0107 ], [ 1.3703, 44.0108 ], [ 1.3704, 44.0109 ], [ 1.3698, 44.0111 ], [ 1.3697, 44.0112 ], [ 1.3699, 44.0116 ], [ 1.3693, 44.0116 ], [ 1.3688, 44.0117 ], [ 1.3685, 44.012 ], [ 1.3698, 44.0128 ], [ 1.3701, 44.0127 ], [ 1.3704, 44.0128 ], [ 1.371, 44.0132 ], [ 1.3718, 44.0138 ], [ 1.3719, 44.0138 ], [ 1.3729, 44.015 ], [ 1.3735, 44.0157 ], [ 1.3742, 44.0153 ], [ 1.3751, 44.0161 ], [ 1.3759, 44.0168 ], [ 1.3761, 44.017 ], [ 1.3766, 44.0172 ], [ 1.3773, 44.0166 ], [ 1.378, 44.016 ], [ 1.3779, 44.0159 ], [ 1.3774, 44.0156 ], [ 1.377, 44.0153 ], [ 1.3769, 44.0155 ], [ 1.3764, 44.0152 ], [ 1.3763, 44.0153 ], [ 1.3754, 44.0145 ], [ 1.3758, 44.0142 ], [ 1.3763, 44.014 ], [ 1.3754, 44.0129 ], [ 1.3754, 44.0128 ], [ 1.375, 44.0122 ], [ 1.3751, 44.0122 ], [ 1.3744, 44.0121 ], [ 1.374, 44.012 ], [ 1.3739, 44.0121 ], [ 1.3737, 44.0112 ], [ 1.3739, 44.0109 ], [ 1.3751, 44.0108 ], [ 1.3754, 44.0108 ], [ 1.3756, 44.0106 ], [ 1.3764, 44.0105 ], [ 1.3766, 44.0105 ], [ 1.3767, 44.0107 ], [ 1.3766, 44.0107 ], [ 1.3765, 44.0107 ], [ 1.3762, 44.0108 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.011 ], [ 1.3763, 44.0112 ], [ 1.3762, 44.0112 ], [ 1.3761, 44.0112 ], [ 1.3757, 44.0112 ], [ 1.3757, 44.0113 ], [ 1.3757, 44.0113 ], [ 1.3758, 44.0118 ], [ 1.3758, 44.0118 ], [ 1.3758, 44.012 ], [ 1.3757, 44.0122 ], [ 1.3765, 44.0122 ], [ 1.3769, 44.0122 ], [ 1.3771, 44.0122 ], [ 1.3773, 44.0123 ], [ 1.3784, 44.0124 ], [ 1.3786, 44.0125 ], [ 1.3788, 44.0124 ], [ 1.3789, 44.0124 ], [ 1.3792, 44.0124 ], [ 1.3793, 44.0125 ], [ 1.3794, 44.0126 ], [ 1.3804, 44.0128 ], [ 1.3806, 44.0128 ], [ 1.3809, 44.0129 ], [ 1.3812, 44.0131 ], [ 1.3814, 44.0132 ], [ 1.3814, 44.0133 ], [ 1.381, 44.0138 ], [ 1.3825, 44.0143 ], [ 1.3821, 44.0149 ], [ 1.3819, 44.0151 ], [ 1.3813, 44.0158 ], [ 1.3817, 44.0159 ], [ 1.3822, 44.0161 ], [ 1.3829, 44.0164 ], [ 1.3836, 44.0167 ], [ 1.3839, 44.0168 ], [ 1.3841, 44.0168 ], [ 1.3837, 44.0176 ], [ 1.384, 44.0176 ], [ 1.3843, 44.0176 ], [ 1.3847, 44.0169 ], [ 1.3848, 44.017 ], [ 1.3855, 44.0166 ], [ 1.3855, 44.0166 ], [ 1.3858, 44.0164 ], [ 1.3857, 44.016 ], [ 1.3864, 44.0156 ], [ 1.3863, 44.015 ], [ 1.3863, 44.0149 ], [ 1.3864, 44.0148 ], [ 1.3866, 44.0147 ], [ 1.3867, 44.0146 ], [ 1.3867, 44.0146 ] ] ], "type": "Polygon" }, "id": "56", "properties": { "code_commune": "82121", "code_departement": "82", "code_qp": "QP082002", "commune_qp": "Montauban", "nom_commune": "Montauban", "nom_qp": "Médiathèque - Chambord" }, "type": "Feature" }, { "bbox": [ 2.1581, 43.9249, 2.1666, 43.9301 ], "geometry": { "coordinates": [ [ [ 2.1634, 43.9298 ], [ 2.1645, 43.9293 ], [ 2.1646, 43.9292 ], [ 2.1644, 43.9291 ], [ 2.1648, 43.9287 ], [ 2.165, 43.9286 ], [ 2.1651, 43.9284 ], [ 2.1653, 43.9282 ], [ 2.1652, 43.9279 ], [ 2.1653, 43.9279 ], [ 2.1662, 43.9278 ], [ 2.1661, 43.9278 ], [ 2.1666, 43.9276 ], [ 2.1665, 43.9272 ], [ 2.166, 43.9272 ], [ 2.166, 43.9273 ], [ 2.1659, 43.9274 ], [ 2.1651, 43.9275 ], [ 2.165, 43.9274 ], [ 2.1646, 43.9274 ], [ 2.1646, 43.9273 ], [ 2.1644, 43.9274 ], [ 2.1643, 43.9271 ], [ 2.164, 43.9271 ], [ 2.1639, 43.9267 ], [ 2.1638, 43.9266 ], [ 2.1633, 43.9266 ], [ 2.1632, 43.9261 ], [ 2.1632, 43.9261 ], [ 2.1631, 43.926 ], [ 2.1629, 43.9257 ], [ 2.1623, 43.9257 ], [ 2.1622, 43.9253 ], [ 2.162, 43.9252 ], [ 2.1614, 43.9254 ], [ 2.1613, 43.925 ], [ 2.1607, 43.9252 ], [ 2.1596, 43.9255 ], [ 2.1596, 43.9254 ], [ 2.1592, 43.9249 ], [ 2.159, 43.9249 ], [ 2.1587, 43.925 ], [ 2.1584, 43.9252 ], [ 2.1581, 43.9253 ], [ 2.1587, 43.9267 ], [ 2.1598, 43.9265 ], [ 2.1597, 43.9259 ], [ 2.1603, 43.9259 ], [ 2.1606, 43.9259 ], [ 2.161, 43.9258 ], [ 2.1612, 43.9262 ], [ 2.1612, 43.9264 ], [ 2.1615, 43.9264 ], [ 2.1616, 43.9267 ], [ 2.1615, 43.9267 ], [ 2.1617, 43.9273 ], [ 2.1618, 43.9273 ], [ 2.1618, 43.9273 ], [ 2.1619, 43.9276 ], [ 2.1619, 43.9278 ], [ 2.162, 43.9283 ], [ 2.1616, 43.9284 ], [ 2.1611, 43.9283 ], [ 2.1611, 43.9287 ], [ 2.1611, 43.9288 ], [ 2.1621, 43.9287 ], [ 2.1622, 43.929 ], [ 2.1632, 43.9288 ], [ 2.1633, 43.9293 ], [ 2.1629, 43.9294 ], [ 2.1627, 43.9297 ], [ 2.1628, 43.9297 ], [ 2.1626, 43.9299 ], [ 2.1631, 43.9301 ], [ 2.1632, 43.9301 ], [ 2.1634, 43.9298 ] ] ], "type": "Polygon" }, "id": "57", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081008", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Lapanouse" }, "type": "Feature" }, { "bbox": [ 1.4619, 43.565, 1.4697, 43.5738 ], "geometry": { "coordinates": [ [ [ 1.4636, 43.5734 ], [ 1.4637, 43.5734 ], [ 1.4626, 43.5724 ], [ 1.4639, 43.5722 ], [ 1.4628, 43.5712 ], [ 1.464, 43.5705 ], [ 1.4639, 43.5705 ], [ 1.4641, 43.5704 ], [ 1.4642, 43.5704 ], [ 1.4645, 43.5702 ], [ 1.4647, 43.57 ], [ 1.4648, 43.5693 ], [ 1.4654, 43.5693 ], [ 1.4658, 43.5689 ], [ 1.4664, 43.5692 ], [ 1.4679, 43.5699 ], [ 1.4685, 43.5693 ], [ 1.4692, 43.5686 ], [ 1.4697, 43.5681 ], [ 1.4658, 43.5661 ], [ 1.4652, 43.5657 ], [ 1.4645, 43.565 ], [ 1.464, 43.5656 ], [ 1.4635, 43.5658 ], [ 1.4637, 43.566 ], [ 1.4633, 43.5663 ], [ 1.4634, 43.5677 ], [ 1.4643, 43.5676 ], [ 1.464, 43.569 ], [ 1.4634, 43.5691 ], [ 1.4633, 43.5702 ], [ 1.4619, 43.5705 ], [ 1.4626, 43.5713 ], [ 1.4623, 43.5715 ], [ 1.4627, 43.5719 ], [ 1.462, 43.5725 ], [ 1.4627, 43.5731 ], [ 1.4624, 43.5732 ], [ 1.463, 43.5738 ], [ 1.463, 43.5738 ], [ 1.4636, 43.5734 ] ] ], "type": "Polygon" }, "id": "58", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031015", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Rangueil" }, "type": "Feature" }, { "bbox": [ 2.9733, 43.1814, 2.9962, 43.19 ], "geometry": { "coordinates": [ [ [ 2.9837, 43.1842 ], [ 2.9837, 43.1836 ], [ 2.9812, 43.1837 ], [ 2.9808, 43.1838 ], [ 2.9807, 43.1827 ], [ 2.9807, 43.1827 ], [ 2.981, 43.1827 ], [ 2.9809, 43.1816 ], [ 2.98, 43.1815 ], [ 2.9786, 43.1815 ], [ 2.9779, 43.1814 ], [ 2.9779, 43.1819 ], [ 2.978, 43.1826 ], [ 2.978, 43.1827 ], [ 2.978, 43.1834 ], [ 2.978, 43.1834 ], [ 2.9778, 43.1834 ], [ 2.9776, 43.1834 ], [ 2.9768, 43.1833 ], [ 2.9762, 43.1833 ], [ 2.9761, 43.1833 ], [ 2.976, 43.1833 ], [ 2.9759, 43.1832 ], [ 2.9761, 43.1826 ], [ 2.9761, 43.1826 ], [ 2.9755, 43.1825 ], [ 2.9752, 43.1825 ], [ 2.9751, 43.1825 ], [ 2.975, 43.1825 ], [ 2.9749, 43.1825 ], [ 2.9749, 43.182 ], [ 2.9743, 43.1819 ], [ 2.9743, 43.1821 ], [ 2.9739, 43.1821 ], [ 2.9739, 43.182 ], [ 2.9739, 43.182 ], [ 2.9734, 43.182 ], [ 2.9734, 43.1827 ], [ 2.9733, 43.1831 ], [ 2.9735, 43.1831 ], [ 2.974, 43.1833 ], [ 2.9755, 43.1838 ], [ 2.9757, 43.1839 ], [ 2.9758, 43.1839 ], [ 2.9763, 43.1842 ], [ 2.9764, 43.1842 ], [ 2.9765, 43.1843 ], [ 2.9768, 43.1848 ], [ 2.9768, 43.1849 ], [ 2.9768, 43.1852 ], [ 2.9762, 43.1851 ], [ 2.9762, 43.1858 ], [ 2.9763, 43.1861 ], [ 2.9763, 43.1863 ], [ 2.9765, 43.1864 ], [ 2.9765, 43.1866 ], [ 2.9768, 43.1866 ], [ 2.9769, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9775, 43.1865 ], [ 2.9775, 43.1864 ], [ 2.9778, 43.1864 ], [ 2.9778, 43.1863 ], [ 2.9782, 43.1864 ], [ 2.9782, 43.1864 ], [ 2.9783, 43.1865 ], [ 2.9783, 43.1865 ], [ 2.9786, 43.1865 ], [ 2.9786, 43.1867 ], [ 2.9785, 43.1868 ], [ 2.9786, 43.1868 ], [ 2.9786, 43.1868 ], [ 2.979, 43.1868 ], [ 2.979, 43.1867 ], [ 2.9789, 43.1866 ], [ 2.9789, 43.1865 ], [ 2.9789, 43.1864 ], [ 2.9789, 43.1861 ], [ 2.9793, 43.1861 ], [ 2.9793, 43.1859 ], [ 2.9786, 43.1859 ], [ 2.9786, 43.1858 ], [ 2.9786, 43.1849 ], [ 2.9786, 43.1846 ], [ 2.979, 43.1847 ], [ 2.9791, 43.1847 ], [ 2.9794, 43.1847 ], [ 2.9798, 43.1847 ], [ 2.981, 43.185 ], [ 2.9811, 43.1847 ], [ 2.981, 43.1846 ], [ 2.981, 43.1841 ], [ 2.9817, 43.1841 ], [ 2.9822, 43.1842 ], [ 2.9824, 43.1841 ], [ 2.9825, 43.1841 ], [ 2.9832, 43.1841 ], [ 2.9832, 43.1841 ], [ 2.9833, 43.1842 ], [ 2.9833, 43.1843 ], [ 2.9836, 43.1855 ], [ 2.9837, 43.1856 ], [ 2.9839, 43.1864 ], [ 2.984, 43.1871 ], [ 2.9836, 43.1871 ], [ 2.984, 43.1877 ], [ 2.9842, 43.188 ], [ 2.9843, 43.1881 ], [ 2.9844, 43.1881 ], [ 2.9847, 43.1882 ], [ 2.9848, 43.1882 ], [ 2.985, 43.1885 ], [ 2.9852, 43.189 ], [ 2.9854, 43.1891 ], [ 2.9854, 43.1891 ], [ 2.9863, 43.1886 ], [ 2.9864, 43.1886 ], [ 2.9864, 43.1887 ], [ 2.9865, 43.1887 ], [ 2.9866, 43.1888 ], [ 2.9867, 43.1888 ], [ 2.9876, 43.1884 ], [ 2.9878, 43.1888 ], [ 2.9881, 43.1891 ], [ 2.9882, 43.1893 ], [ 2.9881, 43.1894 ], [ 2.9885, 43.1898 ], [ 2.9898, 43.189 ], [ 2.9901, 43.1888 ], [ 2.9903, 43.1886 ], [ 2.991, 43.1882 ], [ 2.9913, 43.1886 ], [ 2.9917, 43.1889 ], [ 2.9923, 43.189 ], [ 2.9929, 43.1887 ], [ 2.9933, 43.189 ], [ 2.9936, 43.1892 ], [ 2.9936, 43.1892 ], [ 2.9935, 43.1894 ], [ 2.9935, 43.1895 ], [ 2.9935, 43.1896 ], [ 2.9941, 43.1898 ], [ 2.9947, 43.19 ], [ 2.9949, 43.19 ], [ 2.9951, 43.1898 ], [ 2.9958, 43.1889 ], [ 2.9961, 43.1886 ], [ 2.9962, 43.1884 ], [ 2.9955, 43.1887 ], [ 2.9941, 43.1891 ], [ 2.9934, 43.1885 ], [ 2.993, 43.1881 ], [ 2.9928, 43.1879 ], [ 2.9928, 43.1877 ], [ 2.9929, 43.1877 ], [ 2.9932, 43.1877 ], [ 2.9934, 43.1877 ], [ 2.9939, 43.1878 ], [ 2.9942, 43.1878 ], [ 2.9942, 43.1878 ], [ 2.9943, 43.1877 ], [ 2.995, 43.1877 ], [ 2.9954, 43.1877 ], [ 2.9958, 43.1877 ], [ 2.9961, 43.1876 ], [ 2.9953, 43.1866 ], [ 2.995, 43.1867 ], [ 2.9945, 43.1869 ], [ 2.9946, 43.1871 ], [ 2.9944, 43.1872 ], [ 2.9944, 43.1872 ], [ 2.994, 43.1874 ], [ 2.9939, 43.1874 ], [ 2.9937, 43.1871 ], [ 2.9934, 43.1873 ], [ 2.9931, 43.1874 ], [ 2.9923, 43.1876 ], [ 2.9921, 43.1871 ], [ 2.9919, 43.1871 ], [ 2.992, 43.1871 ], [ 2.9916, 43.1873 ], [ 2.9916, 43.1874 ], [ 2.9915, 43.1874 ], [ 2.9909, 43.1877 ], [ 2.9908, 43.1873 ], [ 2.9907, 43.1871 ], [ 2.9906, 43.187 ], [ 2.9905, 43.187 ], [ 2.9895, 43.1871 ], [ 2.9888, 43.1872 ], [ 2.9877, 43.1872 ], [ 2.9871, 43.1873 ], [ 2.9866, 43.1873 ], [ 2.986, 43.1873 ], [ 2.9858, 43.1871 ], [ 2.9855, 43.187 ], [ 2.9853, 43.187 ], [ 2.9848, 43.187 ], [ 2.9848, 43.1866 ], [ 2.9849, 43.1865 ], [ 2.9848, 43.1859 ], [ 2.9843, 43.1859 ], [ 2.9843, 43.1856 ], [ 2.9843, 43.1855 ], [ 2.985, 43.1855 ], [ 2.9848, 43.1842 ], [ 2.9841, 43.1842 ], [ 2.9837, 43.1842 ] ] ], "type": "Polygon" }, "id": "59", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011007", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Ouest" }, "type": "Feature" }, { "bbox": [ 4.0105, 44.2164, 4.0202, 44.2295 ], "geometry": { "coordinates": [ [ [ 4.0202, 44.2165 ], [ 4.02, 44.2164 ], [ 4.0198, 44.2166 ], [ 4.0197, 44.2168 ], [ 4.0196, 44.2169 ], [ 4.0194, 44.2171 ], [ 4.0192, 44.2172 ], [ 4.0189, 44.2174 ], [ 4.0188, 44.2175 ], [ 4.0187, 44.2176 ], [ 4.0182, 44.2178 ], [ 4.0177, 44.2181 ], [ 4.0169, 44.2185 ], [ 4.0163, 44.2188 ], [ 4.016, 44.2191 ], [ 4.0151, 44.2198 ], [ 4.0147, 44.22 ], [ 4.0144, 44.2203 ], [ 4.0142, 44.2205 ], [ 4.014, 44.2206 ], [ 4.0139, 44.2207 ], [ 4.0139, 44.2208 ], [ 4.0139, 44.2208 ], [ 4.0137, 44.2208 ], [ 4.0136, 44.2208 ], [ 4.0134, 44.221 ], [ 4.0133, 44.2214 ], [ 4.0132, 44.2217 ], [ 4.0132, 44.2218 ], [ 4.0132, 44.2219 ], [ 4.0132, 44.222 ], [ 4.0137, 44.2222 ], [ 4.014, 44.2224 ], [ 4.0138, 44.2226 ], [ 4.0137, 44.2228 ], [ 4.0136, 44.223 ], [ 4.0135, 44.2232 ], [ 4.0134, 44.2234 ], [ 4.0134, 44.2236 ], [ 4.0133, 44.2236 ], [ 4.0132, 44.2239 ], [ 4.0132, 44.224 ], [ 4.0132, 44.2241 ], [ 4.0132, 44.2242 ], [ 4.0131, 44.2246 ], [ 4.0131, 44.2246 ], [ 4.0131, 44.2248 ], [ 4.013, 44.2252 ], [ 4.0129, 44.2255 ], [ 4.0128, 44.2256 ], [ 4.0128, 44.2258 ], [ 4.0127, 44.2259 ], [ 4.0126, 44.2261 ], [ 4.0125, 44.2263 ], [ 4.0124, 44.2265 ], [ 4.0123, 44.2266 ], [ 4.0121, 44.227 ], [ 4.0121, 44.227 ], [ 4.012, 44.227 ], [ 4.0118, 44.2274 ], [ 4.0117, 44.2276 ], [ 4.0116, 44.2277 ], [ 4.0114, 44.2279 ], [ 4.0112, 44.2281 ], [ 4.011, 44.2283 ], [ 4.0108, 44.2284 ], [ 4.0108, 44.2284 ], [ 4.0108, 44.2285 ], [ 4.0108, 44.2285 ], [ 4.0106, 44.2286 ], [ 4.0105, 44.2287 ], [ 4.0106, 44.2289 ], [ 4.0107, 44.2289 ], [ 4.0108, 44.2289 ], [ 4.0108, 44.2289 ], [ 4.011, 44.229 ], [ 4.011, 44.229 ], [ 4.0114, 44.2291 ], [ 4.0112, 44.2294 ], [ 4.0112, 44.2295 ], [ 4.0113, 44.2295 ], [ 4.0114, 44.2295 ], [ 4.0116, 44.2295 ], [ 4.0119, 44.2295 ], [ 4.0121, 44.2295 ], [ 4.0121, 44.2295 ], [ 4.0121, 44.2294 ], [ 4.0122, 44.2293 ], [ 4.0123, 44.2293 ], [ 4.0124, 44.2292 ], [ 4.0128, 44.2292 ], [ 4.0129, 44.229 ], [ 4.0128, 44.229 ], [ 4.0127, 44.229 ], [ 4.0127, 44.229 ], [ 4.0126, 44.229 ], [ 4.0125, 44.2289 ], [ 4.0126, 44.2289 ], [ 4.0125, 44.2289 ], [ 4.0127, 44.2287 ], [ 4.0127, 44.2287 ], [ 4.0127, 44.2287 ], [ 4.0124, 44.2285 ], [ 4.0122, 44.2285 ], [ 4.012, 44.2284 ], [ 4.0118, 44.2283 ], [ 4.0117, 44.2283 ], [ 4.0118, 44.2282 ], [ 4.0118, 44.2282 ], [ 4.0119, 44.2281 ], [ 4.012, 44.2281 ], [ 4.0119, 44.2281 ], [ 4.0119, 44.228 ], [ 4.012, 44.228 ], [ 4.0121, 44.228 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.228 ], [ 4.0125, 44.228 ], [ 4.0127, 44.2279 ], [ 4.013, 44.2277 ], [ 4.0131, 44.2277 ], [ 4.0131, 44.2276 ], [ 4.0131, 44.2275 ], [ 4.0131, 44.2274 ], [ 4.0131, 44.2273 ], [ 4.0131, 44.2272 ], [ 4.0131, 44.2272 ], [ 4.0136, 44.2272 ], [ 4.0141, 44.2272 ], [ 4.0141, 44.2272 ], [ 4.0142, 44.2272 ], [ 4.0144, 44.2272 ], [ 4.0144, 44.2273 ], [ 4.0144, 44.2274 ], [ 4.0146, 44.2275 ], [ 4.0147, 44.2275 ], [ 4.0147, 44.2275 ], [ 4.0148, 44.2275 ], [ 4.0149, 44.2276 ], [ 4.015, 44.2276 ], [ 4.015, 44.2276 ], [ 4.0151, 44.2277 ], [ 4.0151, 44.2277 ], [ 4.0151, 44.2278 ], [ 4.0152, 44.2278 ], [ 4.0153, 44.2278 ], [ 4.0153, 44.2279 ], [ 4.0154, 44.2279 ], [ 4.0155, 44.228 ], [ 4.0156, 44.2279 ], [ 4.0157, 44.2279 ], [ 4.0157, 44.2279 ], [ 4.0156, 44.2276 ], [ 4.0155, 44.2275 ], [ 4.0155, 44.2274 ], [ 4.0155, 44.2273 ], [ 4.0155, 44.2272 ], [ 4.0155, 44.2271 ], [ 4.0155, 44.2271 ], [ 4.0156, 44.227 ], [ 4.0156, 44.2269 ], [ 4.0157, 44.2268 ], [ 4.0161, 44.2265 ], [ 4.0157, 44.2258 ], [ 4.0152, 44.225 ], [ 4.0152, 44.2245 ], [ 4.0152, 44.2245 ], [ 4.0151, 44.2244 ], [ 4.0151, 44.2243 ], [ 4.015, 44.2242 ], [ 4.015, 44.2242 ], [ 4.0149, 44.224 ], [ 4.0149, 44.2239 ], [ 4.0151, 44.2238 ], [ 4.0154, 44.2236 ], [ 4.0156, 44.2235 ], [ 4.016, 44.2233 ], [ 4.0162, 44.2232 ], [ 4.0163, 44.2232 ], [ 4.0164, 44.2232 ], [ 4.0164, 44.2232 ], [ 4.0166, 44.2235 ], [ 4.0169, 44.224 ], [ 4.0171, 44.2239 ], [ 4.0173, 44.2239 ], [ 4.0174, 44.2238 ], [ 4.018, 44.2237 ], [ 4.018, 44.2237 ], [ 4.018, 44.2238 ], [ 4.0181, 44.224 ], [ 4.0185, 44.2239 ], [ 4.0188, 44.2237 ], [ 4.0187, 44.2236 ], [ 4.0188, 44.2234 ], [ 4.0187, 44.2233 ], [ 4.0187, 44.2231 ], [ 4.0186, 44.2229 ], [ 4.0187, 44.2229 ], [ 4.0185, 44.2228 ], [ 4.0184, 44.2228 ], [ 4.0183, 44.2228 ], [ 4.0182, 44.2227 ], [ 4.0182, 44.2225 ], [ 4.0183, 44.2224 ], [ 4.0186, 44.2223 ], [ 4.0186, 44.2223 ], [ 4.0188, 44.2222 ], [ 4.0188, 44.2222 ], [ 4.019, 44.2221 ], [ 4.0191, 44.2219 ], [ 4.0192, 44.2218 ], [ 4.0194, 44.2218 ], [ 4.0195, 44.2218 ], [ 4.0195, 44.2217 ], [ 4.0192, 44.2216 ], [ 4.0192, 44.2216 ], [ 4.019, 44.2215 ], [ 4.0191, 44.2214 ], [ 4.0189, 44.2213 ], [ 4.0189, 44.2212 ], [ 4.0189, 44.221 ], [ 4.019, 44.221 ], [ 4.019, 44.2209 ], [ 4.019, 44.2208 ], [ 4.019, 44.2208 ], [ 4.0191, 44.2207 ], [ 4.0191, 44.2207 ], [ 4.0191, 44.2206 ], [ 4.0192, 44.2205 ], [ 4.0193, 44.2205 ], [ 4.0196, 44.2202 ], [ 4.0197, 44.2201 ], [ 4.0197, 44.2199 ], [ 4.0202, 44.2196 ], [ 4.02, 44.2195 ], [ 4.0198, 44.2195 ], [ 4.0194, 44.2193 ], [ 4.0194, 44.2192 ], [ 4.0194, 44.2191 ], [ 4.0193, 44.219 ], [ 4.0196, 44.2187 ], [ 4.0197, 44.2186 ], [ 4.0196, 44.2185 ], [ 4.0196, 44.2185 ], [ 4.0196, 44.2184 ], [ 4.0196, 44.2183 ], [ 4.0196, 44.2181 ], [ 4.019, 44.218 ], [ 4.0193, 44.2176 ], [ 4.0193, 44.2175 ], [ 4.0195, 44.2173 ], [ 4.0196, 44.2171 ], [ 4.0199, 44.2167 ], [ 4.0202, 44.2165 ] ] ], "type": "Polygon" }, "id": "60", "properties": { "code_commune": "30132", "code_departement": "30", "code_qp": "QP030017", "commune_qp": "La Grand-Combe", "nom_commune": "La Grand-Combe", "nom_qp": "Trescol - La Levade" }, "type": "Feature" }, { "bbox": [ 3.8707, 43.5912, 3.874, 43.594 ], "geometry": { "coordinates": [ [ [ 3.8721, 43.594 ], [ 3.8726, 43.5937 ], [ 3.8729, 43.5936 ], [ 3.8733, 43.5934 ], [ 3.8734, 43.5933 ], [ 3.8737, 43.5932 ], [ 3.8738, 43.5931 ], [ 3.874, 43.593 ], [ 3.8732, 43.5921 ], [ 3.873, 43.5921 ], [ 3.8729, 43.5921 ], [ 3.8727, 43.5922 ], [ 3.8725, 43.5923 ], [ 3.8723, 43.5921 ], [ 3.8728, 43.5919 ], [ 3.8733, 43.5917 ], [ 3.8727, 43.5912 ], [ 3.8719, 43.5916 ], [ 3.8715, 43.5913 ], [ 3.8707, 43.5917 ], [ 3.8713, 43.5923 ], [ 3.8716, 43.5927 ], [ 3.8712, 43.5929 ], [ 3.8717, 43.5935 ], [ 3.8717, 43.5936 ], [ 3.8721, 43.594 ] ] ], "type": "Polygon" }, "id": "61", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034011", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Lemasson" }, "type": "Feature" }, { "bbox": [ 3.8982, 43.6178, 3.9038, 43.6215 ], "geometry": { "coordinates": [ [ [ 3.9006, 43.6185 ], [ 3.9002, 43.6184 ], [ 3.8991, 43.6183 ], [ 3.8988, 43.6183 ], [ 3.8986, 43.6183 ], [ 3.8982, 43.6184 ], [ 3.8983, 43.6185 ], [ 3.8986, 43.6188 ], [ 3.8988, 43.6189 ], [ 3.899, 43.619 ], [ 3.8994, 43.6192 ], [ 3.8996, 43.6193 ], [ 3.8997, 43.6193 ], [ 3.8999, 43.6194 ], [ 3.9002, 43.6194 ], [ 3.9005, 43.6194 ], [ 3.9007, 43.6195 ], [ 3.9008, 43.6196 ], [ 3.901, 43.6197 ], [ 3.901, 43.6198 ], [ 3.9011, 43.6199 ], [ 3.9011, 43.62 ], [ 3.9015, 43.6203 ], [ 3.9016, 43.6204 ], [ 3.9017, 43.6205 ], [ 3.9017, 43.6206 ], [ 3.9016, 43.621 ], [ 3.9016, 43.621 ], [ 3.9017, 43.6212 ], [ 3.9018, 43.6213 ], [ 3.9019, 43.6213 ], [ 3.9021, 43.6214 ], [ 3.9026, 43.6214 ], [ 3.9029, 43.6214 ], [ 3.9031, 43.6215 ], [ 3.9033, 43.6215 ], [ 3.9034, 43.6215 ], [ 3.9036, 43.6214 ], [ 3.9036, 43.6213 ], [ 3.9037, 43.6213 ], [ 3.9037, 43.6212 ], [ 3.9038, 43.6209 ], [ 3.9038, 43.6208 ], [ 3.9037, 43.6208 ], [ 3.9036, 43.6207 ], [ 3.9034, 43.6206 ], [ 3.9033, 43.6205 ], [ 3.9033, 43.6204 ], [ 3.9034, 43.6201 ], [ 3.9034, 43.62 ], [ 3.9037, 43.6198 ], [ 3.9038, 43.6197 ], [ 3.9033, 43.6195 ], [ 3.9032, 43.6195 ], [ 3.9033, 43.6191 ], [ 3.903, 43.6191 ], [ 3.9027, 43.6191 ], [ 3.9023, 43.6191 ], [ 3.9019, 43.6192 ], [ 3.9015, 43.6193 ], [ 3.9009, 43.6194 ], [ 3.9011, 43.6189 ], [ 3.9012, 43.6185 ], [ 3.9014, 43.618 ], [ 3.9014, 43.6179 ], [ 3.9012, 43.6178 ], [ 3.9011, 43.6178 ], [ 3.9009, 43.6178 ], [ 3.9008, 43.6178 ], [ 3.9007, 43.6178 ], [ 3.9007, 43.6179 ], [ 3.9006, 43.6185 ] ] ], "type": "Polygon" }, "id": "62", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034013", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Pompignane" }, "type": "Feature" }, { "bbox": [ 1.1403, 42.9816, 1.1485, 42.9867 ], "geometry": { "coordinates": [ [ [ 1.1438, 42.9863 ], [ 1.1441, 42.9864 ], [ 1.1443, 42.9865 ], [ 1.1445, 42.9866 ], [ 1.1447, 42.9867 ], [ 1.145, 42.9864 ], [ 1.145, 42.9863 ], [ 1.145, 42.9863 ], [ 1.1452, 42.9862 ], [ 1.1453, 42.9863 ], [ 1.1454, 42.9863 ], [ 1.1455, 42.9863 ], [ 1.1454, 42.9862 ], [ 1.1455, 42.9862 ], [ 1.1456, 42.9862 ], [ 1.1456, 42.9862 ], [ 1.1455, 42.9862 ], [ 1.1455, 42.9861 ], [ 1.1455, 42.9861 ], [ 1.1456, 42.9861 ], [ 1.1456, 42.986 ], [ 1.1455, 42.986 ], [ 1.1455, 42.9859 ], [ 1.146, 42.9858 ], [ 1.1465, 42.9857 ], [ 1.1467, 42.9856 ], [ 1.1468, 42.9856 ], [ 1.147, 42.9855 ], [ 1.1472, 42.9853 ], [ 1.1473, 42.9851 ], [ 1.1475, 42.9847 ], [ 1.1485, 42.9829 ], [ 1.1481, 42.9828 ], [ 1.1478, 42.9827 ], [ 1.1474, 42.9828 ], [ 1.1472, 42.9828 ], [ 1.147, 42.9827 ], [ 1.146, 42.9823 ], [ 1.1449, 42.9834 ], [ 1.1448, 42.9835 ], [ 1.1447, 42.9834 ], [ 1.1446, 42.9835 ], [ 1.1445, 42.9836 ], [ 1.1442, 42.9839 ], [ 1.1441, 42.9841 ], [ 1.144, 42.9842 ], [ 1.1435, 42.9844 ], [ 1.1432, 42.9846 ], [ 1.1433, 42.9848 ], [ 1.1427, 42.9857 ], [ 1.1421, 42.9855 ], [ 1.1422, 42.9853 ], [ 1.1429, 42.9842 ], [ 1.1432, 42.984 ], [ 1.1437, 42.9836 ], [ 1.1442, 42.9831 ], [ 1.1442, 42.9832 ], [ 1.1443, 42.9831 ], [ 1.1443, 42.9831 ], [ 1.1443, 42.983 ], [ 1.1442, 42.983 ], [ 1.1444, 42.9829 ], [ 1.1445, 42.9828 ], [ 1.1446, 42.9827 ], [ 1.1449, 42.9825 ], [ 1.1452, 42.9823 ], [ 1.1455, 42.9819 ], [ 1.1454, 42.9819 ], [ 1.1451, 42.9818 ], [ 1.1451, 42.9817 ], [ 1.1449, 42.9816 ], [ 1.1448, 42.9817 ], [ 1.1446, 42.9816 ], [ 1.1446, 42.9817 ], [ 1.1443, 42.9816 ], [ 1.1441, 42.9817 ], [ 1.1443, 42.9818 ], [ 1.1442, 42.9818 ], [ 1.1441, 42.9819 ], [ 1.144, 42.982 ], [ 1.1439, 42.982 ], [ 1.1438, 42.9821 ], [ 1.1439, 42.9821 ], [ 1.1436, 42.9825 ], [ 1.1435, 42.9824 ], [ 1.1434, 42.9824 ], [ 1.1433, 42.9825 ], [ 1.1432, 42.983 ], [ 1.1432, 42.9832 ], [ 1.1431, 42.9833 ], [ 1.1427, 42.9838 ], [ 1.1425, 42.984 ], [ 1.1413, 42.9852 ], [ 1.1412, 42.9851 ], [ 1.1406, 42.9849 ], [ 1.1403, 42.9854 ], [ 1.1412, 42.9858 ], [ 1.1413, 42.9859 ], [ 1.1415, 42.986 ], [ 1.1414, 42.9862 ], [ 1.1416, 42.9862 ], [ 1.142, 42.9857 ], [ 1.1426, 42.9859 ], [ 1.1438, 42.9863 ] ] ], "type": "Polygon" }, "id": "63", "properties": { "code_commune": "09261", "code_departement": "09", "code_qp": "QP009001", "commune_qp": "Saint-Girons", "nom_commune": "Saint-Girons", "nom_qp": "Coeur De Ville" }, "type": "Feature" }, { "bbox": [ 2.9697, 42.5983, 2.9755, 42.6013 ], "geometry": { "coordinates": [ [ [ 2.9716, 42.6011 ], [ 2.9718, 42.601 ], [ 2.972, 42.601 ], [ 2.9723, 42.601 ], [ 2.9725, 42.6009 ], [ 2.9727, 42.6009 ], [ 2.9733, 42.601 ], [ 2.9737, 42.6011 ], [ 2.9743, 42.6012 ], [ 2.9744, 42.6012 ], [ 2.9745, 42.6012 ], [ 2.9746, 42.6011 ], [ 2.975, 42.601 ], [ 2.975, 42.6009 ], [ 2.9751, 42.6008 ], [ 2.9751, 42.6006 ], [ 2.9751, 42.6006 ], [ 2.9755, 42.5995 ], [ 2.9755, 42.5993 ], [ 2.9755, 42.5992 ], [ 2.9753, 42.599 ], [ 2.9751, 42.5989 ], [ 2.9749, 42.5988 ], [ 2.9735, 42.5985 ], [ 2.9735, 42.5984 ], [ 2.9734, 42.5983 ], [ 2.9732, 42.5985 ], [ 2.9732, 42.5985 ], [ 2.9731, 42.5985 ], [ 2.9732, 42.5985 ], [ 2.9731, 42.5986 ], [ 2.973, 42.5987 ], [ 2.9728, 42.5987 ], [ 2.9728, 42.5987 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5987 ], [ 2.9726, 42.5986 ], [ 2.9724, 42.5986 ], [ 2.9722, 42.5987 ], [ 2.9722, 42.5987 ], [ 2.9722, 42.5988 ], [ 2.9723, 42.5989 ], [ 2.9724, 42.599 ], [ 2.9725, 42.5991 ], [ 2.9725, 42.5992 ], [ 2.9725, 42.5993 ], [ 2.9724, 42.5993 ], [ 2.9723, 42.5994 ], [ 2.9721, 42.5995 ], [ 2.9721, 42.5995 ], [ 2.972, 42.5995 ], [ 2.9719, 42.5994 ], [ 2.9718, 42.5994 ], [ 2.9716, 42.5994 ], [ 2.9716, 42.5995 ], [ 2.9715, 42.5996 ], [ 2.9715, 42.5996 ], [ 2.9714, 42.5996 ], [ 2.9711, 42.5995 ], [ 2.9711, 42.5995 ], [ 2.971, 42.5995 ], [ 2.9709, 42.5994 ], [ 2.9709, 42.5993 ], [ 2.9706, 42.5993 ], [ 2.9701, 42.5993 ], [ 2.9699, 42.5994 ], [ 2.9698, 42.5993 ], [ 2.9697, 42.5993 ], [ 2.9697, 42.5994 ], [ 2.9698, 42.5996 ], [ 2.9698, 42.5997 ], [ 2.9699, 42.5998 ], [ 2.97, 42.6 ], [ 2.97, 42.6001 ], [ 2.9701, 42.6003 ], [ 2.9702, 42.6004 ], [ 2.9702, 42.6005 ], [ 2.9703, 42.6006 ], [ 2.9704, 42.6006 ], [ 2.9704, 42.6006 ], [ 2.9703, 42.6009 ], [ 2.9703, 42.601 ], [ 2.9705, 42.601 ], [ 2.9709, 42.6011 ], [ 2.971, 42.6011 ], [ 2.971, 42.6012 ], [ 2.971, 42.6013 ], [ 2.9711, 42.6013 ], [ 2.9712, 42.6012 ], [ 2.9716, 42.6011 ] ] ], "type": "Polygon" }, "id": "64", "properties": { "code_commune": "66065", "code_departement": "66", "code_qp": "QP066001", "commune_qp": "Elne", "nom_commune": "Elne", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 2.8899, 42.6937, 2.9034, 42.7007 ], "geometry": { "coordinates": [ [ [ 2.9033, 42.6991 ], [ 2.9034, 42.6991 ], [ 2.9033, 42.699 ], [ 2.903, 42.6988 ], [ 2.9026, 42.6991 ], [ 2.9026, 42.6991 ], [ 2.9025, 42.699 ], [ 2.9023, 42.699 ], [ 2.9022, 42.6989 ], [ 2.9023, 42.6989 ], [ 2.9022, 42.6988 ], [ 2.9018, 42.6985 ], [ 2.902, 42.6984 ], [ 2.9021, 42.6983 ], [ 2.9023, 42.6982 ], [ 2.9021, 42.698 ], [ 2.9023, 42.6979 ], [ 2.9024, 42.6979 ], [ 2.9026, 42.6978 ], [ 2.9025, 42.6977 ], [ 2.9024, 42.6976 ], [ 2.9024, 42.6975 ], [ 2.9024, 42.6975 ], [ 2.9023, 42.6974 ], [ 2.9022, 42.6973 ], [ 2.9022, 42.6973 ], [ 2.9021, 42.6972 ], [ 2.9021, 42.6972 ], [ 2.902, 42.6971 ], [ 2.902, 42.697 ], [ 2.9019, 42.6969 ], [ 2.9018, 42.6966 ], [ 2.9018, 42.6965 ], [ 2.9017, 42.6964 ], [ 2.9017, 42.6962 ], [ 2.9017, 42.696 ], [ 2.9017, 42.6959 ], [ 2.9017, 42.6959 ], [ 2.9014, 42.6957 ], [ 2.9011, 42.6956 ], [ 2.901, 42.6955 ], [ 2.9006, 42.6952 ], [ 2.9002, 42.6955 ], [ 2.8995, 42.6961 ], [ 2.8992, 42.6962 ], [ 2.8989, 42.6964 ], [ 2.8988, 42.6963 ], [ 2.8988, 42.6961 ], [ 2.8988, 42.6961 ], [ 2.8983, 42.6961 ], [ 2.8982, 42.696 ], [ 2.8976, 42.6957 ], [ 2.8973, 42.6955 ], [ 2.8972, 42.6955 ], [ 2.8972, 42.6955 ], [ 2.8971, 42.6956 ], [ 2.8971, 42.6956 ], [ 2.8966, 42.6952 ], [ 2.8964, 42.6952 ], [ 2.8963, 42.6952 ], [ 2.896, 42.6953 ], [ 2.8956, 42.6951 ], [ 2.8954, 42.695 ], [ 2.8954, 42.6949 ], [ 2.8953, 42.6949 ], [ 2.895, 42.6948 ], [ 2.8947, 42.6948 ], [ 2.8946, 42.6948 ], [ 2.8936, 42.6948 ], [ 2.8929, 42.6947 ], [ 2.8928, 42.6951 ], [ 2.8927, 42.6951 ], [ 2.8926, 42.695 ], [ 2.8925, 42.6949 ], [ 2.8924, 42.6948 ], [ 2.8923, 42.6946 ], [ 2.8922, 42.6945 ], [ 2.8921, 42.6944 ], [ 2.8921, 42.6943 ], [ 2.892, 42.6942 ], [ 2.8916, 42.6939 ], [ 2.8915, 42.6939 ], [ 2.8913, 42.6937 ], [ 2.8903, 42.6944 ], [ 2.8906, 42.6946 ], [ 2.8908, 42.6947 ], [ 2.8906, 42.6949 ], [ 2.8904, 42.6951 ], [ 2.8901, 42.6952 ], [ 2.8899, 42.6954 ], [ 2.89, 42.6955 ], [ 2.8901, 42.6956 ], [ 2.8903, 42.6957 ], [ 2.8904, 42.6958 ], [ 2.8908, 42.696 ], [ 2.8913, 42.6964 ], [ 2.8911, 42.6966 ], [ 2.8913, 42.6968 ], [ 2.8917, 42.6971 ], [ 2.892, 42.6973 ], [ 2.8922, 42.6975 ], [ 2.8923, 42.6976 ], [ 2.8922, 42.6977 ], [ 2.892, 42.698 ], [ 2.8922, 42.6981 ], [ 2.8923, 42.6981 ], [ 2.8923, 42.6982 ], [ 2.8925, 42.6984 ], [ 2.8925, 42.6986 ], [ 2.8925, 42.6986 ], [ 2.8925, 42.6987 ], [ 2.8923, 42.6987 ], [ 2.8924, 42.6989 ], [ 2.8925, 42.6991 ], [ 2.8929, 42.6995 ], [ 2.8931, 42.6997 ], [ 2.8933, 42.7 ], [ 2.8935, 42.7002 ], [ 2.8936, 42.7003 ], [ 2.8937, 42.7003 ], [ 2.8938, 42.7001 ], [ 2.8941, 42.7003 ], [ 2.8941, 42.7003 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8943, 42.7004 ], [ 2.8945, 42.7004 ], [ 2.8948, 42.7005 ], [ 2.895, 42.7006 ], [ 2.8951, 42.7005 ], [ 2.8953, 42.7003 ], [ 2.8953, 42.7003 ], [ 2.8954, 42.7004 ], [ 2.8954, 42.7003 ], [ 2.8957, 42.7 ], [ 2.8958, 42.7 ], [ 2.8959, 42.6999 ], [ 2.8959, 42.6999 ], [ 2.896, 42.6998 ], [ 2.8961, 42.6997 ], [ 2.8963, 42.6996 ], [ 2.8963, 42.6996 ], [ 2.8964, 42.6995 ], [ 2.8965, 42.6995 ], [ 2.8965, 42.6995 ], [ 2.8966, 42.6994 ], [ 2.8966, 42.6994 ], [ 2.8967, 42.6995 ], [ 2.8967, 42.6995 ], [ 2.8969, 42.6995 ], [ 2.8969, 42.6995 ], [ 2.897, 42.6995 ], [ 2.8972, 42.6996 ], [ 2.8973, 42.6996 ], [ 2.8974, 42.6996 ], [ 2.8974, 42.6996 ], [ 2.8975, 42.6996 ], [ 2.8977, 42.6997 ], [ 2.8978, 42.6997 ], [ 2.8979, 42.6997 ], [ 2.8981, 42.6997 ], [ 2.8982, 42.6997 ], [ 2.8983, 42.6995 ], [ 2.8986, 42.6996 ], [ 2.8988, 42.6996 ], [ 2.8997, 42.6992 ], [ 2.8999, 42.6994 ], [ 2.9004, 42.6999 ], [ 2.9006, 42.7002 ], [ 2.9005, 42.7003 ], [ 2.9007, 42.7004 ], [ 2.9008, 42.7005 ], [ 2.9011, 42.7007 ], [ 2.9018, 42.7001 ], [ 2.9025, 42.6995 ], [ 2.9028, 42.6997 ], [ 2.9033, 42.6992 ], [ 2.9032, 42.6992 ], [ 2.9033, 42.6991 ] ] ], "type": "Polygon" }, "id": "65", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066008", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Centre Ancien" }, "type": "Feature" }, { "bbox": [ 1.4331, 43.6327, 1.4456, 43.6435 ], "geometry": { "coordinates": [ [ [ 1.4331, 43.6346 ], [ 1.4331, 43.635 ], [ 1.4331, 43.6353 ], [ 1.4333, 43.636 ], [ 1.4349, 43.6358 ], [ 1.435, 43.6359 ], [ 1.4366, 43.6357 ], [ 1.4368, 43.6362 ], [ 1.4376, 43.6361 ], [ 1.4373, 43.6364 ], [ 1.4382, 43.6367 ], [ 1.439, 43.6366 ], [ 1.4391, 43.6369 ], [ 1.4391, 43.6375 ], [ 1.4392, 43.6382 ], [ 1.4399, 43.6382 ], [ 1.4418, 43.6384 ], [ 1.4418, 43.6385 ], [ 1.4419, 43.6388 ], [ 1.4419, 43.6389 ], [ 1.4418, 43.6393 ], [ 1.4417, 43.64 ], [ 1.4416, 43.6404 ], [ 1.4392, 43.6403 ], [ 1.4391, 43.6418 ], [ 1.4391, 43.6429 ], [ 1.4406, 43.6431 ], [ 1.4413, 43.6432 ], [ 1.4419, 43.6432 ], [ 1.4422, 43.6435 ], [ 1.4434, 43.6431 ], [ 1.4445, 43.6429 ], [ 1.4444, 43.6423 ], [ 1.4444, 43.6409 ], [ 1.4444, 43.6401 ], [ 1.4451, 43.6401 ], [ 1.4451, 43.6395 ], [ 1.4453, 43.6395 ], [ 1.4452, 43.639 ], [ 1.4454, 43.6389 ], [ 1.4453, 43.6379 ], [ 1.4456, 43.6379 ], [ 1.4455, 43.6376 ], [ 1.4454, 43.6373 ], [ 1.4448, 43.6374 ], [ 1.4447, 43.6372 ], [ 1.4447, 43.6369 ], [ 1.4447, 43.6364 ], [ 1.4446, 43.636 ], [ 1.4442, 43.6361 ], [ 1.4441, 43.6356 ], [ 1.4439, 43.6356 ], [ 1.4439, 43.6354 ], [ 1.4434, 43.6356 ], [ 1.4426, 43.635 ], [ 1.4419, 43.6344 ], [ 1.4417, 43.6341 ], [ 1.4413, 43.6332 ], [ 1.4411, 43.6328 ], [ 1.441, 43.6327 ], [ 1.44, 43.6346 ], [ 1.4392, 43.6344 ], [ 1.4391, 43.6346 ], [ 1.4389, 43.6346 ], [ 1.4383, 43.6348 ], [ 1.4379, 43.6348 ], [ 1.4378, 43.6346 ], [ 1.4377, 43.6345 ], [ 1.4368, 43.6345 ], [ 1.4368, 43.6345 ], [ 1.4369, 43.6346 ], [ 1.4369, 43.6347 ], [ 1.4367, 43.6347 ], [ 1.4365, 43.6347 ], [ 1.4364, 43.6348 ], [ 1.4364, 43.6349 ], [ 1.4363, 43.6349 ], [ 1.436, 43.635 ], [ 1.4356, 43.635 ], [ 1.4356, 43.6346 ], [ 1.4356, 43.6343 ], [ 1.4342, 43.6344 ], [ 1.4342, 43.6346 ], [ 1.4341, 43.6346 ], [ 1.4335, 43.6346 ], [ 1.4331, 43.6346 ] ] ], "type": "Polygon" }, "id": "66", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031011", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Les Izards - La Vache" }, "type": "Feature" }, { "bbox": [ 0.0491, 43.2277, 0.0564, 43.2315 ], "geometry": { "coordinates": [ [ [ 0.0497, 43.2288 ], [ 0.05, 43.229 ], [ 0.0503, 43.2292 ], [ 0.0507, 43.2293 ], [ 0.0513, 43.2294 ], [ 0.0518, 43.2293 ], [ 0.0523, 43.2293 ], [ 0.0528, 43.2293 ], [ 0.0535, 43.2293 ], [ 0.0543, 43.2294 ], [ 0.0546, 43.2295 ], [ 0.0546, 43.2296 ], [ 0.0546, 43.23 ], [ 0.054, 43.23 ], [ 0.054, 43.2301 ], [ 0.054, 43.2302 ], [ 0.0539, 43.2315 ], [ 0.0546, 43.2315 ], [ 0.0546, 43.2313 ], [ 0.0547, 43.2311 ], [ 0.0548, 43.2309 ], [ 0.0549, 43.231 ], [ 0.0556, 43.231 ], [ 0.0558, 43.231 ], [ 0.0558, 43.2309 ], [ 0.0564, 43.2309 ], [ 0.0564, 43.2303 ], [ 0.0564, 43.2296 ], [ 0.0559, 43.2296 ], [ 0.0557, 43.2296 ], [ 0.0555, 43.2295 ], [ 0.0556, 43.2293 ], [ 0.0548, 43.2293 ], [ 0.0547, 43.2293 ], [ 0.0543, 43.2293 ], [ 0.0543, 43.228 ], [ 0.0539, 43.2281 ], [ 0.0534, 43.2281 ], [ 0.0534, 43.2277 ], [ 0.052, 43.2278 ], [ 0.0504, 43.2278 ], [ 0.0497, 43.2278 ], [ 0.0497, 43.2279 ], [ 0.0496, 43.2279 ], [ 0.0493, 43.2279 ], [ 0.0493, 43.228 ], [ 0.0493, 43.228 ], [ 0.0492, 43.2281 ], [ 0.0492, 43.2281 ], [ 0.0491, 43.2281 ], [ 0.0491, 43.2282 ], [ 0.0495, 43.2285 ], [ 0.0497, 43.2288 ], [ 0.0497, 43.2288 ] ] ], "type": "Polygon" }, "id": "67", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065001", "commune_qp": "Tarbes", "nom_commune": "Tarbes", "nom_qp": "Tarbes Ouest" }, "type": "Feature" }, { "bbox": [ 3.8367, 43.5925, 3.8495, 43.6013 ], "geometry": { "coordinates": [ [ [ 3.8479, 43.5999 ], [ 3.8475, 43.5997 ], [ 3.8472, 43.5994 ], [ 3.8466, 43.5987 ], [ 3.8464, 43.5985 ], [ 3.8469, 43.5984 ], [ 3.8467, 43.5979 ], [ 3.8464, 43.5974 ], [ 3.8459, 43.5977 ], [ 3.8455, 43.5972 ], [ 3.8457, 43.5971 ], [ 3.846, 43.597 ], [ 3.8458, 43.5968 ], [ 3.8463, 43.5965 ], [ 3.846, 43.5962 ], [ 3.845, 43.5966 ], [ 3.8436, 43.5972 ], [ 3.8428, 43.5976 ], [ 3.8418, 43.5966 ], [ 3.8422, 43.5965 ], [ 3.8421, 43.5964 ], [ 3.8418, 43.5961 ], [ 3.8415, 43.5959 ], [ 3.8413, 43.5956 ], [ 3.841, 43.5956 ], [ 3.8409, 43.5955 ], [ 3.8407, 43.5954 ], [ 3.8404, 43.5952 ], [ 3.8401, 43.595 ], [ 3.8398, 43.5947 ], [ 3.8401, 43.5944 ], [ 3.8404, 43.5946 ], [ 3.8405, 43.5945 ], [ 3.8408, 43.5946 ], [ 3.841, 43.5944 ], [ 3.8412, 43.5942 ], [ 3.8414, 43.5943 ], [ 3.8414, 43.5943 ], [ 3.8415, 43.5943 ], [ 3.8416, 43.5943 ], [ 3.8418, 43.5943 ], [ 3.8424, 43.5946 ], [ 3.8425, 43.5946 ], [ 3.8425, 43.5946 ], [ 3.8426, 43.5946 ], [ 3.8431, 43.5935 ], [ 3.8431, 43.5934 ], [ 3.843, 43.5934 ], [ 3.8425, 43.5935 ], [ 3.8422, 43.5929 ], [ 3.8417, 43.5926 ], [ 3.8416, 43.5925 ], [ 3.8415, 43.5925 ], [ 3.8407, 43.5932 ], [ 3.8406, 43.5932 ], [ 3.8405, 43.5933 ], [ 3.8399, 43.5931 ], [ 3.8396, 43.593 ], [ 3.8388, 43.5942 ], [ 3.8386, 43.5942 ], [ 3.8385, 43.5943 ], [ 3.8388, 43.5946 ], [ 3.8385, 43.5948 ], [ 3.8382, 43.5946 ], [ 3.8378, 43.5948 ], [ 3.8376, 43.5947 ], [ 3.8374, 43.5949 ], [ 3.8372, 43.595 ], [ 3.8369, 43.5949 ], [ 3.8367, 43.5952 ], [ 3.8369, 43.5953 ], [ 3.837, 43.5955 ], [ 3.8369, 43.5956 ], [ 3.8368, 43.5957 ], [ 3.8368, 43.5958 ], [ 3.8368, 43.5959 ], [ 3.8368, 43.5961 ], [ 3.8369, 43.5961 ], [ 3.8372, 43.5963 ], [ 3.8375, 43.5965 ], [ 3.8378, 43.5966 ], [ 3.8385, 43.5968 ], [ 3.839, 43.5963 ], [ 3.8388, 43.5961 ], [ 3.8391, 43.5958 ], [ 3.8393, 43.5956 ], [ 3.8394, 43.5956 ], [ 3.8395, 43.5957 ], [ 3.8396, 43.5957 ], [ 3.8399, 43.5961 ], [ 3.84, 43.5962 ], [ 3.8401, 43.5964 ], [ 3.8405, 43.5966 ], [ 3.8412, 43.5969 ], [ 3.8415, 43.5971 ], [ 3.8418, 43.5984 ], [ 3.8431, 43.5996 ], [ 3.8454, 43.6008 ], [ 3.8461, 43.6011 ], [ 3.8466, 43.6012 ], [ 3.8484, 43.6013 ], [ 3.8494, 43.601 ], [ 3.8495, 43.6008 ], [ 3.8484, 43.6003 ], [ 3.8479, 43.5999 ] ] ], "type": "Polygon" }, "id": "68", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034007", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Pas Du Loup - Val De Croze" }, "type": "Feature" }, { "bbox": [ 2.5906, 44.3632, 2.6018, 44.3674 ], "geometry": { "coordinates": [ [ [ 2.5926, 44.3671 ], [ 2.5927, 44.3672 ], [ 2.5929, 44.3674 ], [ 2.5933, 44.3672 ], [ 2.594, 44.367 ], [ 2.5947, 44.3668 ], [ 2.5949, 44.3667 ], [ 2.5954, 44.3666 ], [ 2.5956, 44.3665 ], [ 2.5965, 44.3661 ], [ 2.5972, 44.3656 ], [ 2.5977, 44.3652 ], [ 2.598, 44.365 ], [ 2.5988, 44.3655 ], [ 2.5996, 44.3653 ], [ 2.5998, 44.3653 ], [ 2.6001, 44.3652 ], [ 2.6005, 44.3647 ], [ 2.6006, 44.3646 ], [ 2.6006, 44.3646 ], [ 2.6009, 44.3646 ], [ 2.6013, 44.3645 ], [ 2.6014, 44.3645 ], [ 2.6016, 44.3645 ], [ 2.6017, 44.3644 ], [ 2.6018, 44.3643 ], [ 2.6016, 44.3643 ], [ 2.6015, 44.3642 ], [ 2.6013, 44.3641 ], [ 2.6011, 44.3641 ], [ 2.6016, 44.3638 ], [ 2.6018, 44.3634 ], [ 2.6015, 44.3632 ], [ 2.6011, 44.3634 ], [ 2.6009, 44.3635 ], [ 2.6003, 44.3639 ], [ 2.5994, 44.3637 ], [ 2.5991, 44.3636 ], [ 2.5974, 44.3635 ], [ 2.597, 44.3636 ], [ 2.5969, 44.3637 ], [ 2.5967, 44.3638 ], [ 2.5963, 44.3641 ], [ 2.5959, 44.3642 ], [ 2.5955, 44.3643 ], [ 2.5947, 44.3645 ], [ 2.5945, 44.3645 ], [ 2.5942, 44.3645 ], [ 2.5941, 44.3643 ], [ 2.594, 44.3641 ], [ 2.5927, 44.3642 ], [ 2.5924, 44.3642 ], [ 2.5922, 44.3642 ], [ 2.592, 44.3642 ], [ 2.5919, 44.3643 ], [ 2.5918, 44.3644 ], [ 2.5919, 44.3647 ], [ 2.5921, 44.3646 ], [ 2.5921, 44.3648 ], [ 2.5921, 44.3649 ], [ 2.5921, 44.3651 ], [ 2.592, 44.3651 ], [ 2.5919, 44.3652 ], [ 2.5919, 44.3652 ], [ 2.5919, 44.3653 ], [ 2.5919, 44.3653 ], [ 2.5919, 44.3654 ], [ 2.592, 44.3654 ], [ 2.592, 44.3655 ], [ 2.5918, 44.3656 ], [ 2.5918, 44.3657 ], [ 2.5911, 44.3657 ], [ 2.5912, 44.3658 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.366 ], [ 2.5906, 44.3661 ], [ 2.5907, 44.3663 ], [ 2.5908, 44.3663 ], [ 2.5909, 44.3663 ], [ 2.5911, 44.3662 ], [ 2.5913, 44.3664 ], [ 2.592, 44.3664 ], [ 2.5921, 44.3664 ], [ 2.5926, 44.3671 ] ] ], "type": "Polygon" }, "id": "69", "properties": { "code_commune": "12176", "code_departement": "12", "code_qp": "QP012001", "commune_qp": "Onet-le-Château", "nom_commune": "Onet-le-Château", "nom_qp": "Quatre Saisons" }, "type": "Feature" }, { "bbox": [ -0.0437, 43.0836, -0.0404, 43.0895 ], "geometry": { "coordinates": [ [ [ -0.0418, 43.0892 ], [ -0.0417, 43.0895 ], [ -0.0408, 43.0893 ], [ -0.0404, 43.0888 ], [ -0.0405, 43.0885 ], [ -0.0406, 43.0883 ], [ -0.0407, 43.088 ], [ -0.0408, 43.0879 ], [ -0.0408, 43.0878 ], [ -0.0409, 43.0877 ], [ -0.0407, 43.0872 ], [ -0.0407, 43.0869 ], [ -0.0407, 43.0868 ], [ -0.0407, 43.0867 ], [ -0.0412, 43.0865 ], [ -0.0419, 43.0865 ], [ -0.0421, 43.0865 ], [ -0.0421, 43.086 ], [ -0.0421, 43.0851 ], [ -0.0414, 43.0845 ], [ -0.0414, 43.0843 ], [ -0.0414, 43.0841 ], [ -0.0414, 43.0838 ], [ -0.0415, 43.0838 ], [ -0.0416, 43.0837 ], [ -0.0417, 43.0837 ], [ -0.0421, 43.0837 ], [ -0.0429, 43.0836 ], [ -0.0433, 43.0836 ], [ -0.0437, 43.0836 ], [ -0.0437, 43.0837 ], [ -0.0435, 43.0838 ], [ -0.0434, 43.0851 ], [ -0.0433, 43.0851 ], [ -0.0433, 43.0856 ], [ -0.0433, 43.0861 ], [ -0.0433, 43.0861 ], [ -0.0432, 43.0865 ], [ -0.0432, 43.0867 ], [ -0.0431, 43.0867 ], [ -0.043, 43.0875 ], [ -0.0429, 43.0881 ], [ -0.0427, 43.0891 ], [ -0.0427, 43.0893 ], [ -0.0418, 43.0892 ] ] ], "type": "Polygon" }, "id": "70", "properties": { "code_commune": "65286", "code_departement": "65", "code_qp": "QP065004", "commune_qp": "Lourdes", "nom_commune": "Lourdes", "nom_qp": "Ophite" }, "type": "Feature" }, { "bbox": [ 4.3577, 43.8386, 4.3726, 43.8447 ], "geometry": { "coordinates": [ [ [ 4.3726, 43.8407 ], [ 4.3721, 43.8405 ], [ 4.3712, 43.8403 ], [ 4.3707, 43.8402 ], [ 4.3701, 43.8397 ], [ 4.3695, 43.8393 ], [ 4.3691, 43.839 ], [ 4.3688, 43.8388 ], [ 4.3665, 43.8391 ], [ 4.3657, 43.8391 ], [ 4.3645, 43.8392 ], [ 4.3643, 43.8393 ], [ 4.3641, 43.8392 ], [ 4.3637, 43.839 ], [ 4.3634, 43.8392 ], [ 4.3635, 43.8396 ], [ 4.3635, 43.8398 ], [ 4.3635, 43.8398 ], [ 4.363, 43.84 ], [ 4.3629, 43.84 ], [ 4.3626, 43.8393 ], [ 4.3626, 43.8391 ], [ 4.3626, 43.8391 ], [ 4.3626, 43.839 ], [ 4.3625, 43.8389 ], [ 4.3624, 43.8388 ], [ 4.3622, 43.8387 ], [ 4.3621, 43.8387 ], [ 4.362, 43.8386 ], [ 4.3617, 43.8386 ], [ 4.3616, 43.8386 ], [ 4.3615, 43.8387 ], [ 4.3612, 43.8388 ], [ 4.3606, 43.8391 ], [ 4.3605, 43.8391 ], [ 4.3604, 43.8391 ], [ 4.3599, 43.839 ], [ 4.3599, 43.8393 ], [ 4.3599, 43.8395 ], [ 4.3602, 43.84 ], [ 4.3603, 43.8403 ], [ 4.3603, 43.8404 ], [ 4.36, 43.8404 ], [ 4.3598, 43.8405 ], [ 4.3596, 43.8405 ], [ 4.3591, 43.8405 ], [ 4.3589, 43.8405 ], [ 4.3581, 43.8404 ], [ 4.358, 43.8408 ], [ 4.3579, 43.8413 ], [ 4.3579, 43.8415 ], [ 4.3577, 43.8419 ], [ 4.3582, 43.842 ], [ 4.3583, 43.8421 ], [ 4.3582, 43.8423 ], [ 4.3579, 43.8429 ], [ 4.3577, 43.8433 ], [ 4.3582, 43.8433 ], [ 4.3582, 43.8434 ], [ 4.3587, 43.8435 ], [ 4.3587, 43.8435 ], [ 4.3595, 43.8436 ], [ 4.3597, 43.8436 ], [ 4.3602, 43.8436 ], [ 4.3607, 43.8437 ], [ 4.3607, 43.8437 ], [ 4.3615, 43.8438 ], [ 4.3623, 43.8438 ], [ 4.3624, 43.8436 ], [ 4.3625, 43.8434 ], [ 4.3626, 43.8433 ], [ 4.3625, 43.8423 ], [ 4.3624, 43.8416 ], [ 4.3623, 43.841 ], [ 4.3622, 43.8403 ], [ 4.3629, 43.8402 ], [ 4.3649, 43.8401 ], [ 4.3652, 43.8402 ], [ 4.3656, 43.8404 ], [ 4.3663, 43.841 ], [ 4.3672, 43.8417 ], [ 4.3672, 43.8417 ], [ 4.3675, 43.8426 ], [ 4.3676, 43.8428 ], [ 4.3677, 43.8435 ], [ 4.3677, 43.8437 ], [ 4.3677, 43.8442 ], [ 4.3677, 43.8447 ], [ 4.3686, 43.844 ], [ 4.3692, 43.8433 ], [ 4.3696, 43.8429 ], [ 4.3698, 43.8427 ], [ 4.3704, 43.8423 ], [ 4.3704, 43.8423 ], [ 4.3716, 43.8425 ], [ 4.3718, 43.8419 ], [ 4.372, 43.8415 ], [ 4.372, 43.8415 ], [ 4.372, 43.8415 ], [ 4.3722, 43.8415 ], [ 4.3726, 43.8407 ] ] ], "type": "Polygon" }, "id": "71", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030004", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Gambetta-Richelieu" }, "type": "Feature" }, { "bbox": [ 3.8427, 43.617, 3.8555, 43.6246 ], "geometry": { "coordinates": [ [ [ 3.8548, 43.6206 ], [ 3.8549, 43.6201 ], [ 3.8543, 43.6201 ], [ 3.8533, 43.6201 ], [ 3.8521, 43.62 ], [ 3.8505, 43.62 ], [ 3.8482, 43.6213 ], [ 3.8475, 43.6212 ], [ 3.8475, 43.6212 ], [ 3.8474, 43.6212 ], [ 3.847, 43.6213 ], [ 3.8465, 43.621 ], [ 3.8465, 43.621 ], [ 3.8465, 43.6209 ], [ 3.8465, 43.6208 ], [ 3.8459, 43.6207 ], [ 3.8459, 43.6207 ], [ 3.8458, 43.6207 ], [ 3.8458, 43.6205 ], [ 3.8459, 43.6202 ], [ 3.8461, 43.6199 ], [ 3.8462, 43.6198 ], [ 3.8462, 43.6198 ], [ 3.8462, 43.6197 ], [ 3.8463, 43.6196 ], [ 3.8464, 43.6195 ], [ 3.8464, 43.6194 ], [ 3.8465, 43.6192 ], [ 3.8466, 43.6191 ], [ 3.8466, 43.619 ], [ 3.8466, 43.6189 ], [ 3.8466, 43.6187 ], [ 3.8462, 43.6186 ], [ 3.8463, 43.6184 ], [ 3.8469, 43.6179 ], [ 3.8474, 43.618 ], [ 3.8477, 43.6174 ], [ 3.8471, 43.6174 ], [ 3.8465, 43.6175 ], [ 3.8464, 43.6175 ], [ 3.8459, 43.617 ], [ 3.8459, 43.6171 ], [ 3.8458, 43.6171 ], [ 3.8452, 43.6171 ], [ 3.8451, 43.6171 ], [ 3.8439, 43.618 ], [ 3.8442, 43.6181 ], [ 3.8435, 43.6189 ], [ 3.8427, 43.6194 ], [ 3.8436, 43.6198 ], [ 3.8432, 43.6203 ], [ 3.8437, 43.6206 ], [ 3.8435, 43.6209 ], [ 3.8432, 43.6213 ], [ 3.8434, 43.6214 ], [ 3.8435, 43.6215 ], [ 3.8437, 43.6215 ], [ 3.8438, 43.6215 ], [ 3.8443, 43.6215 ], [ 3.8444, 43.6217 ], [ 3.8444, 43.6219 ], [ 3.8446, 43.6219 ], [ 3.8447, 43.622 ], [ 3.844, 43.6225 ], [ 3.8444, 43.623 ], [ 3.8452, 43.6225 ], [ 3.8459, 43.6221 ], [ 3.8468, 43.6218 ], [ 3.8473, 43.6217 ], [ 3.8477, 43.6216 ], [ 3.8478, 43.6217 ], [ 3.8479, 43.6217 ], [ 3.8481, 43.6218 ], [ 3.8481, 43.6218 ], [ 3.8483, 43.6224 ], [ 3.8491, 43.6222 ], [ 3.8492, 43.6222 ], [ 3.8498, 43.6224 ], [ 3.8499, 43.6224 ], [ 3.85, 43.6224 ], [ 3.8504, 43.623 ], [ 3.8495, 43.6234 ], [ 3.8492, 43.6237 ], [ 3.8492, 43.6238 ], [ 3.8492, 43.6238 ], [ 3.8493, 43.6241 ], [ 3.8493, 43.6243 ], [ 3.8494, 43.6243 ], [ 3.8498, 43.6245 ], [ 3.85, 43.6246 ], [ 3.8501, 43.6245 ], [ 3.8504, 43.6244 ], [ 3.8509, 43.624 ], [ 3.8513, 43.6235 ], [ 3.8516, 43.6233 ], [ 3.8519, 43.6231 ], [ 3.852, 43.6231 ], [ 3.8525, 43.6235 ], [ 3.8529, 43.6237 ], [ 3.8537, 43.6231 ], [ 3.8536, 43.623 ], [ 3.8535, 43.6227 ], [ 3.8538, 43.6226 ], [ 3.8542, 43.6226 ], [ 3.8545, 43.6226 ], [ 3.8547, 43.6224 ], [ 3.8555, 43.6219 ], [ 3.855, 43.6217 ], [ 3.855, 43.6217 ], [ 3.8545, 43.6216 ], [ 3.8544, 43.6215 ], [ 3.855, 43.6212 ], [ 3.8551, 43.6211 ], [ 3.8552, 43.6209 ], [ 3.8549, 43.6206 ], [ 3.8548, 43.6206 ] ] ], "type": "Polygon" }, "id": "72", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034008", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Cévennes" }, "type": "Feature" }, { "bbox": [ 4.3816, 43.8369, 4.396, 43.8472 ], "geometry": { "coordinates": [ [ [ 4.3863, 43.8422 ], [ 4.3821, 43.8428 ], [ 4.3817, 43.8429 ], [ 4.3816, 43.843 ], [ 4.3816, 43.8432 ], [ 4.3829, 43.8443 ], [ 4.3826, 43.8444 ], [ 4.3825, 43.8446 ], [ 4.3824, 43.8447 ], [ 4.3821, 43.8448 ], [ 4.3822, 43.8454 ], [ 4.3849, 43.8461 ], [ 4.385, 43.846 ], [ 4.3839, 43.8451 ], [ 4.3843, 43.8449 ], [ 4.3846, 43.8447 ], [ 4.3852, 43.8444 ], [ 4.3856, 43.8445 ], [ 4.3863, 43.8449 ], [ 4.3866, 43.8451 ], [ 4.3871, 43.8453 ], [ 4.3874, 43.8454 ], [ 4.3879, 43.8456 ], [ 4.3884, 43.8458 ], [ 4.3888, 43.846 ], [ 4.3892, 43.8463 ], [ 4.3896, 43.8465 ], [ 4.3898, 43.8466 ], [ 4.39, 43.8466 ], [ 4.3901, 43.8467 ], [ 4.3903, 43.8467 ], [ 4.3905, 43.8468 ], [ 4.3907, 43.8468 ], [ 4.3916, 43.8469 ], [ 4.3929, 43.8469 ], [ 4.3942, 43.8471 ], [ 4.3949, 43.8472 ], [ 4.3959, 43.8471 ], [ 4.396, 43.8469 ], [ 4.3955, 43.8466 ], [ 4.3952, 43.8463 ], [ 4.3949, 43.8461 ], [ 4.3947, 43.8459 ], [ 4.3942, 43.8454 ], [ 4.3935, 43.8448 ], [ 4.3925, 43.8441 ], [ 4.3916, 43.8433 ], [ 4.3913, 43.8431 ], [ 4.3905, 43.8423 ], [ 4.3904, 43.8422 ], [ 4.3903, 43.8421 ], [ 4.39, 43.8418 ], [ 4.3897, 43.8415 ], [ 4.3897, 43.8412 ], [ 4.3895, 43.841 ], [ 4.389, 43.8401 ], [ 4.3885, 43.8389 ], [ 4.3881, 43.8372 ], [ 4.388, 43.837 ], [ 4.3875, 43.8369 ], [ 4.3871, 43.8369 ], [ 4.3869, 43.8375 ], [ 4.3867, 43.8383 ], [ 4.3866, 43.8388 ], [ 4.3866, 43.8389 ], [ 4.3868, 43.839 ], [ 4.3873, 43.8392 ], [ 4.3873, 43.8393 ], [ 4.3872, 43.8396 ], [ 4.3869, 43.8402 ], [ 4.3882, 43.8405 ], [ 4.388, 43.8409 ], [ 4.3885, 43.8411 ], [ 4.3886, 43.8411 ], [ 4.3885, 43.8414 ], [ 4.3874, 43.8412 ], [ 4.3873, 43.8412 ], [ 4.3872, 43.8417 ], [ 4.3867, 43.8416 ], [ 4.3865, 43.8416 ], [ 4.3862, 43.8421 ], [ 4.3863, 43.8422 ] ] ], "type": "Polygon" }, "id": "73", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030005", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Chemin-Bas D'Avignon - Clos D'Orville" }, "type": "Feature" }, { "bbox": [ 4.3932, 43.8528, 4.4027, 43.8608 ], "geometry": { "coordinates": [ [ [ 4.3977, 43.8531 ], [ 4.3975, 43.8528 ], [ 4.3972, 43.8529 ], [ 4.3973, 43.8531 ], [ 4.3969, 43.8532 ], [ 4.397, 43.8534 ], [ 4.3969, 43.8538 ], [ 4.3968, 43.8543 ], [ 4.3966, 43.8546 ], [ 4.3967, 43.8546 ], [ 4.3965, 43.8548 ], [ 4.3963, 43.8552 ], [ 4.3962, 43.8554 ], [ 4.3962, 43.8554 ], [ 4.3957, 43.8553 ], [ 4.3956, 43.8553 ], [ 4.3954, 43.8552 ], [ 4.3953, 43.8552 ], [ 4.395, 43.8556 ], [ 4.3947, 43.856 ], [ 4.3946, 43.8559 ], [ 4.3944, 43.8561 ], [ 4.3944, 43.8561 ], [ 4.3944, 43.8562 ], [ 4.3943, 43.8562 ], [ 4.3942, 43.8562 ], [ 4.3941, 43.8563 ], [ 4.394, 43.8563 ], [ 4.3936, 43.8563 ], [ 4.3934, 43.8567 ], [ 4.3935, 43.8567 ], [ 4.3933, 43.857 ], [ 4.3932, 43.857 ], [ 4.3932, 43.8571 ], [ 4.3935, 43.8573 ], [ 4.3938, 43.8575 ], [ 4.394, 43.8576 ], [ 4.3942, 43.8577 ], [ 4.3945, 43.8578 ], [ 4.3945, 43.8578 ], [ 4.3944, 43.8579 ], [ 4.3944, 43.8581 ], [ 4.3943, 43.8582 ], [ 4.3943, 43.8583 ], [ 4.3943, 43.8585 ], [ 4.3944, 43.8586 ], [ 4.3946, 43.8586 ], [ 4.3949, 43.8586 ], [ 4.395, 43.8587 ], [ 4.3949, 43.8592 ], [ 4.395, 43.8593 ], [ 4.3957, 43.8595 ], [ 4.3959, 43.8596 ], [ 4.396, 43.8596 ], [ 4.3962, 43.8596 ], [ 4.3964, 43.8593 ], [ 4.3964, 43.8589 ], [ 4.3961, 43.8589 ], [ 4.3961, 43.8589 ], [ 4.3958, 43.8588 ], [ 4.3957, 43.8586 ], [ 4.3957, 43.8584 ], [ 4.3957, 43.8583 ], [ 4.3957, 43.8582 ], [ 4.3961, 43.8582 ], [ 4.3963, 43.8583 ], [ 4.3963, 43.8582 ], [ 4.3964, 43.8582 ], [ 4.3965, 43.8583 ], [ 4.3966, 43.8583 ], [ 4.3966, 43.8585 ], [ 4.3965, 43.8586 ], [ 4.3964, 43.8589 ], [ 4.397, 43.8589 ], [ 4.3973, 43.8589 ], [ 4.3975, 43.8588 ], [ 4.3974, 43.8587 ], [ 4.3973, 43.8585 ], [ 4.3972, 43.8583 ], [ 4.3972, 43.8583 ], [ 4.3971, 43.8582 ], [ 4.3971, 43.8581 ], [ 4.3971, 43.8579 ], [ 4.3971, 43.8577 ], [ 4.3972, 43.8575 ], [ 4.3977, 43.8575 ], [ 4.3976, 43.8577 ], [ 4.3977, 43.8577 ], [ 4.3981, 43.8579 ], [ 4.3983, 43.858 ], [ 4.3984, 43.858 ], [ 4.3986, 43.8582 ], [ 4.3984, 43.8584 ], [ 4.3983, 43.8583 ], [ 4.3983, 43.8584 ], [ 4.3982, 43.8584 ], [ 4.3981, 43.8585 ], [ 4.398, 43.8586 ], [ 4.398, 43.8586 ], [ 4.3981, 43.8586 ], [ 4.3983, 43.8586 ], [ 4.3986, 43.8586 ], [ 4.3988, 43.8588 ], [ 4.399, 43.8589 ], [ 4.3993, 43.8592 ], [ 4.3987, 43.8597 ], [ 4.3989, 43.8599 ], [ 4.3997, 43.8592 ], [ 4.3998, 43.8593 ], [ 4.3998, 43.8594 ], [ 4.4, 43.8595 ], [ 4.4001, 43.8597 ], [ 4.4002, 43.8597 ], [ 4.4003, 43.8597 ], [ 4.4007, 43.8599 ], [ 4.4011, 43.8603 ], [ 4.401, 43.8603 ], [ 4.4015, 43.8608 ], [ 4.4018, 43.8607 ], [ 4.4017, 43.8606 ], [ 4.402, 43.8604 ], [ 4.4022, 43.8605 ], [ 4.4023, 43.8605 ], [ 4.4024, 43.8605 ], [ 4.4025, 43.8605 ], [ 4.4026, 43.8603 ], [ 4.4027, 43.8603 ], [ 4.4027, 43.8602 ], [ 4.4027, 43.8602 ], [ 4.4027, 43.86 ], [ 4.4024, 43.8593 ], [ 4.4023, 43.8591 ], [ 4.4021, 43.8587 ], [ 4.402, 43.8583 ], [ 4.4013, 43.8572 ], [ 4.4003, 43.8576 ], [ 4.4002, 43.8578 ], [ 4.4001, 43.8579 ], [ 4.4001, 43.8579 ], [ 4.4002, 43.8579 ], [ 4.4, 43.8582 ], [ 4.3999, 43.8581 ], [ 4.3997, 43.8581 ], [ 4.3996, 43.8581 ], [ 4.3995, 43.858 ], [ 4.3997, 43.8579 ], [ 4.3998, 43.8575 ], [ 4.3998, 43.8575 ], [ 4.3997, 43.8572 ], [ 4.3997, 43.8571 ], [ 4.3999, 43.8566 ], [ 4.4, 43.8564 ], [ 4.4001, 43.8563 ], [ 4.4001, 43.8563 ], [ 4.4002, 43.8562 ], [ 4.4004, 43.8561 ], [ 4.4005, 43.856 ], [ 4.4006, 43.8559 ], [ 4.4005, 43.8558 ], [ 4.4003, 43.8556 ], [ 4.4, 43.8554 ], [ 4.3995, 43.8551 ], [ 4.3991, 43.8548 ], [ 4.3989, 43.8546 ], [ 4.3986, 43.8544 ], [ 4.3982, 43.854 ], [ 4.3981, 43.8538 ], [ 4.398, 43.8538 ], [ 4.3979, 43.8534 ], [ 4.3979, 43.8533 ], [ 4.3977, 43.8531 ] ] ], "type": "Polygon" }, "id": "74", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030006", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Mas De Mingue" }, "type": "Feature" }, { "bbox": [ 3.8752, 43.58, 3.8901, 43.5942 ], "geometry": { "coordinates": [ [ [ 3.8763, 43.5812 ], [ 3.8766, 43.5814 ], [ 3.8762, 43.5818 ], [ 3.8766, 43.5821 ], [ 3.8769, 43.5822 ], [ 3.8773, 43.5822 ], [ 3.8776, 43.5822 ], [ 3.8779, 43.5821 ], [ 3.8782, 43.582 ], [ 3.8784, 43.5819 ], [ 3.8786, 43.5817 ], [ 3.8797, 43.5822 ], [ 3.8805, 43.5829 ], [ 3.8829, 43.5865 ], [ 3.884, 43.588 ], [ 3.8827, 43.5884 ], [ 3.8838, 43.5894 ], [ 3.8836, 43.5894 ], [ 3.8844, 43.5906 ], [ 3.8832, 43.5911 ], [ 3.8822, 43.5915 ], [ 3.883, 43.5927 ], [ 3.8824, 43.5929 ], [ 3.8826, 43.5932 ], [ 3.8839, 43.5927 ], [ 3.8845, 43.5935 ], [ 3.8848, 43.5938 ], [ 3.8852, 43.5942 ], [ 3.8854, 43.5941 ], [ 3.8856, 43.5939 ], [ 3.8859, 43.5937 ], [ 3.8861, 43.5935 ], [ 3.8863, 43.5933 ], [ 3.8861, 43.5931 ], [ 3.8861, 43.593 ], [ 3.8862, 43.5929 ], [ 3.8867, 43.5924 ], [ 3.8854, 43.5907 ], [ 3.8857, 43.5905 ], [ 3.8856, 43.5902 ], [ 3.886, 43.5901 ], [ 3.8876, 43.5896 ], [ 3.8879, 43.5895 ], [ 3.8886, 43.5894 ], [ 3.8894, 43.5894 ], [ 3.8896, 43.5894 ], [ 3.8895, 43.5891 ], [ 3.8897, 43.5889 ], [ 3.89, 43.5887 ], [ 3.8901, 43.5882 ], [ 3.89, 43.5879 ], [ 3.8895, 43.5872 ], [ 3.8892, 43.5868 ], [ 3.8887, 43.5857 ], [ 3.8883, 43.5853 ], [ 3.8882, 43.5846 ], [ 3.8881, 43.5843 ], [ 3.888, 43.5843 ], [ 3.8875, 43.5835 ], [ 3.8871, 43.5831 ], [ 3.886, 43.5821 ], [ 3.8856, 43.5819 ], [ 3.8837, 43.5812 ], [ 3.8824, 43.5808 ], [ 3.8821, 43.5807 ], [ 3.8819, 43.5808 ], [ 3.8813, 43.5811 ], [ 3.8812, 43.5813 ], [ 3.8809, 43.5815 ], [ 3.8804, 43.5818 ], [ 3.8789, 43.5815 ], [ 3.879, 43.5813 ], [ 3.879, 43.5812 ], [ 3.879, 43.581 ], [ 3.8788, 43.581 ], [ 3.8787, 43.581 ], [ 3.8786, 43.5808 ], [ 3.8784, 43.5806 ], [ 3.8782, 43.5804 ], [ 3.8778, 43.5802 ], [ 3.8776, 43.5802 ], [ 3.8775, 43.5802 ], [ 3.8771, 43.5802 ], [ 3.8767, 43.5803 ], [ 3.8765, 43.58 ], [ 3.8761, 43.5802 ], [ 3.8759, 43.58 ], [ 3.8752, 43.5804 ], [ 3.8762, 43.5806 ], [ 3.8763, 43.5807 ], [ 3.8764, 43.581 ], [ 3.8764, 43.5811 ], [ 3.8764, 43.5811 ], [ 3.8763, 43.5812 ] ] ], "type": "Polygon" }, "id": "75", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034012", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Près D'Arènes" }, "type": "Feature" }, { "bbox": [ 0.7183, 43.1062, 0.7301, 43.1123 ], "geometry": { "coordinates": [ [ [ 0.7224, 43.1089 ], [ 0.7222, 43.1095 ], [ 0.7222, 43.1098 ], [ 0.7217, 43.1097 ], [ 0.7215, 43.11 ], [ 0.7214, 43.11 ], [ 0.7213, 43.1101 ], [ 0.723, 43.1103 ], [ 0.7229, 43.1106 ], [ 0.7229, 43.1107 ], [ 0.7227, 43.111 ], [ 0.7228, 43.111 ], [ 0.7234, 43.1111 ], [ 0.7241, 43.1112 ], [ 0.7242, 43.1113 ], [ 0.7242, 43.1116 ], [ 0.7242, 43.1117 ], [ 0.7245, 43.1117 ], [ 0.7245, 43.1123 ], [ 0.7257, 43.1122 ], [ 0.7259, 43.1121 ], [ 0.7263, 43.1121 ], [ 0.7264, 43.1118 ], [ 0.7263, 43.1117 ], [ 0.7263, 43.1114 ], [ 0.7263, 43.1112 ], [ 0.7271, 43.1112 ], [ 0.7271, 43.1109 ], [ 0.7276, 43.1109 ], [ 0.7279, 43.1109 ], [ 0.7279, 43.1109 ], [ 0.728, 43.1102 ], [ 0.7283, 43.1103 ], [ 0.729, 43.1103 ], [ 0.729, 43.1105 ], [ 0.7292, 43.1105 ], [ 0.7294, 43.1105 ], [ 0.7295, 43.1106 ], [ 0.7297, 43.1106 ], [ 0.7298, 43.1107 ], [ 0.7299, 43.1107 ], [ 0.73, 43.1105 ], [ 0.7301, 43.1103 ], [ 0.7296, 43.1101 ], [ 0.729, 43.1096 ], [ 0.7286, 43.1095 ], [ 0.7286, 43.1093 ], [ 0.7286, 43.1091 ], [ 0.7298, 43.1065 ], [ 0.7295, 43.1065 ], [ 0.7292, 43.1066 ], [ 0.7286, 43.1067 ], [ 0.7283, 43.1067 ], [ 0.7278, 43.1069 ], [ 0.7277, 43.1069 ], [ 0.7276, 43.107 ], [ 0.7274, 43.1073 ], [ 0.7273, 43.1073 ], [ 0.7272, 43.1073 ], [ 0.7268, 43.1073 ], [ 0.7267, 43.1075 ], [ 0.7265, 43.1076 ], [ 0.7266, 43.1079 ], [ 0.7263, 43.1078 ], [ 0.7262, 43.1078 ], [ 0.7261, 43.1077 ], [ 0.7261, 43.1075 ], [ 0.726, 43.1075 ], [ 0.7259, 43.1074 ], [ 0.7253, 43.1071 ], [ 0.7252, 43.1071 ], [ 0.725, 43.1071 ], [ 0.7249, 43.1071 ], [ 0.7247, 43.107 ], [ 0.7238, 43.1068 ], [ 0.7229, 43.1065 ], [ 0.7221, 43.1063 ], [ 0.7217, 43.1062 ], [ 0.7215, 43.1062 ], [ 0.7215, 43.1062 ], [ 0.7212, 43.1063 ], [ 0.721, 43.1063 ], [ 0.7209, 43.1064 ], [ 0.7208, 43.1066 ], [ 0.7208, 43.1067 ], [ 0.7207, 43.1068 ], [ 0.7204, 43.1067 ], [ 0.72, 43.1066 ], [ 0.7191, 43.1063 ], [ 0.719, 43.1066 ], [ 0.7189, 43.1066 ], [ 0.7187, 43.1069 ], [ 0.7186, 43.1071 ], [ 0.7186, 43.1071 ], [ 0.7186, 43.1072 ], [ 0.7183, 43.1071 ], [ 0.7184, 43.1074 ], [ 0.7186, 43.1074 ], [ 0.7187, 43.1078 ], [ 0.7189, 43.1078 ], [ 0.719, 43.1079 ], [ 0.7191, 43.1079 ], [ 0.7191, 43.1082 ], [ 0.7191, 43.1083 ], [ 0.7191, 43.1088 ], [ 0.7189, 43.1088 ], [ 0.7191, 43.1091 ], [ 0.7201, 43.1086 ], [ 0.7202, 43.1086 ], [ 0.7207, 43.1084 ], [ 0.7208, 43.1084 ], [ 0.7209, 43.1085 ], [ 0.7209, 43.1085 ], [ 0.7217, 43.1087 ], [ 0.7224, 43.1089 ] ] ], "type": "Polygon" }, "id": "76", "properties": { "code_commune": "31483", "code_departement": "31", "code_qp": "QP031003", "commune_qp": "Saint-Gaudens", "nom_commune": "Saint-Gaudens", "nom_qp": "Coeur De Ville" }, "type": "Feature" }, { "bbox": [ 3.7479, 43.4489, 3.7537, 43.4538 ], "geometry": { "coordinates": [ [ [ 3.7501, 43.4538 ], [ 3.7503, 43.4535 ], [ 3.7504, 43.4534 ], [ 3.7506, 43.4532 ], [ 3.7509, 43.4529 ], [ 3.7509, 43.4528 ], [ 3.751, 43.4528 ], [ 3.7513, 43.4526 ], [ 3.7514, 43.4525 ], [ 3.7516, 43.4524 ], [ 3.7516, 43.4524 ], [ 3.7518, 43.4521 ], [ 3.7523, 43.4516 ], [ 3.7524, 43.4516 ], [ 3.7527, 43.4513 ], [ 3.7533, 43.451 ], [ 3.7534, 43.4509 ], [ 3.7537, 43.4505 ], [ 3.7534, 43.4503 ], [ 3.7529, 43.45 ], [ 3.7518, 43.4493 ], [ 3.7515, 43.4491 ], [ 3.7512, 43.4489 ], [ 3.7511, 43.4489 ], [ 3.7511, 43.449 ], [ 3.751, 43.4491 ], [ 3.7507, 43.4492 ], [ 3.7513, 43.4497 ], [ 3.7517, 43.45 ], [ 3.7519, 43.4502 ], [ 3.7521, 43.4503 ], [ 3.7524, 43.4504 ], [ 3.7518, 43.4508 ], [ 3.7517, 43.4508 ], [ 3.7514, 43.451 ], [ 3.7513, 43.4511 ], [ 3.7512, 43.4513 ], [ 3.751, 43.4512 ], [ 3.7507, 43.4514 ], [ 3.751, 43.4516 ], [ 3.7507, 43.4518 ], [ 3.7507, 43.4518 ], [ 3.7503, 43.4521 ], [ 3.7504, 43.4522 ], [ 3.7505, 43.4523 ], [ 3.7502, 43.4526 ], [ 3.7501, 43.4525 ], [ 3.7492, 43.4518 ], [ 3.7491, 43.4519 ], [ 3.7487, 43.4521 ], [ 3.7486, 43.4522 ], [ 3.7485, 43.4523 ], [ 3.7483, 43.4523 ], [ 3.7481, 43.4524 ], [ 3.748, 43.4525 ], [ 3.748, 43.4526 ], [ 3.7479, 43.4527 ], [ 3.7479, 43.4527 ], [ 3.748, 43.4528 ], [ 3.7481, 43.4531 ], [ 3.7483, 43.4533 ], [ 3.7484, 43.4534 ], [ 3.7485, 43.4535 ], [ 3.749, 43.4533 ], [ 3.7491, 43.4532 ], [ 3.7492, 43.4532 ], [ 3.7493, 43.4533 ], [ 3.7494, 43.4533 ], [ 3.7495, 43.4534 ], [ 3.7495, 43.4534 ], [ 3.7497, 43.4535 ], [ 3.7498, 43.4536 ], [ 3.7498, 43.4536 ], [ 3.7498, 43.4537 ], [ 3.7501, 43.4538 ] ] ], "type": "Polygon" }, "id": "77", "properties": { "code_commune": "34108", "code_departement": "34", "code_qp": "QP034016", "commune_qp": "Frontignan", "nom_commune": "Frontignan", "nom_qp": "Les Deux Pins" }, "type": "Feature" }, { "bbox": [ 3.6911, 43.3997, 3.701, 43.4078 ], "geometry": { "coordinates": [ [ [ 3.6965, 43.4013 ], [ 3.6964, 43.4009 ], [ 3.6962, 43.4002 ], [ 3.6961, 43.3998 ], [ 3.6951, 43.3998 ], [ 3.695, 43.3998 ], [ 3.695, 43.3997 ], [ 3.6946, 43.3997 ], [ 3.6943, 43.3997 ], [ 3.6941, 43.3997 ], [ 3.694, 43.3998 ], [ 3.694, 43.4 ], [ 3.6938, 43.4 ], [ 3.6935, 43.4 ], [ 3.6931, 43.3997 ], [ 3.6929, 43.4001 ], [ 3.6928, 43.4001 ], [ 3.6927, 43.4004 ], [ 3.6927, 43.4005 ], [ 3.6926, 43.4008 ], [ 3.6926, 43.4008 ], [ 3.6925, 43.4013 ], [ 3.6925, 43.4015 ], [ 3.6927, 43.4015 ], [ 3.6928, 43.4014 ], [ 3.6928, 43.4016 ], [ 3.6929, 43.4016 ], [ 3.6929, 43.4016 ], [ 3.693, 43.4016 ], [ 3.693, 43.4016 ], [ 3.6931, 43.4016 ], [ 3.6933, 43.4016 ], [ 3.6933, 43.4017 ], [ 3.6933, 43.4017 ], [ 3.6936, 43.4017 ], [ 3.6936, 43.4018 ], [ 3.6939, 43.4018 ], [ 3.6939, 43.4019 ], [ 3.6942, 43.4019 ], [ 3.6941, 43.4022 ], [ 3.6941, 43.4022 ], [ 3.6941, 43.4023 ], [ 3.6938, 43.4023 ], [ 3.6938, 43.4024 ], [ 3.6939, 43.4024 ], [ 3.6939, 43.4025 ], [ 3.6938, 43.4025 ], [ 3.6934, 43.4025 ], [ 3.6931, 43.4025 ], [ 3.6927, 43.4024 ], [ 3.6923, 43.4024 ], [ 3.6927, 43.4031 ], [ 3.6928, 43.4033 ], [ 3.6937, 43.4034 ], [ 3.6937, 43.4037 ], [ 3.6935, 43.4037 ], [ 3.6934, 43.4039 ], [ 3.6931, 43.4039 ], [ 3.6931, 43.4039 ], [ 3.693, 43.404 ], [ 3.6929, 43.4041 ], [ 3.6928, 43.4041 ], [ 3.6927, 43.4042 ], [ 3.6925, 43.4042 ], [ 3.6915, 43.4041 ], [ 3.6914, 43.4043 ], [ 3.6914, 43.4044 ], [ 3.6914, 43.4046 ], [ 3.6914, 43.4048 ], [ 3.6912, 43.4058 ], [ 3.6911, 43.4065 ], [ 3.6915, 43.4066 ], [ 3.692, 43.4066 ], [ 3.6919, 43.4067 ], [ 3.6925, 43.4067 ], [ 3.6925, 43.4068 ], [ 3.6928, 43.4068 ], [ 3.6927, 43.407 ], [ 3.693, 43.407 ], [ 3.693, 43.4067 ], [ 3.693, 43.4066 ], [ 3.6933, 43.4066 ], [ 3.6932, 43.4078 ], [ 3.6935, 43.4076 ], [ 3.6939, 43.4072 ], [ 3.6941, 43.4066 ], [ 3.6933, 43.4065 ], [ 3.6934, 43.406 ], [ 3.6935, 43.4055 ], [ 3.6935, 43.4053 ], [ 3.6935, 43.405 ], [ 3.6939, 43.4051 ], [ 3.6943, 43.4051 ], [ 3.6944, 43.404 ], [ 3.6945, 43.4037 ], [ 3.6945, 43.4036 ], [ 3.6943, 43.4036 ], [ 3.6944, 43.4033 ], [ 3.6943, 43.4033 ], [ 3.6943, 43.4033 ], [ 3.6944, 43.4032 ], [ 3.6944, 43.4032 ], [ 3.6945, 43.4032 ], [ 3.6946, 43.4029 ], [ 3.6945, 43.4029 ], [ 3.6945, 43.4027 ], [ 3.6945, 43.4026 ], [ 3.6946, 43.4026 ], [ 3.6946, 43.4025 ], [ 3.6945, 43.4024 ], [ 3.6945, 43.4019 ], [ 3.6947, 43.4019 ], [ 3.6951, 43.402 ], [ 3.6956, 43.402 ], [ 3.6956, 43.4016 ], [ 3.6959, 43.4016 ], [ 3.6959, 43.4018 ], [ 3.6959, 43.4018 ], [ 3.6958, 43.4018 ], [ 3.6958, 43.4018 ], [ 3.6959, 43.4018 ], [ 3.6959, 43.4019 ], [ 3.6958, 43.4019 ], [ 3.6958, 43.402 ], [ 3.6966, 43.402 ], [ 3.6967, 43.402 ], [ 3.6967, 43.4019 ], [ 3.697, 43.4018 ], [ 3.6977, 43.4018 ], [ 3.6977, 43.4025 ], [ 3.6981, 43.4025 ], [ 3.6981, 43.4028 ], [ 3.6984, 43.4028 ], [ 3.6986, 43.4028 ], [ 3.6986, 43.4027 ], [ 3.6987, 43.4027 ], [ 3.6991, 43.403 ], [ 3.699, 43.4031 ], [ 3.699, 43.4031 ], [ 3.6994, 43.4033 ], [ 3.6993, 43.404 ], [ 3.6994, 43.4045 ], [ 3.6994, 43.4045 ], [ 3.6993, 43.4048 ], [ 3.6993, 43.4049 ], [ 3.6992, 43.4049 ], [ 3.6992, 43.4049 ], [ 3.6991, 43.4051 ], [ 3.6991, 43.4052 ], [ 3.6991, 43.4052 ], [ 3.6991, 43.4052 ], [ 3.699, 43.4052 ], [ 3.699, 43.4054 ], [ 3.6993, 43.4054 ], [ 3.6993, 43.4055 ], [ 3.6993, 43.4055 ], [ 3.6993, 43.4056 ], [ 3.6989, 43.4055 ], [ 3.6989, 43.4056 ], [ 3.6992, 43.4056 ], [ 3.699, 43.4059 ], [ 3.6992, 43.406 ], [ 3.6995, 43.4057 ], [ 3.6996, 43.4056 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4059 ], [ 3.6999, 43.4059 ], [ 3.6999, 43.4061 ], [ 3.7001, 43.4061 ], [ 3.7001, 43.4062 ], [ 3.7002, 43.4062 ], [ 3.7004, 43.4062 ], [ 3.7004, 43.4064 ], [ 3.7003, 43.4066 ], [ 3.7001, 43.4067 ], [ 3.7003, 43.4068 ], [ 3.7006, 43.4066 ], [ 3.7005, 43.4065 ], [ 3.7006, 43.4065 ], [ 3.7007, 43.4065 ], [ 3.7007, 43.4064 ], [ 3.7006, 43.4064 ], [ 3.7006, 43.4063 ], [ 3.7008, 43.4063 ], [ 3.7008, 43.4062 ], [ 3.7006, 43.4063 ], [ 3.7006, 43.4062 ], [ 3.7006, 43.4062 ], [ 3.7008, 43.4061 ], [ 3.7007, 43.4061 ], [ 3.7005, 43.4061 ], [ 3.7005, 43.406 ], [ 3.7005, 43.4059 ], [ 3.7004, 43.4059 ], [ 3.7002, 43.4059 ], [ 3.7001, 43.4055 ], [ 3.7, 43.4054 ], [ 3.7007, 43.4054 ], [ 3.7007, 43.4053 ], [ 3.7003, 43.4052 ], [ 3.7004, 43.4052 ], [ 3.7002, 43.405 ], [ 3.7001, 43.4049 ], [ 3.7, 43.4048 ], [ 3.7001, 43.4046 ], [ 3.6998, 43.4046 ], [ 3.7, 43.4042 ], [ 3.7002, 43.4041 ], [ 3.7004, 43.4041 ], [ 3.7005, 43.4041 ], [ 3.7006, 43.4042 ], [ 3.7009, 43.404 ], [ 3.701, 43.4041 ], [ 3.701, 43.4036 ], [ 3.7004, 43.4033 ], [ 3.7005, 43.4032 ], [ 3.7004, 43.4031 ], [ 3.7003, 43.4033 ], [ 3.7002, 43.4033 ], [ 3.7003, 43.4031 ], [ 3.7001, 43.4031 ], [ 3.7001, 43.4032 ], [ 3.7, 43.4032 ], [ 3.7, 43.4031 ], [ 3.7, 43.4031 ], [ 3.6999, 43.4031 ], [ 3.6999, 43.4029 ], [ 3.6997, 43.4029 ], [ 3.6997, 43.4028 ], [ 3.6994, 43.4028 ], [ 3.6995, 43.4025 ], [ 3.6986, 43.4025 ], [ 3.6986, 43.4024 ], [ 3.6981, 43.4024 ], [ 3.6981, 43.4022 ], [ 3.6983, 43.4022 ], [ 3.6983, 43.4021 ], [ 3.6979, 43.4021 ], [ 3.698, 43.402 ], [ 3.698, 43.402 ], [ 3.698, 43.4019 ], [ 3.698, 43.4019 ], [ 3.698, 43.4019 ], [ 3.698, 43.4017 ], [ 3.6977, 43.4017 ], [ 3.697, 43.4015 ], [ 3.6966, 43.4016 ], [ 3.6965, 43.4013 ] ] ], "type": "Polygon" }, "id": "78", "properties": { "code_commune": "34301", "code_departement": "34", "code_qp": "QP034018", "commune_qp": "Sète", "nom_commune": "Sète", "nom_qp": "Centre Ville - Ile Sud" }, "type": "Feature" }, { "bbox": [ 4.6479, 44.2542, 4.6525, 44.2583 ], "geometry": { "coordinates": [ [ [ 4.6485, 44.2583 ], [ 4.6488, 44.2582 ], [ 4.649, 44.2582 ], [ 4.6492, 44.2581 ], [ 4.6493, 44.2581 ], [ 4.6498, 44.2581 ], [ 4.6499, 44.258 ], [ 4.65, 44.258 ], [ 4.65, 44.2579 ], [ 4.6501, 44.2579 ], [ 4.6501, 44.258 ], [ 4.6501, 44.2583 ], [ 4.6505, 44.2583 ], [ 4.6509, 44.2578 ], [ 4.6511, 44.2576 ], [ 4.6514, 44.2572 ], [ 4.6517, 44.2568 ], [ 4.6518, 44.2566 ], [ 4.6519, 44.2563 ], [ 4.652, 44.2561 ], [ 4.6523, 44.2554 ], [ 4.6524, 44.2551 ], [ 4.6524, 44.2551 ], [ 4.6524, 44.2547 ], [ 4.6525, 44.2543 ], [ 4.652, 44.2544 ], [ 4.6519, 44.2543 ], [ 4.6517, 44.2543 ], [ 4.6512, 44.2542 ], [ 4.6511, 44.2544 ], [ 4.6511, 44.2545 ], [ 4.6508, 44.2546 ], [ 4.6507, 44.2546 ], [ 4.6505, 44.2546 ], [ 4.6505, 44.2546 ], [ 4.6505, 44.2547 ], [ 4.6504, 44.2546 ], [ 4.6503, 44.2547 ], [ 4.6502, 44.2547 ], [ 4.6502, 44.2547 ], [ 4.6501, 44.2546 ], [ 4.6501, 44.2546 ], [ 4.65, 44.2546 ], [ 4.65, 44.2546 ], [ 4.6499, 44.2546 ], [ 4.6497, 44.2546 ], [ 4.6497, 44.2546 ], [ 4.6496, 44.2546 ], [ 4.6496, 44.2547 ], [ 4.6495, 44.2547 ], [ 4.6496, 44.2547 ], [ 4.6495, 44.2546 ], [ 4.6494, 44.2546 ], [ 4.6493, 44.2546 ], [ 4.6493, 44.2548 ], [ 4.6491, 44.2548 ], [ 4.649, 44.2548 ], [ 4.6485, 44.2549 ], [ 4.6483, 44.2548 ], [ 4.6482, 44.255 ], [ 4.6482, 44.2551 ], [ 4.6483, 44.2552 ], [ 4.6484, 44.2555 ], [ 4.6481, 44.2555 ], [ 4.648, 44.2555 ], [ 4.648, 44.2556 ], [ 4.6479, 44.2557 ], [ 4.6481, 44.2557 ], [ 4.6481, 44.2558 ], [ 4.6481, 44.2558 ], [ 4.6482, 44.2559 ], [ 4.6481, 44.2559 ], [ 4.6481, 44.256 ], [ 4.648, 44.256 ], [ 4.648, 44.2561 ], [ 4.6481, 44.2561 ], [ 4.6481, 44.2562 ], [ 4.648, 44.2562 ], [ 4.648, 44.2563 ], [ 4.648, 44.2563 ], [ 4.648, 44.2564 ], [ 4.648, 44.2565 ], [ 4.6479, 44.2565 ], [ 4.6479, 44.2566 ], [ 4.6479, 44.2566 ], [ 4.6479, 44.2568 ], [ 4.648, 44.2568 ], [ 4.648, 44.2568 ], [ 4.648, 44.2568 ], [ 4.6481, 44.2569 ], [ 4.6481, 44.257 ], [ 4.6481, 44.257 ], [ 4.6481, 44.2571 ], [ 4.6481, 44.2571 ], [ 4.6481, 44.2571 ], [ 4.6482, 44.2571 ], [ 4.6482, 44.2572 ], [ 4.6483, 44.2572 ], [ 4.6483, 44.2572 ], [ 4.6481, 44.2572 ], [ 4.6481, 44.2573 ], [ 4.6482, 44.2573 ], [ 4.6481, 44.2573 ], [ 4.6481, 44.2573 ], [ 4.6481, 44.2574 ], [ 4.6482, 44.2574 ], [ 4.6482, 44.2574 ], [ 4.6481, 44.2574 ], [ 4.6481, 44.2574 ], [ 4.6482, 44.2575 ], [ 4.6482, 44.2575 ], [ 4.6483, 44.2576 ], [ 4.6483, 44.2576 ], [ 4.6482, 44.2576 ], [ 4.6482, 44.2577 ], [ 4.6481, 44.2577 ], [ 4.6481, 44.2578 ], [ 4.6482, 44.258 ], [ 4.6482, 44.2581 ], [ 4.6482, 44.2582 ], [ 4.6483, 44.2582 ], [ 4.6484, 44.2583 ], [ 4.6485, 44.2583 ] ] ], "type": "Polygon" }, "id": "79", "properties": { "code_commune": "30202", "code_departement": "30", "code_qp": "QP030011", "commune_qp": "Pont-Saint-Esprit", "nom_commune": "Pont-Saint-Esprit", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.9763, 43.76, 2.0026, 43.7681 ], "geometry": { "coordinates": [ [ [ 2.0023, 43.7645 ], [ 2.0025, 43.7645 ], [ 2.0026, 43.7642 ], [ 2.0026, 43.764 ], [ 2.0025, 43.7639 ], [ 2.0017, 43.7639 ], [ 2.0013, 43.7624 ], [ 2.0012, 43.7624 ], [ 1.9999, 43.7624 ], [ 1.9988, 43.7624 ], [ 1.9977, 43.7625 ], [ 1.9977, 43.7625 ], [ 1.997, 43.7625 ], [ 1.9969, 43.7627 ], [ 1.9966, 43.7629 ], [ 1.9965, 43.763 ], [ 1.9964, 43.7631 ], [ 1.9963, 43.7631 ], [ 1.9963, 43.763 ], [ 1.996, 43.7627 ], [ 1.9959, 43.7626 ], [ 1.9958, 43.7626 ], [ 1.9957, 43.7625 ], [ 1.9954, 43.7626 ], [ 1.9919, 43.7628 ], [ 1.9914, 43.7629 ], [ 1.9907, 43.7629 ], [ 1.9905, 43.7628 ], [ 1.9903, 43.7625 ], [ 1.9912, 43.7623 ], [ 1.9915, 43.7621 ], [ 1.9931, 43.7615 ], [ 1.9944, 43.7611 ], [ 1.9948, 43.7611 ], [ 1.9943, 43.7602 ], [ 1.9939, 43.7601 ], [ 1.9929, 43.76 ], [ 1.9889, 43.76 ], [ 1.9878, 43.7601 ], [ 1.9876, 43.7602 ], [ 1.9873, 43.7604 ], [ 1.9869, 43.7607 ], [ 1.9867, 43.7608 ], [ 1.9866, 43.7608 ], [ 1.9851, 43.7608 ], [ 1.9851, 43.7622 ], [ 1.985, 43.7622 ], [ 1.9832, 43.7622 ], [ 1.982, 43.7622 ], [ 1.9813, 43.7622 ], [ 1.981, 43.7621 ], [ 1.9792, 43.7614 ], [ 1.979, 43.7615 ], [ 1.9784, 43.7615 ], [ 1.9781, 43.7618 ], [ 1.9763, 43.7618 ], [ 1.9766, 43.7636 ], [ 1.977, 43.7641 ], [ 1.9779, 43.7645 ], [ 1.9778, 43.7643 ], [ 1.9785, 43.764 ], [ 1.9794, 43.7636 ], [ 1.9796, 43.7636 ], [ 1.9806, 43.7634 ], [ 1.9815, 43.7647 ], [ 1.9824, 43.7643 ], [ 1.983, 43.764 ], [ 1.9838, 43.7637 ], [ 1.9843, 43.7635 ], [ 1.9853, 43.7633 ], [ 1.9855, 43.7642 ], [ 1.9875, 43.764 ], [ 1.9874, 43.7638 ], [ 1.988, 43.7637 ], [ 1.988, 43.7638 ], [ 1.9884, 43.7637 ], [ 1.9884, 43.7637 ], [ 1.9889, 43.7636 ], [ 1.989, 43.7638 ], [ 1.9892, 43.7639 ], [ 1.9894, 43.7634 ], [ 1.9898, 43.7628 ], [ 1.9903, 43.763 ], [ 1.9902, 43.7631 ], [ 1.99, 43.7635 ], [ 1.99, 43.7636 ], [ 1.9903, 43.7637 ], [ 1.9903, 43.7636 ], [ 1.9904, 43.7635 ], [ 1.9907, 43.7635 ], [ 1.9909, 43.7637 ], [ 1.991, 43.7638 ], [ 1.9913, 43.7642 ], [ 1.9916, 43.7646 ], [ 1.9917, 43.7647 ], [ 1.9919, 43.7648 ], [ 1.9923, 43.7649 ], [ 1.9931, 43.7652 ], [ 1.9932, 43.7652 ], [ 1.9947, 43.7649 ], [ 1.9971, 43.7646 ], [ 1.9974, 43.7645 ], [ 1.9979, 43.7661 ], [ 1.9967, 43.7663 ], [ 1.9968, 43.7667 ], [ 1.9989, 43.768 ], [ 1.999, 43.7679 ], [ 1.9991, 43.7681 ], [ 2.0003, 43.7679 ], [ 2.0004, 43.7679 ], [ 2.0005, 43.7679 ], [ 2.0012, 43.7662 ], [ 2.0017, 43.7648 ], [ 2.0019, 43.7645 ], [ 2.0023, 43.7645 ] ] ], "type": "Polygon" }, "id": "80", "properties": { "code_commune": "81105", "code_departement": "81", "code_qp": "QP081011", "commune_qp": "Graulhet", "nom_commune": "Graulhet", "nom_qp": "Crins - En Gach" }, "type": "Feature" }, { "bbox": [ 2.1471, 44.0485, 2.1615, 44.0577 ], "geometry": { "coordinates": [ [ [ 2.1605, 44.0528 ], [ 2.1608, 44.0525 ], [ 2.1609, 44.0522 ], [ 2.161, 44.0514 ], [ 2.1609, 44.0513 ], [ 2.1608, 44.0511 ], [ 2.161, 44.0511 ], [ 2.1614, 44.0509 ], [ 2.1612, 44.0505 ], [ 2.1615, 44.0504 ], [ 2.1615, 44.0502 ], [ 2.1612, 44.0499 ], [ 2.1609, 44.0498 ], [ 2.1606, 44.0497 ], [ 2.1603, 44.0498 ], [ 2.1592, 44.05 ], [ 2.1584, 44.0499 ], [ 2.1584, 44.0497 ], [ 2.1583, 44.0496 ], [ 2.158, 44.0497 ], [ 2.1581, 44.0507 ], [ 2.1582, 44.0517 ], [ 2.1582, 44.0518 ], [ 2.1579, 44.0519 ], [ 2.1564, 44.0525 ], [ 2.1558, 44.0518 ], [ 2.1539, 44.0519 ], [ 2.1538, 44.0508 ], [ 2.1537, 44.0504 ], [ 2.1537, 44.0498 ], [ 2.1533, 44.0499 ], [ 2.1532, 44.0497 ], [ 2.1532, 44.0495 ], [ 2.1533, 44.0492 ], [ 2.1535, 44.0491 ], [ 2.1536, 44.0491 ], [ 2.1537, 44.049 ], [ 2.1534, 44.0488 ], [ 2.1536, 44.0486 ], [ 2.1533, 44.0485 ], [ 2.1529, 44.0489 ], [ 2.1527, 44.049 ], [ 2.1525, 44.049 ], [ 2.1521, 44.0491 ], [ 2.1519, 44.0491 ], [ 2.1513, 44.0498 ], [ 2.151, 44.05 ], [ 2.1509, 44.05 ], [ 2.1494, 44.0501 ], [ 2.1492, 44.0501 ], [ 2.1492, 44.0501 ], [ 2.1471, 44.0502 ], [ 2.1473, 44.0507 ], [ 2.1475, 44.051 ], [ 2.1477, 44.0512 ], [ 2.1482, 44.0514 ], [ 2.1483, 44.0515 ], [ 2.1486, 44.0515 ], [ 2.1488, 44.0515 ], [ 2.1508, 44.0519 ], [ 2.1516, 44.0521 ], [ 2.1522, 44.0521 ], [ 2.1534, 44.052 ], [ 2.1535, 44.052 ], [ 2.1535, 44.0521 ], [ 2.1539, 44.0526 ], [ 2.1539, 44.0526 ], [ 2.154, 44.0528 ], [ 2.1541, 44.0528 ], [ 2.154, 44.0529 ], [ 2.1541, 44.053 ], [ 2.1542, 44.0531 ], [ 2.1542, 44.0531 ], [ 2.1543, 44.0532 ], [ 2.1544, 44.0533 ], [ 2.154, 44.0534 ], [ 2.1549, 44.054 ], [ 2.155, 44.0539 ], [ 2.1567, 44.0531 ], [ 2.1571, 44.0529 ], [ 2.1576, 44.0535 ], [ 2.1573, 44.0536 ], [ 2.1572, 44.0536 ], [ 2.157, 44.0536 ], [ 2.1563, 44.0538 ], [ 2.1562, 44.0538 ], [ 2.1559, 44.054 ], [ 2.1558, 44.054 ], [ 2.1555, 44.054 ], [ 2.155, 44.054 ], [ 2.1547, 44.0543 ], [ 2.1546, 44.0545 ], [ 2.1547, 44.0547 ], [ 2.1547, 44.0548 ], [ 2.1541, 44.0548 ], [ 2.1535, 44.0544 ], [ 2.1535, 44.0544 ], [ 2.1533, 44.0544 ], [ 2.1526, 44.0545 ], [ 2.1524, 44.0546 ], [ 2.1522, 44.0543 ], [ 2.1519, 44.0544 ], [ 2.151, 44.0535 ], [ 2.1502, 44.054 ], [ 2.1501, 44.0542 ], [ 2.1502, 44.0543 ], [ 2.1503, 44.0545 ], [ 2.1504, 44.0546 ], [ 2.1501, 44.0551 ], [ 2.15, 44.0552 ], [ 2.1501, 44.0554 ], [ 2.1498, 44.0555 ], [ 2.1482, 44.056 ], [ 2.1487, 44.0561 ], [ 2.1492, 44.0561 ], [ 2.1492, 44.0571 ], [ 2.15, 44.057 ], [ 2.151, 44.0571 ], [ 2.1513, 44.0572 ], [ 2.1515, 44.0572 ], [ 2.1518, 44.0574 ], [ 2.1522, 44.0575 ], [ 2.1525, 44.0576 ], [ 2.1527, 44.0577 ], [ 2.153, 44.0576 ], [ 2.1532, 44.0576 ], [ 2.154, 44.0573 ], [ 2.1546, 44.0571 ], [ 2.1549, 44.0571 ], [ 2.1552, 44.057 ], [ 2.1555, 44.0568 ], [ 2.1558, 44.0564 ], [ 2.156, 44.0562 ], [ 2.1561, 44.0562 ], [ 2.1564, 44.0559 ], [ 2.1573, 44.0552 ], [ 2.1578, 44.0557 ], [ 2.1586, 44.0553 ], [ 2.1589, 44.0552 ], [ 2.1598, 44.0552 ], [ 2.1599, 44.0552 ], [ 2.1603, 44.055 ], [ 2.1611, 44.0545 ], [ 2.1596, 44.0535 ], [ 2.1595, 44.0535 ], [ 2.16, 44.0531 ], [ 2.1605, 44.0528 ] ] ], "type": "Polygon" }, "id": "81", "properties": { "code_commune": "81060", "code_departement": "81", "code_qp": "QP081009", "commune_qp": "Carmaux", "nom_commune": "Carmaux", "nom_qp": "Rajol - Cérou - Gourgatieux - Bouloc - Verrerie" }, "type": "Feature" }, { "bbox": [ 3.312, 43.7269, 3.3249, 43.7361 ], "geometry": { "coordinates": [ [ [ 3.3249, 43.731 ], [ 3.3246, 43.731 ], [ 3.3246, 43.731 ], [ 3.3244, 43.731 ], [ 3.3244, 43.7308 ], [ 3.3244, 43.7307 ], [ 3.3244, 43.7305 ], [ 3.3243, 43.7305 ], [ 3.3244, 43.7303 ], [ 3.3244, 43.7303 ], [ 3.3244, 43.7299 ], [ 3.3243, 43.7298 ], [ 3.3242, 43.7298 ], [ 3.3243, 43.7297 ], [ 3.3243, 43.7296 ], [ 3.3241, 43.7295 ], [ 3.3238, 43.7292 ], [ 3.3241, 43.7289 ], [ 3.3241, 43.7289 ], [ 3.3242, 43.7288 ], [ 3.3241, 43.7287 ], [ 3.324, 43.7285 ], [ 3.3238, 43.7283 ], [ 3.3237, 43.7281 ], [ 3.3232, 43.7278 ], [ 3.3231, 43.7279 ], [ 3.3233, 43.728 ], [ 3.3232, 43.7281 ], [ 3.3232, 43.7282 ], [ 3.3232, 43.7283 ], [ 3.3233, 43.7285 ], [ 3.3234, 43.7286 ], [ 3.3235, 43.7286 ], [ 3.3235, 43.7286 ], [ 3.3235, 43.7288 ], [ 3.3234, 43.729 ], [ 3.3231, 43.7291 ], [ 3.3229, 43.7291 ], [ 3.3227, 43.7291 ], [ 3.3224, 43.7291 ], [ 3.3223, 43.729 ], [ 3.3221, 43.729 ], [ 3.3221, 43.7289 ], [ 3.322, 43.7289 ], [ 3.3219, 43.7288 ], [ 3.3217, 43.7288 ], [ 3.3213, 43.7287 ], [ 3.3211, 43.7286 ], [ 3.321, 43.7287 ], [ 3.3208, 43.7287 ], [ 3.3205, 43.7287 ], [ 3.3202, 43.7288 ], [ 3.3202, 43.7289 ], [ 3.3201, 43.7289 ], [ 3.3197, 43.7287 ], [ 3.3197, 43.7286 ], [ 3.3197, 43.7285 ], [ 3.3196, 43.7283 ], [ 3.3195, 43.7282 ], [ 3.3194, 43.7282 ], [ 3.3193, 43.7281 ], [ 3.3187, 43.7281 ], [ 3.3182, 43.7278 ], [ 3.3181, 43.7277 ], [ 3.318, 43.7276 ], [ 3.3179, 43.7274 ], [ 3.3178, 43.7273 ], [ 3.3174, 43.7271 ], [ 3.3172, 43.727 ], [ 3.3167, 43.727 ], [ 3.3163, 43.727 ], [ 3.3161, 43.727 ], [ 3.3158, 43.7269 ], [ 3.3158, 43.7269 ], [ 3.3161, 43.7272 ], [ 3.3162, 43.7273 ], [ 3.3162, 43.7274 ], [ 3.316, 43.7278 ], [ 3.316, 43.7278 ], [ 3.3161, 43.728 ], [ 3.3163, 43.728 ], [ 3.3161, 43.7281 ], [ 3.3159, 43.7283 ], [ 3.316, 43.7284 ], [ 3.3161, 43.7288 ], [ 3.3161, 43.7288 ], [ 3.3163, 43.7291 ], [ 3.3163, 43.7292 ], [ 3.3162, 43.7294 ], [ 3.3167, 43.7295 ], [ 3.3166, 43.7297 ], [ 3.3168, 43.73 ], [ 3.3169, 43.7303 ], [ 3.3164, 43.7303 ], [ 3.3165, 43.7305 ], [ 3.3166, 43.7307 ], [ 3.3164, 43.7307 ], [ 3.3165, 43.7309 ], [ 3.3165, 43.7309 ], [ 3.316, 43.7312 ], [ 3.3149, 43.7318 ], [ 3.3147, 43.7319 ], [ 3.3146, 43.732 ], [ 3.3136, 43.7324 ], [ 3.313, 43.7327 ], [ 3.3125, 43.7329 ], [ 3.312, 43.7332 ], [ 3.3121, 43.7334 ], [ 3.3122, 43.7335 ], [ 3.3122, 43.7336 ], [ 3.3129, 43.7334 ], [ 3.3132, 43.7333 ], [ 3.3142, 43.7328 ], [ 3.3148, 43.7326 ], [ 3.3157, 43.7322 ], [ 3.3162, 43.7324 ], [ 3.3163, 43.7323 ], [ 3.3161, 43.7322 ], [ 3.3163, 43.7321 ], [ 3.3165, 43.732 ], [ 3.3166, 43.7318 ], [ 3.3168, 43.7316 ], [ 3.3171, 43.7313 ], [ 3.3174, 43.7315 ], [ 3.3175, 43.7315 ], [ 3.3176, 43.7317 ], [ 3.3177, 43.7318 ], [ 3.3177, 43.732 ], [ 3.3177, 43.7322 ], [ 3.3177, 43.7323 ], [ 3.3181, 43.7325 ], [ 3.3182, 43.7326 ], [ 3.3184, 43.7329 ], [ 3.3187, 43.7331 ], [ 3.319, 43.7329 ], [ 3.3191, 43.7329 ], [ 3.3193, 43.733 ], [ 3.3195, 43.7333 ], [ 3.3176, 43.7349 ], [ 3.3179, 43.735 ], [ 3.3174, 43.7354 ], [ 3.3176, 43.7355 ], [ 3.3176, 43.7355 ], [ 3.3177, 43.7356 ], [ 3.3176, 43.7357 ], [ 3.3175, 43.7357 ], [ 3.3175, 43.7358 ], [ 3.3176, 43.7359 ], [ 3.3176, 43.7359 ], [ 3.3183, 43.7361 ], [ 3.3184, 43.7361 ], [ 3.3187, 43.736 ], [ 3.3188, 43.7358 ], [ 3.3188, 43.7358 ], [ 3.3189, 43.7357 ], [ 3.319, 43.7358 ], [ 3.3194, 43.7356 ], [ 3.3195, 43.7355 ], [ 3.3198, 43.7355 ], [ 3.3206, 43.7354 ], [ 3.3205, 43.7351 ], [ 3.3194, 43.7352 ], [ 3.3197, 43.7349 ], [ 3.32, 43.7346 ], [ 3.3205, 43.7341 ], [ 3.3198, 43.7334 ], [ 3.3203, 43.733 ], [ 3.3205, 43.7329 ], [ 3.3207, 43.7327 ], [ 3.3208, 43.7328 ], [ 3.3212, 43.7325 ], [ 3.3215, 43.7322 ], [ 3.322, 43.7321 ], [ 3.3223, 43.732 ], [ 3.3227, 43.7322 ], [ 3.3233, 43.7323 ], [ 3.3236, 43.7323 ], [ 3.3236, 43.7325 ], [ 3.3236, 43.7327 ], [ 3.3237, 43.7332 ], [ 3.3239, 43.7337 ], [ 3.3249, 43.7338 ], [ 3.3249, 43.7334 ], [ 3.3246, 43.7335 ], [ 3.3245, 43.7331 ], [ 3.3245, 43.7329 ], [ 3.3244, 43.7324 ], [ 3.3244, 43.7324 ], [ 3.3245, 43.7324 ], [ 3.3246, 43.7321 ], [ 3.3246, 43.732 ], [ 3.3248, 43.7318 ], [ 3.3247, 43.7318 ], [ 3.3248, 43.7315 ], [ 3.3248, 43.7315 ], [ 3.3248, 43.7314 ], [ 3.3248, 43.7314 ], [ 3.3248, 43.7313 ], [ 3.3249, 43.7312 ], [ 3.3249, 43.731 ] ] ], "type": "Polygon" }, "id": "82", "properties": { "code_commune": "34142", "code_departement": "34", "code_qp": "QP034022", "commune_qp": "Lodève", "nom_commune": "Lodève", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.153, 43.6131, 3.1621, 43.6187 ], "geometry": { "coordinates": [ [ [ 3.1553, 43.6173 ], [ 3.1553, 43.6176 ], [ 3.1559, 43.6174 ], [ 3.1558, 43.6174 ], [ 3.1561, 43.6173 ], [ 3.1561, 43.6172 ], [ 3.1562, 43.6167 ], [ 3.1562, 43.6164 ], [ 3.1562, 43.6163 ], [ 3.1562, 43.6162 ], [ 3.157, 43.6162 ], [ 3.157, 43.6166 ], [ 3.157, 43.6173 ], [ 3.1568, 43.6175 ], [ 3.1568, 43.6175 ], [ 3.1567, 43.6176 ], [ 3.1567, 43.6176 ], [ 3.1566, 43.6177 ], [ 3.1575, 43.6182 ], [ 3.1578, 43.6179 ], [ 3.1585, 43.6183 ], [ 3.1589, 43.6185 ], [ 3.1593, 43.6187 ], [ 3.1601, 43.6181 ], [ 3.1605, 43.6177 ], [ 3.1608, 43.6175 ], [ 3.161, 43.6176 ], [ 3.1611, 43.6175 ], [ 3.1613, 43.6176 ], [ 3.1615, 43.6177 ], [ 3.1617, 43.6179 ], [ 3.1617, 43.6179 ], [ 3.1621, 43.6177 ], [ 3.1618, 43.6175 ], [ 3.162, 43.6174 ], [ 3.1615, 43.6169 ], [ 3.1614, 43.6168 ], [ 3.1614, 43.6168 ], [ 3.1613, 43.6167 ], [ 3.1613, 43.6167 ], [ 3.1611, 43.6163 ], [ 3.1609, 43.6161 ], [ 3.1609, 43.6161 ], [ 3.1608, 43.6161 ], [ 3.1608, 43.616 ], [ 3.1607, 43.6159 ], [ 3.1608, 43.6158 ], [ 3.1608, 43.6157 ], [ 3.1609, 43.6156 ], [ 3.1609, 43.6156 ], [ 3.1611, 43.6155 ], [ 3.1605, 43.615 ], [ 3.1597, 43.6145 ], [ 3.1596, 43.6144 ], [ 3.1595, 43.6142 ], [ 3.1595, 43.6142 ], [ 3.1593, 43.6141 ], [ 3.1595, 43.614 ], [ 3.1594, 43.6139 ], [ 3.1594, 43.6139 ], [ 3.1594, 43.6139 ], [ 3.1592, 43.6139 ], [ 3.1596, 43.6135 ], [ 3.1592, 43.6132 ], [ 3.159, 43.6131 ], [ 3.1589, 43.6131 ], [ 3.1585, 43.6133 ], [ 3.1583, 43.6134 ], [ 3.1582, 43.6134 ], [ 3.158, 43.6135 ], [ 3.158, 43.6135 ], [ 3.1575, 43.6137 ], [ 3.1576, 43.6139 ], [ 3.1576, 43.6139 ], [ 3.1576, 43.6139 ], [ 3.1577, 43.614 ], [ 3.1571, 43.6143 ], [ 3.1571, 43.6143 ], [ 3.157, 43.6144 ], [ 3.1569, 43.6143 ], [ 3.1569, 43.6143 ], [ 3.1568, 43.6142 ], [ 3.1567, 43.6143 ], [ 3.1566, 43.6142 ], [ 3.1563, 43.6144 ], [ 3.1564, 43.6145 ], [ 3.1565, 43.6147 ], [ 3.1568, 43.6149 ], [ 3.1569, 43.6149 ], [ 3.1569, 43.615 ], [ 3.1569, 43.615 ], [ 3.1569, 43.615 ], [ 3.157, 43.615 ], [ 3.1571, 43.6151 ], [ 3.1573, 43.6151 ], [ 3.1574, 43.6152 ], [ 3.1572, 43.6153 ], [ 3.1572, 43.6156 ], [ 3.1571, 43.6159 ], [ 3.1571, 43.6161 ], [ 3.1562, 43.6161 ], [ 3.1562, 43.6159 ], [ 3.1559, 43.6154 ], [ 3.1557, 43.6154 ], [ 3.1553, 43.6153 ], [ 3.1551, 43.6153 ], [ 3.1547, 43.6152 ], [ 3.1544, 43.6152 ], [ 3.1544, 43.6151 ], [ 3.1536, 43.6154 ], [ 3.1535, 43.6154 ], [ 3.1535, 43.6154 ], [ 3.1537, 43.6156 ], [ 3.1538, 43.6158 ], [ 3.1537, 43.6158 ], [ 3.1535, 43.6159 ], [ 3.1534, 43.6159 ], [ 3.153, 43.6161 ], [ 3.153, 43.6162 ], [ 3.1535, 43.6169 ], [ 3.1536, 43.6168 ], [ 3.1537, 43.617 ], [ 3.1537, 43.6171 ], [ 3.1537, 43.6172 ], [ 3.1539, 43.6173 ], [ 3.1541, 43.6176 ], [ 3.1541, 43.6176 ], [ 3.1543, 43.6175 ], [ 3.1543, 43.6176 ], [ 3.1553, 43.6173 ] ] ], "type": "Polygon" }, "id": "83", "properties": { "code_commune": "34028", "code_departement": "34", "code_qp": "QP034020", "commune_qp": "Bédarieux", "nom_commune": "Bédarieux", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.6053, 43.107, 1.6151, 43.1218 ], "geometry": { "coordinates": [ [ [ 1.6151, 43.108 ], [ 1.6148, 43.108 ], [ 1.6148, 43.1079 ], [ 1.6141, 43.1079 ], [ 1.6144, 43.1073 ], [ 1.6143, 43.1073 ], [ 1.6142, 43.1073 ], [ 1.6141, 43.1073 ], [ 1.614, 43.1072 ], [ 1.6138, 43.1071 ], [ 1.6137, 43.1071 ], [ 1.6135, 43.1071 ], [ 1.6134, 43.107 ], [ 1.6129, 43.1071 ], [ 1.6125, 43.1072 ], [ 1.6123, 43.1073 ], [ 1.6121, 43.1073 ], [ 1.612, 43.1074 ], [ 1.6115, 43.1075 ], [ 1.6109, 43.1077 ], [ 1.6108, 43.1077 ], [ 1.6106, 43.1077 ], [ 1.6099, 43.1077 ], [ 1.6097, 43.1077 ], [ 1.6094, 43.1077 ], [ 1.6089, 43.1077 ], [ 1.6084, 43.1077 ], [ 1.6081, 43.1077 ], [ 1.608, 43.1078 ], [ 1.6078, 43.108 ], [ 1.6073, 43.1085 ], [ 1.6074, 43.109 ], [ 1.6075, 43.1093 ], [ 1.6082, 43.109 ], [ 1.6083, 43.1091 ], [ 1.6089, 43.1088 ], [ 1.6093, 43.1093 ], [ 1.6102, 43.109 ], [ 1.611, 43.1095 ], [ 1.6112, 43.1097 ], [ 1.6116, 43.1102 ], [ 1.6117, 43.1104 ], [ 1.6121, 43.1109 ], [ 1.612, 43.111 ], [ 1.6115, 43.1111 ], [ 1.6114, 43.111 ], [ 1.6113, 43.111 ], [ 1.6113, 43.111 ], [ 1.6109, 43.1111 ], [ 1.6109, 43.1111 ], [ 1.6105, 43.111 ], [ 1.6097, 43.1107 ], [ 1.6096, 43.1107 ], [ 1.6095, 43.1107 ], [ 1.6093, 43.1108 ], [ 1.609, 43.1111 ], [ 1.6092, 43.1111 ], [ 1.6093, 43.1112 ], [ 1.6095, 43.1115 ], [ 1.6096, 43.1115 ], [ 1.6097, 43.1116 ], [ 1.6097, 43.1117 ], [ 1.6097, 43.1118 ], [ 1.6096, 43.112 ], [ 1.6096, 43.1124 ], [ 1.6095, 43.1126 ], [ 1.6085, 43.1126 ], [ 1.6085, 43.1128 ], [ 1.6085, 43.1129 ], [ 1.6085, 43.1131 ], [ 1.6085, 43.1131 ], [ 1.6086, 43.1131 ], [ 1.6087, 43.1131 ], [ 1.6089, 43.1131 ], [ 1.609, 43.113 ], [ 1.6091, 43.1131 ], [ 1.6093, 43.1131 ], [ 1.6094, 43.1131 ], [ 1.6094, 43.1131 ], [ 1.6095, 43.1131 ], [ 1.6095, 43.1132 ], [ 1.6096, 43.1132 ], [ 1.6096, 43.1132 ], [ 1.6097, 43.1132 ], [ 1.6099, 43.1133 ], [ 1.61, 43.1133 ], [ 1.6102, 43.1134 ], [ 1.6104, 43.1134 ], [ 1.6107, 43.1136 ], [ 1.6105, 43.1138 ], [ 1.6102, 43.1139 ], [ 1.6105, 43.1142 ], [ 1.6106, 43.1143 ], [ 1.6106, 43.1144 ], [ 1.6106, 43.1144 ], [ 1.6109, 43.1146 ], [ 1.6108, 43.1147 ], [ 1.6104, 43.1148 ], [ 1.6098, 43.115 ], [ 1.6095, 43.1151 ], [ 1.6097, 43.1153 ], [ 1.6095, 43.1154 ], [ 1.6094, 43.1155 ], [ 1.6094, 43.1156 ], [ 1.6093, 43.1156 ], [ 1.6089, 43.1157 ], [ 1.6087, 43.1153 ], [ 1.6081, 43.1154 ], [ 1.6076, 43.1147 ], [ 1.6072, 43.1145 ], [ 1.607, 43.1144 ], [ 1.6069, 43.1144 ], [ 1.6068, 43.1143 ], [ 1.6068, 43.1143 ], [ 1.6068, 43.1143 ], [ 1.6069, 43.1141 ], [ 1.6066, 43.1139 ], [ 1.6065, 43.1139 ], [ 1.6065, 43.1138 ], [ 1.6064, 43.1137 ], [ 1.6063, 43.1137 ], [ 1.6062, 43.1137 ], [ 1.6061, 43.1137 ], [ 1.6062, 43.1137 ], [ 1.6059, 43.1135 ], [ 1.6057, 43.1135 ], [ 1.6055, 43.1138 ], [ 1.6054, 43.114 ], [ 1.6053, 43.1143 ], [ 1.6054, 43.1144 ], [ 1.6054, 43.1144 ], [ 1.6055, 43.1145 ], [ 1.6055, 43.1145 ], [ 1.6056, 43.1145 ], [ 1.6064, 43.115 ], [ 1.6066, 43.115 ], [ 1.6067, 43.1152 ], [ 1.6069, 43.1154 ], [ 1.607, 43.1156 ], [ 1.6071, 43.1157 ], [ 1.6073, 43.1161 ], [ 1.6074, 43.1164 ], [ 1.6075, 43.1165 ], [ 1.6078, 43.1166 ], [ 1.608, 43.1167 ], [ 1.608, 43.1167 ], [ 1.6082, 43.1166 ], [ 1.6089, 43.1173 ], [ 1.6092, 43.1177 ], [ 1.6094, 43.1178 ], [ 1.6094, 43.1179 ], [ 1.6095, 43.1181 ], [ 1.6095, 43.1182 ], [ 1.6094, 43.1182 ], [ 1.609, 43.1182 ], [ 1.609, 43.1188 ], [ 1.6089, 43.1191 ], [ 1.6088, 43.1193 ], [ 1.6087, 43.1195 ], [ 1.6087, 43.1197 ], [ 1.6088, 43.1198 ], [ 1.609, 43.12 ], [ 1.6098, 43.1206 ], [ 1.6099, 43.1207 ], [ 1.61, 43.1206 ], [ 1.6105, 43.1204 ], [ 1.6109, 43.1203 ], [ 1.6111, 43.1202 ], [ 1.6113, 43.1202 ], [ 1.6115, 43.1203 ], [ 1.6115, 43.1204 ], [ 1.6116, 43.1204 ], [ 1.6116, 43.1207 ], [ 1.6117, 43.1213 ], [ 1.6124, 43.1214 ], [ 1.6125, 43.1215 ], [ 1.6128, 43.1217 ], [ 1.613, 43.1217 ], [ 1.6134, 43.1218 ], [ 1.6133, 43.1217 ], [ 1.6131, 43.1214 ], [ 1.6128, 43.1213 ], [ 1.6131, 43.1209 ], [ 1.6134, 43.1211 ], [ 1.6137, 43.1209 ], [ 1.6141, 43.1207 ], [ 1.614, 43.1207 ], [ 1.6134, 43.1206 ], [ 1.613, 43.1205 ], [ 1.6127, 43.1206 ], [ 1.6125, 43.1206 ], [ 1.6124, 43.1205 ], [ 1.6125, 43.1203 ], [ 1.6125, 43.12 ], [ 1.6129, 43.12 ], [ 1.6124, 43.1194 ], [ 1.6122, 43.1193 ], [ 1.6125, 43.1192 ], [ 1.6125, 43.1191 ], [ 1.6127, 43.119 ], [ 1.613, 43.1188 ], [ 1.6131, 43.1187 ], [ 1.6135, 43.1185 ], [ 1.6136, 43.1185 ], [ 1.6138, 43.1184 ], [ 1.614, 43.1184 ], [ 1.6142, 43.1182 ], [ 1.6145, 43.118 ], [ 1.6147, 43.1178 ], [ 1.6148, 43.1177 ], [ 1.6149, 43.1175 ], [ 1.6149, 43.1174 ], [ 1.6149, 43.1172 ], [ 1.6149, 43.1169 ], [ 1.6148, 43.1165 ], [ 1.6148, 43.1163 ], [ 1.6147, 43.116 ], [ 1.6146, 43.1155 ], [ 1.6145, 43.1151 ], [ 1.6141, 43.1152 ], [ 1.614, 43.1152 ], [ 1.6139, 43.1153 ], [ 1.6138, 43.1153 ], [ 1.6138, 43.1152 ], [ 1.6137, 43.1152 ], [ 1.6134, 43.1153 ], [ 1.6134, 43.1152 ], [ 1.6132, 43.1152 ], [ 1.6132, 43.1152 ], [ 1.6131, 43.1152 ], [ 1.6131, 43.1153 ], [ 1.6129, 43.1153 ], [ 1.6129, 43.1152 ], [ 1.6127, 43.1153 ], [ 1.6127, 43.1151 ], [ 1.6125, 43.1152 ], [ 1.6124, 43.1151 ], [ 1.6124, 43.1151 ], [ 1.6123, 43.1151 ], [ 1.6121, 43.1149 ], [ 1.6119, 43.1146 ], [ 1.6119, 43.1145 ], [ 1.6116, 43.1142 ], [ 1.6117, 43.1142 ], [ 1.6115, 43.1141 ], [ 1.6115, 43.1141 ], [ 1.6115, 43.114 ], [ 1.6114, 43.114 ], [ 1.6115, 43.114 ], [ 1.6112, 43.1138 ], [ 1.6116, 43.1135 ], [ 1.6121, 43.1137 ], [ 1.6122, 43.1135 ], [ 1.6116, 43.1131 ], [ 1.611, 43.1127 ], [ 1.6113, 43.1125 ], [ 1.6116, 43.1124 ], [ 1.612, 43.1121 ], [ 1.612, 43.112 ], [ 1.6125, 43.1118 ], [ 1.6124, 43.1117 ], [ 1.6123, 43.1117 ], [ 1.6122, 43.1117 ], [ 1.6122, 43.1116 ], [ 1.6122, 43.1116 ], [ 1.612, 43.1115 ], [ 1.6123, 43.1113 ], [ 1.613, 43.111 ], [ 1.6132, 43.1109 ], [ 1.6134, 43.1108 ], [ 1.614, 43.1106 ], [ 1.6147, 43.1102 ], [ 1.6147, 43.1102 ], [ 1.6147, 43.1101 ], [ 1.6146, 43.1099 ], [ 1.6145, 43.1098 ], [ 1.6144, 43.1097 ], [ 1.6141, 43.1094 ], [ 1.6138, 43.1091 ], [ 1.6138, 43.1087 ], [ 1.6138, 43.1084 ], [ 1.6139, 43.1084 ], [ 1.6142, 43.1084 ], [ 1.6147, 43.1084 ], [ 1.6148, 43.1084 ], [ 1.6151, 43.108 ] ] ], "type": "Polygon" }, "id": "84", "properties": { "code_commune": "09225", "code_departement": "09", "code_qp": "QP009003", "commune_qp": "Pamiers", "nom_commune": "Pamiers", "nom_qp": "Centre Ancien - La Gloriette" }, "type": "Feature" }, { "bbox": [ 3.4658, 43.3088, 3.4746, 43.3166 ], "geometry": { "coordinates": [ [ [ 3.4736, 43.316 ], [ 3.4736, 43.3158 ], [ 3.4736, 43.3155 ], [ 3.4735, 43.3151 ], [ 3.4734, 43.3147 ], [ 3.4733, 43.3145 ], [ 3.4733, 43.3143 ], [ 3.4732, 43.314 ], [ 3.4735, 43.3139 ], [ 3.4739, 43.3137 ], [ 3.4741, 43.3132 ], [ 3.4741, 43.3131 ], [ 3.474, 43.3131 ], [ 3.474, 43.3131 ], [ 3.4739, 43.3127 ], [ 3.4737, 43.3117 ], [ 3.4746, 43.3116 ], [ 3.4745, 43.3112 ], [ 3.4735, 43.3111 ], [ 3.4739, 43.3107 ], [ 3.4742, 43.3105 ], [ 3.4746, 43.3102 ], [ 3.4745, 43.3102 ], [ 3.4745, 43.3101 ], [ 3.4745, 43.3101 ], [ 3.4741, 43.3102 ], [ 3.4737, 43.3102 ], [ 3.4733, 43.3103 ], [ 3.4733, 43.3102 ], [ 3.4731, 43.3099 ], [ 3.4729, 43.3099 ], [ 3.4725, 43.31 ], [ 3.4721, 43.31 ], [ 3.4718, 43.31 ], [ 3.4718, 43.31 ], [ 3.4718, 43.3091 ], [ 3.4715, 43.3091 ], [ 3.4715, 43.3091 ], [ 3.471, 43.3089 ], [ 3.471, 43.3089 ], [ 3.4708, 43.3088 ], [ 3.4704, 43.3088 ], [ 3.4703, 43.3088 ], [ 3.4702, 43.3088 ], [ 3.4702, 43.3089 ], [ 3.4701, 43.3089 ], [ 3.4701, 43.3089 ], [ 3.47, 43.3089 ], [ 3.47, 43.309 ], [ 3.4699, 43.309 ], [ 3.4699, 43.309 ], [ 3.4699, 43.309 ], [ 3.4698, 43.309 ], [ 3.4697, 43.309 ], [ 3.4696, 43.3089 ], [ 3.4693, 43.3089 ], [ 3.4692, 43.3088 ], [ 3.4691, 43.3088 ], [ 3.469, 43.3088 ], [ 3.4685, 43.309 ], [ 3.4685, 43.309 ], [ 3.4686, 43.3092 ], [ 3.4687, 43.3093 ], [ 3.4687, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4682, 43.3096 ], [ 3.4681, 43.3097 ], [ 3.4681, 43.3097 ], [ 3.4682, 43.3099 ], [ 3.468, 43.3099 ], [ 3.4681, 43.3101 ], [ 3.4681, 43.3102 ], [ 3.4682, 43.3104 ], [ 3.4682, 43.3104 ], [ 3.4682, 43.3105 ], [ 3.4682, 43.3106 ], [ 3.4659, 43.3109 ], [ 3.466, 43.3111 ], [ 3.4658, 43.3112 ], [ 3.4659, 43.3114 ], [ 3.4661, 43.3114 ], [ 3.4661, 43.3116 ], [ 3.4662, 43.3117 ], [ 3.4663, 43.3119 ], [ 3.4666, 43.3122 ], [ 3.4668, 43.3124 ], [ 3.4669, 43.3126 ], [ 3.4669, 43.3126 ], [ 3.4669, 43.3126 ], [ 3.4674, 43.3133 ], [ 3.4675, 43.3134 ], [ 3.4676, 43.3135 ], [ 3.4678, 43.3136 ], [ 3.4682, 43.3138 ], [ 3.4686, 43.314 ], [ 3.4689, 43.3142 ], [ 3.4692, 43.3144 ], [ 3.4694, 43.3145 ], [ 3.4696, 43.3147 ], [ 3.469, 43.3148 ], [ 3.4682, 43.315 ], [ 3.4677, 43.3146 ], [ 3.4668, 43.315 ], [ 3.4666, 43.3151 ], [ 3.4663, 43.3153 ], [ 3.4662, 43.3153 ], [ 3.4664, 43.3154 ], [ 3.4664, 43.3154 ], [ 3.4665, 43.3154 ], [ 3.467, 43.3156 ], [ 3.4672, 43.3155 ], [ 3.4677, 43.3159 ], [ 3.4683, 43.3153 ], [ 3.47, 43.3148 ], [ 3.4704, 43.315 ], [ 3.4706, 43.3151 ], [ 3.4708, 43.3152 ], [ 3.4724, 43.3161 ], [ 3.4726, 43.3164 ], [ 3.4733, 43.3166 ], [ 3.4734, 43.3165 ], [ 3.4734, 43.316 ], [ 3.4736, 43.316 ] ] ], "type": "Polygon" }, "id": "85", "properties": { "code_commune": "34003", "code_departement": "34", "code_qp": "QP034019", "commune_qp": "Agde", "nom_commune": "Agde", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 0.0545, 43.2405, 0.0703, 43.2469 ], "geometry": { "coordinates": [ [ [ 0.0611, 43.2419 ], [ 0.0611, 43.2425 ], [ 0.061, 43.2425 ], [ 0.061, 43.2431 ], [ 0.0614, 43.2431 ], [ 0.0616, 43.2431 ], [ 0.0616, 43.2431 ], [ 0.0615, 43.2433 ], [ 0.0612, 43.2435 ], [ 0.0601, 43.2436 ], [ 0.0595, 43.2436 ], [ 0.0595, 43.2436 ], [ 0.059, 43.2436 ], [ 0.059, 43.2438 ], [ 0.059, 43.2444 ], [ 0.059, 43.2445 ], [ 0.0589, 43.2447 ], [ 0.0589, 43.2449 ], [ 0.0588, 43.2449 ], [ 0.0588, 43.2449 ], [ 0.0582, 43.2449 ], [ 0.0578, 43.2449 ], [ 0.0568, 43.2449 ], [ 0.0568, 43.245 ], [ 0.0565, 43.2449 ], [ 0.0559, 43.2449 ], [ 0.0559, 43.245 ], [ 0.0559, 43.2453 ], [ 0.0559, 43.2454 ], [ 0.0558, 43.2455 ], [ 0.0557, 43.2455 ], [ 0.0556, 43.2455 ], [ 0.0555, 43.2455 ], [ 0.0553, 43.2454 ], [ 0.0553, 43.2454 ], [ 0.0553, 43.2453 ], [ 0.0553, 43.2451 ], [ 0.0553, 43.245 ], [ 0.0553, 43.2449 ], [ 0.0552, 43.2449 ], [ 0.0552, 43.2448 ], [ 0.0551, 43.2447 ], [ 0.0548, 43.2446 ], [ 0.0547, 43.2446 ], [ 0.0546, 43.2458 ], [ 0.0546, 43.2459 ], [ 0.0545, 43.2459 ], [ 0.0545, 43.2461 ], [ 0.0545, 43.2463 ], [ 0.0546, 43.2466 ], [ 0.055, 43.2469 ], [ 0.0557, 43.2468 ], [ 0.0558, 43.2461 ], [ 0.0558, 43.2461 ], [ 0.0558, 43.2456 ], [ 0.0559, 43.2455 ], [ 0.0559, 43.2455 ], [ 0.056, 43.2455 ], [ 0.0561, 43.2457 ], [ 0.0562, 43.2459 ], [ 0.0563, 43.2459 ], [ 0.0565, 43.246 ], [ 0.057, 43.246 ], [ 0.0574, 43.2461 ], [ 0.0576, 43.2459 ], [ 0.0577, 43.2458 ], [ 0.058, 43.2456 ], [ 0.0583, 43.2454 ], [ 0.0586, 43.2452 ], [ 0.059, 43.2449 ], [ 0.0591, 43.245 ], [ 0.0595, 43.2452 ], [ 0.0602, 43.2445 ], [ 0.0609, 43.2438 ], [ 0.061, 43.2439 ], [ 0.0611, 43.2439 ], [ 0.0614, 43.2439 ], [ 0.0614, 43.244 ], [ 0.0615, 43.244 ], [ 0.0615, 43.2442 ], [ 0.0614, 43.2456 ], [ 0.0613, 43.2459 ], [ 0.0614, 43.2459 ], [ 0.0625, 43.2465 ], [ 0.0627, 43.2466 ], [ 0.0628, 43.2466 ], [ 0.0633, 43.2466 ], [ 0.0646, 43.2466 ], [ 0.0651, 43.2467 ], [ 0.0656, 43.2456 ], [ 0.0657, 43.2456 ], [ 0.0667, 43.2458 ], [ 0.0667, 43.2457 ], [ 0.0668, 43.2458 ], [ 0.0674, 43.2458 ], [ 0.0679, 43.2459 ], [ 0.0684, 43.2459 ], [ 0.0684, 43.2459 ], [ 0.0684, 43.2458 ], [ 0.0684, 43.2458 ], [ 0.0685, 43.2457 ], [ 0.0687, 43.2457 ], [ 0.0689, 43.2456 ], [ 0.0691, 43.2454 ], [ 0.0686, 43.245 ], [ 0.0686, 43.245 ], [ 0.0683, 43.2449 ], [ 0.0684, 43.2449 ], [ 0.0684, 43.2447 ], [ 0.0685, 43.2446 ], [ 0.0685, 43.2445 ], [ 0.0685, 43.2442 ], [ 0.0685, 43.2441 ], [ 0.0693, 43.2442 ], [ 0.07, 43.2442 ], [ 0.0701, 43.2437 ], [ 0.0701, 43.2436 ], [ 0.0702, 43.2434 ], [ 0.0703, 43.243 ], [ 0.0703, 43.2429 ], [ 0.0703, 43.2426 ], [ 0.0697, 43.2426 ], [ 0.0696, 43.2425 ], [ 0.0696, 43.2426 ], [ 0.0695, 43.2426 ], [ 0.0694, 43.2426 ], [ 0.0694, 43.2427 ], [ 0.0694, 43.2427 ], [ 0.0692, 43.243 ], [ 0.069, 43.2431 ], [ 0.069, 43.2432 ], [ 0.069, 43.2432 ], [ 0.069, 43.2432 ], [ 0.069, 43.2433 ], [ 0.069, 43.2434 ], [ 0.0682, 43.2433 ], [ 0.0683, 43.243 ], [ 0.0683, 43.2425 ], [ 0.0683, 43.2425 ], [ 0.0683, 43.2424 ], [ 0.0683, 43.2419 ], [ 0.0674, 43.2419 ], [ 0.0674, 43.2415 ], [ 0.0672, 43.2415 ], [ 0.0671, 43.2417 ], [ 0.0667, 43.2422 ], [ 0.0667, 43.2423 ], [ 0.0659, 43.2423 ], [ 0.0657, 43.2423 ], [ 0.0656, 43.2425 ], [ 0.0641, 43.2424 ], [ 0.064, 43.2424 ], [ 0.0639, 43.2425 ], [ 0.0638, 43.2425 ], [ 0.0635, 43.2428 ], [ 0.063, 43.2426 ], [ 0.0625, 43.2423 ], [ 0.0627, 43.2421 ], [ 0.0626, 43.242 ], [ 0.0626, 43.2421 ], [ 0.0621, 43.2421 ], [ 0.0621, 43.242 ], [ 0.062, 43.242 ], [ 0.0619, 43.242 ], [ 0.0617, 43.242 ], [ 0.0616, 43.242 ], [ 0.0616, 43.2405 ], [ 0.0612, 43.2405 ], [ 0.0609, 43.2405 ], [ 0.0603, 43.2406 ], [ 0.0597, 43.2407 ], [ 0.0591, 43.2408 ], [ 0.0588, 43.2408 ], [ 0.0587, 43.2409 ], [ 0.059, 43.2416 ], [ 0.0591, 43.2418 ], [ 0.0591, 43.242 ], [ 0.0591, 43.242 ], [ 0.0595, 43.2419 ], [ 0.0597, 43.2419 ], [ 0.0601, 43.2419 ], [ 0.0611, 43.2418 ], [ 0.0611, 43.2419 ] ] ], "type": "Polygon" }, "id": "86", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065002", "commune_qp": "Tarbes", "nom_commune": "Tarbes", "nom_qp": "Tarbes Nord" }, "type": "Feature" }, { "bbox": [ 1.8884, 43.8981, 1.9055, 43.91 ], "geometry": { "coordinates": [ [ [ 1.8974, 43.9039 ], [ 1.8973, 43.9038 ], [ 1.8973, 43.9038 ], [ 1.8972, 43.9038 ], [ 1.8972, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8972, 43.9035 ], [ 1.8972, 43.9034 ], [ 1.8965, 43.9033 ], [ 1.8963, 43.9033 ], [ 1.8962, 43.9032 ], [ 1.8961, 43.9031 ], [ 1.8959, 43.903 ], [ 1.8957, 43.9029 ], [ 1.8956, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8954, 43.9029 ], [ 1.8953, 43.9029 ], [ 1.8952, 43.9028 ], [ 1.8951, 43.9028 ], [ 1.8951, 43.9028 ], [ 1.895, 43.9028 ], [ 1.8949, 43.9028 ], [ 1.8948, 43.903 ], [ 1.8946, 43.9029 ], [ 1.8944, 43.9028 ], [ 1.8945, 43.9027 ], [ 1.8941, 43.9025 ], [ 1.8939, 43.9024 ], [ 1.8936, 43.9024 ], [ 1.8934, 43.9023 ], [ 1.8933, 43.9023 ], [ 1.8934, 43.9021 ], [ 1.8932, 43.9021 ], [ 1.8927, 43.9022 ], [ 1.8923, 43.9023 ], [ 1.8923, 43.902 ], [ 1.8922, 43.902 ], [ 1.8922, 43.9018 ], [ 1.8922, 43.9015 ], [ 1.8921, 43.9014 ], [ 1.8921, 43.9012 ], [ 1.8922, 43.9008 ], [ 1.8922, 43.9007 ], [ 1.8923, 43.9005 ], [ 1.8924, 43.9004 ], [ 1.8922, 43.9002 ], [ 1.8919, 43.9 ], [ 1.8918, 43.9001 ], [ 1.8916, 43.9002 ], [ 1.8914, 43.9003 ], [ 1.8912, 43.9004 ], [ 1.891, 43.9006 ], [ 1.8909, 43.9006 ], [ 1.8908, 43.9006 ], [ 1.8906, 43.9006 ], [ 1.8905, 43.9006 ], [ 1.8906, 43.9005 ], [ 1.8907, 43.9005 ], [ 1.8909, 43.9003 ], [ 1.8911, 43.9002 ], [ 1.8912, 43.9001 ], [ 1.8912, 43.9 ], [ 1.8912, 43.8999 ], [ 1.8912, 43.8998 ], [ 1.8913, 43.8997 ], [ 1.8913, 43.8996 ], [ 1.8915, 43.8994 ], [ 1.8915, 43.8994 ], [ 1.8916, 43.8993 ], [ 1.8917, 43.8993 ], [ 1.8919, 43.8992 ], [ 1.8921, 43.899 ], [ 1.8925, 43.8987 ], [ 1.8919, 43.8987 ], [ 1.8915, 43.8986 ], [ 1.8913, 43.8985 ], [ 1.8911, 43.8985 ], [ 1.8907, 43.8984 ], [ 1.8906, 43.8982 ], [ 1.8905, 43.8982 ], [ 1.8903, 43.8981 ], [ 1.89, 43.8981 ], [ 1.8899, 43.8983 ], [ 1.8897, 43.8986 ], [ 1.8894, 43.8989 ], [ 1.8892, 43.899 ], [ 1.889, 43.8992 ], [ 1.889, 43.8992 ], [ 1.8887, 43.8996 ], [ 1.8889, 43.8998 ], [ 1.8884, 43.9003 ], [ 1.8898, 43.9015 ], [ 1.8902, 43.9018 ], [ 1.8906, 43.9022 ], [ 1.8906, 43.9022 ], [ 1.8907, 43.9024 ], [ 1.8909, 43.9026 ], [ 1.8909, 43.9026 ], [ 1.8911, 43.9027 ], [ 1.8912, 43.9027 ], [ 1.8913, 43.9028 ], [ 1.8913, 43.9029 ], [ 1.8914, 43.903 ], [ 1.8915, 43.9032 ], [ 1.8916, 43.9033 ], [ 1.8917, 43.9034 ], [ 1.8918, 43.9035 ], [ 1.8921, 43.9035 ], [ 1.8927, 43.9037 ], [ 1.8928, 43.9037 ], [ 1.893, 43.9038 ], [ 1.893, 43.9039 ], [ 1.8931, 43.904 ], [ 1.8931, 43.9041 ], [ 1.8931, 43.9042 ], [ 1.8931, 43.9043 ], [ 1.893, 43.9046 ], [ 1.893, 43.9047 ], [ 1.8931, 43.9049 ], [ 1.8939, 43.9049 ], [ 1.8942, 43.9049 ], [ 1.8946, 43.9048 ], [ 1.8949, 43.9048 ], [ 1.8956, 43.9048 ], [ 1.8957, 43.9048 ], [ 1.8959, 43.9048 ], [ 1.896, 43.9049 ], [ 1.8961, 43.9049 ], [ 1.896, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8968, 43.9049 ], [ 1.8968, 43.9049 ], [ 1.8969, 43.9049 ], [ 1.8969, 43.9046 ], [ 1.8969, 43.9046 ], [ 1.8971, 43.9046 ], [ 1.8973, 43.9046 ], [ 1.8973, 43.9047 ], [ 1.8975, 43.9047 ], [ 1.8977, 43.9047 ], [ 1.8978, 43.9048 ], [ 1.8979, 43.9048 ], [ 1.8979, 43.9049 ], [ 1.8981, 43.9051 ], [ 1.8981, 43.9052 ], [ 1.8987, 43.9063 ], [ 1.9006, 43.9058 ], [ 1.9008, 43.906 ], [ 1.9014, 43.9068 ], [ 1.9016, 43.9072 ], [ 1.9019, 43.9075 ], [ 1.902, 43.9076 ], [ 1.9021, 43.9078 ], [ 1.9023, 43.9083 ], [ 1.9027, 43.9089 ], [ 1.9031, 43.9094 ], [ 1.9035, 43.9099 ], [ 1.9036, 43.91 ], [ 1.9036, 43.91 ], [ 1.9037, 43.91 ], [ 1.9043, 43.9094 ], [ 1.9052, 43.9087 ], [ 1.9055, 43.9084 ], [ 1.9042, 43.9062 ], [ 1.9041, 43.9061 ], [ 1.904, 43.9061 ], [ 1.9038, 43.9061 ], [ 1.9037, 43.9061 ], [ 1.9035, 43.9061 ], [ 1.9033, 43.9061 ], [ 1.9032, 43.9061 ], [ 1.9031, 43.9061 ], [ 1.9028, 43.906 ], [ 1.9022, 43.9058 ], [ 1.9016, 43.9056 ], [ 1.9012, 43.9055 ], [ 1.9008, 43.9054 ], [ 1.9004, 43.9053 ], [ 1.9001, 43.9052 ], [ 1.8993, 43.9051 ], [ 1.8992, 43.9051 ], [ 1.8987, 43.905 ], [ 1.8984, 43.905 ], [ 1.8983, 43.9049 ], [ 1.8982, 43.9049 ], [ 1.898, 43.9049 ], [ 1.898, 43.9049 ], [ 1.898, 43.9048 ], [ 1.8979, 43.9048 ], [ 1.8978, 43.9047 ], [ 1.8978, 43.9046 ], [ 1.8977, 43.9045 ], [ 1.8974, 43.9039 ] ] ], "type": "Polygon" }, "id": "87", "properties": { "code_commune": "81099", "code_departement": "81", "code_qp": "QP081010", "commune_qp": "Gaillac", "nom_commune": "Gaillac", "nom_qp": "Lentajou - Catalanis" }, "type": "Feature" }, { "bbox": [ 0.5908, 43.6323, 0.5997, 43.6392 ], "geometry": { "coordinates": [ [ [ 0.5963, 43.6372 ], [ 0.5963, 43.6371 ], [ 0.5964, 43.637 ], [ 0.5963, 43.6369 ], [ 0.5961, 43.6356 ], [ 0.5959, 43.6349 ], [ 0.5959, 43.6347 ], [ 0.5959, 43.6345 ], [ 0.5958, 43.6344 ], [ 0.5956, 43.6342 ], [ 0.5953, 43.6337 ], [ 0.595, 43.6333 ], [ 0.5948, 43.633 ], [ 0.5947, 43.6329 ], [ 0.5944, 43.6326 ], [ 0.5942, 43.6325 ], [ 0.5938, 43.6324 ], [ 0.5932, 43.6323 ], [ 0.593, 43.6323 ], [ 0.5928, 43.6323 ], [ 0.5926, 43.6323 ], [ 0.5924, 43.6323 ], [ 0.5921, 43.6324 ], [ 0.5922, 43.6327 ], [ 0.5921, 43.6327 ], [ 0.592, 43.6328 ], [ 0.5923, 43.6339 ], [ 0.5921, 43.6339 ], [ 0.5921, 43.6342 ], [ 0.5922, 43.6342 ], [ 0.5914, 43.6343 ], [ 0.5915, 43.6347 ], [ 0.5914, 43.6347 ], [ 0.5915, 43.6349 ], [ 0.5914, 43.6349 ], [ 0.5915, 43.6352 ], [ 0.5909, 43.6353 ], [ 0.5908, 43.6353 ], [ 0.5908, 43.6353 ], [ 0.5911, 43.636 ], [ 0.5911, 43.6361 ], [ 0.5913, 43.636 ], [ 0.5916, 43.636 ], [ 0.5919, 43.6359 ], [ 0.592, 43.6363 ], [ 0.5925, 43.6363 ], [ 0.5925, 43.6363 ], [ 0.5929, 43.6362 ], [ 0.5931, 43.6367 ], [ 0.5931, 43.6367 ], [ 0.5933, 43.6372 ], [ 0.5932, 43.6373 ], [ 0.5933, 43.6375 ], [ 0.5934, 43.6376 ], [ 0.5939, 43.6375 ], [ 0.5941, 43.6381 ], [ 0.5941, 43.6382 ], [ 0.5946, 43.6381 ], [ 0.5949, 43.6379 ], [ 0.5957, 43.6375 ], [ 0.5961, 43.6373 ], [ 0.5964, 43.6376 ], [ 0.5966, 43.6375 ], [ 0.5967, 43.6375 ], [ 0.5968, 43.6376 ], [ 0.5967, 43.6377 ], [ 0.5972, 43.6381 ], [ 0.596, 43.6386 ], [ 0.5961, 43.6386 ], [ 0.5962, 43.6387 ], [ 0.5966, 43.639 ], [ 0.5968, 43.6391 ], [ 0.5969, 43.6392 ], [ 0.5975, 43.6389 ], [ 0.5977, 43.6389 ], [ 0.5982, 43.6386 ], [ 0.598, 43.6381 ], [ 0.5981, 43.6381 ], [ 0.5983, 43.6381 ], [ 0.5983, 43.6379 ], [ 0.5985, 43.6378 ], [ 0.5989, 43.6376 ], [ 0.5991, 43.6374 ], [ 0.5993, 43.6373 ], [ 0.5994, 43.6371 ], [ 0.5995, 43.6369 ], [ 0.5996, 43.6366 ], [ 0.5997, 43.6366 ], [ 0.5997, 43.6365 ], [ 0.5997, 43.6364 ], [ 0.5997, 43.6363 ], [ 0.5994, 43.6364 ], [ 0.5994, 43.6364 ], [ 0.5992, 43.6363 ], [ 0.5989, 43.6361 ], [ 0.5988, 43.6362 ], [ 0.5985, 43.6363 ], [ 0.5981, 43.6365 ], [ 0.5978, 43.6366 ], [ 0.5974, 43.6367 ], [ 0.5971, 43.6368 ], [ 0.5969, 43.6369 ], [ 0.5967, 43.6371 ], [ 0.5966, 43.6371 ], [ 0.5964, 43.6372 ], [ 0.5964, 43.6372 ], [ 0.5963, 43.6372 ] ] ], "type": "Polygon" }, "id": "88", "properties": { "code_commune": "32013", "code_departement": "32", "code_qp": "QP032001", "commune_qp": "Auch", "nom_commune": "Auch", "nom_qp": "Grand Garros" }, "type": "Feature" }, { "bbox": [ 3.2468, 43.3314, 3.2605, 43.3417 ], "geometry": { "coordinates": [ [ [ 3.259, 43.3402 ], [ 3.2587, 43.34 ], [ 3.2587, 43.34 ], [ 3.2586, 43.34 ], [ 3.2584, 43.3401 ], [ 3.2583, 43.3402 ], [ 3.2583, 43.3401 ], [ 3.2583, 43.3399 ], [ 3.2582, 43.3396 ], [ 3.2581, 43.3391 ], [ 3.2573, 43.3393 ], [ 3.257, 43.3389 ], [ 3.257, 43.3388 ], [ 3.2568, 43.3384 ], [ 3.2567, 43.3383 ], [ 3.2569, 43.3379 ], [ 3.2571, 43.338 ], [ 3.2574, 43.3377 ], [ 3.2578, 43.3378 ], [ 3.2579, 43.3379 ], [ 3.258, 43.3379 ], [ 3.2579, 43.3378 ], [ 3.2583, 43.3373 ], [ 3.2583, 43.3373 ], [ 3.2584, 43.3372 ], [ 3.2584, 43.3372 ], [ 3.2587, 43.3369 ], [ 3.2589, 43.3366 ], [ 3.2589, 43.3366 ], [ 3.2589, 43.3364 ], [ 3.2588, 43.336 ], [ 3.2596, 43.3359 ], [ 3.2599, 43.3358 ], [ 3.26, 43.3357 ], [ 3.2602, 43.3356 ], [ 3.2603, 43.3355 ], [ 3.2604, 43.3354 ], [ 3.2604, 43.3353 ], [ 3.2605, 43.3351 ], [ 3.2595, 43.3351 ], [ 3.2595, 43.3348 ], [ 3.2589, 43.3348 ], [ 3.2586, 43.3348 ], [ 3.2586, 43.3348 ], [ 3.2585, 43.335 ], [ 3.2585, 43.3352 ], [ 3.2584, 43.3352 ], [ 3.2578, 43.3352 ], [ 3.2575, 43.3353 ], [ 3.2574, 43.3352 ], [ 3.2573, 43.3352 ], [ 3.2569, 43.3352 ], [ 3.2567, 43.3352 ], [ 3.2567, 43.3353 ], [ 3.2566, 43.3349 ], [ 3.2567, 43.3348 ], [ 3.2567, 43.334 ], [ 3.2566, 43.3336 ], [ 3.2565, 43.3336 ], [ 3.2561, 43.3336 ], [ 3.2557, 43.3336 ], [ 3.2554, 43.3336 ], [ 3.2552, 43.3336 ], [ 3.2549, 43.3336 ], [ 3.2542, 43.3336 ], [ 3.2537, 43.3336 ], [ 3.2528, 43.3336 ], [ 3.2524, 43.3336 ], [ 3.2522, 43.3336 ], [ 3.252, 43.3336 ], [ 3.2519, 43.3336 ], [ 3.2514, 43.3336 ], [ 3.2513, 43.3336 ], [ 3.2512, 43.3336 ], [ 3.2508, 43.3336 ], [ 3.2506, 43.3333 ], [ 3.2506, 43.3333 ], [ 3.2506, 43.3332 ], [ 3.2506, 43.3331 ], [ 3.2506, 43.3329 ], [ 3.2506, 43.3328 ], [ 3.2506, 43.3326 ], [ 3.2506, 43.3325 ], [ 3.2506, 43.3321 ], [ 3.2506, 43.3318 ], [ 3.2506, 43.3317 ], [ 3.2506, 43.3315 ], [ 3.2506, 43.3315 ], [ 3.2505, 43.3315 ], [ 3.2505, 43.3314 ], [ 3.2498, 43.3314 ], [ 3.2495, 43.3314 ], [ 3.2493, 43.3314 ], [ 3.2491, 43.3315 ], [ 3.2491, 43.3317 ], [ 3.2488, 43.3318 ], [ 3.2488, 43.3319 ], [ 3.2487, 43.3319 ], [ 3.2487, 43.332 ], [ 3.2487, 43.3321 ], [ 3.2487, 43.3321 ], [ 3.2487, 43.3322 ], [ 3.2488, 43.3323 ], [ 3.2488, 43.3323 ], [ 3.2487, 43.3323 ], [ 3.2485, 43.3325 ], [ 3.2485, 43.3326 ], [ 3.2486, 43.3327 ], [ 3.2485, 43.3328 ], [ 3.2485, 43.3328 ], [ 3.2484, 43.3328 ], [ 3.2484, 43.3329 ], [ 3.2483, 43.3329 ], [ 3.2482, 43.3328 ], [ 3.2482, 43.3328 ], [ 3.2479, 43.3328 ], [ 3.2474, 43.3328 ], [ 3.2474, 43.3328 ], [ 3.2473, 43.3329 ], [ 3.2473, 43.333 ], [ 3.2472, 43.333 ], [ 3.2472, 43.3331 ], [ 3.2472, 43.3332 ], [ 3.2472, 43.3333 ], [ 3.2472, 43.3333 ], [ 3.2471, 43.3336 ], [ 3.2471, 43.3338 ], [ 3.2471, 43.334 ], [ 3.2471, 43.3342 ], [ 3.2471, 43.3343 ], [ 3.247, 43.3345 ], [ 3.247, 43.3346 ], [ 3.247, 43.3347 ], [ 3.247, 43.3348 ], [ 3.2471, 43.3349 ], [ 3.2471, 43.3349 ], [ 3.2472, 43.335 ], [ 3.2471, 43.335 ], [ 3.2472, 43.3351 ], [ 3.2468, 43.3352 ], [ 3.2468, 43.3352 ], [ 3.2468, 43.3357 ], [ 3.247, 43.3357 ], [ 3.247, 43.3357 ], [ 3.247, 43.3359 ], [ 3.2475, 43.3359 ], [ 3.2477, 43.3359 ], [ 3.2478, 43.3359 ], [ 3.2478, 43.3358 ], [ 3.2477, 43.3357 ], [ 3.2476, 43.3355 ], [ 3.2475, 43.3353 ], [ 3.2474, 43.3351 ], [ 3.2473, 43.3349 ], [ 3.2472, 43.3349 ], [ 3.2478, 43.3347 ], [ 3.2481, 43.3346 ], [ 3.2484, 43.3345 ], [ 3.2484, 43.3344 ], [ 3.2484, 43.3342 ], [ 3.249, 43.3342 ], [ 3.2493, 43.3341 ], [ 3.2494, 43.334 ], [ 3.2496, 43.334 ], [ 3.2497, 43.3339 ], [ 3.2498, 43.3339 ], [ 3.2499, 43.3339 ], [ 3.25, 43.3339 ], [ 3.2501, 43.3339 ], [ 3.2502, 43.3341 ], [ 3.2502, 43.3342 ], [ 3.2502, 43.3343 ], [ 3.2502, 43.3348 ], [ 3.2502, 43.3352 ], [ 3.2502, 43.3354 ], [ 3.2502, 43.3356 ], [ 3.2502, 43.3356 ], [ 3.2501, 43.3357 ], [ 3.2501, 43.3359 ], [ 3.2501, 43.3365 ], [ 3.2501, 43.3365 ], [ 3.2501, 43.3366 ], [ 3.2502, 43.3366 ], [ 3.2503, 43.3366 ], [ 3.2504, 43.3366 ], [ 3.2504, 43.337 ], [ 3.2502, 43.3371 ], [ 3.2502, 43.337 ], [ 3.2502, 43.3371 ], [ 3.2502, 43.3372 ], [ 3.2496, 43.3374 ], [ 3.2492, 43.3376 ], [ 3.2494, 43.3378 ], [ 3.2495, 43.3379 ], [ 3.2495, 43.3379 ], [ 3.2496, 43.3379 ], [ 3.25, 43.3379 ], [ 3.2501, 43.3379 ], [ 3.2502, 43.3379 ], [ 3.2502, 43.3379 ], [ 3.2503, 43.3379 ], [ 3.2505, 43.3379 ], [ 3.2507, 43.338 ], [ 3.2509, 43.338 ], [ 3.251, 43.338 ], [ 3.251, 43.338 ], [ 3.2511, 43.3381 ], [ 3.2516, 43.3387 ], [ 3.2521, 43.3393 ], [ 3.2523, 43.3392 ], [ 3.2527, 43.3391 ], [ 3.2527, 43.3391 ], [ 3.2527, 43.339 ], [ 3.2529, 43.339 ], [ 3.253, 43.339 ], [ 3.2532, 43.3389 ], [ 3.2533, 43.3388 ], [ 3.2534, 43.3387 ], [ 3.2534, 43.3387 ], [ 3.2536, 43.3386 ], [ 3.2537, 43.3384 ], [ 3.2538, 43.3384 ], [ 3.2539, 43.3382 ], [ 3.2541, 43.338 ], [ 3.2542, 43.338 ], [ 3.2542, 43.3379 ], [ 3.2547, 43.3374 ], [ 3.2547, 43.3374 ], [ 3.2549, 43.3374 ], [ 3.2556, 43.3378 ], [ 3.2556, 43.3381 ], [ 3.2557, 43.3392 ], [ 3.2557, 43.3393 ], [ 3.2557, 43.3394 ], [ 3.2557, 43.3395 ], [ 3.2558, 43.3399 ], [ 3.2559, 43.3411 ], [ 3.2559, 43.3414 ], [ 3.2559, 43.3415 ], [ 3.2563, 43.3415 ], [ 3.2569, 43.3415 ], [ 3.2574, 43.3416 ], [ 3.258, 43.3417 ], [ 3.2584, 43.3417 ], [ 3.2585, 43.3417 ], [ 3.2586, 43.3415 ], [ 3.2586, 43.3414 ], [ 3.2587, 43.3411 ], [ 3.2588, 43.3408 ], [ 3.2591, 43.3403 ], [ 3.259, 43.3402 ] ] ], "type": "Polygon" }, "id": "89", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034003", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Devèze" }, "type": "Feature" }, { "bbox": [ 1.3182, 43.4559, 1.3307, 43.4649 ], "geometry": { "coordinates": [ [ [ 1.321, 43.464 ], [ 1.3214, 43.4638 ], [ 1.3218, 43.4638 ], [ 1.3214, 43.4627 ], [ 1.3218, 43.4626 ], [ 1.3221, 43.4624 ], [ 1.3227, 43.4622 ], [ 1.3229, 43.4625 ], [ 1.3234, 43.4628 ], [ 1.3246, 43.4624 ], [ 1.3248, 43.4624 ], [ 1.3252, 43.4622 ], [ 1.3254, 43.4622 ], [ 1.3256, 43.4622 ], [ 1.326, 43.4621 ], [ 1.3262, 43.4621 ], [ 1.3263, 43.4621 ], [ 1.3263, 43.4618 ], [ 1.3262, 43.4614 ], [ 1.3262, 43.4614 ], [ 1.3265, 43.4614 ], [ 1.3265, 43.4614 ], [ 1.327, 43.4613 ], [ 1.3272, 43.4613 ], [ 1.3276, 43.4612 ], [ 1.3283, 43.4611 ], [ 1.3289, 43.461 ], [ 1.3289, 43.461 ], [ 1.3291, 43.4611 ], [ 1.3292, 43.4611 ], [ 1.3294, 43.4612 ], [ 1.33, 43.4614 ], [ 1.3301, 43.4612 ], [ 1.3303, 43.4612 ], [ 1.3304, 43.4612 ], [ 1.3305, 43.4612 ], [ 1.3305, 43.4612 ], [ 1.3307, 43.4611 ], [ 1.3301, 43.4608 ], [ 1.3299, 43.4607 ], [ 1.3296, 43.4606 ], [ 1.3292, 43.4605 ], [ 1.329, 43.4605 ], [ 1.3288, 43.4603 ], [ 1.3287, 43.4602 ], [ 1.3286, 43.4601 ], [ 1.3285, 43.4601 ], [ 1.3281, 43.4598 ], [ 1.3277, 43.4595 ], [ 1.3275, 43.4594 ], [ 1.3275, 43.4594 ], [ 1.3275, 43.4593 ], [ 1.3275, 43.4593 ], [ 1.3274, 43.4592 ], [ 1.3275, 43.4592 ], [ 1.327, 43.4587 ], [ 1.3266, 43.4586 ], [ 1.3262, 43.458 ], [ 1.3262, 43.4579 ], [ 1.3261, 43.4578 ], [ 1.3259, 43.4575 ], [ 1.3258, 43.4573 ], [ 1.3257, 43.4573 ], [ 1.3256, 43.4573 ], [ 1.3254, 43.4573 ], [ 1.3253, 43.457 ], [ 1.3253, 43.4568 ], [ 1.3252, 43.4567 ], [ 1.3252, 43.4565 ], [ 1.3252, 43.4564 ], [ 1.325, 43.4562 ], [ 1.3249, 43.4561 ], [ 1.3249, 43.456 ], [ 1.3247, 43.4559 ], [ 1.3234, 43.4563 ], [ 1.3236, 43.4566 ], [ 1.3238, 43.4568 ], [ 1.3241, 43.4572 ], [ 1.3246, 43.4576 ], [ 1.3255, 43.4583 ], [ 1.3262, 43.4589 ], [ 1.3262, 43.459 ], [ 1.3262, 43.459 ], [ 1.3257, 43.4594 ], [ 1.3254, 43.4597 ], [ 1.325, 43.46 ], [ 1.3246, 43.4603 ], [ 1.3246, 43.4605 ], [ 1.3245, 43.4606 ], [ 1.3247, 43.4607 ], [ 1.3246, 43.4609 ], [ 1.3246, 43.4609 ], [ 1.3245, 43.461 ], [ 1.3245, 43.461 ], [ 1.3244, 43.4611 ], [ 1.3244, 43.4612 ], [ 1.3242, 43.4614 ], [ 1.3241, 43.4614 ], [ 1.3241, 43.4614 ], [ 1.324, 43.4614 ], [ 1.3239, 43.4615 ], [ 1.3236, 43.4615 ], [ 1.3233, 43.4615 ], [ 1.3232, 43.4615 ], [ 1.323, 43.4616 ], [ 1.323, 43.4616 ], [ 1.3226, 43.4618 ], [ 1.3226, 43.4617 ], [ 1.3223, 43.4618 ], [ 1.3216, 43.462 ], [ 1.3215, 43.4623 ], [ 1.3212, 43.4622 ], [ 1.3208, 43.4621 ], [ 1.3201, 43.4619 ], [ 1.32, 43.4618 ], [ 1.3202, 43.4613 ], [ 1.3202, 43.4613 ], [ 1.3201, 43.4613 ], [ 1.3201, 43.4612 ], [ 1.3202, 43.461 ], [ 1.3198, 43.4609 ], [ 1.3192, 43.4613 ], [ 1.319, 43.4616 ], [ 1.3194, 43.4617 ], [ 1.3199, 43.4618 ], [ 1.32, 43.4619 ], [ 1.3201, 43.4624 ], [ 1.3201, 43.4628 ], [ 1.3209, 43.4628 ], [ 1.321, 43.4628 ], [ 1.3207, 43.4629 ], [ 1.3201, 43.4632 ], [ 1.3193, 43.4636 ], [ 1.3192, 43.4637 ], [ 1.3187, 43.4638 ], [ 1.3182, 43.4639 ], [ 1.3185, 43.4646 ], [ 1.3198, 43.4649 ], [ 1.3203, 43.4647 ], [ 1.3203, 43.4647 ], [ 1.3203, 43.4646 ], [ 1.3212, 43.4644 ], [ 1.321, 43.464 ] ] ], "type": "Polygon" }, "id": "90", "properties": { "code_commune": "31395", "code_departement": "31", "code_qp": "QP031002", "commune_qp": "Muret", "nom_commune": "Muret", "nom_qp": "Centre Ouest" }, "type": "Feature" }, { "bbox": [ 2.9064, 42.6896, 2.9104, 42.6948 ], "geometry": { "coordinates": [ [ [ 2.9104, 42.6943 ], [ 2.9102, 42.6942 ], [ 2.9089, 42.6926 ], [ 2.908, 42.6915 ], [ 2.9077, 42.6912 ], [ 2.9078, 42.6912 ], [ 2.908, 42.691 ], [ 2.909, 42.6906 ], [ 2.9089, 42.6906 ], [ 2.9088, 42.6905 ], [ 2.9073, 42.6896 ], [ 2.907, 42.6899 ], [ 2.9075, 42.6904 ], [ 2.9077, 42.6905 ], [ 2.908, 42.6909 ], [ 2.9077, 42.6911 ], [ 2.9075, 42.6912 ], [ 2.9069, 42.6915 ], [ 2.9065, 42.6917 ], [ 2.9064, 42.6919 ], [ 2.9064, 42.6921 ], [ 2.9065, 42.6927 ], [ 2.9066, 42.6928 ], [ 2.9066, 42.6929 ], [ 2.9066, 42.6929 ], [ 2.9072, 42.6936 ], [ 2.9072, 42.6937 ], [ 2.9073, 42.6938 ], [ 2.9073, 42.6938 ], [ 2.9073, 42.6938 ], [ 2.9072, 42.6938 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9071, 42.694 ], [ 2.907, 42.694 ], [ 2.9069, 42.6941 ], [ 2.9068, 42.6941 ], [ 2.9068, 42.6942 ], [ 2.9068, 42.6942 ], [ 2.9067, 42.6942 ], [ 2.9067, 42.6945 ], [ 2.9066, 42.6947 ], [ 2.9067, 42.6948 ], [ 2.9069, 42.6948 ], [ 2.9069, 42.6948 ], [ 2.907, 42.6948 ], [ 2.9071, 42.6948 ], [ 2.9079, 42.6948 ], [ 2.908, 42.6948 ], [ 2.9082, 42.6948 ], [ 2.9084, 42.6946 ], [ 2.9085, 42.6946 ], [ 2.9091, 42.6943 ], [ 2.9091, 42.6943 ], [ 2.9091, 42.6943 ], [ 2.9092, 42.6943 ], [ 2.9097, 42.6945 ], [ 2.9099, 42.6945 ], [ 2.9099, 42.6945 ], [ 2.91, 42.6945 ], [ 2.91, 42.6945 ], [ 2.9104, 42.6943 ] ] ], "type": "Polygon" }, "id": "91", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066010", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Champs De Mars" }, "type": "Feature" }, { "bbox": [ 3.8632, 43.6049, 3.8725, 43.609 ], "geometry": { "coordinates": [ [ [ 3.8669, 43.609 ], [ 3.8671, 43.6089 ], [ 3.8676, 43.6086 ], [ 3.8684, 43.6082 ], [ 3.8686, 43.6081 ], [ 3.8687, 43.6082 ], [ 3.8688, 43.6082 ], [ 3.869, 43.6085 ], [ 3.8685, 43.6086 ], [ 3.8687, 43.6088 ], [ 3.8689, 43.6088 ], [ 3.8688, 43.6087 ], [ 3.869, 43.6087 ], [ 3.8692, 43.6087 ], [ 3.8692, 43.6087 ], [ 3.8694, 43.6087 ], [ 3.8694, 43.6086 ], [ 3.8694, 43.6086 ], [ 3.8695, 43.6089 ], [ 3.8696, 43.6089 ], [ 3.8696, 43.609 ], [ 3.8697, 43.6089 ], [ 3.8696, 43.6088 ], [ 3.8696, 43.6088 ], [ 3.8698, 43.6087 ], [ 3.8698, 43.6087 ], [ 3.8699, 43.6087 ], [ 3.8698, 43.6087 ], [ 3.8701, 43.6086 ], [ 3.8701, 43.6086 ], [ 3.8701, 43.6085 ], [ 3.8703, 43.6085 ], [ 3.8703, 43.6085 ], [ 3.8704, 43.6085 ], [ 3.8705, 43.6085 ], [ 3.8706, 43.6085 ], [ 3.8707, 43.6085 ], [ 3.8707, 43.6085 ], [ 3.8709, 43.6085 ], [ 3.8709, 43.6085 ], [ 3.8713, 43.6085 ], [ 3.8713, 43.6084 ], [ 3.8716, 43.6084 ], [ 3.8716, 43.6085 ], [ 3.872, 43.6086 ], [ 3.8721, 43.6085 ], [ 3.8724, 43.6086 ], [ 3.8725, 43.6084 ], [ 3.8722, 43.6083 ], [ 3.8722, 43.6083 ], [ 3.8723, 43.6081 ], [ 3.8722, 43.6081 ], [ 3.872, 43.6082 ], [ 3.872, 43.6082 ], [ 3.8716, 43.6079 ], [ 3.8714, 43.6077 ], [ 3.8711, 43.6075 ], [ 3.8708, 43.6072 ], [ 3.8699, 43.6077 ], [ 3.8691, 43.6069 ], [ 3.8685, 43.6062 ], [ 3.868, 43.6064 ], [ 3.8679, 43.6063 ], [ 3.8677, 43.6062 ], [ 3.8677, 43.6062 ], [ 3.8676, 43.6061 ], [ 3.8675, 43.6061 ], [ 3.8674, 43.6061 ], [ 3.8673, 43.6062 ], [ 3.8672, 43.6059 ], [ 3.8671, 43.6058 ], [ 3.8661, 43.6052 ], [ 3.866, 43.6051 ], [ 3.8656, 43.605 ], [ 3.8654, 43.6049 ], [ 3.8653, 43.6049 ], [ 3.8652, 43.605 ], [ 3.8651, 43.605 ], [ 3.865, 43.605 ], [ 3.865, 43.6051 ], [ 3.8649, 43.6052 ], [ 3.8649, 43.6053 ], [ 3.8649, 43.6054 ], [ 3.8648, 43.6056 ], [ 3.8647, 43.6058 ], [ 3.8638, 43.6055 ], [ 3.8635, 43.6061 ], [ 3.8636, 43.6061 ], [ 3.8634, 43.6066 ], [ 3.8633, 43.6068 ], [ 3.8632, 43.6071 ], [ 3.8635, 43.6073 ], [ 3.8636, 43.6074 ], [ 3.8638, 43.6078 ], [ 3.8636, 43.6083 ], [ 3.8639, 43.6083 ], [ 3.864, 43.6085 ], [ 3.8642, 43.6085 ], [ 3.8661, 43.6085 ], [ 3.8667, 43.6085 ], [ 3.8667, 43.6086 ], [ 3.8667, 43.6086 ], [ 3.8667, 43.6087 ], [ 3.8668, 43.6087 ], [ 3.8668, 43.6087 ], [ 3.8669, 43.6087 ], [ 3.8669, 43.609 ] ] ], "type": "Polygon" }, "id": "92", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034010", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Figuerolles" }, "type": "Feature" }, { "bbox": [ 2.2124, 43.0514, 2.2229, 43.0613 ], "geometry": { "coordinates": [ [ [ 2.2203, 43.0524 ], [ 2.2201, 43.0523 ], [ 2.2202, 43.052 ], [ 2.22, 43.0519 ], [ 2.2201, 43.0517 ], [ 2.2203, 43.0515 ], [ 2.2203, 43.0514 ], [ 2.2203, 43.0514 ], [ 2.2202, 43.0514 ], [ 2.22, 43.0514 ], [ 2.2198, 43.0515 ], [ 2.2196, 43.0516 ], [ 2.2194, 43.0518 ], [ 2.2192, 43.052 ], [ 2.2188, 43.0523 ], [ 2.2185, 43.0521 ], [ 2.2184, 43.0521 ], [ 2.2183, 43.0521 ], [ 2.2182, 43.0521 ], [ 2.2182, 43.0521 ], [ 2.2181, 43.0521 ], [ 2.218, 43.0521 ], [ 2.218, 43.0521 ], [ 2.2179, 43.0525 ], [ 2.2178, 43.0527 ], [ 2.2173, 43.0526 ], [ 2.2168, 43.0524 ], [ 2.2165, 43.0522 ], [ 2.2165, 43.0523 ], [ 2.2161, 43.0521 ], [ 2.2157, 43.0523 ], [ 2.2153, 43.0526 ], [ 2.2156, 43.0528 ], [ 2.2147, 43.0534 ], [ 2.2145, 43.0536 ], [ 2.2143, 43.0538 ], [ 2.2139, 43.0542 ], [ 2.2135, 43.0546 ], [ 2.2145, 43.0546 ], [ 2.2144, 43.0549 ], [ 2.2147, 43.055 ], [ 2.2148, 43.0549 ], [ 2.2151, 43.055 ], [ 2.2151, 43.0549 ], [ 2.2153, 43.055 ], [ 2.2155, 43.0547 ], [ 2.216, 43.0547 ], [ 2.2158, 43.055 ], [ 2.2157, 43.0551 ], [ 2.2154, 43.0555 ], [ 2.2153, 43.0559 ], [ 2.2147, 43.0563 ], [ 2.2137, 43.0561 ], [ 2.2141, 43.0554 ], [ 2.2134, 43.0551 ], [ 2.213, 43.0551 ], [ 2.2129, 43.0552 ], [ 2.2127, 43.0557 ], [ 2.2125, 43.056 ], [ 2.2124, 43.0563 ], [ 2.2124, 43.0565 ], [ 2.2129, 43.0564 ], [ 2.2134, 43.0562 ], [ 2.2135, 43.0567 ], [ 2.2137, 43.0569 ], [ 2.2138, 43.057 ], [ 2.2139, 43.057 ], [ 2.2141, 43.057 ], [ 2.2155, 43.0575 ], [ 2.2156, 43.0574 ], [ 2.2157, 43.0573 ], [ 2.2157, 43.0573 ], [ 2.2167, 43.0564 ], [ 2.217, 43.0561 ], [ 2.2177, 43.0554 ], [ 2.2187, 43.0558 ], [ 2.219, 43.0558 ], [ 2.2192, 43.0559 ], [ 2.2193, 43.0559 ], [ 2.2199, 43.0559 ], [ 2.2201, 43.0559 ], [ 2.2201, 43.0561 ], [ 2.22, 43.0567 ], [ 2.2205, 43.0567 ], [ 2.2205, 43.0569 ], [ 2.2205, 43.057 ], [ 2.2205, 43.057 ], [ 2.2207, 43.057 ], [ 2.2208, 43.0571 ], [ 2.221, 43.0571 ], [ 2.221, 43.0572 ], [ 2.2211, 43.0572 ], [ 2.2212, 43.0573 ], [ 2.2213, 43.0575 ], [ 2.2213, 43.0577 ], [ 2.2214, 43.0578 ], [ 2.2213, 43.0579 ], [ 2.2213, 43.0579 ], [ 2.2207, 43.0579 ], [ 2.2206, 43.0584 ], [ 2.22, 43.0584 ], [ 2.22, 43.0586 ], [ 2.2205, 43.0587 ], [ 2.2205, 43.0587 ], [ 2.2207, 43.0589 ], [ 2.2207, 43.059 ], [ 2.2206, 43.0592 ], [ 2.2206, 43.0592 ], [ 2.2207, 43.0593 ], [ 2.2208, 43.0593 ], [ 2.2208, 43.0596 ], [ 2.2207, 43.0596 ], [ 2.2203, 43.0596 ], [ 2.2197, 43.0597 ], [ 2.2186, 43.0598 ], [ 2.2178, 43.0599 ], [ 2.218, 43.0607 ], [ 2.2181, 43.0613 ], [ 2.2184, 43.0613 ], [ 2.2186, 43.0612 ], [ 2.219, 43.0611 ], [ 2.2193, 43.0611 ], [ 2.2198, 43.061 ], [ 2.2198, 43.0604 ], [ 2.2201, 43.0604 ], [ 2.22, 43.0601 ], [ 2.2212, 43.06 ], [ 2.2211, 43.0597 ], [ 2.2211, 43.0597 ], [ 2.2211, 43.0596 ], [ 2.2211, 43.0595 ], [ 2.2212, 43.0592 ], [ 2.2213, 43.0587 ], [ 2.2214, 43.0582 ], [ 2.2214, 43.058 ], [ 2.2214, 43.0579 ], [ 2.2215, 43.0578 ], [ 2.2219, 43.0578 ], [ 2.2223, 43.0578 ], [ 2.2223, 43.058 ], [ 2.2228, 43.0579 ], [ 2.2228, 43.0577 ], [ 2.2228, 43.0569 ], [ 2.2229, 43.0561 ], [ 2.2227, 43.0561 ], [ 2.2227, 43.0562 ], [ 2.2226, 43.0562 ], [ 2.2225, 43.0562 ], [ 2.2224, 43.0563 ], [ 2.2224, 43.0564 ], [ 2.2223, 43.0574 ], [ 2.2213, 43.0575 ], [ 2.2212, 43.0573 ], [ 2.2211, 43.0571 ], [ 2.2209, 43.057 ], [ 2.2209, 43.0569 ], [ 2.2209, 43.0568 ], [ 2.2208, 43.0567 ], [ 2.2205, 43.0562 ], [ 2.2203, 43.0559 ], [ 2.2201, 43.0557 ], [ 2.2202, 43.0553 ], [ 2.2203, 43.055 ], [ 2.2205, 43.055 ], [ 2.2207, 43.055 ], [ 2.2207, 43.055 ], [ 2.221, 43.0551 ], [ 2.2211, 43.0548 ], [ 2.2212, 43.0547 ], [ 2.2213, 43.0545 ], [ 2.2213, 43.0544 ], [ 2.2213, 43.0544 ], [ 2.2209, 43.0544 ], [ 2.2207, 43.0543 ], [ 2.2201, 43.0542 ], [ 2.219, 43.054 ], [ 2.2193, 43.0538 ], [ 2.2194, 43.0536 ], [ 2.2197, 43.0532 ], [ 2.22, 43.0529 ], [ 2.2203, 43.0524 ] ] ], "type": "Polygon" }, "id": "93", "properties": { "code_commune": "11206", "code_departement": "11", "code_qp": "QP011001", "commune_qp": "Limoux", "nom_commune": "Limoux", "nom_qp": "Quartier Aude" }, "type": "Feature" }, { "bbox": [ 4.6115, 44.1552, 4.6259, 44.1628 ], "geometry": { "coordinates": [ [ [ 4.6258, 44.1607 ], [ 4.6257, 44.1605 ], [ 4.6254, 44.1602 ], [ 4.6254, 44.1601 ], [ 4.6252, 44.16 ], [ 4.6251, 44.1599 ], [ 4.625, 44.1598 ], [ 4.6248, 44.1597 ], [ 4.6246, 44.1593 ], [ 4.6225, 44.1564 ], [ 4.6223, 44.1563 ], [ 4.6221, 44.156 ], [ 4.6219, 44.1559 ], [ 4.6218, 44.1558 ], [ 4.6216, 44.1557 ], [ 4.6208, 44.1557 ], [ 4.6192, 44.1556 ], [ 4.619, 44.1555 ], [ 4.618, 44.1555 ], [ 4.6177, 44.1554 ], [ 4.6175, 44.1554 ], [ 4.6173, 44.1554 ], [ 4.6171, 44.1553 ], [ 4.617, 44.1552 ], [ 4.6169, 44.1553 ], [ 4.6169, 44.1554 ], [ 4.6168, 44.1554 ], [ 4.6168, 44.1555 ], [ 4.6167, 44.1556 ], [ 4.6168, 44.1558 ], [ 4.6169, 44.1559 ], [ 4.617, 44.1561 ], [ 4.6172, 44.1564 ], [ 4.6169, 44.1565 ], [ 4.6165, 44.1566 ], [ 4.6161, 44.1566 ], [ 4.6157, 44.1561 ], [ 4.6154, 44.1557 ], [ 4.6153, 44.1556 ], [ 4.6153, 44.1556 ], [ 4.6153, 44.1555 ], [ 4.6144, 44.1557 ], [ 4.6145, 44.156 ], [ 4.6147, 44.1565 ], [ 4.6143, 44.1566 ], [ 4.614, 44.1566 ], [ 4.614, 44.1566 ], [ 4.614, 44.1567 ], [ 4.6141, 44.1568 ], [ 4.6145, 44.157 ], [ 4.6146, 44.1571 ], [ 4.6147, 44.1572 ], [ 4.6151, 44.1577 ], [ 4.6152, 44.1579 ], [ 4.6151, 44.1579 ], [ 4.6152, 44.1582 ], [ 4.6152, 44.1582 ], [ 4.6134, 44.1585 ], [ 4.6133, 44.1585 ], [ 4.6133, 44.1585 ], [ 4.6134, 44.1587 ], [ 4.6136, 44.159 ], [ 4.6139, 44.1597 ], [ 4.6137, 44.1598 ], [ 4.6129, 44.1598 ], [ 4.612, 44.16 ], [ 4.6116, 44.1601 ], [ 4.6116, 44.1601 ], [ 4.6115, 44.1602 ], [ 4.6115, 44.1604 ], [ 4.6116, 44.161 ], [ 4.6117, 44.1628 ], [ 4.6125, 44.1627 ], [ 4.6123, 44.1612 ], [ 4.6123, 44.16 ], [ 4.6124, 44.1599 ], [ 4.6129, 44.1599 ], [ 4.6138, 44.1598 ], [ 4.6139, 44.1597 ], [ 4.6136, 44.159 ], [ 4.6146, 44.159 ], [ 4.6147, 44.159 ], [ 4.6156, 44.1589 ], [ 4.6157, 44.1588 ], [ 4.6179, 44.1581 ], [ 4.618, 44.158 ], [ 4.618, 44.1582 ], [ 4.6181, 44.1583 ], [ 4.6182, 44.1585 ], [ 4.6184, 44.1587 ], [ 4.6186, 44.1589 ], [ 4.6189, 44.1594 ], [ 4.6194, 44.1592 ], [ 4.6195, 44.1595 ], [ 4.6196, 44.1595 ], [ 4.6197, 44.1595 ], [ 4.6198, 44.1598 ], [ 4.6197, 44.1598 ], [ 4.6197, 44.1602 ], [ 4.6206, 44.1602 ], [ 4.6208, 44.1602 ], [ 4.621, 44.1601 ], [ 4.6211, 44.1602 ], [ 4.6211, 44.1602 ], [ 4.6212, 44.1604 ], [ 4.6215, 44.1603 ], [ 4.6215, 44.1604 ], [ 4.6225, 44.1603 ], [ 4.6226, 44.1603 ], [ 4.6226, 44.1601 ], [ 4.6226, 44.1598 ], [ 4.623, 44.1598 ], [ 4.6234, 44.1598 ], [ 4.6235, 44.16 ], [ 4.6238, 44.1599 ], [ 4.624, 44.1602 ], [ 4.624, 44.1602 ], [ 4.6243, 44.1602 ], [ 4.6243, 44.1604 ], [ 4.6242, 44.1606 ], [ 4.6243, 44.1607 ], [ 4.6243, 44.1609 ], [ 4.6252, 44.1607 ], [ 4.6252, 44.1608 ], [ 4.6254, 44.1607 ], [ 4.6255, 44.161 ], [ 4.6256, 44.161 ], [ 4.6257, 44.1609 ], [ 4.6258, 44.1609 ], [ 4.6258, 44.1608 ], [ 4.6259, 44.1608 ], [ 4.6258, 44.1607 ] ] ], "type": "Polygon" }, "id": "94", "properties": { "code_commune": "30028", "code_departement": "30", "code_qp": "QP030010", "commune_qp": "Bagnols-sur-Cèze", "nom_commune": "Bagnols-sur-Cèze", "nom_qp": "Escanaux - Coronelle - Citadelle - Vigan Braquet" }, "type": "Feature" }, { "bbox": [ 4.4107, 44.0178, 4.4182, 44.0292 ], "geometry": { "coordinates": [ [ [ 4.4182, 44.0186 ], [ 4.418, 44.018 ], [ 4.4179, 44.0178 ], [ 4.4176, 44.0179 ], [ 4.4174, 44.0179 ], [ 4.4165, 44.0182 ], [ 4.4163, 44.0182 ], [ 4.4162, 44.0183 ], [ 4.416, 44.0183 ], [ 4.4159, 44.0183 ], [ 4.4159, 44.0183 ], [ 4.4158, 44.0183 ], [ 4.4155, 44.0184 ], [ 4.4152, 44.0186 ], [ 4.4146, 44.0187 ], [ 4.4145, 44.0188 ], [ 4.4144, 44.0188 ], [ 4.4138, 44.019 ], [ 4.4136, 44.0191 ], [ 4.4133, 44.0192 ], [ 4.4131, 44.0193 ], [ 4.4129, 44.0194 ], [ 4.4125, 44.0195 ], [ 4.4122, 44.0196 ], [ 4.4118, 44.0197 ], [ 4.4111, 44.02 ], [ 4.4113, 44.0204 ], [ 4.4115, 44.0208 ], [ 4.4117, 44.0212 ], [ 4.4122, 44.022 ], [ 4.4119, 44.0222 ], [ 4.4116, 44.0224 ], [ 4.4116, 44.0224 ], [ 4.4113, 44.0227 ], [ 4.4112, 44.0228 ], [ 4.411, 44.0229 ], [ 4.4108, 44.0233 ], [ 4.4108, 44.0234 ], [ 4.4107, 44.0239 ], [ 4.4107, 44.024 ], [ 4.4107, 44.0242 ], [ 4.4108, 44.0243 ], [ 4.4109, 44.0245 ], [ 4.4111, 44.0247 ], [ 4.4112, 44.0248 ], [ 4.4113, 44.0248 ], [ 4.412, 44.0251 ], [ 4.4121, 44.0252 ], [ 4.4122, 44.0252 ], [ 4.4123, 44.0253 ], [ 4.4126, 44.0253 ], [ 4.4126, 44.0254 ], [ 4.4126, 44.0254 ], [ 4.4126, 44.0254 ], [ 4.413, 44.0255 ], [ 4.4131, 44.0256 ], [ 4.4133, 44.0256 ], [ 4.4138, 44.0256 ], [ 4.4137, 44.0257 ], [ 4.4137, 44.0259 ], [ 4.4136, 44.0261 ], [ 4.4135, 44.0262 ], [ 4.4135, 44.0263 ], [ 4.4135, 44.0264 ], [ 4.4136, 44.0265 ], [ 4.4136, 44.0265 ], [ 4.4137, 44.0266 ], [ 4.4138, 44.0267 ], [ 4.4139, 44.0268 ], [ 4.4141, 44.0269 ], [ 4.4145, 44.027 ], [ 4.4144, 44.0271 ], [ 4.4145, 44.0272 ], [ 4.4147, 44.0274 ], [ 4.4149, 44.0276 ], [ 4.4151, 44.0278 ], [ 4.4157, 44.0287 ], [ 4.4158, 44.0288 ], [ 4.4159, 44.0288 ], [ 4.4161, 44.029 ], [ 4.4162, 44.0291 ], [ 4.4163, 44.0292 ], [ 4.417, 44.029 ], [ 4.4175, 44.0288 ], [ 4.4175, 44.0288 ], [ 4.4175, 44.0287 ], [ 4.4176, 44.0286 ], [ 4.4176, 44.0282 ], [ 4.4176, 44.0276 ], [ 4.4176, 44.0274 ], [ 4.4175, 44.0271 ], [ 4.4175, 44.027 ], [ 4.4175, 44.0268 ], [ 4.4174, 44.0267 ], [ 4.4173, 44.0263 ], [ 4.4173, 44.0262 ], [ 4.4173, 44.0261 ], [ 4.4172, 44.026 ], [ 4.4172, 44.0257 ], [ 4.4171, 44.0252 ], [ 4.4171, 44.0251 ], [ 4.417, 44.0249 ], [ 4.417, 44.0248 ], [ 4.4169, 44.0247 ], [ 4.4169, 44.0247 ], [ 4.4168, 44.0246 ], [ 4.4167, 44.0246 ], [ 4.4166, 44.0245 ], [ 4.4158, 44.0243 ], [ 4.4155, 44.024 ], [ 4.4153, 44.0239 ], [ 4.415, 44.0237 ], [ 4.4146, 44.0234 ], [ 4.4142, 44.0231 ], [ 4.4141, 44.023 ], [ 4.4147, 44.0215 ], [ 4.4149, 44.0211 ], [ 4.4152, 44.0202 ], [ 4.4155, 44.0194 ], [ 4.416, 44.0196 ], [ 4.4164, 44.0198 ], [ 4.4168, 44.0196 ], [ 4.4172, 44.0194 ], [ 4.4174, 44.0193 ], [ 4.4174, 44.0193 ], [ 4.4175, 44.0193 ], [ 4.4175, 44.0192 ], [ 4.4176, 44.0192 ], [ 4.4177, 44.0191 ], [ 4.4179, 44.0189 ], [ 4.4181, 44.0187 ], [ 4.4182, 44.0186 ] ] ], "type": "Polygon" }, "id": "95", "properties": { "code_commune": "30334", "code_departement": "30", "code_qp": "QP030018", "commune_qp": "Uzès", "nom_commune": "Uzès", "nom_qp": "Quartier Prioritaire D'Uzès" }, "type": "Feature" }, { "bbox": [ 2.1515, 43.9406, 2.1586, 43.9467 ], "geometry": { "coordinates": [ [ [ 2.1567, 43.9451 ], [ 2.1558, 43.9446 ], [ 2.1559, 43.9446 ], [ 2.1556, 43.9445 ], [ 2.1558, 43.9443 ], [ 2.1558, 43.9441 ], [ 2.1555, 43.9439 ], [ 2.156, 43.9436 ], [ 2.1562, 43.9436 ], [ 2.1564, 43.9437 ], [ 2.1565, 43.9438 ], [ 2.1566, 43.9438 ], [ 2.1567, 43.9438 ], [ 2.1569, 43.9438 ], [ 2.1571, 43.9439 ], [ 2.1573, 43.9439 ], [ 2.1575, 43.9438 ], [ 2.1576, 43.9438 ], [ 2.1579, 43.9438 ], [ 2.158, 43.9438 ], [ 2.1581, 43.9438 ], [ 2.1581, 43.9438 ], [ 2.1582, 43.9438 ], [ 2.1582, 43.9437 ], [ 2.1583, 43.9436 ], [ 2.1585, 43.9435 ], [ 2.1586, 43.9433 ], [ 2.1586, 43.9432 ], [ 2.1586, 43.9431 ], [ 2.1586, 43.943 ], [ 2.1586, 43.9428 ], [ 2.1586, 43.9426 ], [ 2.1585, 43.9422 ], [ 2.1584, 43.9419 ], [ 2.158, 43.9418 ], [ 2.1571, 43.9413 ], [ 2.157, 43.9413 ], [ 2.1569, 43.9413 ], [ 2.1569, 43.9413 ], [ 2.1565, 43.9411 ], [ 2.1564, 43.9411 ], [ 2.1563, 43.941 ], [ 2.1564, 43.941 ], [ 2.1562, 43.9409 ], [ 2.156, 43.9412 ], [ 2.1558, 43.9411 ], [ 2.1557, 43.9411 ], [ 2.1557, 43.9411 ], [ 2.1556, 43.9409 ], [ 2.1555, 43.9406 ], [ 2.1554, 43.9406 ], [ 2.1554, 43.9407 ], [ 2.1552, 43.9407 ], [ 2.1551, 43.9407 ], [ 2.155, 43.9407 ], [ 2.1542, 43.9407 ], [ 2.1542, 43.941 ], [ 2.1539, 43.941 ], [ 2.1537, 43.941 ], [ 2.1535, 43.941 ], [ 2.1533, 43.9411 ], [ 2.1532, 43.9412 ], [ 2.1531, 43.9413 ], [ 2.153, 43.9414 ], [ 2.1529, 43.9415 ], [ 2.1529, 43.9416 ], [ 2.1529, 43.9417 ], [ 2.1529, 43.9417 ], [ 2.1529, 43.9418 ], [ 2.1526, 43.942 ], [ 2.1523, 43.9423 ], [ 2.1521, 43.9423 ], [ 2.1521, 43.9424 ], [ 2.1519, 43.9424 ], [ 2.1518, 43.9425 ], [ 2.1517, 43.9425 ], [ 2.1515, 43.9425 ], [ 2.1517, 43.943 ], [ 2.1517, 43.9431 ], [ 2.1519, 43.9431 ], [ 2.153, 43.943 ], [ 2.1532, 43.943 ], [ 2.154, 43.9434 ], [ 2.1541, 43.9434 ], [ 2.1543, 43.9435 ], [ 2.154, 43.9438 ], [ 2.1543, 43.9439 ], [ 2.1541, 43.944 ], [ 2.154, 43.9441 ], [ 2.1539, 43.9442 ], [ 2.1538, 43.9444 ], [ 2.1538, 43.9445 ], [ 2.1537, 43.9446 ], [ 2.1537, 43.9447 ], [ 2.1536, 43.9448 ], [ 2.1536, 43.9452 ], [ 2.1535, 43.9455 ], [ 2.1535, 43.9456 ], [ 2.1535, 43.9457 ], [ 2.1536, 43.9458 ], [ 2.1536, 43.9459 ], [ 2.1537, 43.9461 ], [ 2.1538, 43.9462 ], [ 2.1539, 43.9463 ], [ 2.1541, 43.9463 ], [ 2.1546, 43.9466 ], [ 2.1549, 43.9467 ], [ 2.1552, 43.9464 ], [ 2.1553, 43.9464 ], [ 2.1554, 43.9465 ], [ 2.1554, 43.9462 ], [ 2.1556, 43.9462 ], [ 2.1556, 43.9462 ], [ 2.1557, 43.9462 ], [ 2.1558, 43.9462 ], [ 2.1559, 43.9462 ], [ 2.1559, 43.9461 ], [ 2.1562, 43.9458 ], [ 2.1564, 43.9458 ], [ 2.1565, 43.9456 ], [ 2.1563, 43.9456 ], [ 2.1564, 43.9455 ], [ 2.1565, 43.9453 ], [ 2.1567, 43.9451 ] ] ], "type": "Polygon" }, "id": "96", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081006", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Cantepau" }, "type": "Feature" }, { "bbox": [ 2.2488, 43.6026, 2.2616, 43.6152 ], "geometry": { "coordinates": [ [ [ 2.255, 43.6138 ], [ 2.2548, 43.6142 ], [ 2.2547, 43.6144 ], [ 2.2546, 43.6145 ], [ 2.2544, 43.6147 ], [ 2.2543, 43.6148 ], [ 2.254, 43.615 ], [ 2.2543, 43.6152 ], [ 2.2545, 43.6151 ], [ 2.2549, 43.6149 ], [ 2.2552, 43.6148 ], [ 2.2551, 43.6145 ], [ 2.2558, 43.6144 ], [ 2.2562, 43.6135 ], [ 2.2563, 43.6135 ], [ 2.2565, 43.6133 ], [ 2.2562, 43.6132 ], [ 2.2563, 43.6131 ], [ 2.2562, 43.6131 ], [ 2.2563, 43.6129 ], [ 2.2566, 43.6129 ], [ 2.2567, 43.6129 ], [ 2.2568, 43.6129 ], [ 2.2569, 43.6129 ], [ 2.257, 43.6129 ], [ 2.257, 43.6128 ], [ 2.2571, 43.6128 ], [ 2.2571, 43.6127 ], [ 2.2571, 43.6127 ], [ 2.2572, 43.6125 ], [ 2.2573, 43.6124 ], [ 2.2574, 43.6123 ], [ 2.2575, 43.6122 ], [ 2.2577, 43.6121 ], [ 2.2579, 43.612 ], [ 2.2579, 43.6119 ], [ 2.2579, 43.6118 ], [ 2.258, 43.6107 ], [ 2.258, 43.6104 ], [ 2.258, 43.6103 ], [ 2.2579, 43.6103 ], [ 2.2567, 43.6103 ], [ 2.2567, 43.6103 ], [ 2.2565, 43.6103 ], [ 2.2564, 43.6103 ], [ 2.2563, 43.6102 ], [ 2.2562, 43.6102 ], [ 2.256, 43.6102 ], [ 2.2559, 43.6102 ], [ 2.256, 43.6097 ], [ 2.2561, 43.6089 ], [ 2.2561, 43.6089 ], [ 2.2564, 43.6088 ], [ 2.2565, 43.6088 ], [ 2.2564, 43.6087 ], [ 2.2564, 43.6086 ], [ 2.2565, 43.6086 ], [ 2.2565, 43.6085 ], [ 2.2568, 43.6084 ], [ 2.2569, 43.6084 ], [ 2.257, 43.6084 ], [ 2.2571, 43.6085 ], [ 2.2573, 43.6085 ], [ 2.2574, 43.6085 ], [ 2.2576, 43.6085 ], [ 2.2577, 43.6085 ], [ 2.2579, 43.6084 ], [ 2.258, 43.6081 ], [ 2.258, 43.6079 ], [ 2.2579, 43.6078 ], [ 2.2577, 43.6077 ], [ 2.2576, 43.6076 ], [ 2.2576, 43.6075 ], [ 2.2576, 43.6075 ], [ 2.2576, 43.6074 ], [ 2.2586, 43.6068 ], [ 2.2601, 43.606 ], [ 2.2605, 43.6058 ], [ 2.2611, 43.6054 ], [ 2.2613, 43.6052 ], [ 2.2614, 43.6052 ], [ 2.2615, 43.6051 ], [ 2.2616, 43.605 ], [ 2.2616, 43.6049 ], [ 2.2615, 43.6049 ], [ 2.2613, 43.6047 ], [ 2.2611, 43.6044 ], [ 2.2603, 43.6035 ], [ 2.2595, 43.6026 ], [ 2.259, 43.6029 ], [ 2.2583, 43.6032 ], [ 2.2589, 43.6038 ], [ 2.258, 43.6044 ], [ 2.2582, 43.6045 ], [ 2.257, 43.6049 ], [ 2.2556, 43.6053 ], [ 2.2558, 43.6058 ], [ 2.256, 43.6063 ], [ 2.2561, 43.6063 ], [ 2.2547, 43.6067 ], [ 2.254, 43.6061 ], [ 2.2537, 43.6063 ], [ 2.252, 43.6073 ], [ 2.2523, 43.6073 ], [ 2.2528, 43.6075 ], [ 2.2552, 43.608 ], [ 2.2551, 43.6082 ], [ 2.2551, 43.6082 ], [ 2.2551, 43.6082 ], [ 2.2554, 43.6084 ], [ 2.2554, 43.6086 ], [ 2.2553, 43.6086 ], [ 2.2549, 43.6087 ], [ 2.2547, 43.6087 ], [ 2.2545, 43.6087 ], [ 2.2539, 43.6087 ], [ 2.2538, 43.6096 ], [ 2.2538, 43.6098 ], [ 2.2531, 43.6096 ], [ 2.2529, 43.6098 ], [ 2.2512, 43.6096 ], [ 2.2515, 43.6099 ], [ 2.2505, 43.6104 ], [ 2.251, 43.611 ], [ 2.2525, 43.6102 ], [ 2.2526, 43.6101 ], [ 2.2529, 43.6099 ], [ 2.253, 43.6099 ], [ 2.2534, 43.6103 ], [ 2.2538, 43.6103 ], [ 2.2538, 43.6105 ], [ 2.2538, 43.6107 ], [ 2.2538, 43.6109 ], [ 2.2536, 43.611 ], [ 2.2524, 43.6116 ], [ 2.2536, 43.6119 ], [ 2.2536, 43.6119 ], [ 2.2534, 43.6123 ], [ 2.2535, 43.6123 ], [ 2.2533, 43.6127 ], [ 2.2533, 43.6128 ], [ 2.2522, 43.6131 ], [ 2.2523, 43.6134 ], [ 2.2517, 43.6135 ], [ 2.2513, 43.6136 ], [ 2.2513, 43.6137 ], [ 2.2514, 43.6138 ], [ 2.2504, 43.6141 ], [ 2.2502, 43.6139 ], [ 2.2502, 43.614 ], [ 2.2498, 43.6141 ], [ 2.2495, 43.6136 ], [ 2.2488, 43.6138 ], [ 2.2491, 43.6143 ], [ 2.2492, 43.6145 ], [ 2.2492, 43.6146 ], [ 2.2492, 43.6147 ], [ 2.2493, 43.6147 ], [ 2.2495, 43.6148 ], [ 2.2495, 43.6148 ], [ 2.2498, 43.6147 ], [ 2.2499, 43.6147 ], [ 2.2502, 43.6145 ], [ 2.2508, 43.6144 ], [ 2.2516, 43.6141 ], [ 2.2524, 43.6138 ], [ 2.2528, 43.6137 ], [ 2.2531, 43.6136 ], [ 2.2534, 43.6135 ], [ 2.2536, 43.6135 ], [ 2.2537, 43.6135 ], [ 2.255, 43.6138 ] ] ], "type": "Polygon" }, "id": "97", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081004", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Aillot Bisséous Lardaillé" }, "type": "Feature" }, { "bbox": [ 1.4126, 43.5904, 1.4202, 43.595 ], "geometry": { "coordinates": [ [ [ 1.4184, 43.591 ], [ 1.4183, 43.5909 ], [ 1.4177, 43.5907 ], [ 1.4174, 43.5906 ], [ 1.4169, 43.5904 ], [ 1.4164, 43.5915 ], [ 1.4169, 43.5916 ], [ 1.4165, 43.5922 ], [ 1.4165, 43.5922 ], [ 1.416, 43.5931 ], [ 1.4159, 43.5931 ], [ 1.415, 43.593 ], [ 1.4151, 43.5927 ], [ 1.4153, 43.5924 ], [ 1.4151, 43.5923 ], [ 1.4142, 43.5921 ], [ 1.4141, 43.5929 ], [ 1.4141, 43.593 ], [ 1.414, 43.593 ], [ 1.414, 43.5934 ], [ 1.4135, 43.5933 ], [ 1.4131, 43.5933 ], [ 1.4128, 43.5939 ], [ 1.4128, 43.5939 ], [ 1.4126, 43.5944 ], [ 1.4128, 43.5945 ], [ 1.4129, 43.5945 ], [ 1.4153, 43.5949 ], [ 1.4153, 43.5949 ], [ 1.4155, 43.5949 ], [ 1.4155, 43.5949 ], [ 1.4156, 43.5949 ], [ 1.4158, 43.5941 ], [ 1.4163, 43.5942 ], [ 1.4163, 43.5943 ], [ 1.4178, 43.5944 ], [ 1.4179, 43.5941 ], [ 1.4192, 43.5942 ], [ 1.4193, 43.5949 ], [ 1.4199, 43.595 ], [ 1.4199, 43.5948 ], [ 1.42, 43.5948 ], [ 1.4202, 43.594 ], [ 1.4202, 43.594 ], [ 1.4196, 43.5941 ], [ 1.4199, 43.5932 ], [ 1.4197, 43.5931 ], [ 1.4197, 43.5931 ], [ 1.4195, 43.593 ], [ 1.4196, 43.593 ], [ 1.4196, 43.5929 ], [ 1.4194, 43.5928 ], [ 1.4194, 43.5928 ], [ 1.4193, 43.5927 ], [ 1.4193, 43.5927 ], [ 1.4189, 43.5927 ], [ 1.4188, 43.5927 ], [ 1.4187, 43.5927 ], [ 1.4187, 43.5927 ], [ 1.4178, 43.5929 ], [ 1.4175, 43.5928 ], [ 1.4176, 43.5925 ], [ 1.4176, 43.5924 ], [ 1.4175, 43.5924 ], [ 1.4176, 43.5922 ], [ 1.4177, 43.5915 ], [ 1.4178, 43.5915 ], [ 1.4185, 43.5914 ], [ 1.4185, 43.5911 ], [ 1.4184, 43.591 ] ] ], "type": "Polygon" }, "id": "98", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031008", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Arènes" }, "type": "Feature" }, { "bbox": [ 2.3607, 43.502, 2.3691, 43.5087 ], "geometry": { "coordinates": [ [ [ 2.3622, 43.5087 ], [ 2.3624, 43.5085 ], [ 2.3627, 43.5087 ], [ 2.3634, 43.508 ], [ 2.3639, 43.5075 ], [ 2.364, 43.5073 ], [ 2.3643, 43.507 ], [ 2.3643, 43.5069 ], [ 2.3646, 43.5068 ], [ 2.3647, 43.5069 ], [ 2.3653, 43.5069 ], [ 2.3668, 43.5069 ], [ 2.3668, 43.5072 ], [ 2.3668, 43.5083 ], [ 2.3673, 43.5083 ], [ 2.3673, 43.508 ], [ 2.3672, 43.508 ], [ 2.3673, 43.5069 ], [ 2.3675, 43.507 ], [ 2.3676, 43.507 ], [ 2.3677, 43.5064 ], [ 2.3677, 43.5059 ], [ 2.3669, 43.5059 ], [ 2.3669, 43.5054 ], [ 2.3669, 43.5054 ], [ 2.3669, 43.5053 ], [ 2.367, 43.5052 ], [ 2.3671, 43.5048 ], [ 2.3672, 43.5042 ], [ 2.3673, 43.5041 ], [ 2.3673, 43.5041 ], [ 2.3674, 43.504 ], [ 2.3676, 43.504 ], [ 2.3677, 43.5041 ], [ 2.3678, 43.5044 ], [ 2.3679, 43.5045 ], [ 2.3681, 43.5045 ], [ 2.3682, 43.5044 ], [ 2.3682, 43.5044 ], [ 2.3681, 43.5043 ], [ 2.3681, 43.5042 ], [ 2.3681, 43.5042 ], [ 2.3681, 43.504 ], [ 2.3682, 43.5039 ], [ 2.3683, 43.5038 ], [ 2.3684, 43.5037 ], [ 2.3683, 43.5037 ], [ 2.3681, 43.5036 ], [ 2.3686, 43.5032 ], [ 2.3691, 43.5028 ], [ 2.3686, 43.502 ], [ 2.3673, 43.5035 ], [ 2.3672, 43.5036 ], [ 2.3669, 43.5039 ], [ 2.3668, 43.5042 ], [ 2.3667, 43.5045 ], [ 2.3667, 43.5044 ], [ 2.3665, 43.5043 ], [ 2.3663, 43.5044 ], [ 2.366, 43.5042 ], [ 2.366, 43.5042 ], [ 2.3662, 43.5039 ], [ 2.3668, 43.5034 ], [ 2.3668, 43.5033 ], [ 2.3666, 43.5031 ], [ 2.3665, 43.5031 ], [ 2.3662, 43.5031 ], [ 2.3647, 43.5033 ], [ 2.3647, 43.5033 ], [ 2.3639, 43.5035 ], [ 2.3637, 43.5036 ], [ 2.3637, 43.5036 ], [ 2.3636, 43.5034 ], [ 2.3634, 43.5034 ], [ 2.3634, 43.5034 ], [ 2.3631, 43.5034 ], [ 2.363, 43.5033 ], [ 2.3629, 43.5034 ], [ 2.3626, 43.5035 ], [ 2.3626, 43.5034 ], [ 2.3625, 43.5034 ], [ 2.3624, 43.5034 ], [ 2.3622, 43.5033 ], [ 2.3608, 43.5042 ], [ 2.361, 43.5045 ], [ 2.363, 43.5051 ], [ 2.3632, 43.5048 ], [ 2.3635, 43.5048 ], [ 2.3636, 43.5048 ], [ 2.3638, 43.5053 ], [ 2.3639, 43.5055 ], [ 2.3632, 43.5056 ], [ 2.3623, 43.506 ], [ 2.3623, 43.506 ], [ 2.3623, 43.506 ], [ 2.3623, 43.5061 ], [ 2.3624, 43.5064 ], [ 2.3613, 43.5066 ], [ 2.3613, 43.5066 ], [ 2.3611, 43.5067 ], [ 2.3611, 43.5068 ], [ 2.3613, 43.507 ], [ 2.3607, 43.5077 ], [ 2.3611, 43.5079 ], [ 2.3618, 43.5082 ], [ 2.3617, 43.5084 ], [ 2.3622, 43.5087 ] ] ], "type": "Polygon" }, "id": "99", "properties": { "code_commune": "81021", "code_departement": "81", "code_qp": "QP081001", "commune_qp": "Aussillon", "nom_commune": "Aussillon", "nom_qp": "La Falgalarié" }, "type": "Feature" }, { "bbox": [ 0.0774, 43.2212, 0.0918, 43.2328 ], "geometry": { "coordinates": [ [ [ 0.0818, 43.2324 ], [ 0.0818, 43.2323 ], [ 0.0816, 43.2321 ], [ 0.0816, 43.2319 ], [ 0.0816, 43.2318 ], [ 0.0822, 43.2317 ], [ 0.0822, 43.2316 ], [ 0.0823, 43.2314 ], [ 0.0825, 43.2315 ], [ 0.0826, 43.2315 ], [ 0.083, 43.2306 ], [ 0.0828, 43.2305 ], [ 0.083, 43.23 ], [ 0.0834, 43.2301 ], [ 0.0843, 43.2304 ], [ 0.0847, 43.2305 ], [ 0.085, 43.2306 ], [ 0.0852, 43.2306 ], [ 0.0868, 43.231 ], [ 0.087, 43.2313 ], [ 0.0873, 43.2316 ], [ 0.0874, 43.2319 ], [ 0.0874, 43.232 ], [ 0.0875, 43.2322 ], [ 0.0904, 43.2328 ], [ 0.0905, 43.2328 ], [ 0.0906, 43.2327 ], [ 0.0908, 43.2322 ], [ 0.0912, 43.2317 ], [ 0.0915, 43.2311 ], [ 0.0894, 43.2309 ], [ 0.0895, 43.2307 ], [ 0.0892, 43.2307 ], [ 0.0892, 43.2309 ], [ 0.0876, 43.2306 ], [ 0.0878, 43.2298 ], [ 0.088, 43.2295 ], [ 0.088, 43.2293 ], [ 0.088, 43.2292 ], [ 0.0881, 43.2287 ], [ 0.0883, 43.2285 ], [ 0.0885, 43.2284 ], [ 0.0886, 43.2283 ], [ 0.0888, 43.228 ], [ 0.0892, 43.2273 ], [ 0.0895, 43.2268 ], [ 0.0897, 43.2263 ], [ 0.0898, 43.2261 ], [ 0.0898, 43.226 ], [ 0.09, 43.2255 ], [ 0.0901, 43.2253 ], [ 0.0903, 43.2251 ], [ 0.0904, 43.2248 ], [ 0.0905, 43.2245 ], [ 0.0906, 43.2243 ], [ 0.0906, 43.2243 ], [ 0.0908, 43.2239 ], [ 0.0908, 43.2239 ], [ 0.0909, 43.2238 ], [ 0.0909, 43.2238 ], [ 0.0909, 43.2237 ], [ 0.091, 43.2236 ], [ 0.0911, 43.2236 ], [ 0.0911, 43.2234 ], [ 0.0912, 43.2231 ], [ 0.0911, 43.223 ], [ 0.0911, 43.223 ], [ 0.091, 43.2229 ], [ 0.091, 43.2228 ], [ 0.0911, 43.2227 ], [ 0.0911, 43.2227 ], [ 0.0912, 43.2227 ], [ 0.0914, 43.2226 ], [ 0.0915, 43.2224 ], [ 0.0917, 43.2219 ], [ 0.0918, 43.2216 ], [ 0.0918, 43.2214 ], [ 0.0918, 43.2212 ], [ 0.0915, 43.2213 ], [ 0.0915, 43.2213 ], [ 0.091, 43.2214 ], [ 0.091, 43.2215 ], [ 0.0909, 43.2217 ], [ 0.0907, 43.2223 ], [ 0.0905, 43.2227 ], [ 0.0905, 43.2228 ], [ 0.0904, 43.2233 ], [ 0.0902, 43.2235 ], [ 0.0902, 43.2235 ], [ 0.0902, 43.2235 ], [ 0.09, 43.2239 ], [ 0.0897, 43.2245 ], [ 0.0897, 43.2245 ], [ 0.0894, 43.2251 ], [ 0.0891, 43.2257 ], [ 0.0889, 43.2264 ], [ 0.0888, 43.2267 ], [ 0.0884, 43.2267 ], [ 0.088, 43.2266 ], [ 0.0879, 43.2272 ], [ 0.0879, 43.2275 ], [ 0.0879, 43.2275 ], [ 0.0875, 43.2276 ], [ 0.0872, 43.2276 ], [ 0.0872, 43.2277 ], [ 0.0869, 43.2279 ], [ 0.0868, 43.2281 ], [ 0.0867, 43.2281 ], [ 0.0866, 43.2281 ], [ 0.0851, 43.228 ], [ 0.0844, 43.2283 ], [ 0.0841, 43.2279 ], [ 0.084, 43.2279 ], [ 0.0835, 43.2278 ], [ 0.083, 43.2288 ], [ 0.0827, 43.2288 ], [ 0.0821, 43.2289 ], [ 0.0811, 43.2289 ], [ 0.0804, 43.2289 ], [ 0.0804, 43.2279 ], [ 0.0804, 43.2279 ], [ 0.0804, 43.2276 ], [ 0.0803, 43.2276 ], [ 0.0799, 43.2276 ], [ 0.0799, 43.2275 ], [ 0.0799, 43.2274 ], [ 0.0799, 43.227 ], [ 0.0799, 43.2264 ], [ 0.0799, 43.2262 ], [ 0.0799, 43.2258 ], [ 0.0798, 43.2256 ], [ 0.0798, 43.2255 ], [ 0.0797, 43.2255 ], [ 0.0797, 43.2254 ], [ 0.0798, 43.2253 ], [ 0.0799, 43.2253 ], [ 0.08, 43.2253 ], [ 0.0802, 43.2251 ], [ 0.0804, 43.2249 ], [ 0.0809, 43.2244 ], [ 0.0811, 43.2242 ], [ 0.0812, 43.2243 ], [ 0.0813, 43.2242 ], [ 0.0813, 43.224 ], [ 0.0815, 43.2239 ], [ 0.0816, 43.2238 ], [ 0.0814, 43.2237 ], [ 0.0815, 43.2235 ], [ 0.0813, 43.2234 ], [ 0.0811, 43.2234 ], [ 0.0811, 43.2232 ], [ 0.0812, 43.223 ], [ 0.0812, 43.2229 ], [ 0.0802, 43.2227 ], [ 0.0797, 43.2229 ], [ 0.0796, 43.223 ], [ 0.0795, 43.223 ], [ 0.0794, 43.2231 ], [ 0.0792, 43.2236 ], [ 0.0789, 43.2235 ], [ 0.0786, 43.2236 ], [ 0.0782, 43.2235 ], [ 0.0781, 43.2239 ], [ 0.0782, 43.2239 ], [ 0.078, 43.2243 ], [ 0.078, 43.2244 ], [ 0.078, 43.2244 ], [ 0.078, 43.2246 ], [ 0.0779, 43.2246 ], [ 0.078, 43.2246 ], [ 0.078, 43.2247 ], [ 0.0782, 43.2247 ], [ 0.0782, 43.2249 ], [ 0.0784, 43.2249 ], [ 0.0786, 43.2249 ], [ 0.0784, 43.2252 ], [ 0.0784, 43.2252 ], [ 0.0784, 43.2253 ], [ 0.0783, 43.2254 ], [ 0.0779, 43.2257 ], [ 0.0777, 43.2259 ], [ 0.0776, 43.2263 ], [ 0.0778, 43.2263 ], [ 0.0776, 43.227 ], [ 0.0775, 43.2278 ], [ 0.0775, 43.2278 ], [ 0.0774, 43.2284 ], [ 0.0775, 43.2284 ], [ 0.0779, 43.2284 ], [ 0.0784, 43.2285 ], [ 0.0785, 43.2285 ], [ 0.0793, 43.2289 ], [ 0.0795, 43.2289 ], [ 0.0794, 43.2291 ], [ 0.0793, 43.2293 ], [ 0.0788, 43.2302 ], [ 0.0795, 43.2303 ], [ 0.0806, 43.2305 ], [ 0.0818, 43.2307 ], [ 0.0816, 43.2308 ], [ 0.0815, 43.2309 ], [ 0.0811, 43.2311 ], [ 0.0811, 43.2311 ], [ 0.081, 43.2311 ], [ 0.0809, 43.2311 ], [ 0.0808, 43.2318 ], [ 0.0807, 43.2318 ], [ 0.0797, 43.2319 ], [ 0.0798, 43.2326 ], [ 0.0807, 43.2325 ], [ 0.0813, 43.2325 ], [ 0.0817, 43.2324 ], [ 0.0818, 43.2324 ] ] ], "type": "Polygon" }, "id": "100", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065003", "commune_qp": "Tarbes", "nom_commune": "Séméac, Tarbes", "nom_qp": "Tarbes Est" }, "type": "Feature" }, { "bbox": [ 1.3353, 43.5363, 1.3406, 43.5391 ], "geometry": { "coordinates": [ [ [ 1.3353, 43.5369 ], [ 1.3354, 43.537 ], [ 1.3363, 43.5379 ], [ 1.3361, 43.538 ], [ 1.336, 43.5381 ], [ 1.3365, 43.5386 ], [ 1.3366, 43.5387 ], [ 1.3367, 43.5388 ], [ 1.3371, 43.5391 ], [ 1.3374, 43.5391 ], [ 1.3374, 43.5391 ], [ 1.3376, 43.5391 ], [ 1.3376, 43.5391 ], [ 1.3376, 43.539 ], [ 1.3381, 43.5391 ], [ 1.3383, 43.5391 ], [ 1.3387, 43.5389 ], [ 1.3386, 43.5388 ], [ 1.3388, 43.5388 ], [ 1.3391, 43.5386 ], [ 1.3392, 43.5388 ], [ 1.3394, 43.5388 ], [ 1.3395, 43.5388 ], [ 1.3397, 43.5387 ], [ 1.34, 43.5385 ], [ 1.3403, 43.5384 ], [ 1.3406, 43.5382 ], [ 1.3403, 43.5381 ], [ 1.3391, 43.5375 ], [ 1.3366, 43.5363 ], [ 1.3355, 43.5369 ], [ 1.3354, 43.5369 ], [ 1.3353, 43.5369 ] ] ], "type": "Polygon" }, "id": "101", "properties": { "code_commune": "31157", "code_departement": "31", "code_qp": "QP031017", "commune_qp": "Cugnaux", "nom_commune": "Cugnaux", "nom_qp": "Vivier Maçon" }, "type": "Feature" }, { "bbox": [ 1.3134, 43.6043, 1.3237, 43.6067 ], "geometry": { "coordinates": [ [ [ 1.3236, 43.6052 ], [ 1.3233, 43.6051 ], [ 1.3231, 43.6051 ], [ 1.3226, 43.6051 ], [ 1.3214, 43.605 ], [ 1.3196, 43.6048 ], [ 1.3174, 43.6046 ], [ 1.3162, 43.6045 ], [ 1.3153, 43.6045 ], [ 1.3134, 43.6043 ], [ 1.3137, 43.6046 ], [ 1.314, 43.605 ], [ 1.3147, 43.6047 ], [ 1.3149, 43.6047 ], [ 1.315, 43.6047 ], [ 1.3151, 43.6047 ], [ 1.3154, 43.6047 ], [ 1.3156, 43.605 ], [ 1.3162, 43.6048 ], [ 1.3162, 43.605 ], [ 1.3161, 43.6057 ], [ 1.3161, 43.6059 ], [ 1.3161, 43.6061 ], [ 1.3162, 43.6062 ], [ 1.3168, 43.6063 ], [ 1.3195, 43.6065 ], [ 1.3212, 43.6066 ], [ 1.322, 43.6067 ], [ 1.3224, 43.6067 ], [ 1.3233, 43.6067 ], [ 1.3234, 43.6067 ], [ 1.3235, 43.6067 ], [ 1.3235, 43.6066 ], [ 1.3235, 43.6065 ], [ 1.3235, 43.6062 ], [ 1.3236, 43.6058 ], [ 1.3236, 43.6056 ], [ 1.3237, 43.6054 ], [ 1.3236, 43.6052 ] ] ], "type": "Polygon" }, "id": "102", "properties": { "code_commune": "31149", "code_departement": "31", "code_qp": "QP031016", "commune_qp": "Colomiers", "nom_commune": "Colomiers", "nom_qp": "En Jacca" }, "type": "Feature" }, { "bbox": [ 1.4387, 43.6182, 1.446, 43.6219 ], "geometry": { "coordinates": [ [ [ 1.4416, 43.6184 ], [ 1.4409, 43.6185 ], [ 1.441, 43.6196 ], [ 1.4411, 43.62 ], [ 1.4411, 43.6201 ], [ 1.4401, 43.6205 ], [ 1.4399, 43.62 ], [ 1.4394, 43.6201 ], [ 1.4394, 43.62 ], [ 1.4387, 43.6201 ], [ 1.4388, 43.6204 ], [ 1.4388, 43.6204 ], [ 1.439, 43.621 ], [ 1.4397, 43.6208 ], [ 1.4397, 43.6208 ], [ 1.4401, 43.6219 ], [ 1.4406, 43.6217 ], [ 1.4401, 43.6206 ], [ 1.4412, 43.6202 ], [ 1.4413, 43.6201 ], [ 1.4421, 43.62 ], [ 1.4437, 43.6195 ], [ 1.446, 43.6188 ], [ 1.446, 43.6188 ], [ 1.4458, 43.6187 ], [ 1.4456, 43.6187 ], [ 1.4453, 43.6186 ], [ 1.4451, 43.6185 ], [ 1.4447, 43.6184 ], [ 1.4447, 43.6184 ], [ 1.4428, 43.6188 ], [ 1.4427, 43.6186 ], [ 1.4425, 43.6182 ], [ 1.4423, 43.6182 ], [ 1.4416, 43.6184 ] ] ], "type": "Polygon" }, "id": "103", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031018", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Négreneys" }, "type": "Feature" }, { "bbox": [ 1.4672, 43.607, 1.4729, 43.6102 ], "geometry": { "coordinates": [ [ [ 1.4729, 43.6074 ], [ 1.4727, 43.6073 ], [ 1.4727, 43.6073 ], [ 1.4724, 43.6071 ], [ 1.4722, 43.607 ], [ 1.4712, 43.6072 ], [ 1.471, 43.6073 ], [ 1.4706, 43.6073 ], [ 1.4692, 43.6073 ], [ 1.4681, 43.6072 ], [ 1.4672, 43.6072 ], [ 1.4675, 43.6073 ], [ 1.4676, 43.6074 ], [ 1.4679, 43.6076 ], [ 1.4681, 43.6077 ], [ 1.4686, 43.6079 ], [ 1.4698, 43.6086 ], [ 1.4686, 43.6096 ], [ 1.4694, 43.6102 ], [ 1.4701, 43.6096 ], [ 1.4724, 43.6079 ], [ 1.4725, 43.6078 ], [ 1.4728, 43.6076 ], [ 1.4729, 43.6074 ] ] ], "type": "Polygon" }, "id": "104", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031019", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "La Gloire" }, "type": "Feature" } ], "type": "FeatureCollection" }, "hovertemplate": "%{hovertext}

Quartier Prioritaire=%{location}
Taux d'Activité des Femmes=%{customdata[0]}
Taux Total en Emploi Précaire=%{customdata[1]}
Taux d'Activité des Etrangers=%{z}", "hovertext": [ "Laden Petit Train", "Lameilhé", "Aillot Bisséous Lardaillé", "Centre Ville" ], "locations": [ "Laden Petit Train", "Lameilhé", "Aillot Bisséous Lardaillé", "Centre Ville" ], "name": "", "subplot": "mapbox", "type": "choroplethmapbox", "z": [ 35.9, 33.1, null, null ] } ], "layout": { "autosize": true, "coloraxis": { "colorbar": { "title": { "text": "Taux d'Activité des Etrangers" } }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ] }, "legend": { "tracegroupgap": 0 }, "mapbox": { "center": { "lat": 43.607, "lon": 2.24 }, "domain": { "x": [ 0, 1 ], "y": [ 0, 1 ] }, "style": "carto-positron", "zoom": 11.5 }, "margin": { "b": 0, "l": 0, "r": 0, "t": 25 }, "template": { "data": { "bar": [ { "error_x": { "color": "#2a3f5f" }, "error_y": { "color": "#2a3f5f" }, "marker": { "line": { "color": "#E5ECF6", "width": 0.5 }, "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "bar" } ], "barpolar": [ { "marker": { "line": { "color": "#E5ECF6", "width": 0.5 }, "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "barpolar" } ], "carpet": [ { "aaxis": { "endlinecolor": "#2a3f5f", "gridcolor": "white", "linecolor": "white", "minorgridcolor": "white", "startlinecolor": "#2a3f5f" }, "baxis": { "endlinecolor": "#2a3f5f", "gridcolor": "white", "linecolor": "white", "minorgridcolor": "white", "startlinecolor": "#2a3f5f" }, "type": "carpet" } ], "choropleth": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "choropleth" } ], "contour": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "contour" } ], "contourcarpet": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "contourcarpet" } ], "heatmap": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "heatmap" } ], "heatmapgl": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "heatmapgl" } ], "histogram": [ { "marker": { "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "histogram" } ], "histogram2d": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "histogram2d" } ], "histogram2dcontour": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "histogram2dcontour" } ], "mesh3d": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "mesh3d" } ], "parcoords": [ { "line": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "parcoords" } ], "pie": [ { "automargin": true, "type": "pie" } ], "scatter": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatter" } ], "scatter3d": [ { "line": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatter3d" } ], "scattercarpet": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattercarpet" } ], "scattergeo": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattergeo" } ], "scattergl": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattergl" } ], "scattermapbox": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattermapbox" } ], "scatterpolar": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterpolar" } ], "scatterpolargl": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterpolargl" } ], "scatterternary": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterternary" } ], "surface": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "surface" } ], "table": [ { "cells": { "fill": { "color": "#EBF0F8" }, "line": { "color": "white" } }, "header": { "fill": { "color": "#C8D4E3" }, "line": { "color": "white" } }, "type": "table" } ] }, "layout": { "annotationdefaults": { "arrowcolor": "#2a3f5f", "arrowhead": 0, "arrowwidth": 1 }, "autotypenumbers": "strict", "coloraxis": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "colorscale": { "diverging": [ [ 0, "#8e0152" ], [ 0.1, "#c51b7d" ], [ 0.2, "#de77ae" ], [ 0.3, "#f1b6da" ], [ 0.4, "#fde0ef" ], [ 0.5, "#f7f7f7" ], [ 0.6, "#e6f5d0" ], [ 0.7, "#b8e186" ], [ 0.8, "#7fbc41" ], [ 0.9, "#4d9221" ], [ 1, "#276419" ] ], "sequential": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "sequentialminus": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ] }, "colorway": [ "#636efa", "#EF553B", "#00cc96", "#ab63fa", "#FFA15A", "#19d3f3", "#FF6692", "#B6E880", "#FF97FF", "#FECB52" ], "font": { "color": "#2a3f5f" }, "geo": { "bgcolor": "white", "lakecolor": "white", "landcolor": "#E5ECF6", "showlakes": true, "showland": true, "subunitcolor": "white" }, "hoverlabel": { "align": "left" }, "hovermode": "closest", "mapbox": { "style": "light" }, "paper_bgcolor": "white", "plot_bgcolor": "#E5ECF6", "polar": { "angularaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "bgcolor": "#E5ECF6", "radialaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" } }, "scene": { "xaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" }, "yaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" }, "zaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" } }, "shapedefaults": { "line": { "color": "#2a3f5f" } }, "ternary": { "aaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "baxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "bgcolor": "#E5ECF6", "caxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" } }, "title": { "x": 0.05 }, "xaxis": { "automargin": true, "gridcolor": "white", "linecolor": "white", "ticks": "", "title": { "standoff": 15 }, "zerolinecolor": "white", "zerolinewidth": 2 }, "yaxis": { "automargin": true, "gridcolor": "white", "linecolor": "white", "ticks": "", "title": { "standoff": 15 }, "zerolinecolor": "white", "zerolinewidth": 2 } } } } }, "image/png": "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", "text/html": [ "
" ] }, "metadata": {}, "output_type": "display_data" } ], "source": [ "tieks(df_castres, latitude=43.607, longitude=2.24, colored_var=\"tx_et_empl\")\n" ] }, { "cell_type": "markdown", "id": "cb523237", "metadata": {}, "source": [ "INPUT FUNCTION¶\n" ] }, { "cell_type": "code", "execution_count": 20, "id": "c7342dfc", "metadata": {}, "outputs": [ { "name": "stdin", "output_type": "stream", "text": [ "Quelle ville vous intéresse ? (Toulouse ou Castres) : Toulouse\n" ] }, { "data": { "application/vnd.plotly.v1+json": { "config": { "plotlyServerURL": "https://plot.ly" }, "data": [ { "coloraxis": "coloraxis", "customdata": [ [ 44.8, 30 ], [ 32.5, 25.7 ], [ 38, 24.7 ], [ 41.1, null ], [ 38.2, 28.5 ], [ 42.1, 20.9 ], [ 34.1, null ], [ 58.5, 19.8 ], [ 56.1, 15.9 ], [ 25.2, 38.7 ], [ 53.6, 24 ], [ 52.6, 22.3 ] ], "featureidkey": "properties.nom_qp", "geojson": { "bbox": [ -0.0437, 42.5983, 4.6525, 44.4672 ], "features": [ { "bbox": [ 2.8882, 42.7035, 2.9005, 42.7101 ], "geometry": { "coordinates": [ [ [ 2.9005, 42.7081 ], [ 2.9004, 42.7077 ], [ 2.9004, 42.7075 ], [ 2.9003, 42.7074 ], [ 2.9003, 42.7069 ], [ 2.9, 42.7069 ], [ 2.9001, 42.7067 ], [ 2.9002, 42.7065 ], [ 2.9002, 42.7064 ], [ 2.9002, 42.7063 ], [ 2.9002, 42.7062 ], [ 2.9001, 42.7062 ], [ 2.9001, 42.7061 ], [ 2.8994, 42.7059 ], [ 2.8979, 42.7055 ], [ 2.8976, 42.7054 ], [ 2.8972, 42.7053 ], [ 2.8964, 42.7051 ], [ 2.8961, 42.705 ], [ 2.8957, 42.7049 ], [ 2.8957, 42.7049 ], [ 2.8953, 42.7047 ], [ 2.8949, 42.7046 ], [ 2.8948, 42.7045 ], [ 2.8946, 42.7045 ], [ 2.8944, 42.7044 ], [ 2.8941, 42.7044 ], [ 2.8938, 42.7043 ], [ 2.8934, 42.7042 ], [ 2.8933, 42.7042 ], [ 2.8932, 42.7042 ], [ 2.8931, 42.7041 ], [ 2.8927, 42.7042 ], [ 2.8926, 42.7043 ], [ 2.8923, 42.7043 ], [ 2.8916, 42.7041 ], [ 2.8915, 42.7041 ], [ 2.8906, 42.7039 ], [ 2.8905, 42.7039 ], [ 2.8896, 42.7037 ], [ 2.8889, 42.7035 ], [ 2.8887, 42.7039 ], [ 2.8886, 42.7042 ], [ 2.8891, 42.7044 ], [ 2.8898, 42.7046 ], [ 2.8904, 42.7049 ], [ 2.8904, 42.705 ], [ 2.8905, 42.7049 ], [ 2.8907, 42.705 ], [ 2.8908, 42.705 ], [ 2.8914, 42.7053 ], [ 2.8916, 42.7053 ], [ 2.8914, 42.7056 ], [ 2.8912, 42.7056 ], [ 2.891, 42.7056 ], [ 2.8905, 42.7056 ], [ 2.8898, 42.7056 ], [ 2.8893, 42.7056 ], [ 2.8892, 42.7056 ], [ 2.889, 42.7057 ], [ 2.8888, 42.7059 ], [ 2.8887, 42.7059 ], [ 2.8887, 42.706 ], [ 2.8885, 42.706 ], [ 2.8884, 42.706 ], [ 2.8884, 42.706 ], [ 2.8883, 42.7061 ], [ 2.8882, 42.7064 ], [ 2.8887, 42.7065 ], [ 2.8888, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8893, 42.7062 ], [ 2.8893, 42.7061 ], [ 2.8893, 42.7061 ], [ 2.8905, 42.7062 ], [ 2.891, 42.7062 ], [ 2.8911, 42.7063 ], [ 2.8918, 42.7064 ], [ 2.8918, 42.7065 ], [ 2.892, 42.7065 ], [ 2.8925, 42.7066 ], [ 2.8925, 42.7067 ], [ 2.8926, 42.7067 ], [ 2.8928, 42.7069 ], [ 2.8932, 42.7072 ], [ 2.8931, 42.7073 ], [ 2.893, 42.7076 ], [ 2.8929, 42.7079 ], [ 2.8923, 42.7077 ], [ 2.892, 42.7077 ], [ 2.8919, 42.7077 ], [ 2.8919, 42.7077 ], [ 2.8918, 42.7077 ], [ 2.8918, 42.7077 ], [ 2.8916, 42.7077 ], [ 2.8916, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8914, 42.7076 ], [ 2.8913, 42.7075 ], [ 2.8912, 42.7078 ], [ 2.8911, 42.7081 ], [ 2.8911, 42.7082 ], [ 2.8909, 42.7086 ], [ 2.8907, 42.7092 ], [ 2.8906, 42.7093 ], [ 2.8906, 42.7095 ], [ 2.8905, 42.7096 ], [ 2.8908, 42.7096 ], [ 2.8909, 42.7096 ], [ 2.891, 42.7095 ], [ 2.8913, 42.7097 ], [ 2.8916, 42.7098 ], [ 2.8917, 42.7099 ], [ 2.8921, 42.71 ], [ 2.8921, 42.71 ], [ 2.8921, 42.7101 ], [ 2.8924, 42.7101 ], [ 2.8924, 42.71 ], [ 2.8924, 42.71 ], [ 2.8925, 42.7097 ], [ 2.8926, 42.7095 ], [ 2.8926, 42.7094 ], [ 2.8926, 42.7094 ], [ 2.8927, 42.7093 ], [ 2.8929, 42.7093 ], [ 2.893, 42.7094 ], [ 2.893, 42.7094 ], [ 2.893, 42.7094 ], [ 2.8933, 42.7088 ], [ 2.8936, 42.7082 ], [ 2.8938, 42.7081 ], [ 2.8937, 42.7081 ], [ 2.894, 42.7079 ], [ 2.894, 42.7079 ], [ 2.8946, 42.7083 ], [ 2.8946, 42.7083 ], [ 2.8948, 42.7083 ], [ 2.8952, 42.7084 ], [ 2.8955, 42.7084 ], [ 2.8958, 42.7085 ], [ 2.8958, 42.7085 ], [ 2.8959, 42.7084 ], [ 2.8964, 42.7082 ], [ 2.8967, 42.7081 ], [ 2.8965, 42.7078 ], [ 2.8965, 42.7078 ], [ 2.8963, 42.7076 ], [ 2.8962, 42.7075 ], [ 2.896, 42.7072 ], [ 2.8958, 42.707 ], [ 2.8957, 42.7068 ], [ 2.8959, 42.7068 ], [ 2.8959, 42.7068 ], [ 2.8957, 42.7066 ], [ 2.8957, 42.7065 ], [ 2.8958, 42.7065 ], [ 2.8962, 42.7063 ], [ 2.8963, 42.7063 ], [ 2.8964, 42.7062 ], [ 2.8965, 42.7062 ], [ 2.8967, 42.7062 ], [ 2.8968, 42.7063 ], [ 2.8968, 42.7063 ], [ 2.8969, 42.7066 ], [ 2.897, 42.7069 ], [ 2.8973, 42.7071 ], [ 2.8973, 42.7072 ], [ 2.8977, 42.7073 ], [ 2.898, 42.707 ], [ 2.899, 42.7074 ], [ 2.8992, 42.7075 ], [ 2.8992, 42.7075 ], [ 2.8992, 42.7076 ], [ 2.8995, 42.7077 ], [ 2.8995, 42.7077 ], [ 2.8999, 42.7079 ], [ 2.9005, 42.7081 ] ] ], "type": "Polygon" }, "id": "0", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066007", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Bas-Vernet Nouveau QPV" }, "type": "Feature" }, { "bbox": [ 4.0233, 44.2076, 4.0343, 44.2164 ], "geometry": { "coordinates": [ [ [ 4.0343, 44.2092 ], [ 4.0343, 44.2091 ], [ 4.0343, 44.209 ], [ 4.0342, 44.209 ], [ 4.0328, 44.2087 ], [ 4.0319, 44.2084 ], [ 4.0303, 44.208 ], [ 4.0298, 44.2079 ], [ 4.0294, 44.2077 ], [ 4.0288, 44.2076 ], [ 4.0285, 44.2076 ], [ 4.0282, 44.2076 ], [ 4.028, 44.2076 ], [ 4.0278, 44.2076 ], [ 4.0276, 44.2076 ], [ 4.0274, 44.2076 ], [ 4.027, 44.2077 ], [ 4.0267, 44.2078 ], [ 4.0265, 44.2079 ], [ 4.026, 44.2081 ], [ 4.0255, 44.2084 ], [ 4.0254, 44.2085 ], [ 4.0256, 44.2089 ], [ 4.0258, 44.2092 ], [ 4.0258, 44.2093 ], [ 4.0258, 44.2095 ], [ 4.0258, 44.2095 ], [ 4.0257, 44.2096 ], [ 4.0255, 44.2098 ], [ 4.0252, 44.21 ], [ 4.0251, 44.2102 ], [ 4.0245, 44.2103 ], [ 4.0247, 44.2105 ], [ 4.0247, 44.2105 ], [ 4.0246, 44.2106 ], [ 4.0245, 44.2106 ], [ 4.0243, 44.2107 ], [ 4.0245, 44.2108 ], [ 4.0245, 44.2108 ], [ 4.0249, 44.2111 ], [ 4.0249, 44.2111 ], [ 4.0251, 44.2114 ], [ 4.0248, 44.2115 ], [ 4.0245, 44.2117 ], [ 4.0242, 44.2119 ], [ 4.0238, 44.2122 ], [ 4.0237, 44.2123 ], [ 4.0233, 44.2126 ], [ 4.0239, 44.213 ], [ 4.0244, 44.2125 ], [ 4.0241, 44.2123 ], [ 4.024, 44.2123 ], [ 4.024, 44.2123 ], [ 4.0241, 44.2121 ], [ 4.0241, 44.2122 ], [ 4.0242, 44.2121 ], [ 4.0243, 44.212 ], [ 4.0244, 44.212 ], [ 4.0244, 44.212 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0246, 44.2118 ], [ 4.0246, 44.2118 ], [ 4.0246, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0248, 44.2118 ], [ 4.025, 44.2118 ], [ 4.0251, 44.2119 ], [ 4.0252, 44.212 ], [ 4.0252, 44.212 ], [ 4.0253, 44.212 ], [ 4.0253, 44.2119 ], [ 4.0254, 44.2119 ], [ 4.0255, 44.212 ], [ 4.0257, 44.2118 ], [ 4.0257, 44.2118 ], [ 4.0258, 44.2118 ], [ 4.0258, 44.2118 ], [ 4.0259, 44.2118 ], [ 4.026, 44.2119 ], [ 4.0261, 44.2119 ], [ 4.0262, 44.2119 ], [ 4.0262, 44.2119 ], [ 4.0263, 44.2118 ], [ 4.0264, 44.2118 ], [ 4.0265, 44.2118 ], [ 4.0266, 44.2118 ], [ 4.0267, 44.2118 ], [ 4.0269, 44.2118 ], [ 4.027, 44.2119 ], [ 4.0276, 44.212 ], [ 4.028, 44.2121 ], [ 4.0282, 44.2121 ], [ 4.0284, 44.2125 ], [ 4.0284, 44.2126 ], [ 4.0284, 44.2128 ], [ 4.0284, 44.2128 ], [ 4.0284, 44.2132 ], [ 4.0285, 44.2134 ], [ 4.0286, 44.2136 ], [ 4.0288, 44.2136 ], [ 4.0288, 44.2136 ], [ 4.0288, 44.2137 ], [ 4.0289, 44.2137 ], [ 4.029, 44.2139 ], [ 4.0291, 44.2141 ], [ 4.0292, 44.2142 ], [ 4.0292, 44.2142 ], [ 4.0291, 44.2143 ], [ 4.029, 44.2144 ], [ 4.029, 44.2144 ], [ 4.0289, 44.2145 ], [ 4.0289, 44.2146 ], [ 4.0286, 44.2146 ], [ 4.0281, 44.2147 ], [ 4.0278, 44.2147 ], [ 4.0278, 44.2148 ], [ 4.0278, 44.2148 ], [ 4.0278, 44.2151 ], [ 4.0278, 44.2153 ], [ 4.0278, 44.2154 ], [ 4.0276, 44.2154 ], [ 4.0276, 44.2156 ], [ 4.0273, 44.2156 ], [ 4.0273, 44.216 ], [ 4.0273, 44.216 ], [ 4.0275, 44.216 ], [ 4.0283, 44.216 ], [ 4.0283, 44.216 ], [ 4.0284, 44.216 ], [ 4.0284, 44.216 ], [ 4.0285, 44.2161 ], [ 4.0286, 44.2161 ], [ 4.0287, 44.2162 ], [ 4.0288, 44.2162 ], [ 4.0295, 44.2162 ], [ 4.0296, 44.2162 ], [ 4.0299, 44.2162 ], [ 4.0305, 44.216 ], [ 4.0306, 44.2159 ], [ 4.031, 44.2158 ], [ 4.0311, 44.2158 ], [ 4.0312, 44.216 ], [ 4.0312, 44.216 ], [ 4.0315, 44.2164 ], [ 4.0318, 44.2164 ], [ 4.0321, 44.2163 ], [ 4.0325, 44.2161 ], [ 4.0321, 44.2157 ], [ 4.0331, 44.2154 ], [ 4.0331, 44.2152 ], [ 4.0331, 44.2152 ], [ 4.033, 44.215 ], [ 4.033, 44.2146 ], [ 4.0329, 44.2144 ], [ 4.0336, 44.2145 ], [ 4.034, 44.2143 ], [ 4.0336, 44.2139 ], [ 4.0336, 44.2139 ], [ 4.0337, 44.2139 ], [ 4.0339, 44.2138 ], [ 4.0339, 44.2138 ], [ 4.034, 44.2135 ], [ 4.034, 44.2135 ], [ 4.0341, 44.2135 ], [ 4.0342, 44.2135 ], [ 4.0342, 44.2135 ], [ 4.0343, 44.2135 ], [ 4.0343, 44.2135 ], [ 4.0343, 44.2134 ], [ 4.0343, 44.2134 ], [ 4.0342, 44.2133 ], [ 4.034, 44.2131 ], [ 4.0339, 44.2131 ], [ 4.0339, 44.213 ], [ 4.0338, 44.2128 ], [ 4.0337, 44.2127 ], [ 4.0336, 44.2127 ], [ 4.0334, 44.2126 ], [ 4.0332, 44.2124 ], [ 4.0327, 44.2121 ], [ 4.0326, 44.212 ], [ 4.0325, 44.2119 ], [ 4.0323, 44.2119 ], [ 4.0316, 44.2114 ], [ 4.0315, 44.2113 ], [ 4.0315, 44.2112 ], [ 4.0314, 44.2109 ], [ 4.0317, 44.2109 ], [ 4.032, 44.2105 ], [ 4.0323, 44.2104 ], [ 4.0325, 44.2103 ], [ 4.033, 44.2101 ], [ 4.0331, 44.2101 ], [ 4.0333, 44.21 ], [ 4.0334, 44.2097 ], [ 4.0336, 44.2097 ], [ 4.0337, 44.2096 ], [ 4.0339, 44.2095 ], [ 4.0339, 44.2095 ], [ 4.0342, 44.2093 ], [ 4.0343, 44.2092 ] ] ], "type": "Polygon" }, "id": "1", "properties": { "code_commune": "30132", "code_departement": "30", "code_qp": "QP030016", "commune_qp": "La Grand-Combe", "nom_commune": "La Grand-Combe", "nom_qp": "Centre Ville - Arboux" }, "type": "Feature" }, { "bbox": [ 4.4296, 43.6741, 4.438, 43.6845 ], "geometry": { "coordinates": [ [ [ 4.438, 43.6827 ], [ 4.438, 43.6826 ], [ 4.438, 43.6826 ], [ 4.4376, 43.6824 ], [ 4.4375, 43.6823 ], [ 4.4374, 43.6823 ], [ 4.4373, 43.6823 ], [ 4.4371, 43.6819 ], [ 4.4367, 43.6817 ], [ 4.4362, 43.6815 ], [ 4.4353, 43.6813 ], [ 4.4351, 43.6809 ], [ 4.4351, 43.6804 ], [ 4.4353, 43.6801 ], [ 4.4363, 43.68 ], [ 4.4362, 43.6799 ], [ 4.4361, 43.6796 ], [ 4.436, 43.6794 ], [ 4.4359, 43.6794 ], [ 4.4359, 43.6793 ], [ 4.4359, 43.6792 ], [ 4.4358, 43.6791 ], [ 4.4358, 43.6791 ], [ 4.4356, 43.679 ], [ 4.4355, 43.679 ], [ 4.4353, 43.679 ], [ 4.4349, 43.679 ], [ 4.4343, 43.6791 ], [ 4.4341, 43.6791 ], [ 4.4336, 43.679 ], [ 4.4337, 43.6789 ], [ 4.4336, 43.6788 ], [ 4.4336, 43.6787 ], [ 4.4336, 43.6786 ], [ 4.4336, 43.6786 ], [ 4.4335, 43.6784 ], [ 4.4335, 43.6783 ], [ 4.4335, 43.6782 ], [ 4.4335, 43.6781 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6777 ], [ 4.4336, 43.6776 ], [ 4.4336, 43.6776 ], [ 4.4335, 43.6775 ], [ 4.4335, 43.6774 ], [ 4.4334, 43.6772 ], [ 4.4334, 43.6772 ], [ 4.4336, 43.6771 ], [ 4.4338, 43.6771 ], [ 4.4338, 43.677 ], [ 4.4337, 43.6766 ], [ 4.4336, 43.6765 ], [ 4.4336, 43.6763 ], [ 4.4336, 43.6761 ], [ 4.4336, 43.6761 ], [ 4.4333, 43.6757 ], [ 4.4332, 43.6756 ], [ 4.4326, 43.6752 ], [ 4.4324, 43.6751 ], [ 4.4325, 43.6748 ], [ 4.4325, 43.6748 ], [ 4.4324, 43.6747 ], [ 4.4324, 43.6746 ], [ 4.4325, 43.6746 ], [ 4.4325, 43.6744 ], [ 4.4324, 43.6743 ], [ 4.4324, 43.6742 ], [ 4.4324, 43.6741 ], [ 4.4322, 43.6743 ], [ 4.4317, 43.6748 ], [ 4.4312, 43.6752 ], [ 4.4309, 43.6755 ], [ 4.4306, 43.6759 ], [ 4.4304, 43.6761 ], [ 4.4299, 43.6765 ], [ 4.4298, 43.6766 ], [ 4.4297, 43.6768 ], [ 4.4297, 43.6771 ], [ 4.4296, 43.6772 ], [ 4.4296, 43.6779 ], [ 4.4298, 43.6779 ], [ 4.4299, 43.678 ], [ 4.4299, 43.678 ], [ 4.4299, 43.6781 ], [ 4.43, 43.6781 ], [ 4.4301, 43.6782 ], [ 4.4303, 43.6783 ], [ 4.4305, 43.6784 ], [ 4.4306, 43.6784 ], [ 4.4307, 43.6785 ], [ 4.4309, 43.6785 ], [ 4.4309, 43.6786 ], [ 4.431, 43.6786 ], [ 4.4311, 43.6788 ], [ 4.4311, 43.6788 ], [ 4.4312, 43.6788 ], [ 4.4312, 43.679 ], [ 4.4312, 43.679 ], [ 4.4314, 43.6791 ], [ 4.4318, 43.6791 ], [ 4.432, 43.6792 ], [ 4.4322, 43.6792 ], [ 4.4326, 43.6792 ], [ 4.4327, 43.6792 ], [ 4.4331, 43.6801 ], [ 4.4332, 43.6801 ], [ 4.4332, 43.6802 ], [ 4.4333, 43.6804 ], [ 4.4334, 43.6805 ], [ 4.4326, 43.6811 ], [ 4.433, 43.6812 ], [ 4.4327, 43.6813 ], [ 4.4326, 43.6814 ], [ 4.4325, 43.6815 ], [ 4.4325, 43.6815 ], [ 4.4322, 43.6816 ], [ 4.4321, 43.6815 ], [ 4.4319, 43.6815 ], [ 4.4318, 43.6816 ], [ 4.4318, 43.6816 ], [ 4.4318, 43.6816 ], [ 4.4319, 43.6817 ], [ 4.432, 43.6818 ], [ 4.4319, 43.6818 ], [ 4.4319, 43.6819 ], [ 4.4315, 43.6821 ], [ 4.4315, 43.6821 ], [ 4.4315, 43.6822 ], [ 4.4316, 43.6822 ], [ 4.4313, 43.6825 ], [ 4.4331, 43.6825 ], [ 4.4336, 43.6825 ], [ 4.4336, 43.6825 ], [ 4.4337, 43.6826 ], [ 4.4339, 43.6826 ], [ 4.4342, 43.6826 ], [ 4.4342, 43.6826 ], [ 4.4343, 43.6827 ], [ 4.4346, 43.6828 ], [ 4.4349, 43.6828 ], [ 4.4354, 43.6831 ], [ 4.4356, 43.6832 ], [ 4.4359, 43.6833 ], [ 4.4361, 43.6835 ], [ 4.4362, 43.6836 ], [ 4.4366, 43.6839 ], [ 4.4369, 43.6841 ], [ 4.4372, 43.6842 ], [ 4.4376, 43.6845 ], [ 4.4378, 43.6844 ], [ 4.4376, 43.6841 ], [ 4.4376, 43.6841 ], [ 4.4378, 43.684 ], [ 4.4379, 43.6839 ], [ 4.4379, 43.6835 ], [ 4.438, 43.6827 ] ] ], "type": "Polygon" }, "id": "2", "properties": { "code_commune": "30258", "code_departement": "30", "code_qp": "QP030009", "commune_qp": "Saint-Gilles", "nom_commune": "Saint-Gilles", "nom_qp": "Sabatot - Centre Ancien" }, "type": "Feature" }, { "bbox": [ 2.3637, 43.2054, 2.3794, 43.2191 ], "geometry": { "coordinates": [ [ [ 2.3743, 43.218 ], [ 2.3742, 43.2177 ], [ 2.3741, 43.2174 ], [ 2.3741, 43.2174 ], [ 2.374, 43.2175 ], [ 2.3738, 43.2173 ], [ 2.3732, 43.2176 ], [ 2.3725, 43.2179 ], [ 2.3723, 43.218 ], [ 2.3717, 43.2173 ], [ 2.3714, 43.2171 ], [ 2.3713, 43.2171 ], [ 2.3712, 43.217 ], [ 2.3708, 43.2165 ], [ 2.3704, 43.2162 ], [ 2.3702, 43.2163 ], [ 2.3702, 43.2163 ], [ 2.3699, 43.2165 ], [ 2.3693, 43.2156 ], [ 2.3697, 43.2155 ], [ 2.37, 43.2153 ], [ 2.3689, 43.2141 ], [ 2.3688, 43.214 ], [ 2.3693, 43.2138 ], [ 2.3697, 43.2136 ], [ 2.3702, 43.2133 ], [ 2.3705, 43.2132 ], [ 2.3709, 43.213 ], [ 2.3711, 43.2129 ], [ 2.3716, 43.213 ], [ 2.3721, 43.2131 ], [ 2.3736, 43.2144 ], [ 2.3753, 43.2136 ], [ 2.3778, 43.2125 ], [ 2.3782, 43.2123 ], [ 2.3788, 43.212 ], [ 2.379, 43.2118 ], [ 2.3789, 43.2116 ], [ 2.3794, 43.2114 ], [ 2.3792, 43.2112 ], [ 2.3792, 43.2111 ], [ 2.3792, 43.2105 ], [ 2.3791, 43.2099 ], [ 2.3788, 43.21 ], [ 2.3786, 43.2097 ], [ 2.3783, 43.2088 ], [ 2.3782, 43.2088 ], [ 2.3781, 43.2082 ], [ 2.3777, 43.2083 ], [ 2.3776, 43.2079 ], [ 2.3776, 43.2079 ], [ 2.3776, 43.2075 ], [ 2.3774, 43.2075 ], [ 2.3774, 43.2073 ], [ 2.3774, 43.2073 ], [ 2.3774, 43.2072 ], [ 2.3776, 43.2072 ], [ 2.3775, 43.2069 ], [ 2.3775, 43.2068 ], [ 2.3783, 43.2068 ], [ 2.3783, 43.2068 ], [ 2.3786, 43.2068 ], [ 2.3787, 43.2067 ], [ 2.3788, 43.2062 ], [ 2.379, 43.2055 ], [ 2.3786, 43.2055 ], [ 2.3784, 43.2055 ], [ 2.3764, 43.2057 ], [ 2.3757, 43.2058 ], [ 2.3752, 43.2057 ], [ 2.3747, 43.2057 ], [ 2.3739, 43.2056 ], [ 2.373, 43.2054 ], [ 2.3728, 43.2054 ], [ 2.3724, 43.2061 ], [ 2.3723, 43.2064 ], [ 2.372, 43.2071 ], [ 2.3727, 43.207 ], [ 2.3734, 43.2069 ], [ 2.374, 43.2068 ], [ 2.3744, 43.2067 ], [ 2.3745, 43.2067 ], [ 2.3749, 43.2065 ], [ 2.3751, 43.2073 ], [ 2.3758, 43.2072 ], [ 2.3758, 43.2072 ], [ 2.3763, 43.2071 ], [ 2.3765, 43.2071 ], [ 2.3769, 43.207 ], [ 2.3768, 43.2072 ], [ 2.3769, 43.2075 ], [ 2.3767, 43.2076 ], [ 2.3768, 43.2082 ], [ 2.377, 43.2082 ], [ 2.377, 43.2087 ], [ 2.377, 43.2088 ], [ 2.3778, 43.2088 ], [ 2.3781, 43.2095 ], [ 2.378, 43.2096 ], [ 2.3782, 43.2098 ], [ 2.3781, 43.2098 ], [ 2.3784, 43.2102 ], [ 2.3776, 43.2105 ], [ 2.3773, 43.2106 ], [ 2.3768, 43.2108 ], [ 2.3757, 43.2112 ], [ 2.3721, 43.2126 ], [ 2.3718, 43.2126 ], [ 2.3717, 43.2126 ], [ 2.3713, 43.2124 ], [ 2.3712, 43.2124 ], [ 2.3717, 43.212 ], [ 2.3711, 43.2114 ], [ 2.3711, 43.2114 ], [ 2.3709, 43.2112 ], [ 2.3709, 43.2112 ], [ 2.3706, 43.211 ], [ 2.3701, 43.2113 ], [ 2.3701, 43.2113 ], [ 2.37, 43.2113 ], [ 2.3692, 43.2117 ], [ 2.3691, 43.2117 ], [ 2.3693, 43.2119 ], [ 2.3694, 43.212 ], [ 2.3691, 43.2121 ], [ 2.3686, 43.2123 ], [ 2.3685, 43.2124 ], [ 2.3685, 43.2124 ], [ 2.3683, 43.2123 ], [ 2.3683, 43.2123 ], [ 2.3683, 43.2123 ], [ 2.3681, 43.2123 ], [ 2.3678, 43.2124 ], [ 2.3676, 43.2124 ], [ 2.3669, 43.2126 ], [ 2.3668, 43.2126 ], [ 2.3664, 43.2127 ], [ 2.3666, 43.2131 ], [ 2.3667, 43.2133 ], [ 2.3662, 43.2136 ], [ 2.3661, 43.2136 ], [ 2.3665, 43.2144 ], [ 2.3665, 43.2145 ], [ 2.3666, 43.2147 ], [ 2.3668, 43.2149 ], [ 2.3664, 43.215 ], [ 2.3654, 43.2152 ], [ 2.3654, 43.2155 ], [ 2.3653, 43.2156 ], [ 2.3651, 43.2157 ], [ 2.365, 43.2157 ], [ 2.3646, 43.2158 ], [ 2.3645, 43.2158 ], [ 2.3645, 43.2158 ], [ 2.3644, 43.2158 ], [ 2.3644, 43.2159 ], [ 2.3644, 43.2159 ], [ 2.3644, 43.216 ], [ 2.3644, 43.2161 ], [ 2.3637, 43.2161 ], [ 2.3638, 43.2162 ], [ 2.3639, 43.2167 ], [ 2.3642, 43.2165 ], [ 2.3646, 43.2164 ], [ 2.3647, 43.2163 ], [ 2.3652, 43.2162 ], [ 2.3654, 43.2164 ], [ 2.3656, 43.2165 ], [ 2.3659, 43.2163 ], [ 2.3661, 43.2164 ], [ 2.3663, 43.2164 ], [ 2.3669, 43.2161 ], [ 2.3672, 43.2168 ], [ 2.3675, 43.2175 ], [ 2.3676, 43.2177 ], [ 2.3676, 43.2178 ], [ 2.368, 43.2184 ], [ 2.3681, 43.2185 ], [ 2.3679, 43.2188 ], [ 2.3678, 43.2188 ], [ 2.368, 43.2188 ], [ 2.3683, 43.2189 ], [ 2.3688, 43.2189 ], [ 2.3697, 43.2189 ], [ 2.3701, 43.219 ], [ 2.3709, 43.219 ], [ 2.3713, 43.219 ], [ 2.3719, 43.2191 ], [ 2.3722, 43.2191 ], [ 2.3722, 43.219 ], [ 2.3725, 43.2188 ], [ 2.3735, 43.2184 ], [ 2.3743, 43.218 ] ] ], "type": "Polygon" }, "id": "3", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011002", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "La Conte - Ozanam" }, "type": "Feature" }, { "bbox": [ 4.2702, 43.6938, 4.2823, 43.701 ], "geometry": { "coordinates": [ [ [ 4.2819, 43.7001 ], [ 4.2818, 43.7 ], [ 4.2818, 43.6999 ], [ 4.2817, 43.6999 ], [ 4.2817, 43.6998 ], [ 4.2818, 43.6996 ], [ 4.2818, 43.6996 ], [ 4.2818, 43.6996 ], [ 4.2819, 43.6995 ], [ 4.2823, 43.6994 ], [ 4.2822, 43.6994 ], [ 4.2821, 43.6993 ], [ 4.282, 43.6993 ], [ 4.2815, 43.6992 ], [ 4.2818, 43.6986 ], [ 4.2815, 43.6985 ], [ 4.2813, 43.6985 ], [ 4.2813, 43.6984 ], [ 4.2817, 43.6974 ], [ 4.2817, 43.6974 ], [ 4.281, 43.6972 ], [ 4.2808, 43.6972 ], [ 4.2806, 43.6971 ], [ 4.2804, 43.6971 ], [ 4.2802, 43.697 ], [ 4.28, 43.697 ], [ 4.2793, 43.6971 ], [ 4.2786, 43.6972 ], [ 4.2785, 43.6974 ], [ 4.2785, 43.6975 ], [ 4.2783, 43.6974 ], [ 4.2782, 43.6974 ], [ 4.2782, 43.6974 ], [ 4.2782, 43.6972 ], [ 4.2782, 43.6971 ], [ 4.2782, 43.6969 ], [ 4.2782, 43.6969 ], [ 4.2782, 43.6968 ], [ 4.2772, 43.6966 ], [ 4.2771, 43.6968 ], [ 4.2769, 43.6973 ], [ 4.2759, 43.6971 ], [ 4.2758, 43.6971 ], [ 4.2759, 43.6969 ], [ 4.2759, 43.6968 ], [ 4.2756, 43.6967 ], [ 4.2757, 43.6964 ], [ 4.2758, 43.6963 ], [ 4.2752, 43.6962 ], [ 4.2753, 43.6961 ], [ 4.2754, 43.696 ], [ 4.2748, 43.6958 ], [ 4.2745, 43.6963 ], [ 4.2742, 43.6967 ], [ 4.2741, 43.697 ], [ 4.274, 43.6971 ], [ 4.2739, 43.697 ], [ 4.2737, 43.697 ], [ 4.2734, 43.6969 ], [ 4.2735, 43.6966 ], [ 4.2736, 43.6965 ], [ 4.2737, 43.6964 ], [ 4.2739, 43.696 ], [ 4.2738, 43.696 ], [ 4.2739, 43.6959 ], [ 4.2737, 43.6956 ], [ 4.2738, 43.6956 ], [ 4.2734, 43.695 ], [ 4.273, 43.6951 ], [ 4.2728, 43.6947 ], [ 4.2731, 43.6946 ], [ 4.273, 43.6946 ], [ 4.2729, 43.6943 ], [ 4.2731, 43.6942 ], [ 4.2729, 43.6938 ], [ 4.2722, 43.6941 ], [ 4.2721, 43.6942 ], [ 4.2707, 43.6947 ], [ 4.2702, 43.695 ], [ 4.2703, 43.6953 ], [ 4.2702, 43.6953 ], [ 4.2705, 43.696 ], [ 4.2705, 43.6961 ], [ 4.2707, 43.6965 ], [ 4.271, 43.697 ], [ 4.2711, 43.6974 ], [ 4.2715, 43.6975 ], [ 4.2716, 43.6976 ], [ 4.272, 43.6976 ], [ 4.2725, 43.6977 ], [ 4.2726, 43.6977 ], [ 4.2728, 43.6978 ], [ 4.2729, 43.6978 ], [ 4.2732, 43.6979 ], [ 4.2733, 43.698 ], [ 4.2733, 43.698 ], [ 4.2734, 43.698 ], [ 4.2734, 43.698 ], [ 4.2735, 43.698 ], [ 4.2735, 43.698 ], [ 4.2737, 43.6976 ], [ 4.2753, 43.6981 ], [ 4.2755, 43.6982 ], [ 4.2765, 43.6985 ], [ 4.2763, 43.6988 ], [ 4.2763, 43.6989 ], [ 4.2763, 43.699 ], [ 4.2772, 43.6992 ], [ 4.2772, 43.6993 ], [ 4.2775, 43.6993 ], [ 4.2775, 43.6994 ], [ 4.2775, 43.6994 ], [ 4.2775, 43.6995 ], [ 4.2777, 43.6995 ], [ 4.278, 43.6996 ], [ 4.2783, 43.6996 ], [ 4.2783, 43.6997 ], [ 4.2797, 43.7 ], [ 4.2798, 43.7001 ], [ 4.2798, 43.7001 ], [ 4.2798, 43.7001 ], [ 4.2797, 43.7004 ], [ 4.2802, 43.7005 ], [ 4.2803, 43.7005 ], [ 4.2805, 43.7007 ], [ 4.2809, 43.7009 ], [ 4.2811, 43.701 ], [ 4.2811, 43.701 ], [ 4.2812, 43.701 ], [ 4.2814, 43.701 ], [ 4.2817, 43.7009 ], [ 4.2818, 43.7009 ], [ 4.2818, 43.7007 ], [ 4.2818, 43.7006 ], [ 4.2818, 43.7006 ], [ 4.2819, 43.7004 ], [ 4.282, 43.7003 ], [ 4.282, 43.7001 ], [ 4.2819, 43.7001 ] ] ], "type": "Polygon" }, "id": "4", "properties": { "code_commune": "30341", "code_departement": "30", "code_qp": "QP030015", "commune_qp": "Vauvert", "nom_commune": "Vauvert", "nom_qp": "Les Costières" }, "type": "Feature" }, { "bbox": [ 3.6599, 43.4106, 3.667, 43.4154 ], "geometry": { "coordinates": [ [ [ 3.667, 43.4154 ], [ 3.667, 43.4145 ], [ 3.667, 43.4143 ], [ 3.6669, 43.4141 ], [ 3.6668, 43.4139 ], [ 3.6665, 43.4137 ], [ 3.666, 43.4133 ], [ 3.6653, 43.4128 ], [ 3.6652, 43.4127 ], [ 3.6653, 43.4126 ], [ 3.6654, 43.4124 ], [ 3.6653, 43.4122 ], [ 3.6653, 43.4121 ], [ 3.6653, 43.412 ], [ 3.6644, 43.4114 ], [ 3.6638, 43.4118 ], [ 3.6635, 43.4115 ], [ 3.664, 43.4111 ], [ 3.6637, 43.4109 ], [ 3.6631, 43.4113 ], [ 3.6623, 43.4106 ], [ 3.6619, 43.4109 ], [ 3.6613, 43.4114 ], [ 3.6606, 43.4119 ], [ 3.6606, 43.4119 ], [ 3.6602, 43.4121 ], [ 3.6601, 43.4121 ], [ 3.66, 43.4121 ], [ 3.66, 43.4122 ], [ 3.6599, 43.4124 ], [ 3.6599, 43.4125 ], [ 3.6608, 43.4131 ], [ 3.661, 43.4132 ], [ 3.6623, 43.4141 ], [ 3.6624, 43.4141 ], [ 3.6625, 43.4142 ], [ 3.6626, 43.4142 ], [ 3.6627, 43.4143 ], [ 3.6628, 43.4145 ], [ 3.6632, 43.4144 ], [ 3.6635, 43.4142 ], [ 3.6636, 43.4142 ], [ 3.6637, 43.4143 ], [ 3.6642, 43.4146 ], [ 3.6644, 43.4145 ], [ 3.6648, 43.4143 ], [ 3.665, 43.4144 ], [ 3.6652, 43.4142 ], [ 3.6669, 43.4154 ], [ 3.667, 43.4154 ], [ 3.667, 43.4154 ] ] ], "type": "Polygon" }, "id": "5", "properties": { "code_commune": "34301", "code_departement": "34", "code_qp": "QP034017", "commune_qp": "Sète", "nom_commune": "Sète", "nom_qp": "Ile De Thau" }, "type": "Feature" }, { "bbox": [ 2.8805, 42.7129, 2.902, 42.7278 ], "geometry": { "coordinates": [ [ [ 2.902, 42.7151 ], [ 2.902, 42.7149 ], [ 2.902, 42.7148 ], [ 2.9019, 42.7146 ], [ 2.9019, 42.7145 ], [ 2.9018, 42.7144 ], [ 2.9018, 42.7143 ], [ 2.9016, 42.7141 ], [ 2.9016, 42.7139 ], [ 2.9014, 42.7137 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9012, 42.7135 ], [ 2.9011, 42.7134 ], [ 2.9009, 42.7133 ], [ 2.9008, 42.7132 ], [ 2.9006, 42.713 ], [ 2.9005, 42.713 ], [ 2.9005, 42.7129 ], [ 2.9005, 42.7129 ], [ 2.9004, 42.713 ], [ 2.9002, 42.7131 ], [ 2.8998, 42.7135 ], [ 2.8993, 42.714 ], [ 2.8993, 42.714 ], [ 2.8991, 42.7144 ], [ 2.8987, 42.7143 ], [ 2.8984, 42.7142 ], [ 2.8983, 42.7142 ], [ 2.898, 42.7141 ], [ 2.8978, 42.714 ], [ 2.8974, 42.7139 ], [ 2.8972, 42.7139 ], [ 2.897, 42.7138 ], [ 2.8967, 42.7138 ], [ 2.8966, 42.7138 ], [ 2.8965, 42.7137 ], [ 2.8963, 42.7137 ], [ 2.8961, 42.7137 ], [ 2.8959, 42.7137 ], [ 2.8958, 42.7138 ], [ 2.8958, 42.7139 ], [ 2.8958, 42.714 ], [ 2.8957, 42.7142 ], [ 2.8957, 42.7145 ], [ 2.8956, 42.7146 ], [ 2.8956, 42.715 ], [ 2.8955, 42.7153 ], [ 2.8955, 42.7155 ], [ 2.8955, 42.7157 ], [ 2.8955, 42.7159 ], [ 2.8956, 42.7162 ], [ 2.8956, 42.7164 ], [ 2.8957, 42.7165 ], [ 2.8957, 42.7167 ], [ 2.8953, 42.7167 ], [ 2.8951, 42.7168 ], [ 2.8948, 42.7169 ], [ 2.8946, 42.7168 ], [ 2.8943, 42.7168 ], [ 2.8939, 42.7169 ], [ 2.8934, 42.7171 ], [ 2.8931, 42.7172 ], [ 2.8927, 42.7173 ], [ 2.8924, 42.7174 ], [ 2.8918, 42.7174 ], [ 2.8913, 42.7175 ], [ 2.8909, 42.7175 ], [ 2.8908, 42.7174 ], [ 2.8909, 42.7173 ], [ 2.8908, 42.7173 ], [ 2.8908, 42.7173 ], [ 2.8906, 42.7173 ], [ 2.8902, 42.7174 ], [ 2.8893, 42.7175 ], [ 2.8881, 42.7176 ], [ 2.8881, 42.7178 ], [ 2.8881, 42.718 ], [ 2.888, 42.7182 ], [ 2.8881, 42.7183 ], [ 2.8882, 42.7184 ], [ 2.8882, 42.7185 ], [ 2.8882, 42.7185 ], [ 2.8882, 42.7186 ], [ 2.8883, 42.7188 ], [ 2.8882, 42.7188 ], [ 2.8882, 42.7189 ], [ 2.8882, 42.7189 ], [ 2.8881, 42.719 ], [ 2.888, 42.7198 ], [ 2.8875, 42.7198 ], [ 2.8874, 42.7198 ], [ 2.8873, 42.7198 ], [ 2.8873, 42.7198 ], [ 2.8872, 42.7199 ], [ 2.8868, 42.7198 ], [ 2.8865, 42.7197 ], [ 2.8863, 42.7204 ], [ 2.8861, 42.7208 ], [ 2.886, 42.7208 ], [ 2.8858, 42.7208 ], [ 2.8857, 42.7208 ], [ 2.8857, 42.7208 ], [ 2.8856, 42.7207 ], [ 2.8853, 42.7205 ], [ 2.8852, 42.7206 ], [ 2.8849, 42.7209 ], [ 2.8848, 42.721 ], [ 2.8842, 42.721 ], [ 2.8843, 42.721 ], [ 2.8842, 42.721 ], [ 2.8836, 42.7212 ], [ 2.8834, 42.7213 ], [ 2.8831, 42.7213 ], [ 2.8834, 42.7213 ], [ 2.8835, 42.7213 ], [ 2.8837, 42.7214 ], [ 2.8837, 42.7215 ], [ 2.8836, 42.7219 ], [ 2.8835, 42.7219 ], [ 2.8835, 42.7221 ], [ 2.8834, 42.7222 ], [ 2.8834, 42.7224 ], [ 2.8827, 42.7224 ], [ 2.8825, 42.7224 ], [ 2.8823, 42.7224 ], [ 2.8818, 42.7224 ], [ 2.8817, 42.7224 ], [ 2.8815, 42.7224 ], [ 2.8811, 42.7224 ], [ 2.8811, 42.7227 ], [ 2.8811, 42.7229 ], [ 2.8811, 42.7231 ], [ 2.8811, 42.7231 ], [ 2.881, 42.7231 ], [ 2.881, 42.7233 ], [ 2.8809, 42.7234 ], [ 2.8811, 42.7234 ], [ 2.881, 42.7237 ], [ 2.8811, 42.7237 ], [ 2.8813, 42.7237 ], [ 2.8814, 42.7237 ], [ 2.8813, 42.7238 ], [ 2.8813, 42.724 ], [ 2.8815, 42.724 ], [ 2.8813, 42.7245 ], [ 2.8812, 42.7246 ], [ 2.8819, 42.7247 ], [ 2.8816, 42.725 ], [ 2.881, 42.7255 ], [ 2.8806, 42.7258 ], [ 2.8807, 42.7259 ], [ 2.8807, 42.7259 ], [ 2.8806, 42.726 ], [ 2.8806, 42.7261 ], [ 2.8805, 42.7261 ], [ 2.8805, 42.7262 ], [ 2.8805, 42.7262 ], [ 2.8805, 42.7263 ], [ 2.8806, 42.7264 ], [ 2.8806, 42.7265 ], [ 2.8806, 42.7266 ], [ 2.8806, 42.7267 ], [ 2.8807, 42.727 ], [ 2.8807, 42.7273 ], [ 2.8813, 42.7272 ], [ 2.8814, 42.7272 ], [ 2.8817, 42.7272 ], [ 2.8818, 42.7272 ], [ 2.8822, 42.7271 ], [ 2.8823, 42.7271 ], [ 2.8825, 42.727 ], [ 2.8827, 42.727 ], [ 2.8827, 42.727 ], [ 2.8829, 42.7271 ], [ 2.883, 42.727 ], [ 2.8831, 42.7271 ], [ 2.8836, 42.7274 ], [ 2.8836, 42.7274 ], [ 2.8838, 42.7275 ], [ 2.8841, 42.7277 ], [ 2.8842, 42.7277 ], [ 2.8844, 42.7277 ], [ 2.8849, 42.7278 ], [ 2.885, 42.7278 ], [ 2.8851, 42.7278 ], [ 2.8854, 42.7277 ], [ 2.8854, 42.7276 ], [ 2.8854, 42.7275 ], [ 2.8854, 42.7269 ], [ 2.8861, 42.7268 ], [ 2.8859, 42.7267 ], [ 2.8858, 42.7266 ], [ 2.8859, 42.7264 ], [ 2.886, 42.7261 ], [ 2.886, 42.7261 ], [ 2.8861, 42.7261 ], [ 2.886, 42.7259 ], [ 2.886, 42.7258 ], [ 2.886, 42.7258 ], [ 2.886, 42.7258 ], [ 2.8859, 42.7257 ], [ 2.8858, 42.7254 ], [ 2.8858, 42.7252 ], [ 2.8858, 42.7252 ], [ 2.8857, 42.7249 ], [ 2.8857, 42.7247 ], [ 2.8856, 42.7244 ], [ 2.8856, 42.7242 ], [ 2.8855, 42.7241 ], [ 2.8855, 42.7241 ], [ 2.8853, 42.7242 ], [ 2.8849, 42.7242 ], [ 2.8841, 42.7243 ], [ 2.884, 42.7243 ], [ 2.884, 42.7243 ], [ 2.8838, 42.7231 ], [ 2.8837, 42.723 ], [ 2.884, 42.7228 ], [ 2.8843, 42.7225 ], [ 2.8848, 42.7221 ], [ 2.885, 42.7219 ], [ 2.8851, 42.7219 ], [ 2.8853, 42.722 ], [ 2.8853, 42.722 ], [ 2.8854, 42.722 ], [ 2.8855, 42.7221 ], [ 2.8855, 42.7221 ], [ 2.8856, 42.7221 ], [ 2.8856, 42.7221 ], [ 2.8857, 42.7222 ], [ 2.8858, 42.7222 ], [ 2.886, 42.7222 ], [ 2.8861, 42.7222 ], [ 2.8862, 42.7222 ], [ 2.8863, 42.7223 ], [ 2.8866, 42.7222 ], [ 2.8866, 42.7222 ], [ 2.8869, 42.7222 ], [ 2.8871, 42.7223 ], [ 2.8871, 42.7224 ], [ 2.8875, 42.7224 ], [ 2.8877, 42.7224 ], [ 2.888, 42.7224 ], [ 2.8883, 42.7225 ], [ 2.8883, 42.7223 ], [ 2.8884, 42.7222 ], [ 2.8885, 42.722 ], [ 2.8886, 42.7219 ], [ 2.8888, 42.7216 ], [ 2.8888, 42.7216 ], [ 2.8886, 42.7215 ], [ 2.8885, 42.7214 ], [ 2.8883, 42.7214 ], [ 2.8882, 42.7213 ], [ 2.8879, 42.7212 ], [ 2.8879, 42.7211 ], [ 2.8881, 42.721 ], [ 2.8882, 42.7209 ], [ 2.8883, 42.7209 ], [ 2.8885, 42.7209 ], [ 2.8888, 42.7208 ], [ 2.889, 42.7208 ], [ 2.8891, 42.7208 ], [ 2.8892, 42.7207 ], [ 2.8892, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8895, 42.7207 ], [ 2.8895, 42.7206 ], [ 2.8897, 42.7205 ], [ 2.8897, 42.7204 ], [ 2.8898, 42.7204 ], [ 2.89, 42.7204 ], [ 2.8901, 42.7203 ], [ 2.8904, 42.7202 ], [ 2.8907, 42.7201 ], [ 2.8909, 42.7201 ], [ 2.891, 42.7201 ], [ 2.8911, 42.7201 ], [ 2.8911, 42.72 ], [ 2.8912, 42.72 ], [ 2.8913, 42.72 ], [ 2.8918, 42.7198 ], [ 2.8919, 42.7197 ], [ 2.8923, 42.7196 ], [ 2.8923, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8925, 42.7196 ], [ 2.8928, 42.7194 ], [ 2.893, 42.7192 ], [ 2.8924, 42.7189 ], [ 2.8924, 42.7188 ], [ 2.8923, 42.7188 ], [ 2.8922, 42.7188 ], [ 2.892, 42.7188 ], [ 2.8918, 42.7188 ], [ 2.8918, 42.7187 ], [ 2.8917, 42.7184 ], [ 2.8918, 42.7184 ], [ 2.8921, 42.7183 ], [ 2.8925, 42.7182 ], [ 2.8933, 42.7181 ], [ 2.8933, 42.7182 ], [ 2.8942, 42.7184 ], [ 2.8953, 42.7186 ], [ 2.8953, 42.7184 ], [ 2.8955, 42.718 ], [ 2.8956, 42.7176 ], [ 2.8956, 42.7176 ], [ 2.8956, 42.7173 ], [ 2.8956, 42.7173 ], [ 2.8957, 42.7173 ], [ 2.8959, 42.7174 ], [ 2.8961, 42.7174 ], [ 2.8963, 42.7175 ], [ 2.8967, 42.7176 ], [ 2.8972, 42.7177 ], [ 2.8975, 42.7178 ], [ 2.8978, 42.7178 ], [ 2.898, 42.7179 ], [ 2.8984, 42.7179 ], [ 2.8987, 42.718 ], [ 2.8988, 42.7175 ], [ 2.8993, 42.7177 ], [ 2.8995, 42.7174 ], [ 2.8997, 42.7172 ], [ 2.9, 42.7169 ], [ 2.9001, 42.7168 ], [ 2.9002, 42.7167 ], [ 2.9003, 42.7166 ], [ 2.9011, 42.7167 ], [ 2.9011, 42.7165 ], [ 2.901, 42.7165 ], [ 2.9011, 42.7164 ], [ 2.9011, 42.7162 ], [ 2.9011, 42.716 ], [ 2.901, 42.7159 ], [ 2.9007, 42.7156 ], [ 2.9004, 42.7153 ], [ 2.9005, 42.7151 ], [ 2.9006, 42.7152 ], [ 2.9008, 42.7153 ], [ 2.9011, 42.7154 ], [ 2.9015, 42.7153 ], [ 2.9016, 42.7153 ], [ 2.9018, 42.7152 ], [ 2.902, 42.7152 ], [ 2.902, 42.7151 ] ] ], "type": "Polygon" }, "id": "6", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066005", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Diagonale Du Haut - Moyen-Vernet" }, "type": "Feature" }, { "bbox": [ 2.8756, 42.6876, 2.8837, 42.7006 ], "geometry": { "coordinates": [ [ [ 2.8837, 42.6899 ], [ 2.8836, 42.6899 ], [ 2.8831, 42.6897 ], [ 2.8827, 42.6896 ], [ 2.8826, 42.6896 ], [ 2.8825, 42.6895 ], [ 2.8824, 42.6896 ], [ 2.8818, 42.6896 ], [ 2.8816, 42.6895 ], [ 2.8816, 42.6894 ], [ 2.8816, 42.6893 ], [ 2.8816, 42.6893 ], [ 2.8817, 42.6893 ], [ 2.8816, 42.6891 ], [ 2.8816, 42.689 ], [ 2.8816, 42.6889 ], [ 2.8816, 42.6888 ], [ 2.8816, 42.6888 ], [ 2.8816, 42.6885 ], [ 2.8816, 42.6884 ], [ 2.8816, 42.6883 ], [ 2.8818, 42.6882 ], [ 2.8818, 42.6881 ], [ 2.8818, 42.6878 ], [ 2.8814, 42.6878 ], [ 2.8813, 42.6878 ], [ 2.8813, 42.6876 ], [ 2.8809, 42.6876 ], [ 2.8809, 42.6877 ], [ 2.8809, 42.6881 ], [ 2.8806, 42.688 ], [ 2.8805, 42.688 ], [ 2.8804, 42.6883 ], [ 2.8804, 42.6884 ], [ 2.8794, 42.6881 ], [ 2.8794, 42.6882 ], [ 2.879, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6882 ], [ 2.8789, 42.6883 ], [ 2.8786, 42.6882 ], [ 2.8782, 42.6881 ], [ 2.8781, 42.6883 ], [ 2.878, 42.6885 ], [ 2.8779, 42.6888 ], [ 2.8777, 42.6891 ], [ 2.8777, 42.6891 ], [ 2.8782, 42.6893 ], [ 2.8787, 42.6896 ], [ 2.8792, 42.6898 ], [ 2.8797, 42.6901 ], [ 2.88, 42.6902 ], [ 2.8804, 42.6904 ], [ 2.8808, 42.6906 ], [ 2.881, 42.6908 ], [ 2.8812, 42.6909 ], [ 2.8815, 42.691 ], [ 2.8815, 42.6911 ], [ 2.8813, 42.6915 ], [ 2.8813, 42.6916 ], [ 2.8812, 42.6916 ], [ 2.8808, 42.6917 ], [ 2.8806, 42.6917 ], [ 2.8804, 42.6918 ], [ 2.8803, 42.6919 ], [ 2.8802, 42.692 ], [ 2.8801, 42.6921 ], [ 2.8799, 42.6924 ], [ 2.8796, 42.6926 ], [ 2.8794, 42.6927 ], [ 2.8791, 42.6927 ], [ 2.8789, 42.6928 ], [ 2.8789, 42.6928 ], [ 2.8788, 42.6928 ], [ 2.8788, 42.6928 ], [ 2.8787, 42.6929 ], [ 2.8786, 42.6929 ], [ 2.8788, 42.6931 ], [ 2.8787, 42.6932 ], [ 2.8785, 42.6935 ], [ 2.878, 42.6934 ], [ 2.8771, 42.6931 ], [ 2.8769, 42.693 ], [ 2.8768, 42.6931 ], [ 2.8767, 42.6931 ], [ 2.8767, 42.6932 ], [ 2.8766, 42.6933 ], [ 2.8765, 42.6934 ], [ 2.8765, 42.6934 ], [ 2.8765, 42.6935 ], [ 2.8765, 42.6938 ], [ 2.8765, 42.694 ], [ 2.8765, 42.6941 ], [ 2.8765, 42.6944 ], [ 2.8763, 42.6943 ], [ 2.8763, 42.6944 ], [ 2.8762, 42.6946 ], [ 2.8761, 42.6949 ], [ 2.876, 42.6953 ], [ 2.876, 42.6955 ], [ 2.876, 42.6956 ], [ 2.8761, 42.6956 ], [ 2.8763, 42.6956 ], [ 2.8764, 42.6956 ], [ 2.8764, 42.6956 ], [ 2.8765, 42.6957 ], [ 2.8766, 42.6957 ], [ 2.8767, 42.6958 ], [ 2.8769, 42.6959 ], [ 2.8768, 42.696 ], [ 2.8768, 42.6964 ], [ 2.8768, 42.6968 ], [ 2.8768, 42.6969 ], [ 2.8768, 42.697 ], [ 2.8767, 42.6972 ], [ 2.8766, 42.6973 ], [ 2.8766, 42.6973 ], [ 2.8765, 42.6974 ], [ 2.8763, 42.6974 ], [ 2.876, 42.6974 ], [ 2.876, 42.6977 ], [ 2.876, 42.698 ], [ 2.8759, 42.6983 ], [ 2.8759, 42.6985 ], [ 2.8759, 42.6986 ], [ 2.8758, 42.6986 ], [ 2.8757, 42.699 ], [ 2.8756, 42.6991 ], [ 2.8761, 42.6991 ], [ 2.8766, 42.6992 ], [ 2.8771, 42.6993 ], [ 2.8772, 42.6993 ], [ 2.8774, 42.6993 ], [ 2.8778, 42.6994 ], [ 2.8778, 42.6994 ], [ 2.878, 42.6995 ], [ 2.8782, 42.6996 ], [ 2.8785, 42.6996 ], [ 2.8789, 42.6998 ], [ 2.8791, 42.6999 ], [ 2.8794, 42.7 ], [ 2.8799, 42.7001 ], [ 2.8808, 42.7004 ], [ 2.8815, 42.7006 ], [ 2.8817, 42.7006 ], [ 2.8817, 42.7003 ], [ 2.8814, 42.7003 ], [ 2.8814, 42.7003 ], [ 2.8809, 42.7001 ], [ 2.881, 42.6996 ], [ 2.8811, 42.6993 ], [ 2.8811, 42.6992 ], [ 2.8803, 42.6991 ], [ 2.8798, 42.6991 ], [ 2.8794, 42.699 ], [ 2.8789, 42.6989 ], [ 2.8785, 42.6989 ], [ 2.8781, 42.6988 ], [ 2.878, 42.6988 ], [ 2.8778, 42.6988 ], [ 2.8778, 42.6987 ], [ 2.8778, 42.6985 ], [ 2.8778, 42.6982 ], [ 2.8779, 42.698 ], [ 2.8779, 42.6976 ], [ 2.878, 42.6977 ], [ 2.8783, 42.6977 ], [ 2.8784, 42.6972 ], [ 2.8787, 42.6967 ], [ 2.8798, 42.6968 ], [ 2.8798, 42.6968 ], [ 2.8799, 42.6968 ], [ 2.8801, 42.6968 ], [ 2.8804, 42.6968 ], [ 2.8805, 42.6968 ], [ 2.881, 42.6969 ], [ 2.8812, 42.6969 ], [ 2.8812, 42.6969 ], [ 2.8814, 42.6969 ], [ 2.8815, 42.6969 ], [ 2.8815, 42.6969 ], [ 2.8815, 42.6971 ], [ 2.8816, 42.6971 ], [ 2.8816, 42.6972 ], [ 2.8822, 42.6973 ], [ 2.8822, 42.6972 ], [ 2.8823, 42.6969 ], [ 2.8823, 42.6969 ], [ 2.8826, 42.697 ], [ 2.8829, 42.6965 ], [ 2.8831, 42.6963 ], [ 2.8831, 42.6962 ], [ 2.8833, 42.696 ], [ 2.8832, 42.6959 ], [ 2.8828, 42.6958 ], [ 2.8829, 42.6956 ], [ 2.8832, 42.6957 ], [ 2.8833, 42.6955 ], [ 2.8832, 42.6955 ], [ 2.8832, 42.6954 ], [ 2.883, 42.6953 ], [ 2.8823, 42.6952 ], [ 2.8823, 42.6952 ], [ 2.8821, 42.6951 ], [ 2.882, 42.6953 ], [ 2.8813, 42.6952 ], [ 2.8811, 42.6951 ], [ 2.8812, 42.6946 ], [ 2.8813, 42.6942 ], [ 2.8814, 42.6939 ], [ 2.8815, 42.6937 ], [ 2.8808, 42.6936 ], [ 2.8805, 42.6935 ], [ 2.881, 42.6922 ], [ 2.8816, 42.6921 ], [ 2.8817, 42.6921 ], [ 2.8817, 42.692 ], [ 2.8818, 42.6919 ], [ 2.8824, 42.6917 ], [ 2.8826, 42.6917 ], [ 2.8827, 42.6915 ], [ 2.8827, 42.6916 ], [ 2.8831, 42.691 ], [ 2.883, 42.691 ], [ 2.8833, 42.6905 ], [ 2.8835, 42.6901 ], [ 2.8836, 42.69 ], [ 2.8837, 42.6899 ] ] ], "type": "Polygon" }, "id": "7", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066003", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Gare" }, "type": "Feature" }, { "bbox": [ 2.3465, 43.2102, 2.3579, 43.2164 ], "geometry": { "coordinates": [ [ [ 2.3579, 43.2105 ], [ 2.3578, 43.2103 ], [ 2.3577, 43.2102 ], [ 2.3571, 43.2102 ], [ 2.3567, 43.2102 ], [ 2.3562, 43.2102 ], [ 2.356, 43.2103 ], [ 2.3558, 43.2103 ], [ 2.3552, 43.2104 ], [ 2.3552, 43.2105 ], [ 2.3473, 43.2105 ], [ 2.3472, 43.2105 ], [ 2.347, 43.211 ], [ 2.3468, 43.2118 ], [ 2.3466, 43.2118 ], [ 2.3465, 43.2124 ], [ 2.3466, 43.2125 ], [ 2.3465, 43.2126 ], [ 2.3465, 43.2127 ], [ 2.3466, 43.2128 ], [ 2.3468, 43.2128 ], [ 2.3471, 43.2134 ], [ 2.3471, 43.2134 ], [ 2.3475, 43.2142 ], [ 2.3474, 43.2142 ], [ 2.348, 43.2151 ], [ 2.348, 43.2151 ], [ 2.3479, 43.2151 ], [ 2.3483, 43.2157 ], [ 2.3487, 43.2164 ], [ 2.3489, 43.2164 ], [ 2.3489, 43.2164 ], [ 2.353, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3536, 43.2163 ], [ 2.3539, 43.2156 ], [ 2.3544, 43.2148 ], [ 2.3544, 43.2148 ], [ 2.3548, 43.2141 ], [ 2.355, 43.2138 ], [ 2.3554, 43.213 ], [ 2.3554, 43.2126 ], [ 2.3555, 43.2126 ], [ 2.3554, 43.2126 ], [ 2.3552, 43.2118 ], [ 2.3555, 43.2119 ], [ 2.3556, 43.2119 ], [ 2.3558, 43.2118 ], [ 2.3573, 43.2116 ], [ 2.3575, 43.2116 ], [ 2.3575, 43.2117 ], [ 2.3576, 43.2116 ], [ 2.3576, 43.2114 ], [ 2.3579, 43.2105 ] ] ], "type": "Polygon" }, "id": "8", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011004", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Bastide Pont-Vieux" }, "type": "Feature" }, { "bbox": [ 2.9955, 43.1804, 3.0095, 43.1877 ], "geometry": { "coordinates": [ [ [ 3.0095, 43.1855 ], [ 3.0095, 43.1854 ], [ 3.0095, 43.1853 ], [ 3.0095, 43.1853 ], [ 3.0094, 43.1852 ], [ 3.0094, 43.1851 ], [ 3.0093, 43.185 ], [ 3.0091, 43.1848 ], [ 3.009, 43.1846 ], [ 3.0089, 43.1845 ], [ 3.0082, 43.1847 ], [ 3.0082, 43.1847 ], [ 3.0078, 43.1848 ], [ 3.0077, 43.1848 ], [ 3.0076, 43.1847 ], [ 3.0075, 43.1846 ], [ 3.0075, 43.1845 ], [ 3.0074, 43.1844 ], [ 3.0076, 43.1844 ], [ 3.0075, 43.1843 ], [ 3.0075, 43.1842 ], [ 3.0074, 43.1841 ], [ 3.0073, 43.1841 ], [ 3.0072, 43.184 ], [ 3.0072, 43.1839 ], [ 3.007, 43.1838 ], [ 3.007, 43.1837 ], [ 3.0068, 43.1837 ], [ 3.0067, 43.1835 ], [ 3.0066, 43.1834 ], [ 3.0066, 43.1834 ], [ 3.0065, 43.1833 ], [ 3.0065, 43.1833 ], [ 3.0064, 43.1833 ], [ 3.0059, 43.1834 ], [ 3.0058, 43.1834 ], [ 3.0057, 43.1835 ], [ 3.0056, 43.1833 ], [ 3.0056, 43.1833 ], [ 3.0055, 43.1833 ], [ 3.0055, 43.1833 ], [ 3.0054, 43.1832 ], [ 3.0054, 43.1832 ], [ 3.0054, 43.1832 ], [ 3.0053, 43.1831 ], [ 3.0053, 43.1832 ], [ 3.0053, 43.1831 ], [ 3.0052, 43.1831 ], [ 3.0051, 43.1831 ], [ 3.005, 43.1829 ], [ 3.004, 43.1823 ], [ 3.0039, 43.1822 ], [ 3.0037, 43.1819 ], [ 3.0036, 43.1819 ], [ 3.0036, 43.1819 ], [ 3.0035, 43.1819 ], [ 3.0034, 43.1819 ], [ 3.0032, 43.1817 ], [ 3.0032, 43.1817 ], [ 3.0031, 43.1818 ], [ 3.003, 43.1817 ], [ 3.0029, 43.1817 ], [ 3.0029, 43.1817 ], [ 3.0028, 43.1816 ], [ 3.0027, 43.1815 ], [ 3.0026, 43.1816 ], [ 3.0023, 43.1817 ], [ 3.0023, 43.1816 ], [ 3.0021, 43.1813 ], [ 3.0018, 43.181 ], [ 3.0015, 43.1808 ], [ 3.0014, 43.1807 ], [ 3.0013, 43.1807 ], [ 3.001, 43.1807 ], [ 3.001, 43.1808 ], [ 3.0011, 43.1812 ], [ 3.0008, 43.1813 ], [ 3.0004, 43.1813 ], [ 3.0001, 43.1814 ], [ 2.9999, 43.1814 ], [ 2.9996, 43.1813 ], [ 2.9995, 43.1814 ], [ 2.9993, 43.1814 ], [ 2.9993, 43.1814 ], [ 2.9992, 43.1814 ], [ 2.9992, 43.1813 ], [ 2.9992, 43.1812 ], [ 2.9991, 43.1812 ], [ 2.999, 43.1808 ], [ 2.9987, 43.1809 ], [ 2.9983, 43.181 ], [ 2.9977, 43.1812 ], [ 2.9976, 43.181 ], [ 2.9975, 43.1807 ], [ 2.9973, 43.1804 ], [ 2.997, 43.1804 ], [ 2.9966, 43.1804 ], [ 2.9968, 43.1808 ], [ 2.9971, 43.1812 ], [ 2.997, 43.1813 ], [ 2.9968, 43.1813 ], [ 2.9961, 43.1814 ], [ 2.9955, 43.1815 ], [ 2.9956, 43.1818 ], [ 2.9955, 43.1819 ], [ 2.9955, 43.1823 ], [ 2.9957, 43.1823 ], [ 2.9957, 43.1828 ], [ 2.9957, 43.183 ], [ 2.9958, 43.183 ], [ 2.9959, 43.183 ], [ 2.9959, 43.1832 ], [ 2.9959, 43.1832 ], [ 2.9959, 43.1832 ], [ 2.9963, 43.1833 ], [ 2.9965, 43.1834 ], [ 2.9967, 43.1835 ], [ 2.9968, 43.1836 ], [ 2.9969, 43.1836 ], [ 2.9971, 43.1836 ], [ 2.9971, 43.1836 ], [ 2.9972, 43.1836 ], [ 2.9977, 43.1835 ], [ 2.9978, 43.1836 ], [ 2.9989, 43.1844 ], [ 2.9992, 43.1847 ], [ 2.9995, 43.1849 ], [ 2.9996, 43.1848 ], [ 2.9997, 43.1847 ], [ 2.9998, 43.1847 ], [ 2.9999, 43.1847 ], [ 3.0001, 43.1846 ], [ 3.0002, 43.1846 ], [ 3.0005, 43.1844 ], [ 3.0008, 43.1843 ], [ 3.0012, 43.1841 ], [ 3.0016, 43.184 ], [ 3.0017, 43.1839 ], [ 3.0019, 43.1839 ], [ 3.0023, 43.1837 ], [ 3.0026, 43.1839 ], [ 3.0027, 43.184 ], [ 3.0028, 43.1841 ], [ 3.0028, 43.1842 ], [ 3.0032, 43.1852 ], [ 3.0033, 43.1852 ], [ 3.0033, 43.1853 ], [ 3.0037, 43.1851 ], [ 3.0037, 43.1852 ], [ 3.0038, 43.1854 ], [ 3.0039, 43.1855 ], [ 3.004, 43.1857 ], [ 3.004, 43.1858 ], [ 3.0041, 43.1858 ], [ 3.0042, 43.1859 ], [ 3.0043, 43.1859 ], [ 3.0044, 43.1859 ], [ 3.0045, 43.1859 ], [ 3.0045, 43.186 ], [ 3.0045, 43.1862 ], [ 3.0045, 43.1863 ], [ 3.0046, 43.1864 ], [ 3.0046, 43.1864 ], [ 3.0047, 43.1865 ], [ 3.0048, 43.1866 ], [ 3.0049, 43.1867 ], [ 3.0049, 43.1868 ], [ 3.005, 43.1869 ], [ 3.0051, 43.187 ], [ 3.0052, 43.1871 ], [ 3.0053, 43.1873 ], [ 3.0056, 43.187 ], [ 3.0064, 43.1873 ], [ 3.0072, 43.1877 ], [ 3.0073, 43.1877 ], [ 3.0074, 43.1876 ], [ 3.0075, 43.1873 ], [ 3.0076, 43.1872 ], [ 3.0078, 43.1871 ], [ 3.0079, 43.1871 ], [ 3.008, 43.1871 ], [ 3.008, 43.1871 ], [ 3.0082, 43.1871 ], [ 3.0087, 43.1864 ], [ 3.0093, 43.1858 ], [ 3.0094, 43.1856 ], [ 3.0095, 43.1855 ] ] ], "type": "Polygon" }, "id": "9", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011008", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Centre" }, "type": "Feature" }, { "bbox": [ 3.0116, 43.192, 3.0172, 43.1962 ], "geometry": { "coordinates": [ [ [ 3.0167, 43.1938 ], [ 3.0165, 43.1936 ], [ 3.0165, 43.1934 ], [ 3.0163, 43.1933 ], [ 3.0159, 43.1928 ], [ 3.0157, 43.1927 ], [ 3.0155, 43.1924 ], [ 3.0152, 43.192 ], [ 3.0141, 43.1924 ], [ 3.014, 43.1925 ], [ 3.0139, 43.1924 ], [ 3.0137, 43.1921 ], [ 3.013, 43.1924 ], [ 3.0123, 43.1926 ], [ 3.0129, 43.1937 ], [ 3.0126, 43.1938 ], [ 3.0126, 43.1938 ], [ 3.0128, 43.1944 ], [ 3.0131, 43.195 ], [ 3.0126, 43.1952 ], [ 3.0126, 43.1952 ], [ 3.0126, 43.1954 ], [ 3.0116, 43.1956 ], [ 3.0123, 43.1962 ], [ 3.0123, 43.1962 ], [ 3.0133, 43.196 ], [ 3.0131, 43.1954 ], [ 3.0135, 43.1953 ], [ 3.0143, 43.1952 ], [ 3.0144, 43.1952 ], [ 3.0145, 43.1952 ], [ 3.0149, 43.1951 ], [ 3.0149, 43.1951 ], [ 3.0149, 43.1954 ], [ 3.015, 43.1957 ], [ 3.015, 43.1957 ], [ 3.0158, 43.1952 ], [ 3.0159, 43.1952 ], [ 3.0162, 43.195 ], [ 3.0166, 43.1947 ], [ 3.017, 43.1945 ], [ 3.0171, 43.1944 ], [ 3.0172, 43.1943 ], [ 3.0172, 43.1941 ], [ 3.0171, 43.194 ], [ 3.017, 43.1939 ], [ 3.0169, 43.1938 ], [ 3.0167, 43.1938 ] ] ], "type": "Polygon" }, "id": "10", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011009", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Est" }, "type": "Feature" }, { "bbox": [ 4.3233, 43.8189, 4.342, 43.8338 ], "geometry": { "coordinates": [ [ [ 4.3277, 43.8276 ], [ 4.3268, 43.8273 ], [ 4.3267, 43.8274 ], [ 4.3259, 43.8287 ], [ 4.3256, 43.8292 ], [ 4.3252, 43.8299 ], [ 4.3251, 43.8301 ], [ 4.3249, 43.8301 ], [ 4.3245, 43.8303 ], [ 4.3242, 43.8303 ], [ 4.3238, 43.8305 ], [ 4.3235, 43.8307 ], [ 4.3233, 43.8308 ], [ 4.3233, 43.8311 ], [ 4.3234, 43.8312 ], [ 4.3239, 43.8319 ], [ 4.324, 43.8321 ], [ 4.324, 43.8323 ], [ 4.3242, 43.8324 ], [ 4.3244, 43.8325 ], [ 4.3246, 43.8326 ], [ 4.3251, 43.8329 ], [ 4.3253, 43.8329 ], [ 4.3254, 43.8329 ], [ 4.3256, 43.8329 ], [ 4.3257, 43.8328 ], [ 4.3258, 43.8327 ], [ 4.326, 43.8325 ], [ 4.3263, 43.8321 ], [ 4.3263, 43.832 ], [ 4.3264, 43.8321 ], [ 4.3268, 43.8322 ], [ 4.3269, 43.832 ], [ 4.327, 43.832 ], [ 4.3273, 43.832 ], [ 4.3273, 43.832 ], [ 4.3278, 43.8322 ], [ 4.3283, 43.8324 ], [ 4.3283, 43.8323 ], [ 4.3285, 43.8324 ], [ 4.3287, 43.8329 ], [ 4.3284, 43.833 ], [ 4.3289, 43.8333 ], [ 4.3286, 43.8336 ], [ 4.3291, 43.8338 ], [ 4.3293, 43.8336 ], [ 4.3301, 43.8334 ], [ 4.3308, 43.8331 ], [ 4.3306, 43.8329 ], [ 4.3307, 43.8325 ], [ 4.3308, 43.8325 ], [ 4.3309, 43.8324 ], [ 4.331, 43.8323 ], [ 4.3317, 43.8326 ], [ 4.3317, 43.8325 ], [ 4.3317, 43.8325 ], [ 4.3317, 43.8324 ], [ 4.3316, 43.8323 ], [ 4.3316, 43.8322 ], [ 4.3319, 43.8322 ], [ 4.332, 43.8322 ], [ 4.3321, 43.8322 ], [ 4.3323, 43.8322 ], [ 4.3329, 43.8321 ], [ 4.3329, 43.8321 ], [ 4.3329, 43.832 ], [ 4.3329, 43.8319 ], [ 4.3332, 43.8315 ], [ 4.3333, 43.8314 ], [ 4.3334, 43.8312 ], [ 4.3337, 43.8307 ], [ 4.3332, 43.8306 ], [ 4.3333, 43.8305 ], [ 4.333, 43.8304 ], [ 4.3323, 43.8301 ], [ 4.333, 43.8291 ], [ 4.3331, 43.8288 ], [ 4.3332, 43.8286 ], [ 4.3332, 43.8285 ], [ 4.3334, 43.8288 ], [ 4.3335, 43.8289 ], [ 4.3335, 43.8289 ], [ 4.3336, 43.829 ], [ 4.3337, 43.8291 ], [ 4.3339, 43.8291 ], [ 4.334, 43.8292 ], [ 4.3341, 43.8292 ], [ 4.3344, 43.8292 ], [ 4.3345, 43.8292 ], [ 4.335, 43.8291 ], [ 4.3356, 43.8289 ], [ 4.3356, 43.8288 ], [ 4.3356, 43.8287 ], [ 4.3358, 43.8284 ], [ 4.3365, 43.8285 ], [ 4.3367, 43.8285 ], [ 4.3368, 43.8286 ], [ 4.3369, 43.8287 ], [ 4.3377, 43.8292 ], [ 4.338, 43.8289 ], [ 4.338, 43.8288 ], [ 4.3381, 43.8287 ], [ 4.3382, 43.8288 ], [ 4.3383, 43.8286 ], [ 4.3384, 43.8287 ], [ 4.3384, 43.8287 ], [ 4.3379, 43.8284 ], [ 4.338, 43.828 ], [ 4.3383, 43.828 ], [ 4.3386, 43.8281 ], [ 4.3387, 43.8282 ], [ 4.3387, 43.8281 ], [ 4.3386, 43.8278 ], [ 4.3386, 43.8278 ], [ 4.3387, 43.8275 ], [ 4.3388, 43.8275 ], [ 4.3388, 43.8272 ], [ 4.3384, 43.8274 ], [ 4.3381, 43.8275 ], [ 4.3379, 43.8275 ], [ 4.3378, 43.8274 ], [ 4.3381, 43.8268 ], [ 4.3382, 43.8265 ], [ 4.3372, 43.8262 ], [ 4.3363, 43.8259 ], [ 4.3363, 43.8258 ], [ 4.337, 43.8246 ], [ 4.3375, 43.8247 ], [ 4.3377, 43.8249 ], [ 4.3387, 43.8252 ], [ 4.3389, 43.8253 ], [ 4.3391, 43.8252 ], [ 4.3395, 43.8251 ], [ 4.3398, 43.8251 ], [ 4.3401, 43.8251 ], [ 4.3403, 43.8251 ], [ 4.3404, 43.8252 ], [ 4.3407, 43.8253 ], [ 4.3413, 43.8252 ], [ 4.3419, 43.8251 ], [ 4.342, 43.825 ], [ 4.3419, 43.8248 ], [ 4.3414, 43.8247 ], [ 4.3418, 43.8243 ], [ 4.3414, 43.8242 ], [ 4.3413, 43.8241 ], [ 4.341, 43.824 ], [ 4.3414, 43.8235 ], [ 4.341, 43.8234 ], [ 4.3406, 43.8233 ], [ 4.3402, 43.8232 ], [ 4.3404, 43.8229 ], [ 4.3407, 43.8225 ], [ 4.3408, 43.8221 ], [ 4.3411, 43.8217 ], [ 4.3413, 43.8214 ], [ 4.3417, 43.821 ], [ 4.3417, 43.8209 ], [ 4.3412, 43.8207 ], [ 4.3406, 43.8205 ], [ 4.3403, 43.8203 ], [ 4.34, 43.8202 ], [ 4.3394, 43.8199 ], [ 4.3388, 43.8196 ], [ 4.3385, 43.8195 ], [ 4.3382, 43.8193 ], [ 4.3379, 43.8191 ], [ 4.3375, 43.8189 ], [ 4.337, 43.8193 ], [ 4.3368, 43.8195 ], [ 4.3364, 43.8198 ], [ 4.3362, 43.82 ], [ 4.3361, 43.8202 ], [ 4.3359, 43.8203 ], [ 4.3356, 43.8202 ], [ 4.3353, 43.8202 ], [ 4.3347, 43.8202 ], [ 4.3342, 43.8203 ], [ 4.3327, 43.8205 ], [ 4.3322, 43.8206 ], [ 4.3316, 43.8208 ], [ 4.331, 43.821 ], [ 4.3306, 43.8211 ], [ 4.3303, 43.8212 ], [ 4.3299, 43.8215 ], [ 4.3295, 43.8218 ], [ 4.3289, 43.8223 ], [ 4.3285, 43.8228 ], [ 4.3282, 43.8233 ], [ 4.3283, 43.8235 ], [ 4.3284, 43.8236 ], [ 4.3289, 43.8238 ], [ 4.3295, 43.8241 ], [ 4.3305, 43.8248 ], [ 4.3313, 43.8255 ], [ 4.3321, 43.826 ], [ 4.3323, 43.8261 ], [ 4.3326, 43.8263 ], [ 4.3328, 43.8265 ], [ 4.333, 43.8267 ], [ 4.3332, 43.8268 ], [ 4.3336, 43.8271 ], [ 4.334, 43.8265 ], [ 4.3343, 43.8259 ], [ 4.3346, 43.826 ], [ 4.3347, 43.826 ], [ 4.3349, 43.8258 ], [ 4.335, 43.8257 ], [ 4.335, 43.8257 ], [ 4.3352, 43.8256 ], [ 4.3358, 43.8258 ], [ 4.3361, 43.8259 ], [ 4.3362, 43.826 ], [ 4.3362, 43.8261 ], [ 4.3358, 43.8268 ], [ 4.3356, 43.8267 ], [ 4.3355, 43.8268 ], [ 4.3357, 43.8269 ], [ 4.3358, 43.827 ], [ 4.3358, 43.8271 ], [ 4.3351, 43.8273 ], [ 4.3352, 43.8274 ], [ 4.3353, 43.8276 ], [ 4.3355, 43.8278 ], [ 4.3356, 43.828 ], [ 4.3356, 43.8282 ], [ 4.3352, 43.8283 ], [ 4.3349, 43.8281 ], [ 4.3347, 43.8279 ], [ 4.3335, 43.8272 ], [ 4.3337, 43.8276 ], [ 4.3338, 43.8278 ], [ 4.3339, 43.8278 ], [ 4.3339, 43.8279 ], [ 4.3339, 43.8279 ], [ 4.3338, 43.828 ], [ 4.3334, 43.8279 ], [ 4.3332, 43.8278 ], [ 4.3331, 43.8279 ], [ 4.333, 43.828 ], [ 4.3329, 43.828 ], [ 4.3331, 43.8282 ], [ 4.3329, 43.8283 ], [ 4.3327, 43.8282 ], [ 4.3325, 43.8281 ], [ 4.3321, 43.8279 ], [ 4.3319, 43.8286 ], [ 4.3317, 43.8289 ], [ 4.3316, 43.829 ], [ 4.3315, 43.8289 ], [ 4.3314, 43.8289 ], [ 4.3314, 43.829 ], [ 4.3313, 43.8292 ], [ 4.3313, 43.8292 ], [ 4.3313, 43.8293 ], [ 4.3312, 43.8293 ], [ 4.3312, 43.8293 ], [ 4.3311, 43.8293 ], [ 4.331, 43.8293 ], [ 4.3309, 43.8294 ], [ 4.3308, 43.8294 ], [ 4.3308, 43.8294 ], [ 4.3308, 43.8295 ], [ 4.3307, 43.8295 ], [ 4.3306, 43.8295 ], [ 4.3305, 43.8296 ], [ 4.3304, 43.8296 ], [ 4.3304, 43.8296 ], [ 4.3309, 43.8298 ], [ 4.3309, 43.8299 ], [ 4.3308, 43.83 ], [ 4.3307, 43.8301 ], [ 4.3307, 43.8304 ], [ 4.3306, 43.8306 ], [ 4.3304, 43.8308 ], [ 4.3304, 43.8309 ], [ 4.3303, 43.8309 ], [ 4.3292, 43.8305 ], [ 4.3293, 43.8303 ], [ 4.3287, 43.8291 ], [ 4.33, 43.8287 ], [ 4.3301, 43.8287 ], [ 4.3303, 43.8288 ], [ 4.3304, 43.8285 ], [ 4.3304, 43.8285 ], [ 4.3305, 43.8284 ], [ 4.3307, 43.8281 ], [ 4.3307, 43.828 ], [ 4.3307, 43.8278 ], [ 4.331, 43.8274 ], [ 4.3308, 43.8273 ], [ 4.3304, 43.8275 ], [ 4.3301, 43.8276 ], [ 4.3299, 43.8276 ], [ 4.3298, 43.8279 ], [ 4.3292, 43.8279 ], [ 4.3292, 43.8274 ], [ 4.3281, 43.827 ], [ 4.3277, 43.8276 ] ] ], "type": "Polygon" }, "id": "11", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030003", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Pissevin - Valdegour" }, "type": "Feature" }, { "bbox": [ 3.9824, 44.0535, 3.9873, 44.0594 ], "geometry": { "coordinates": [ [ [ 3.9824, 44.0536 ], [ 3.9825, 44.0537 ], [ 3.9828, 44.0539 ], [ 3.9829, 44.054 ], [ 3.983, 44.0541 ], [ 3.9831, 44.0543 ], [ 3.9833, 44.0544 ], [ 3.9833, 44.0544 ], [ 3.9833, 44.0545 ], [ 3.9834, 44.0545 ], [ 3.9836, 44.0548 ], [ 3.9835, 44.0548 ], [ 3.9836, 44.0549 ], [ 3.9834, 44.055 ], [ 3.9836, 44.0552 ], [ 3.9838, 44.0551 ], [ 3.9838, 44.0553 ], [ 3.9839, 44.0554 ], [ 3.9839, 44.0554 ], [ 3.9838, 44.0555 ], [ 3.9838, 44.0556 ], [ 3.9838, 44.0556 ], [ 3.9839, 44.0558 ], [ 3.984, 44.0558 ], [ 3.9841, 44.0559 ], [ 3.9843, 44.0559 ], [ 3.9843, 44.056 ], [ 3.9843, 44.056 ], [ 3.9842, 44.0561 ], [ 3.9844, 44.0562 ], [ 3.9845, 44.0564 ], [ 3.9846, 44.0565 ], [ 3.9846, 44.0566 ], [ 3.9846, 44.0567 ], [ 3.9846, 44.0568 ], [ 3.9847, 44.0569 ], [ 3.9847, 44.0569 ], [ 3.9849, 44.0568 ], [ 3.9849, 44.0568 ], [ 3.985, 44.0568 ], [ 3.985, 44.0569 ], [ 3.985, 44.0569 ], [ 3.985, 44.057 ], [ 3.9851, 44.057 ], [ 3.9851, 44.0571 ], [ 3.9852, 44.0572 ], [ 3.9852, 44.0573 ], [ 3.9853, 44.0574 ], [ 3.9853, 44.0574 ], [ 3.9853, 44.0575 ], [ 3.9853, 44.0575 ], [ 3.9848, 44.0575 ], [ 3.9848, 44.0576 ], [ 3.9848, 44.0577 ], [ 3.985, 44.0578 ], [ 3.9851, 44.0578 ], [ 3.9853, 44.0578 ], [ 3.9851, 44.0582 ], [ 3.985, 44.0583 ], [ 3.9849, 44.0584 ], [ 3.9849, 44.0585 ], [ 3.9848, 44.0585 ], [ 3.9847, 44.0587 ], [ 3.9845, 44.0589 ], [ 3.9845, 44.0593 ], [ 3.9847, 44.0594 ], [ 3.9851, 44.0591 ], [ 3.9852, 44.059 ], [ 3.9853, 44.0589 ], [ 3.9852, 44.0588 ], [ 3.9854, 44.0587 ], [ 3.9856, 44.0584 ], [ 3.9858, 44.0583 ], [ 3.9859, 44.0581 ], [ 3.986, 44.058 ], [ 3.9861, 44.0578 ], [ 3.9862, 44.0576 ], [ 3.9863, 44.0574 ], [ 3.9865, 44.057 ], [ 3.9867, 44.0564 ], [ 3.9868, 44.0562 ], [ 3.9869, 44.056 ], [ 3.9869, 44.0559 ], [ 3.987, 44.0557 ], [ 3.987, 44.0556 ], [ 3.987, 44.0554 ], [ 3.9872, 44.0554 ], [ 3.9872, 44.0551 ], [ 3.9871, 44.055 ], [ 3.9871, 44.0548 ], [ 3.9871, 44.0546 ], [ 3.9871, 44.0546 ], [ 3.9872, 44.0545 ], [ 3.9873, 44.0542 ], [ 3.9873, 44.054 ], [ 3.9873, 44.054 ], [ 3.987, 44.0538 ], [ 3.9863, 44.0536 ], [ 3.9859, 44.0535 ], [ 3.9861, 44.0536 ], [ 3.9859, 44.0536 ], [ 3.9856, 44.0536 ], [ 3.9854, 44.0536 ], [ 3.9853, 44.0536 ], [ 3.9851, 44.0536 ], [ 3.9849, 44.0537 ], [ 3.9848, 44.0537 ], [ 3.9847, 44.0536 ], [ 3.9846, 44.0535 ], [ 3.9846, 44.0535 ], [ 3.9845, 44.0535 ], [ 3.984, 44.0537 ], [ 3.9839, 44.0537 ], [ 3.9839, 44.0537 ], [ 3.9837, 44.0537 ], [ 3.983, 44.0537 ], [ 3.983, 44.0537 ], [ 3.9829, 44.0537 ], [ 3.9824, 44.0535 ], [ 3.9824, 44.0536 ] ] ], "type": "Polygon" }, "id": "12", "properties": { "code_commune": "30010", "code_departement": "30", "code_qp": "QP030002", "commune_qp": "Anduze", "nom_commune": "Anduze", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 4.1241, 43.6696, 4.1407, 43.6799 ], "geometry": { "coordinates": [ [ [ 4.1386, 43.6762 ], [ 4.1385, 43.676 ], [ 4.1383, 43.6759 ], [ 4.1382, 43.6759 ], [ 4.1379, 43.6755 ], [ 4.138, 43.6751 ], [ 4.138, 43.6749 ], [ 4.138, 43.6745 ], [ 4.1378, 43.6741 ], [ 4.1374, 43.6734 ], [ 4.1373, 43.6732 ], [ 4.1369, 43.6728 ], [ 4.1367, 43.6726 ], [ 4.1366, 43.6725 ], [ 4.1366, 43.6725 ], [ 4.1366, 43.6722 ], [ 4.1371, 43.6721 ], [ 4.1373, 43.6721 ], [ 4.1383, 43.6722 ], [ 4.1396, 43.6723 ], [ 4.1404, 43.6724 ], [ 4.1405, 43.6715 ], [ 4.1407, 43.6705 ], [ 4.1402, 43.6705 ], [ 4.1402, 43.6706 ], [ 4.1391, 43.6705 ], [ 4.1391, 43.6705 ], [ 4.1383, 43.6704 ], [ 4.1383, 43.6704 ], [ 4.1379, 43.6704 ], [ 4.1378, 43.6705 ], [ 4.1378, 43.6709 ], [ 4.1379, 43.6709 ], [ 4.1379, 43.6709 ], [ 4.1378, 43.671 ], [ 4.1377, 43.671 ], [ 4.1376, 43.6709 ], [ 4.1376, 43.6709 ], [ 4.1375, 43.6709 ], [ 4.1375, 43.6709 ], [ 4.1368, 43.6708 ], [ 4.1367, 43.671 ], [ 4.1367, 43.6711 ], [ 4.1367, 43.6713 ], [ 4.1367, 43.6715 ], [ 4.1367, 43.6716 ], [ 4.1367, 43.6717 ], [ 4.1367, 43.672 ], [ 4.1367, 43.6721 ], [ 4.1366, 43.6722 ], [ 4.1365, 43.6722 ], [ 4.1365, 43.6722 ], [ 4.1363, 43.6722 ], [ 4.1363, 43.6724 ], [ 4.1361, 43.6726 ], [ 4.136, 43.6726 ], [ 4.136, 43.6727 ], [ 4.136, 43.6728 ], [ 4.1359, 43.6737 ], [ 4.1356, 43.6737 ], [ 4.1356, 43.6736 ], [ 4.1356, 43.6736 ], [ 4.1356, 43.6736 ], [ 4.1354, 43.6734 ], [ 4.1347, 43.6734 ], [ 4.1342, 43.6734 ], [ 4.1342, 43.6734 ], [ 4.1342, 43.6732 ], [ 4.1339, 43.6732 ], [ 4.1337, 43.6732 ], [ 4.1334, 43.6732 ], [ 4.1334, 43.6732 ], [ 4.1332, 43.6733 ], [ 4.1332, 43.6732 ], [ 4.133, 43.6734 ], [ 4.1328, 43.6733 ], [ 4.133, 43.6728 ], [ 4.1327, 43.6727 ], [ 4.1325, 43.6731 ], [ 4.1323, 43.6732 ], [ 4.1322, 43.6732 ], [ 4.1322, 43.6733 ], [ 4.1321, 43.6735 ], [ 4.1321, 43.6736 ], [ 4.132, 43.6737 ], [ 4.132, 43.674 ], [ 4.1321, 43.674 ], [ 4.1321, 43.674 ], [ 4.1325, 43.674 ], [ 4.1325, 43.6741 ], [ 4.1325, 43.6743 ], [ 4.1324, 43.6744 ], [ 4.1324, 43.6745 ], [ 4.1324, 43.6746 ], [ 4.1323, 43.6747 ], [ 4.1323, 43.6748 ], [ 4.1321, 43.6748 ], [ 4.1318, 43.6747 ], [ 4.1315, 43.6747 ], [ 4.1314, 43.6746 ], [ 4.1312, 43.6746 ], [ 4.1313, 43.6742 ], [ 4.1299, 43.6743 ], [ 4.1298, 43.6743 ], [ 4.1298, 43.6744 ], [ 4.1299, 43.6744 ], [ 4.13, 43.6744 ], [ 4.1299, 43.6746 ], [ 4.1297, 43.6751 ], [ 4.1294, 43.6749 ], [ 4.1294, 43.6752 ], [ 4.1288, 43.6753 ], [ 4.1287, 43.6751 ], [ 4.1281, 43.6752 ], [ 4.1278, 43.6754 ], [ 4.1273, 43.675 ], [ 4.1273, 43.6749 ], [ 4.1278, 43.6745 ], [ 4.1281, 43.6743 ], [ 4.1282, 43.6743 ], [ 4.1282, 43.6742 ], [ 4.1284, 43.6739 ], [ 4.1282, 43.6738 ], [ 4.1284, 43.6738 ], [ 4.1285, 43.6737 ], [ 4.1288, 43.6733 ], [ 4.129, 43.6729 ], [ 4.1291, 43.6727 ], [ 4.1293, 43.6724 ], [ 4.1296, 43.672 ], [ 4.1295, 43.672 ], [ 4.1294, 43.672 ], [ 4.129, 43.6718 ], [ 4.1286, 43.6716 ], [ 4.1284, 43.6716 ], [ 4.1277, 43.6714 ], [ 4.1276, 43.6713 ], [ 4.1272, 43.6713 ], [ 4.127, 43.6712 ], [ 4.1271, 43.671 ], [ 4.1271, 43.6709 ], [ 4.1273, 43.6708 ], [ 4.1275, 43.6708 ], [ 4.1276, 43.6708 ], [ 4.1278, 43.6704 ], [ 4.1281, 43.6701 ], [ 4.1282, 43.67 ], [ 4.1272, 43.6698 ], [ 4.1258, 43.6696 ], [ 4.1254, 43.671 ], [ 4.1254, 43.6711 ], [ 4.1253, 43.6711 ], [ 4.1251, 43.6711 ], [ 4.1249, 43.6711 ], [ 4.1246, 43.6711 ], [ 4.1243, 43.671 ], [ 4.1243, 43.6712 ], [ 4.1242, 43.6715 ], [ 4.1242, 43.6719 ], [ 4.1243, 43.6721 ], [ 4.1244, 43.6721 ], [ 4.1244, 43.6721 ], [ 4.1251, 43.672 ], [ 4.1263, 43.6724 ], [ 4.1262, 43.6726 ], [ 4.1265, 43.6727 ], [ 4.1276, 43.673 ], [ 4.1281, 43.6731 ], [ 4.1279, 43.6736 ], [ 4.1278, 43.6739 ], [ 4.1276, 43.674 ], [ 4.1274, 43.674 ], [ 4.1271, 43.6739 ], [ 4.1269, 43.674 ], [ 4.1267, 43.6741 ], [ 4.1263, 43.6743 ], [ 4.1262, 43.6744 ], [ 4.1266, 43.6746 ], [ 4.1261, 43.675 ], [ 4.1256, 43.6754 ], [ 4.1252, 43.6757 ], [ 4.1252, 43.6758 ], [ 4.1247, 43.6756 ], [ 4.1244, 43.6754 ], [ 4.1241, 43.6755 ], [ 4.1243, 43.6757 ], [ 4.1241, 43.6758 ], [ 4.1244, 43.6761 ], [ 4.1246, 43.676 ], [ 4.1251, 43.6764 ], [ 4.1252, 43.6764 ], [ 4.1265, 43.6761 ], [ 4.1283, 43.6758 ], [ 4.1285, 43.6758 ], [ 4.1291, 43.6757 ], [ 4.1301, 43.6754 ], [ 4.1303, 43.6754 ], [ 4.1315, 43.6755 ], [ 4.1317, 43.6756 ], [ 4.1319, 43.6758 ], [ 4.1322, 43.676 ], [ 4.1324, 43.6762 ], [ 4.1329, 43.6764 ], [ 4.1333, 43.6766 ], [ 4.1337, 43.6769 ], [ 4.1335, 43.6772 ], [ 4.1333, 43.6774 ], [ 4.1332, 43.6776 ], [ 4.1331, 43.6779 ], [ 4.1342, 43.6781 ], [ 4.1342, 43.6781 ], [ 4.1344, 43.6781 ], [ 4.1342, 43.6784 ], [ 4.1341, 43.6787 ], [ 4.1339, 43.6786 ], [ 4.1338, 43.6787 ], [ 4.1337, 43.6787 ], [ 4.1336, 43.6789 ], [ 4.1335, 43.6788 ], [ 4.1332, 43.6791 ], [ 4.133, 43.6792 ], [ 4.1328, 43.6791 ], [ 4.1327, 43.6794 ], [ 4.1326, 43.6794 ], [ 4.1326, 43.6794 ], [ 4.1324, 43.6797 ], [ 4.1334, 43.6799 ], [ 4.1334, 43.6797 ], [ 4.1334, 43.6797 ], [ 4.1335, 43.6795 ], [ 4.1339, 43.6796 ], [ 4.134, 43.6794 ], [ 4.1341, 43.6791 ], [ 4.1343, 43.6792 ], [ 4.1344, 43.679 ], [ 4.1348, 43.6792 ], [ 4.1349, 43.6789 ], [ 4.1351, 43.679 ], [ 4.1354, 43.6782 ], [ 4.1355, 43.6778 ], [ 4.1365, 43.678 ], [ 4.1365, 43.6779 ], [ 4.1366, 43.6779 ], [ 4.1367, 43.6773 ], [ 4.1369, 43.6774 ], [ 4.1371, 43.6774 ], [ 4.1375, 43.6776 ], [ 4.1379, 43.6777 ], [ 4.1378, 43.6776 ], [ 4.1378, 43.6776 ], [ 4.1382, 43.677 ], [ 4.1382, 43.677 ], [ 4.1386, 43.6762 ] ] ], "type": "Polygon" }, "id": "13", "properties": { "code_commune": "34145", "code_departement": "34", "code_qp": "QP034021", "commune_qp": "Lunel", "nom_commune": "Lunel", "nom_qp": "Centre Et Périphérie" }, "type": "Feature" }, { "bbox": [ 4.6254, 43.8078, 4.6319, 43.8124 ], "geometry": { "coordinates": [ [ [ 4.6319, 43.8112 ], [ 4.6319, 43.8111 ], [ 4.6318, 43.8107 ], [ 4.6317, 43.8107 ], [ 4.6317, 43.8107 ], [ 4.6317, 43.8106 ], [ 4.6313, 43.8103 ], [ 4.6311, 43.8094 ], [ 4.6311, 43.8093 ], [ 4.6311, 43.8085 ], [ 4.6304, 43.8084 ], [ 4.6304, 43.8084 ], [ 4.6296, 43.8082 ], [ 4.6297, 43.8079 ], [ 4.6293, 43.8078 ], [ 4.6287, 43.8078 ], [ 4.6286, 43.8078 ], [ 4.6278, 43.8078 ], [ 4.6274, 43.8078 ], [ 4.6273, 43.8078 ], [ 4.6273, 43.8079 ], [ 4.6272, 43.8079 ], [ 4.6272, 43.808 ], [ 4.6271, 43.8081 ], [ 4.627, 43.8083 ], [ 4.6269, 43.8085 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8087 ], [ 4.6271, 43.8088 ], [ 4.6272, 43.8088 ], [ 4.6274, 43.8089 ], [ 4.6275, 43.809 ], [ 4.6278, 43.809 ], [ 4.6279, 43.8091 ], [ 4.628, 43.809 ], [ 4.6281, 43.8093 ], [ 4.6279, 43.8093 ], [ 4.6277, 43.8094 ], [ 4.6274, 43.8095 ], [ 4.6268, 43.8095 ], [ 4.6268, 43.8096 ], [ 4.6267, 43.8096 ], [ 4.6267, 43.8097 ], [ 4.6266, 43.8098 ], [ 4.6266, 43.8098 ], [ 4.6266, 43.8098 ], [ 4.6265, 43.8098 ], [ 4.6265, 43.8098 ], [ 4.6264, 43.8098 ], [ 4.6263, 43.8098 ], [ 4.6261, 43.8098 ], [ 4.6259, 43.8098 ], [ 4.6254, 43.8098 ], [ 4.6254, 43.8105 ], [ 4.6255, 43.811 ], [ 4.6255, 43.811 ], [ 4.6256, 43.811 ], [ 4.6266, 43.811 ], [ 4.6271, 43.811 ], [ 4.6275, 43.8109 ], [ 4.6275, 43.8111 ], [ 4.6276, 43.8116 ], [ 4.6276, 43.8119 ], [ 4.6283, 43.8118 ], [ 4.6286, 43.8118 ], [ 4.6288, 43.8119 ], [ 4.6289, 43.8124 ], [ 4.6295, 43.8122 ], [ 4.6294, 43.8122 ], [ 4.6298, 43.8121 ], [ 4.6305, 43.8119 ], [ 4.6318, 43.8116 ], [ 4.6318, 43.8116 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8112 ] ] ], "type": "Polygon" }, "id": "14", "properties": { "code_commune": "30032", "code_departement": "30", "code_qp": "QP030012", "commune_qp": "Beaucaire", "nom_commune": "Beaucaire", "nom_qp": "La Moulinelle" }, "type": "Feature" }, { "bbox": [ 2.7551, 43.1974, 2.7711, 43.2053 ], "geometry": { "coordinates": [ [ [ 2.7564, 43.2037 ], [ 2.7557, 43.2044 ], [ 2.7554, 43.2049 ], [ 2.7551, 43.2052 ], [ 2.7557, 43.2053 ], [ 2.7559, 43.2052 ], [ 2.7567, 43.2051 ], [ 2.7571, 43.205 ], [ 2.7586, 43.2044 ], [ 2.7599, 43.204 ], [ 2.7605, 43.2038 ], [ 2.7615, 43.2034 ], [ 2.7621, 43.2032 ], [ 2.7625, 43.2031 ], [ 2.7631, 43.203 ], [ 2.7638, 43.2029 ], [ 2.7642, 43.2029 ], [ 2.765, 43.2027 ], [ 2.7659, 43.2025 ], [ 2.7658, 43.2023 ], [ 2.7655, 43.2023 ], [ 2.7647, 43.2014 ], [ 2.7654, 43.201 ], [ 2.766, 43.2005 ], [ 2.7666, 43.2008 ], [ 2.7671, 43.2005 ], [ 2.7677, 43.201 ], [ 2.7681, 43.2008 ], [ 2.7683, 43.2009 ], [ 2.7685, 43.201 ], [ 2.7688, 43.2007 ], [ 2.7696, 43.2011 ], [ 2.7703, 43.2014 ], [ 2.7709, 43.2015 ], [ 2.7711, 43.2014 ], [ 2.7711, 43.2013 ], [ 2.7709, 43.2009 ], [ 2.7709, 43.2007 ], [ 2.77, 43.2005 ], [ 2.7689, 43.2002 ], [ 2.7686, 43.2001 ], [ 2.7687, 43.1999 ], [ 2.7681, 43.1997 ], [ 2.768, 43.1996 ], [ 2.767, 43.1994 ], [ 2.767, 43.1994 ], [ 2.7667, 43.1993 ], [ 2.7647, 43.199 ], [ 2.7634, 43.1987 ], [ 2.7632, 43.1986 ], [ 2.7609, 43.1981 ], [ 2.7604, 43.198 ], [ 2.7577, 43.1974 ], [ 2.758, 43.1982 ], [ 2.7581, 43.1983 ], [ 2.7586, 43.1994 ], [ 2.7578, 43.1997 ], [ 2.7569, 43.2001 ], [ 2.7566, 43.2002 ], [ 2.7558, 43.2006 ], [ 2.7558, 43.2005 ], [ 2.7556, 43.2006 ], [ 2.7555, 43.2006 ], [ 2.7552, 43.2008 ], [ 2.7551, 43.2009 ], [ 2.7553, 43.201 ], [ 2.7552, 43.2019 ], [ 2.7552, 43.202 ], [ 2.7552, 43.202 ], [ 2.7552, 43.2021 ], [ 2.7551, 43.2027 ], [ 2.7551, 43.2028 ], [ 2.7551, 43.2029 ], [ 2.7558, 43.2027 ], [ 2.7564, 43.2037 ] ] ], "type": "Polygon" }, "id": "15", "properties": { "code_commune": "11203", "code_departement": "11", "code_qp": "QP011010", "commune_qp": "Lézignan-Corbières", "nom_commune": "Lézignan-Corbières", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.2331, 43.3431, 3.2394, 43.3527 ], "geometry": { "coordinates": [ [ [ 3.2393, 43.3502 ], [ 3.2394, 43.3501 ], [ 3.2393, 43.3495 ], [ 3.239, 43.3494 ], [ 3.2389, 43.3493 ], [ 3.2379, 43.3491 ], [ 3.2377, 43.3492 ], [ 3.2374, 43.3494 ], [ 3.2372, 43.3497 ], [ 3.2371, 43.3497 ], [ 3.237, 43.3498 ], [ 3.2369, 43.3497 ], [ 3.2368, 43.3496 ], [ 3.2366, 43.3496 ], [ 3.2361, 43.3492 ], [ 3.2365, 43.3488 ], [ 3.2365, 43.3488 ], [ 3.2366, 43.3487 ], [ 3.2367, 43.3486 ], [ 3.2368, 43.3486 ], [ 3.237, 43.3483 ], [ 3.2372, 43.3481 ], [ 3.2367, 43.3479 ], [ 3.2366, 43.3478 ], [ 3.2369, 43.3476 ], [ 3.2371, 43.3474 ], [ 3.2367, 43.3471 ], [ 3.2365, 43.3471 ], [ 3.2363, 43.3473 ], [ 3.2363, 43.3472 ], [ 3.2361, 43.3471 ], [ 3.2362, 43.347 ], [ 3.2355, 43.3466 ], [ 3.2359, 43.3462 ], [ 3.2364, 43.3455 ], [ 3.2366, 43.3453 ], [ 3.2364, 43.3452 ], [ 3.2362, 43.3451 ], [ 3.2359, 43.3451 ], [ 3.2358, 43.345 ], [ 3.2359, 43.3448 ], [ 3.2363, 43.3443 ], [ 3.2365, 43.3444 ], [ 3.2366, 43.3444 ], [ 3.2367, 43.3441 ], [ 3.2368, 43.3439 ], [ 3.2368, 43.3436 ], [ 3.237, 43.3434 ], [ 3.2368, 43.3434 ], [ 3.2363, 43.3432 ], [ 3.2362, 43.3432 ], [ 3.2354, 43.3431 ], [ 3.2348, 43.3431 ], [ 3.2346, 43.3431 ], [ 3.2344, 43.3431 ], [ 3.2343, 43.3432 ], [ 3.234, 43.3433 ], [ 3.2338, 43.3433 ], [ 3.2337, 43.3434 ], [ 3.2338, 43.3435 ], [ 3.2338, 43.3436 ], [ 3.2339, 43.3438 ], [ 3.234, 43.3442 ], [ 3.2341, 43.3447 ], [ 3.2341, 43.3448 ], [ 3.234, 43.3454 ], [ 3.2339, 43.3456 ], [ 3.2339, 43.3457 ], [ 3.2338, 43.3459 ], [ 3.2338, 43.3461 ], [ 3.2335, 43.3465 ], [ 3.2331, 43.347 ], [ 3.2335, 43.3471 ], [ 3.2342, 43.3474 ], [ 3.2343, 43.3475 ], [ 3.2355, 43.348 ], [ 3.2354, 43.3481 ], [ 3.2352, 43.3483 ], [ 3.235, 43.3486 ], [ 3.2348, 43.349 ], [ 3.2344, 43.3497 ], [ 3.2341, 43.35 ], [ 3.2338, 43.3504 ], [ 3.2335, 43.3508 ], [ 3.2334, 43.351 ], [ 3.2335, 43.3511 ], [ 3.2333, 43.3514 ], [ 3.2333, 43.3514 ], [ 3.2333, 43.3515 ], [ 3.2333, 43.3515 ], [ 3.2337, 43.3517 ], [ 3.2338, 43.3517 ], [ 3.2339, 43.3517 ], [ 3.234, 43.3517 ], [ 3.2342, 43.3514 ], [ 3.2343, 43.3514 ], [ 3.235, 43.3517 ], [ 3.2351, 43.3517 ], [ 3.2352, 43.3518 ], [ 3.2353, 43.352 ], [ 3.2355, 43.3521 ], [ 3.2356, 43.3519 ], [ 3.2362, 43.3522 ], [ 3.237, 43.3525 ], [ 3.2374, 43.3527 ], [ 3.2374, 43.3527 ], [ 3.2375, 43.3526 ], [ 3.2377, 43.3523 ], [ 3.2379, 43.3521 ], [ 3.2378, 43.352 ], [ 3.2371, 43.3517 ], [ 3.2373, 43.3515 ], [ 3.2378, 43.3508 ], [ 3.2383, 43.3502 ], [ 3.2389, 43.3504 ], [ 3.239, 43.3504 ], [ 3.2392, 43.3504 ], [ 3.2392, 43.3504 ], [ 3.2393, 43.3502 ] ] ], "type": "Polygon" }, "id": "16", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034002", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Iranget Grangette" }, "type": "Feature" }, { "bbox": [ 4.6382, 43.8051, 4.6484, 43.8134 ], "geometry": { "coordinates": [ [ [ 4.6387, 43.8096 ], [ 4.6393, 43.8096 ], [ 4.6398, 43.8096 ], [ 4.64, 43.8096 ], [ 4.6401, 43.8096 ], [ 4.6403, 43.8096 ], [ 4.6404, 43.8097 ], [ 4.6407, 43.8097 ], [ 4.6413, 43.8097 ], [ 4.6415, 43.8097 ], [ 4.6424, 43.8097 ], [ 4.6429, 43.8097 ], [ 4.6431, 43.8097 ], [ 4.6432, 43.8102 ], [ 4.6432, 43.8103 ], [ 4.6433, 43.8105 ], [ 4.6426, 43.8105 ], [ 4.6421, 43.8104 ], [ 4.6418, 43.8104 ], [ 4.6417, 43.8104 ], [ 4.6416, 43.8105 ], [ 4.6414, 43.8107 ], [ 4.6411, 43.8108 ], [ 4.641, 43.8109 ], [ 4.6409, 43.8109 ], [ 4.6408, 43.8109 ], [ 4.6407, 43.8109 ], [ 4.6405, 43.8108 ], [ 4.6404, 43.8108 ], [ 4.6404, 43.8108 ], [ 4.6407, 43.8111 ], [ 4.6413, 43.8115 ], [ 4.6414, 43.8117 ], [ 4.6413, 43.8119 ], [ 4.6413, 43.8121 ], [ 4.6413, 43.8122 ], [ 4.6411, 43.8126 ], [ 4.6409, 43.8128 ], [ 4.6408, 43.8129 ], [ 4.6408, 43.813 ], [ 4.6408, 43.8131 ], [ 4.6411, 43.8132 ], [ 4.6411, 43.8132 ], [ 4.6412, 43.8132 ], [ 4.6413, 43.8132 ], [ 4.6414, 43.8132 ], [ 4.6414, 43.8133 ], [ 4.6414, 43.8133 ], [ 4.6415, 43.8133 ], [ 4.6417, 43.8134 ], [ 4.6418, 43.8134 ], [ 4.642, 43.8132 ], [ 4.642, 43.8128 ], [ 4.642, 43.8128 ], [ 4.6421, 43.8126 ], [ 4.6422, 43.8126 ], [ 4.6422, 43.8126 ], [ 4.6417, 43.8122 ], [ 4.6416, 43.8122 ], [ 4.6417, 43.8122 ], [ 4.6414, 43.8121 ], [ 4.6414, 43.8119 ], [ 4.6415, 43.8117 ], [ 4.6417, 43.812 ], [ 4.6418, 43.812 ], [ 4.6423, 43.8123 ], [ 4.6426, 43.8125 ], [ 4.6427, 43.8125 ], [ 4.6428, 43.8125 ], [ 4.6429, 43.8126 ], [ 4.644, 43.8115 ], [ 4.6442, 43.8113 ], [ 4.6444, 43.8112 ], [ 4.6456, 43.81 ], [ 4.6457, 43.8099 ], [ 4.6458, 43.8099 ], [ 4.6462, 43.8097 ], [ 4.6461, 43.8096 ], [ 4.6462, 43.8096 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8094 ], [ 4.6465, 43.8088 ], [ 4.6466, 43.8085 ], [ 4.6466, 43.8084 ], [ 4.6467, 43.8082 ], [ 4.6467, 43.8082 ], [ 4.6475, 43.8075 ], [ 4.6475, 43.8075 ], [ 4.6477, 43.8074 ], [ 4.6477, 43.8073 ], [ 4.6478, 43.8072 ], [ 4.6481, 43.8066 ], [ 4.6482, 43.8063 ], [ 4.6483, 43.806 ], [ 4.6484, 43.8056 ], [ 4.6483, 43.8051 ], [ 4.6472, 43.8052 ], [ 4.6469, 43.8053 ], [ 4.6468, 43.8053 ], [ 4.6467, 43.8052 ], [ 4.6465, 43.8053 ], [ 4.6461, 43.8053 ], [ 4.6453, 43.8055 ], [ 4.6445, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6422, 43.8059 ], [ 4.6419, 43.806 ], [ 4.6418, 43.806 ], [ 4.6417, 43.806 ], [ 4.6416, 43.806 ], [ 4.6415, 43.806 ], [ 4.641, 43.8061 ], [ 4.6403, 43.8062 ], [ 4.6395, 43.8063 ], [ 4.6388, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6386, 43.8064 ], [ 4.6385, 43.8065 ], [ 4.6385, 43.8065 ], [ 4.6384, 43.8066 ], [ 4.6384, 43.8066 ], [ 4.6384, 43.8067 ], [ 4.6383, 43.8068 ], [ 4.6383, 43.8068 ], [ 4.6383, 43.8069 ], [ 4.6382, 43.807 ], [ 4.6382, 43.8071 ], [ 4.6383, 43.8076 ], [ 4.6383, 43.8081 ], [ 4.6385, 43.809 ], [ 4.6386, 43.8094 ], [ 4.6386, 43.8096 ], [ 4.6387, 43.8096 ] ] ], "type": "Polygon" }, "id": "17", "properties": { "code_commune": "30032", "code_departement": "30", "code_qp": "QP030013", "commune_qp": "Beaucaire", "nom_commune": "Beaucaire", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 4.0674, 44.1171, 4.0918, 44.1538 ], "geometry": { "coordinates": [ [ [ 4.0918, 44.1425 ], [ 4.0916, 44.1424 ], [ 4.0914, 44.1423 ], [ 4.0912, 44.1421 ], [ 4.091, 44.142 ], [ 4.0908, 44.1419 ], [ 4.0907, 44.1418 ], [ 4.0906, 44.1417 ], [ 4.0903, 44.1414 ], [ 4.0898, 44.1409 ], [ 4.0895, 44.1406 ], [ 4.089, 44.1403 ], [ 4.0886, 44.14 ], [ 4.0886, 44.14 ], [ 4.0884, 44.1399 ], [ 4.0883, 44.1398 ], [ 4.088, 44.1397 ], [ 4.0879, 44.1396 ], [ 4.0869, 44.1391 ], [ 4.0864, 44.1389 ], [ 4.0856, 44.1384 ], [ 4.0854, 44.1382 ], [ 4.0851, 44.138 ], [ 4.0847, 44.1377 ], [ 4.0846, 44.1377 ], [ 4.0845, 44.1377 ], [ 4.0843, 44.1377 ], [ 4.084, 44.1375 ], [ 4.084, 44.1373 ], [ 4.084, 44.1372 ], [ 4.084, 44.1371 ], [ 4.0838, 44.1364 ], [ 4.0837, 44.1363 ], [ 4.0837, 44.1362 ], [ 4.0835, 44.1355 ], [ 4.0835, 44.1354 ], [ 4.0836, 44.1353 ], [ 4.0835, 44.1351 ], [ 4.0841, 44.1351 ], [ 4.084, 44.135 ], [ 4.0841, 44.135 ], [ 4.0841, 44.1349 ], [ 4.0842, 44.1348 ], [ 4.0843, 44.1347 ], [ 4.0844, 44.1347 ], [ 4.0845, 44.1346 ], [ 4.0846, 44.1346 ], [ 4.0849, 44.1345 ], [ 4.085, 44.1344 ], [ 4.0851, 44.1343 ], [ 4.0851, 44.1342 ], [ 4.0852, 44.1341 ], [ 4.0853, 44.1341 ], [ 4.0853, 44.1341 ], [ 4.0853, 44.134 ], [ 4.0854, 44.134 ], [ 4.0854, 44.134 ], [ 4.0854, 44.1339 ], [ 4.0855, 44.1339 ], [ 4.0856, 44.1338 ], [ 4.0856, 44.1337 ], [ 4.0858, 44.1335 ], [ 4.0856, 44.1335 ], [ 4.0858, 44.1333 ], [ 4.0856, 44.1331 ], [ 4.0856, 44.133 ], [ 4.0854, 44.1328 ], [ 4.0854, 44.1328 ], [ 4.0855, 44.1328 ], [ 4.0852, 44.1324 ], [ 4.0849, 44.1325 ], [ 4.0845, 44.1326 ], [ 4.0841, 44.1327 ], [ 4.084, 44.1327 ], [ 4.0839, 44.1327 ], [ 4.0837, 44.1327 ], [ 4.0831, 44.1326 ], [ 4.083, 44.1326 ], [ 4.083, 44.1325 ], [ 4.0829, 44.1324 ], [ 4.0829, 44.1323 ], [ 4.0828, 44.1323 ], [ 4.0826, 44.132 ], [ 4.0825, 44.1319 ], [ 4.0824, 44.1318 ], [ 4.0824, 44.1318 ], [ 4.0823, 44.1318 ], [ 4.0821, 44.1317 ], [ 4.0819, 44.1316 ], [ 4.0818, 44.1315 ], [ 4.0818, 44.1316 ], [ 4.0816, 44.1316 ], [ 4.0814, 44.1317 ], [ 4.0814, 44.1317 ], [ 4.0813, 44.1316 ], [ 4.0812, 44.1316 ], [ 4.0812, 44.1316 ], [ 4.0811, 44.1316 ], [ 4.081, 44.1314 ], [ 4.0808, 44.1313 ], [ 4.0807, 44.1312 ], [ 4.0807, 44.1311 ], [ 4.0806, 44.131 ], [ 4.0806, 44.1308 ], [ 4.0805, 44.1307 ], [ 4.0805, 44.1304 ], [ 4.0805, 44.1303 ], [ 4.0805, 44.1302 ], [ 4.0804, 44.1301 ], [ 4.0804, 44.13 ], [ 4.0802, 44.1299 ], [ 4.0803, 44.1298 ], [ 4.0803, 44.1296 ], [ 4.0804, 44.1295 ], [ 4.0804, 44.1294 ], [ 4.0804, 44.1294 ], [ 4.0802, 44.1295 ], [ 4.0802, 44.1295 ], [ 4.0798, 44.1292 ], [ 4.0797, 44.1291 ], [ 4.0796, 44.1291 ], [ 4.0796, 44.129 ], [ 4.0794, 44.1289 ], [ 4.0793, 44.1288 ], [ 4.0793, 44.1287 ], [ 4.0792, 44.1286 ], [ 4.0792, 44.1285 ], [ 4.0791, 44.1285 ], [ 4.0791, 44.1283 ], [ 4.079, 44.1281 ], [ 4.0791, 44.1279 ], [ 4.0792, 44.1274 ], [ 4.0792, 44.1274 ], [ 4.0792, 44.1273 ], [ 4.0795, 44.1269 ], [ 4.0797, 44.1267 ], [ 4.0797, 44.1266 ], [ 4.0798, 44.1265 ], [ 4.0799, 44.1263 ], [ 4.0799, 44.1262 ], [ 4.0801, 44.125 ], [ 4.0802, 44.1246 ], [ 4.0802, 44.1245 ], [ 4.0803, 44.124 ], [ 4.0804, 44.1239 ], [ 4.0805, 44.1238 ], [ 4.0806, 44.1237 ], [ 4.0816, 44.1236 ], [ 4.0819, 44.1236 ], [ 4.0821, 44.1236 ], [ 4.0822, 44.1236 ], [ 4.0823, 44.1236 ], [ 4.0825, 44.1236 ], [ 4.0828, 44.1236 ], [ 4.0829, 44.1236 ], [ 4.083, 44.1234 ], [ 4.0832, 44.1229 ], [ 4.0834, 44.1225 ], [ 4.0846, 44.1228 ], [ 4.0847, 44.1227 ], [ 4.0847, 44.1219 ], [ 4.0847, 44.1213 ], [ 4.0845, 44.1213 ], [ 4.0845, 44.1213 ], [ 4.0843, 44.1213 ], [ 4.0841, 44.1213 ], [ 4.0839, 44.1212 ], [ 4.0836, 44.1212 ], [ 4.0834, 44.1212 ], [ 4.0831, 44.1212 ], [ 4.0828, 44.1212 ], [ 4.0825, 44.1212 ], [ 4.0822, 44.1212 ], [ 4.0819, 44.1212 ], [ 4.0816, 44.1212 ], [ 4.0815, 44.1212 ], [ 4.0815, 44.1213 ], [ 4.0809, 44.1214 ], [ 4.0806, 44.1213 ], [ 4.0805, 44.1199 ], [ 4.0805, 44.1196 ], [ 4.0805, 44.1196 ], [ 4.0804, 44.1196 ], [ 4.0803, 44.1196 ], [ 4.0802, 44.1193 ], [ 4.0801, 44.1192 ], [ 4.0802, 44.1191 ], [ 4.0804, 44.1189 ], [ 4.0809, 44.1187 ], [ 4.0807, 44.1184 ], [ 4.0805, 44.1183 ], [ 4.0805, 44.1182 ], [ 4.0804, 44.1182 ], [ 4.0806, 44.1179 ], [ 4.0804, 44.1178 ], [ 4.0804, 44.1178 ], [ 4.0806, 44.1176 ], [ 4.0808, 44.1174 ], [ 4.0807, 44.1173 ], [ 4.0806, 44.1173 ], [ 4.0805, 44.1173 ], [ 4.0802, 44.1174 ], [ 4.0801, 44.1174 ], [ 4.0799, 44.1174 ], [ 4.0798, 44.1173 ], [ 4.0797, 44.1173 ], [ 4.0796, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.079, 44.1171 ], [ 4.0789, 44.1171 ], [ 4.0789, 44.1172 ], [ 4.0788, 44.1174 ], [ 4.0788, 44.1175 ], [ 4.0788, 44.1176 ], [ 4.0788, 44.1176 ], [ 4.0789, 44.1177 ], [ 4.0793, 44.118 ], [ 4.0794, 44.118 ], [ 4.0794, 44.1181 ], [ 4.0795, 44.1183 ], [ 4.0795, 44.1183 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0793, 44.1185 ], [ 4.0792, 44.1185 ], [ 4.0791, 44.1185 ], [ 4.079, 44.1185 ], [ 4.0788, 44.1186 ], [ 4.0787, 44.1186 ], [ 4.0784, 44.1187 ], [ 4.0782, 44.1187 ], [ 4.0782, 44.1189 ], [ 4.0781, 44.119 ], [ 4.0782, 44.1193 ], [ 4.0782, 44.1194 ], [ 4.0783, 44.1195 ], [ 4.0785, 44.1198 ], [ 4.0784, 44.1198 ], [ 4.0785, 44.12 ], [ 4.0782, 44.121 ], [ 4.078, 44.121 ], [ 4.0773, 44.121 ], [ 4.0768, 44.121 ], [ 4.0767, 44.121 ], [ 4.0765, 44.121 ], [ 4.0763, 44.1211 ], [ 4.076, 44.1212 ], [ 4.0756, 44.1214 ], [ 4.075, 44.1217 ], [ 4.0747, 44.1219 ], [ 4.0741, 44.1223 ], [ 4.0737, 44.1225 ], [ 4.0735, 44.1227 ], [ 4.0733, 44.1228 ], [ 4.0731, 44.123 ], [ 4.073, 44.1231 ], [ 4.0729, 44.1232 ], [ 4.0729, 44.1232 ], [ 4.0728, 44.1234 ], [ 4.0713, 44.1232 ], [ 4.0712, 44.123 ], [ 4.071, 44.1231 ], [ 4.0708, 44.1231 ], [ 4.0708, 44.1232 ], [ 4.0702, 44.1232 ], [ 4.07, 44.1232 ], [ 4.0699, 44.1232 ], [ 4.0699, 44.1232 ], [ 4.0698, 44.1233 ], [ 4.0698, 44.1233 ], [ 4.0697, 44.1233 ], [ 4.0696, 44.1233 ], [ 4.0694, 44.1233 ], [ 4.0693, 44.1233 ], [ 4.0693, 44.1234 ], [ 4.0692, 44.1235 ], [ 4.0692, 44.1236 ], [ 4.0692, 44.1237 ], [ 4.0692, 44.1237 ], [ 4.0692, 44.1238 ], [ 4.0692, 44.1239 ], [ 4.0692, 44.1239 ], [ 4.0692, 44.124 ], [ 4.0692, 44.1241 ], [ 4.0692, 44.1241 ], [ 4.0689, 44.1246 ], [ 4.0688, 44.1246 ], [ 4.0685, 44.1245 ], [ 4.0685, 44.1245 ], [ 4.0684, 44.1245 ], [ 4.0683, 44.1247 ], [ 4.0682, 44.1247 ], [ 4.0681, 44.1248 ], [ 4.068, 44.1248 ], [ 4.068, 44.1248 ], [ 4.068, 44.1249 ], [ 4.0679, 44.1249 ], [ 4.0679, 44.1251 ], [ 4.0679, 44.1251 ], [ 4.0679, 44.1252 ], [ 4.0678, 44.1252 ], [ 4.0677, 44.1253 ], [ 4.0676, 44.1253 ], [ 4.0679, 44.1256 ], [ 4.068, 44.1256 ], [ 4.0683, 44.1259 ], [ 4.0683, 44.1259 ], [ 4.0684, 44.1258 ], [ 4.0683, 44.1259 ], [ 4.0682, 44.126 ], [ 4.0682, 44.126 ], [ 4.0681, 44.1261 ], [ 4.0684, 44.1263 ], [ 4.0684, 44.1263 ], [ 4.0683, 44.1264 ], [ 4.0686, 44.1266 ], [ 4.0688, 44.1265 ], [ 4.069, 44.1264 ], [ 4.0693, 44.1261 ], [ 4.0695, 44.1259 ], [ 4.0698, 44.1256 ], [ 4.0699, 44.1256 ], [ 4.0702, 44.1258 ], [ 4.0703, 44.1258 ], [ 4.0703, 44.1259 ], [ 4.0703, 44.126 ], [ 4.0703, 44.126 ], [ 4.0703, 44.1261 ], [ 4.0703, 44.1262 ], [ 4.0703, 44.1262 ], [ 4.0702, 44.1263 ], [ 4.0702, 44.1264 ], [ 4.0703, 44.1265 ], [ 4.0703, 44.1266 ], [ 4.0703, 44.1266 ], [ 4.0702, 44.1266 ], [ 4.0702, 44.1268 ], [ 4.0701, 44.127 ], [ 4.0701, 44.1271 ], [ 4.0701, 44.1272 ], [ 4.0701, 44.1272 ], [ 4.0701, 44.1272 ], [ 4.0702, 44.1273 ], [ 4.0703, 44.1274 ], [ 4.0703, 44.1275 ], [ 4.0703, 44.1276 ], [ 4.0703, 44.1276 ], [ 4.0704, 44.1279 ], [ 4.0703, 44.1279 ], [ 4.0702, 44.128 ], [ 4.0702, 44.1281 ], [ 4.0704, 44.1282 ], [ 4.0704, 44.1282 ], [ 4.0703, 44.1283 ], [ 4.0703, 44.1284 ], [ 4.0702, 44.1284 ], [ 4.0701, 44.1286 ], [ 4.0701, 44.1285 ], [ 4.07, 44.1287 ], [ 4.0701, 44.1288 ], [ 4.0702, 44.1288 ], [ 4.0702, 44.1289 ], [ 4.0701, 44.1289 ], [ 4.07, 44.1292 ], [ 4.0699, 44.1294 ], [ 4.0698, 44.1293 ], [ 4.0695, 44.1294 ], [ 4.0694, 44.1295 ], [ 4.0693, 44.1295 ], [ 4.0691, 44.1295 ], [ 4.069, 44.1296 ], [ 4.069, 44.1296 ], [ 4.0686, 44.1296 ], [ 4.0684, 44.1297 ], [ 4.0682, 44.1297 ], [ 4.068, 44.1297 ], [ 4.0676, 44.1298 ], [ 4.0676, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.13 ], [ 4.0674, 44.1303 ], [ 4.0674, 44.1304 ], [ 4.0674, 44.1304 ], [ 4.0675, 44.1305 ], [ 4.0676, 44.1305 ], [ 4.0676, 44.1305 ], [ 4.0677, 44.1304 ], [ 4.0679, 44.1303 ], [ 4.068, 44.1303 ], [ 4.0683, 44.1303 ], [ 4.069, 44.1304 ], [ 4.0689, 44.1304 ], [ 4.0689, 44.1305 ], [ 4.0689, 44.1306 ], [ 4.069, 44.1307 ], [ 4.069, 44.1309 ], [ 4.069, 44.1313 ], [ 4.069, 44.1318 ], [ 4.0697, 44.1318 ], [ 4.0699, 44.1318 ], [ 4.0699, 44.1318 ], [ 4.0699, 44.1329 ], [ 4.0704, 44.1329 ], [ 4.0707, 44.133 ], [ 4.0707, 44.133 ], [ 4.0707, 44.1331 ], [ 4.0708, 44.1331 ], [ 4.0708, 44.1331 ], [ 4.0708, 44.1332 ], [ 4.0709, 44.1332 ], [ 4.0712, 44.1332 ], [ 4.0713, 44.1332 ], [ 4.0715, 44.1333 ], [ 4.0717, 44.1334 ], [ 4.0719, 44.1335 ], [ 4.0717, 44.1337 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1342 ], [ 4.0716, 44.1344 ], [ 4.0717, 44.1344 ], [ 4.0717, 44.1345 ], [ 4.0716, 44.1345 ], [ 4.0716, 44.1346 ], [ 4.0715, 44.1346 ], [ 4.0714, 44.1346 ], [ 4.0711, 44.1345 ], [ 4.071, 44.1345 ], [ 4.0709, 44.1345 ], [ 4.071, 44.1347 ], [ 4.0711, 44.1348 ], [ 4.0712, 44.135 ], [ 4.0715, 44.1354 ], [ 4.0715, 44.1356 ], [ 4.0716, 44.1357 ], [ 4.0716, 44.1358 ], [ 4.0716, 44.1359 ], [ 4.0717, 44.136 ], [ 4.0718, 44.1362 ], [ 4.0719, 44.1363 ], [ 4.0721, 44.1362 ], [ 4.0723, 44.136 ], [ 4.0725, 44.1359 ], [ 4.0726, 44.1357 ], [ 4.0727, 44.1356 ], [ 4.0729, 44.1356 ], [ 4.073, 44.1353 ], [ 4.0732, 44.1352 ], [ 4.0733, 44.1352 ], [ 4.0736, 44.135 ], [ 4.0737, 44.135 ], [ 4.0737, 44.1351 ], [ 4.0737, 44.1351 ], [ 4.0737, 44.1351 ], [ 4.0738, 44.1352 ], [ 4.0738, 44.1352 ], [ 4.0742, 44.1355 ], [ 4.0743, 44.1356 ], [ 4.0745, 44.1358 ], [ 4.0745, 44.1358 ], [ 4.0747, 44.1359 ], [ 4.0744, 44.1361 ], [ 4.0742, 44.1365 ], [ 4.0741, 44.1369 ], [ 4.074, 44.1372 ], [ 4.0739, 44.1375 ], [ 4.0739, 44.1377 ], [ 4.0739, 44.1381 ], [ 4.074, 44.1385 ], [ 4.0741, 44.1394 ], [ 4.0743, 44.1401 ], [ 4.0744, 44.1407 ], [ 4.0744, 44.1409 ], [ 4.0744, 44.141 ], [ 4.0744, 44.1412 ], [ 4.0745, 44.1414 ], [ 4.0746, 44.1418 ], [ 4.0749, 44.1422 ], [ 4.0749, 44.1424 ], [ 4.0749, 44.1425 ], [ 4.0749, 44.1425 ], [ 4.0747, 44.143 ], [ 4.0744, 44.1437 ], [ 4.0743, 44.1439 ], [ 4.0742, 44.144 ], [ 4.0741, 44.1441 ], [ 4.074, 44.1442 ], [ 4.0739, 44.1443 ], [ 4.0738, 44.1444 ], [ 4.0735, 44.1445 ], [ 4.0732, 44.1447 ], [ 4.073, 44.1449 ], [ 4.0728, 44.1449 ], [ 4.0727, 44.145 ], [ 4.0725, 44.145 ], [ 4.0721, 44.145 ], [ 4.0721, 44.1451 ], [ 4.0723, 44.1451 ], [ 4.0726, 44.1451 ], [ 4.0727, 44.1451 ], [ 4.0728, 44.1451 ], [ 4.0729, 44.1451 ], [ 4.0729, 44.1451 ], [ 4.073, 44.145 ], [ 4.0731, 44.145 ], [ 4.0732, 44.145 ], [ 4.0734, 44.145 ], [ 4.0737, 44.1449 ], [ 4.0739, 44.1448 ], [ 4.0741, 44.1447 ], [ 4.0742, 44.1446 ], [ 4.0743, 44.1447 ], [ 4.0745, 44.1445 ], [ 4.0747, 44.1444 ], [ 4.0747, 44.1444 ], [ 4.0756, 44.1438 ], [ 4.0758, 44.1437 ], [ 4.076, 44.1435 ], [ 4.0762, 44.1433 ], [ 4.0763, 44.1432 ], [ 4.0766, 44.1428 ], [ 4.0769, 44.1423 ], [ 4.0771, 44.1419 ], [ 4.078, 44.1398 ], [ 4.0782, 44.1394 ], [ 4.0779, 44.1395 ], [ 4.0776, 44.1395 ], [ 4.0775, 44.1394 ], [ 4.0775, 44.1393 ], [ 4.0778, 44.1388 ], [ 4.0774, 44.1388 ], [ 4.0774, 44.1385 ], [ 4.0769, 44.1383 ], [ 4.0771, 44.138 ], [ 4.0772, 44.1377 ], [ 4.0773, 44.1375 ], [ 4.0773, 44.1373 ], [ 4.0774, 44.1369 ], [ 4.0773, 44.1365 ], [ 4.0771, 44.1364 ], [ 4.0766, 44.1362 ], [ 4.0764, 44.1362 ], [ 4.0761, 44.136 ], [ 4.0753, 44.1354 ], [ 4.0755, 44.1351 ], [ 4.0758, 44.1349 ], [ 4.0762, 44.1347 ], [ 4.0764, 44.1346 ], [ 4.077, 44.1343 ], [ 4.0783, 44.1337 ], [ 4.0786, 44.134 ], [ 4.0786, 44.1341 ], [ 4.0788, 44.1344 ], [ 4.0792, 44.135 ], [ 4.0795, 44.1355 ], [ 4.0797, 44.1357 ], [ 4.0798, 44.136 ], [ 4.08, 44.1371 ], [ 4.08, 44.1375 ], [ 4.08, 44.1383 ], [ 4.0799, 44.1385 ], [ 4.0798, 44.1389 ], [ 4.0798, 44.1391 ], [ 4.0804, 44.1392 ], [ 4.0808, 44.1396 ], [ 4.0811, 44.1395 ], [ 4.0813, 44.1393 ], [ 4.0813, 44.1393 ], [ 4.0814, 44.1393 ], [ 4.082, 44.1394 ], [ 4.0822, 44.1395 ], [ 4.0825, 44.1397 ], [ 4.0828, 44.1398 ], [ 4.0832, 44.1399 ], [ 4.0835, 44.1401 ], [ 4.0835, 44.1402 ], [ 4.0835, 44.1403 ], [ 4.0837, 44.1403 ], [ 4.084, 44.1405 ], [ 4.0842, 44.1406 ], [ 4.0847, 44.1406 ], [ 4.0847, 44.1407 ], [ 4.0846, 44.1409 ], [ 4.0841, 44.1416 ], [ 4.0838, 44.1418 ], [ 4.0837, 44.1419 ], [ 4.0836, 44.1421 ], [ 4.0833, 44.1429 ], [ 4.0833, 44.143 ], [ 4.0833, 44.1431 ], [ 4.0833, 44.1435 ], [ 4.0833, 44.1436 ], [ 4.0832, 44.1437 ], [ 4.0831, 44.1438 ], [ 4.0829, 44.1441 ], [ 4.0825, 44.1445 ], [ 4.0824, 44.1448 ], [ 4.0823, 44.1449 ], [ 4.0823, 44.1449 ], [ 4.0822, 44.1453 ], [ 4.0822, 44.1454 ], [ 4.0822, 44.1454 ], [ 4.0822, 44.1455 ], [ 4.0822, 44.1455 ], [ 4.082, 44.1458 ], [ 4.0819, 44.1459 ], [ 4.0818, 44.1459 ], [ 4.0811, 44.1462 ], [ 4.0809, 44.1463 ], [ 4.0809, 44.1464 ], [ 4.0807, 44.1471 ], [ 4.0807, 44.1473 ], [ 4.0806, 44.1477 ], [ 4.0807, 44.1477 ], [ 4.0806, 44.148 ], [ 4.0808, 44.148 ], [ 4.0807, 44.1484 ], [ 4.0802, 44.1484 ], [ 4.0801, 44.1489 ], [ 4.0799, 44.1489 ], [ 4.0794, 44.149 ], [ 4.0794, 44.1491 ], [ 4.0795, 44.1492 ], [ 4.0796, 44.1494 ], [ 4.0798, 44.1497 ], [ 4.0803, 44.1496 ], [ 4.0804, 44.1499 ], [ 4.0804, 44.15 ], [ 4.0806, 44.1504 ], [ 4.0809, 44.1504 ], [ 4.0809, 44.1504 ], [ 4.0809, 44.1506 ], [ 4.0809, 44.1509 ], [ 4.0809, 44.1509 ], [ 4.0809, 44.1511 ], [ 4.081, 44.1514 ], [ 4.081, 44.1515 ], [ 4.0813, 44.1514 ], [ 4.0816, 44.1513 ], [ 4.0817, 44.1512 ], [ 4.0817, 44.1513 ], [ 4.0821, 44.1517 ], [ 4.0826, 44.152 ], [ 4.0826, 44.1521 ], [ 4.083, 44.1524 ], [ 4.0831, 44.1524 ], [ 4.0836, 44.1532 ], [ 4.0834, 44.1533 ], [ 4.0836, 44.1537 ], [ 4.0837, 44.1538 ], [ 4.0839, 44.1536 ], [ 4.0841, 44.1535 ], [ 4.0843, 44.1534 ], [ 4.0845, 44.1532 ], [ 4.0848, 44.1531 ], [ 4.0849, 44.153 ], [ 4.0849, 44.153 ], [ 4.085, 44.1529 ], [ 4.0849, 44.1528 ], [ 4.0849, 44.1527 ], [ 4.0848, 44.1527 ], [ 4.0847, 44.1525 ], [ 4.084, 44.1521 ], [ 4.0841, 44.1516 ], [ 4.0838, 44.1515 ], [ 4.0839, 44.151 ], [ 4.0838, 44.1507 ], [ 4.0838, 44.1504 ], [ 4.0836, 44.1502 ], [ 4.0836, 44.1502 ], [ 4.0835, 44.1502 ], [ 4.0835, 44.1502 ], [ 4.0834, 44.1502 ], [ 4.0833, 44.1502 ], [ 4.0832, 44.1498 ], [ 4.0831, 44.1495 ], [ 4.0831, 44.1494 ], [ 4.083, 44.1492 ], [ 4.083, 44.1492 ], [ 4.0829, 44.1492 ], [ 4.0829, 44.1491 ], [ 4.0829, 44.1491 ], [ 4.0828, 44.149 ], [ 4.0823, 44.149 ], [ 4.0821, 44.1491 ], [ 4.0821, 44.149 ], [ 4.0822, 44.1489 ], [ 4.0818, 44.1488 ], [ 4.0816, 44.1488 ], [ 4.0817, 44.1486 ], [ 4.0819, 44.148 ], [ 4.082, 44.1479 ], [ 4.0821, 44.148 ], [ 4.0822, 44.148 ], [ 4.0824, 44.148 ], [ 4.0824, 44.1479 ], [ 4.0825, 44.1475 ], [ 4.0825, 44.1475 ], [ 4.0827, 44.1475 ], [ 4.0828, 44.1475 ], [ 4.0833, 44.1475 ], [ 4.0833, 44.1474 ], [ 4.0833, 44.1474 ], [ 4.0834, 44.1473 ], [ 4.0835, 44.1472 ], [ 4.0837, 44.147 ], [ 4.084, 44.1467 ], [ 4.0843, 44.1465 ], [ 4.0838, 44.1463 ], [ 4.0839, 44.1462 ], [ 4.0839, 44.1462 ], [ 4.0843, 44.1459 ], [ 4.0844, 44.1459 ], [ 4.0845, 44.1458 ], [ 4.0845, 44.1457 ], [ 4.0845, 44.1455 ], [ 4.0851, 44.1455 ], [ 4.0851, 44.1454 ], [ 4.085, 44.1452 ], [ 4.0851, 44.1452 ], [ 4.0851, 44.145 ], [ 4.0851, 44.1446 ], [ 4.0858, 44.1443 ], [ 4.0861, 44.1439 ], [ 4.0865, 44.1439 ], [ 4.087, 44.1439 ], [ 4.0877, 44.1439 ], [ 4.0883, 44.1439 ], [ 4.0886, 44.1439 ], [ 4.0887, 44.1439 ], [ 4.0887, 44.1441 ], [ 4.0887, 44.1445 ], [ 4.0891, 44.1445 ], [ 4.0894, 44.1443 ], [ 4.0894, 44.1442 ], [ 4.0897, 44.1441 ], [ 4.0898, 44.144 ], [ 4.0899, 44.144 ], [ 4.0901, 44.144 ], [ 4.0905, 44.1437 ], [ 4.0905, 44.1437 ], [ 4.0906, 44.1437 ], [ 4.0907, 44.1437 ], [ 4.0909, 44.1436 ], [ 4.091, 44.1436 ], [ 4.091, 44.1436 ], [ 4.0911, 44.1436 ], [ 4.0911, 44.1435 ], [ 4.0912, 44.1435 ], [ 4.0912, 44.1434 ], [ 4.0913, 44.1433 ], [ 4.0913, 44.1433 ], [ 4.0915, 44.143 ], [ 4.0917, 44.1428 ], [ 4.0918, 44.1426 ], [ 4.0918, 44.1425 ] ] ], "type": "Polygon" }, "id": "18", "properties": { "code_commune": "30007", "code_departement": "30", "code_qp": "QP030001", "commune_qp": "Alès", "nom_commune": "Alès", "nom_qp": "Près Saint Jean - Cévennes - Tamaris - Cauvel-la Royale - Rochebelle - Centre ville" }, "type": "Feature" }, { "bbox": [ 4.3733, 43.8361, 4.3789, 43.8394 ], "geometry": { "coordinates": [ [ [ 4.3741, 43.8372 ], [ 4.3741, 43.8372 ], [ 4.374, 43.8372 ], [ 4.3739, 43.8373 ], [ 4.3738, 43.8375 ], [ 4.3737, 43.8377 ], [ 4.3733, 43.8383 ], [ 4.3745, 43.8382 ], [ 4.3752, 43.8381 ], [ 4.3753, 43.838 ], [ 4.3752, 43.8381 ], [ 4.3748, 43.8384 ], [ 4.3745, 43.8387 ], [ 4.3741, 43.839 ], [ 4.3746, 43.8391 ], [ 4.375, 43.8391 ], [ 4.3756, 43.8386 ], [ 4.3757, 43.8386 ], [ 4.3756, 43.838 ], [ 4.376, 43.838 ], [ 4.3762, 43.8376 ], [ 4.3765, 43.8374 ], [ 4.3768, 43.8375 ], [ 4.3767, 43.838 ], [ 4.3768, 43.838 ], [ 4.377, 43.8385 ], [ 4.377, 43.8388 ], [ 4.3771, 43.8394 ], [ 4.3773, 43.8394 ], [ 4.3777, 43.8394 ], [ 4.3777, 43.8391 ], [ 4.3781, 43.839 ], [ 4.3777, 43.8383 ], [ 4.378, 43.8382 ], [ 4.3778, 43.8379 ], [ 4.3779, 43.8379 ], [ 4.3789, 43.8378 ], [ 4.3788, 43.8367 ], [ 4.3784, 43.8369 ], [ 4.3781, 43.8371 ], [ 4.3776, 43.8366 ], [ 4.3774, 43.8363 ], [ 4.3768, 43.8369 ], [ 4.3764, 43.8372 ], [ 4.3759, 43.837 ], [ 4.376, 43.8369 ], [ 4.3761, 43.8368 ], [ 4.3764, 43.8365 ], [ 4.3762, 43.8364 ], [ 4.3758, 43.8361 ], [ 4.3739, 43.8369 ], [ 4.3741, 43.8372 ] ] ], "type": "Polygon" }, "id": "19", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030007", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Route De Beaucaire" }, "type": "Feature" }, { "bbox": [ 1.3974, 43.592, 1.4081, 43.5977 ], "geometry": { "coordinates": [ [ [ 1.4005, 43.5923 ], [ 1.3994, 43.592 ], [ 1.3994, 43.592 ], [ 1.3993, 43.5921 ], [ 1.3992, 43.5922 ], [ 1.3991, 43.5923 ], [ 1.3989, 43.5928 ], [ 1.3984, 43.5935 ], [ 1.3983, 43.5938 ], [ 1.3982, 43.5945 ], [ 1.398, 43.5944 ], [ 1.3979, 43.5947 ], [ 1.3978, 43.5948 ], [ 1.3977, 43.5953 ], [ 1.3977, 43.5954 ], [ 1.3976, 43.5959 ], [ 1.3975, 43.596 ], [ 1.3976, 43.596 ], [ 1.3976, 43.5962 ], [ 1.3976, 43.5963 ], [ 1.3975, 43.5967 ], [ 1.3974, 43.5972 ], [ 1.3974, 43.5977 ], [ 1.3975, 43.5975 ], [ 1.3976, 43.5975 ], [ 1.3977, 43.5974 ], [ 1.3977, 43.5974 ], [ 1.3982, 43.5971 ], [ 1.3987, 43.5969 ], [ 1.3991, 43.5967 ], [ 1.3992, 43.5967 ], [ 1.3993, 43.5967 ], [ 1.4, 43.5968 ], [ 1.4002, 43.5969 ], [ 1.4002, 43.5969 ], [ 1.4004, 43.5966 ], [ 1.4005, 43.5962 ], [ 1.4006, 43.5962 ], [ 1.4006, 43.5962 ], [ 1.4007, 43.5961 ], [ 1.4011, 43.5961 ], [ 1.4012, 43.5961 ], [ 1.4013, 43.5961 ], [ 1.4023, 43.5961 ], [ 1.4025, 43.5961 ], [ 1.403, 43.5965 ], [ 1.4038, 43.5965 ], [ 1.4039, 43.5959 ], [ 1.404, 43.5954 ], [ 1.4042, 43.5954 ], [ 1.4043, 43.5952 ], [ 1.4045, 43.5951 ], [ 1.4047, 43.5949 ], [ 1.4054, 43.5945 ], [ 1.4058, 43.5944 ], [ 1.4058, 43.5944 ], [ 1.4069, 43.5939 ], [ 1.4077, 43.5938 ], [ 1.4078, 43.5937 ], [ 1.4078, 43.5937 ], [ 1.4081, 43.5936 ], [ 1.4079, 43.5936 ], [ 1.407, 43.5934 ], [ 1.4043, 43.5929 ], [ 1.402, 43.5925 ], [ 1.4019, 43.5925 ], [ 1.4016, 43.5925 ], [ 1.4005, 43.5923 ] ] ], "type": "Polygon" }, "id": "20", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031012", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Cépière Beauregard" }, "type": "Feature" }, { "bbox": [ 4.3709, 43.825, 4.3853, 43.834 ], "geometry": { "coordinates": [ [ [ 4.3811, 43.8269 ], [ 4.3805, 43.8276 ], [ 4.3816, 43.8281 ], [ 4.3818, 43.8282 ], [ 4.3826, 43.8285 ], [ 4.3822, 43.8289 ], [ 4.3813, 43.8285 ], [ 4.3809, 43.829 ], [ 4.3805, 43.8294 ], [ 4.3802, 43.8298 ], [ 4.3798, 43.8297 ], [ 4.3795, 43.8295 ], [ 4.3793, 43.8293 ], [ 4.379, 43.8292 ], [ 4.3785, 43.8288 ], [ 4.3783, 43.8286 ], [ 4.378, 43.8288 ], [ 4.3776, 43.8287 ], [ 4.3772, 43.8285 ], [ 4.3771, 43.8285 ], [ 4.3771, 43.8284 ], [ 4.3773, 43.8283 ], [ 4.3776, 43.8279 ], [ 4.3768, 43.8273 ], [ 4.3771, 43.8271 ], [ 4.3768, 43.8267 ], [ 4.3766, 43.8268 ], [ 4.3765, 43.8266 ], [ 4.3764, 43.8267 ], [ 4.3763, 43.8267 ], [ 4.3761, 43.8265 ], [ 4.376, 43.8266 ], [ 4.3752, 43.827 ], [ 4.375, 43.8273 ], [ 4.3745, 43.8273 ], [ 4.3743, 43.8272 ], [ 4.3741, 43.827 ], [ 4.3735, 43.8266 ], [ 4.3745, 43.8257 ], [ 4.3734, 43.8251 ], [ 4.3733, 43.8251 ], [ 4.3732, 43.8251 ], [ 4.3731, 43.8253 ], [ 4.3722, 43.826 ], [ 4.3721, 43.826 ], [ 4.3719, 43.8261 ], [ 4.3717, 43.8264 ], [ 4.3717, 43.8265 ], [ 4.3718, 43.8266 ], [ 4.3718, 43.8267 ], [ 4.3717, 43.8268 ], [ 4.3717, 43.8268 ], [ 4.3717, 43.8268 ], [ 4.3719, 43.8269 ], [ 4.372, 43.827 ], [ 4.3719, 43.8271 ], [ 4.3719, 43.8272 ], [ 4.3718, 43.8273 ], [ 4.3716, 43.8274 ], [ 4.3716, 43.8274 ], [ 4.3713, 43.8275 ], [ 4.3711, 43.8276 ], [ 4.3709, 43.8277 ], [ 4.3712, 43.8279 ], [ 4.3715, 43.8277 ], [ 4.3717, 43.8278 ], [ 4.3719, 43.8278 ], [ 4.3721, 43.8276 ], [ 4.3724, 43.8278 ], [ 4.3732, 43.8283 ], [ 4.3742, 43.8277 ], [ 4.3743, 43.8276 ], [ 4.3743, 43.8275 ], [ 4.3744, 43.8275 ], [ 4.3748, 43.8275 ], [ 4.3752, 43.8275 ], [ 4.3756, 43.8277 ], [ 4.376, 43.828 ], [ 4.3787, 43.8296 ], [ 4.3793, 43.8299 ], [ 4.3801, 43.8304 ], [ 4.3796, 43.8309 ], [ 4.379, 43.8306 ], [ 4.3783, 43.8312 ], [ 4.3803, 43.8323 ], [ 4.3802, 43.8325 ], [ 4.3801, 43.8326 ], [ 4.3799, 43.833 ], [ 4.3798, 43.8331 ], [ 4.3809, 43.8337 ], [ 4.3815, 43.834 ], [ 4.3828, 43.8331 ], [ 4.3837, 43.8336 ], [ 4.384, 43.8332 ], [ 4.3834, 43.8328 ], [ 4.3823, 43.8321 ], [ 4.3825, 43.8319 ], [ 4.3818, 43.8316 ], [ 4.3812, 43.8313 ], [ 4.3811, 43.8312 ], [ 4.3817, 43.8308 ], [ 4.3819, 43.8306 ], [ 4.3825, 43.8299 ], [ 4.3827, 43.8297 ], [ 4.3819, 43.8294 ], [ 4.382, 43.8293 ], [ 4.382, 43.8293 ], [ 4.3826, 43.8291 ], [ 4.3831, 43.8288 ], [ 4.3832, 43.8287 ], [ 4.3836, 43.8284 ], [ 4.384, 43.8279 ], [ 4.3844, 43.8273 ], [ 4.3849, 43.8268 ], [ 4.3853, 43.8264 ], [ 4.385, 43.8264 ], [ 4.3848, 43.8264 ], [ 4.3845, 43.8263 ], [ 4.384, 43.8261 ], [ 4.3835, 43.8259 ], [ 4.3827, 43.8255 ], [ 4.3818, 43.8251 ], [ 4.3816, 43.825 ], [ 4.3814, 43.825 ], [ 4.3813, 43.8251 ], [ 4.3813, 43.8253 ], [ 4.3814, 43.8253 ], [ 4.3821, 43.8257 ], [ 4.382, 43.8258 ], [ 4.3816, 43.8264 ], [ 4.3811, 43.8269 ] ] ], "type": "Polygon" }, "id": "21", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030008", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Némausus-Jonquilles - Haute Magaille - Oliviers" }, "type": "Feature" }, { "bbox": [ 2.3249, 43.2066, 2.3357, 43.2114 ], "geometry": { "coordinates": [ [ [ 2.3351, 43.21 ], [ 2.335, 43.2098 ], [ 2.335, 43.2095 ], [ 2.3357, 43.2094 ], [ 2.3357, 43.2092 ], [ 2.3356, 43.2089 ], [ 2.3351, 43.2089 ], [ 2.335, 43.2089 ], [ 2.335, 43.2088 ], [ 2.335, 43.2087 ], [ 2.335, 43.2085 ], [ 2.335, 43.2081 ], [ 2.3349, 43.208 ], [ 2.3339, 43.2081 ], [ 2.3332, 43.2083 ], [ 2.3324, 43.2084 ], [ 2.3321, 43.2085 ], [ 2.3321, 43.2081 ], [ 2.3317, 43.2082 ], [ 2.3305, 43.2082 ], [ 2.3303, 43.2082 ], [ 2.3302, 43.2082 ], [ 2.3296, 43.2083 ], [ 2.3289, 43.2083 ], [ 2.3289, 43.2081 ], [ 2.3287, 43.208 ], [ 2.3285, 43.208 ], [ 2.3283, 43.2079 ], [ 2.3279, 43.2076 ], [ 2.3279, 43.2075 ], [ 2.3277, 43.2075 ], [ 2.3276, 43.2075 ], [ 2.3276, 43.2074 ], [ 2.3275, 43.2074 ], [ 2.3272, 43.2072 ], [ 2.327, 43.2071 ], [ 2.3269, 43.207 ], [ 2.3268, 43.2069 ], [ 2.3268, 43.2066 ], [ 2.3264, 43.2066 ], [ 2.3265, 43.2069 ], [ 2.3265, 43.207 ], [ 2.3265, 43.2071 ], [ 2.3265, 43.2073 ], [ 2.3258, 43.2073 ], [ 2.3249, 43.2073 ], [ 2.3251, 43.2074 ], [ 2.3252, 43.2076 ], [ 2.3255, 43.2078 ], [ 2.3258, 43.208 ], [ 2.3262, 43.2083 ], [ 2.3263, 43.2084 ], [ 2.3266, 43.2087 ], [ 2.3272, 43.2092 ], [ 2.3275, 43.2094 ], [ 2.3278, 43.2096 ], [ 2.3281, 43.2099 ], [ 2.3286, 43.2104 ], [ 2.3287, 43.2104 ], [ 2.3293, 43.2109 ], [ 2.3297, 43.2112 ], [ 2.3299, 43.2114 ], [ 2.3304, 43.2113 ], [ 2.3304, 43.2113 ], [ 2.3305, 43.2113 ], [ 2.3305, 43.211 ], [ 2.3304, 43.2095 ], [ 2.3305, 43.2095 ], [ 2.3313, 43.2094 ], [ 2.332, 43.2094 ], [ 2.3324, 43.2094 ], [ 2.3324, 43.21 ], [ 2.3333, 43.2099 ], [ 2.3333, 43.2101 ], [ 2.3338, 43.2101 ], [ 2.3351, 43.21 ] ] ], "type": "Polygon" }, "id": "22", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011003", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Le Viguier - Saint-Jacques" }, "type": "Feature" }, { "bbox": [ 1.3251, 43.6093, 1.3344, 43.6178 ], "geometry": { "coordinates": [ [ [ 1.3338, 43.6133 ], [ 1.3339, 43.6133 ], [ 1.3339, 43.6132 ], [ 1.3338, 43.6131 ], [ 1.3338, 43.613 ], [ 1.3339, 43.6129 ], [ 1.3344, 43.6128 ], [ 1.3342, 43.6123 ], [ 1.3341, 43.6122 ], [ 1.334, 43.6121 ], [ 1.3338, 43.6116 ], [ 1.3337, 43.6115 ], [ 1.3336, 43.6115 ], [ 1.3333, 43.6116 ], [ 1.3333, 43.6117 ], [ 1.3328, 43.6118 ], [ 1.3326, 43.6117 ], [ 1.3324, 43.6117 ], [ 1.3319, 43.6118 ], [ 1.3319, 43.6119 ], [ 1.332, 43.6122 ], [ 1.3319, 43.6123 ], [ 1.3319, 43.6123 ], [ 1.3317, 43.6123 ], [ 1.3315, 43.6123 ], [ 1.3316, 43.6124 ], [ 1.3311, 43.6125 ], [ 1.331, 43.6125 ], [ 1.331, 43.6124 ], [ 1.3309, 43.6123 ], [ 1.3308, 43.6121 ], [ 1.3306, 43.6119 ], [ 1.3293, 43.6109 ], [ 1.3274, 43.6094 ], [ 1.3273, 43.6093 ], [ 1.3272, 43.6093 ], [ 1.3271, 43.6093 ], [ 1.3269, 43.6094 ], [ 1.3267, 43.6094 ], [ 1.3265, 43.6093 ], [ 1.3263, 43.6093 ], [ 1.3262, 43.6093 ], [ 1.3257, 43.6096 ], [ 1.3256, 43.6097 ], [ 1.3256, 43.6099 ], [ 1.3253, 43.6099 ], [ 1.3251, 43.61 ], [ 1.3254, 43.6105 ], [ 1.3256, 43.6107 ], [ 1.3254, 43.6108 ], [ 1.3256, 43.6111 ], [ 1.3256, 43.6111 ], [ 1.3258, 43.611 ], [ 1.3262, 43.6108 ], [ 1.3264, 43.6111 ], [ 1.3265, 43.6114 ], [ 1.3266, 43.6119 ], [ 1.3266, 43.6121 ], [ 1.3267, 43.6122 ], [ 1.3268, 43.6122 ], [ 1.327, 43.6129 ], [ 1.3273, 43.6129 ], [ 1.3272, 43.613 ], [ 1.3275, 43.6132 ], [ 1.3274, 43.6133 ], [ 1.3273, 43.6134 ], [ 1.3268, 43.6136 ], [ 1.3269, 43.6138 ], [ 1.3271, 43.614 ], [ 1.3272, 43.6141 ], [ 1.3274, 43.6142 ], [ 1.328, 43.6143 ], [ 1.3283, 43.6144 ], [ 1.3281, 43.6145 ], [ 1.3279, 43.6146 ], [ 1.3282, 43.615 ], [ 1.3264, 43.6158 ], [ 1.3263, 43.6159 ], [ 1.3262, 43.616 ], [ 1.3266, 43.6163 ], [ 1.3272, 43.6167 ], [ 1.3273, 43.6169 ], [ 1.3274, 43.6172 ], [ 1.3274, 43.6174 ], [ 1.3272, 43.6176 ], [ 1.3272, 43.6178 ], [ 1.3281, 43.6177 ], [ 1.3288, 43.6175 ], [ 1.3294, 43.6173 ], [ 1.3293, 43.6172 ], [ 1.3292, 43.6169 ], [ 1.3291, 43.6165 ], [ 1.3288, 43.6154 ], [ 1.3287, 43.6151 ], [ 1.3287, 43.615 ], [ 1.3285, 43.6149 ], [ 1.3288, 43.6148 ], [ 1.3309, 43.6145 ], [ 1.3315, 43.6144 ], [ 1.3314, 43.6143 ], [ 1.3312, 43.6139 ], [ 1.3311, 43.6134 ], [ 1.3314, 43.6132 ], [ 1.3316, 43.6132 ], [ 1.3318, 43.6129 ], [ 1.3319, 43.6128 ], [ 1.3321, 43.6131 ], [ 1.3323, 43.6137 ], [ 1.3323, 43.6137 ], [ 1.3327, 43.6136 ], [ 1.333, 43.6136 ], [ 1.3333, 43.6135 ], [ 1.3338, 43.6133 ] ] ], "type": "Polygon" }, "id": "23", "properties": { "code_commune": "31149", "code_departement": "31", "code_qp": "QP031005", "commune_qp": "Colomiers", "nom_commune": "Colomiers", "nom_qp": "Val D'Aran - Poitou - Pyrénées" }, "type": "Feature" }, { "bbox": [ 1.0964, 44.098, 1.1024, 44.1054 ], "geometry": { "coordinates": [ [ [ 1.1, 44.1052 ], [ 1.0996, 44.1045 ], [ 1.1001, 44.1044 ], [ 1.1, 44.1041 ], [ 1.1, 44.1041 ], [ 1.0999, 44.104 ], [ 1.1004, 44.104 ], [ 1.1016, 44.1039 ], [ 1.1017, 44.1032 ], [ 1.1017, 44.103 ], [ 1.1021, 44.1007 ], [ 1.1022, 44.1 ], [ 1.1022, 44.1 ], [ 1.1024, 44.0988 ], [ 1.1019, 44.0987 ], [ 1.1017, 44.0989 ], [ 1.1014, 44.0991 ], [ 1.1017, 44.0993 ], [ 1.1013, 44.0997 ], [ 1.1006, 44.0991 ], [ 1.1006, 44.099 ], [ 1.101, 44.0988 ], [ 1.1, 44.098 ], [ 1.0997, 44.0981 ], [ 1.0996, 44.0981 ], [ 1.0995, 44.0982 ], [ 1.0995, 44.0982 ], [ 1.0995, 44.0983 ], [ 1.1015, 44.0999 ], [ 1.1016, 44.1001 ], [ 1.1011, 44.1001 ], [ 1.1002, 44.1004 ], [ 1.0999, 44.1004 ], [ 1.0998, 44.1005 ], [ 1.0994, 44.1006 ], [ 1.0994, 44.1008 ], [ 1.0996, 44.1012 ], [ 1.099, 44.1013 ], [ 1.0986, 44.1014 ], [ 1.0984, 44.1014 ], [ 1.0983, 44.1012 ], [ 1.0983, 44.1011 ], [ 1.0978, 44.1013 ], [ 1.0977, 44.1013 ], [ 1.0967, 44.1017 ], [ 1.0969, 44.102 ], [ 1.098, 44.1018 ], [ 1.0984, 44.1027 ], [ 1.0979, 44.1028 ], [ 1.0978, 44.1029 ], [ 1.0975, 44.1036 ], [ 1.0974, 44.1036 ], [ 1.0974, 44.103 ], [ 1.0974, 44.1029 ], [ 1.0966, 44.1031 ], [ 1.0964, 44.1031 ], [ 1.0965, 44.1045 ], [ 1.0975, 44.1043 ], [ 1.0979, 44.1042 ], [ 1.0982, 44.1042 ], [ 1.0986, 44.1042 ], [ 1.0986, 44.1042 ], [ 1.0986, 44.1044 ], [ 1.0987, 44.1045 ], [ 1.0988, 44.1045 ], [ 1.0989, 44.1046 ], [ 1.099, 44.1047 ], [ 1.0992, 44.1047 ], [ 1.0993, 44.1048 ], [ 1.0994, 44.105 ], [ 1.0995, 44.1052 ], [ 1.0996, 44.1054 ], [ 1.1, 44.1052 ] ] ], "type": "Polygon" }, "id": "24", "properties": { "code_commune": "82112", "code_departement": "82", "code_qp": "QP082004", "commune_qp": "Moissac", "nom_commune": "Moissac", "nom_qp": "Sarlac" }, "type": "Feature" }, { "bbox": [ 1.4363, 43.5742, 1.4452, 43.584 ], "geometry": { "coordinates": [ [ [ 1.4389, 43.5821 ], [ 1.4392, 43.5824 ], [ 1.4394, 43.5832 ], [ 1.4396, 43.584 ], [ 1.4415, 43.5839 ], [ 1.4437, 43.5838 ], [ 1.4441, 43.5839 ], [ 1.4444, 43.5839 ], [ 1.4444, 43.5833 ], [ 1.4445, 43.5833 ], [ 1.4445, 43.5832 ], [ 1.4445, 43.5832 ], [ 1.4445, 43.5831 ], [ 1.4445, 43.5829 ], [ 1.4444, 43.5829 ], [ 1.4444, 43.5828 ], [ 1.4445, 43.5828 ], [ 1.4444, 43.5827 ], [ 1.4444, 43.5826 ], [ 1.4443, 43.5826 ], [ 1.4443, 43.5824 ], [ 1.4446, 43.5825 ], [ 1.4446, 43.5824 ], [ 1.4443, 43.5824 ], [ 1.4443, 43.5822 ], [ 1.4444, 43.5822 ], [ 1.4444, 43.5821 ], [ 1.4445, 43.5821 ], [ 1.4446, 43.5819 ], [ 1.4446, 43.5816 ], [ 1.4447, 43.5814 ], [ 1.4448, 43.5813 ], [ 1.4443, 43.5812 ], [ 1.4448, 43.5807 ], [ 1.4452, 43.5803 ], [ 1.4449, 43.5803 ], [ 1.4446, 43.5802 ], [ 1.4445, 43.5803 ], [ 1.4443, 43.5803 ], [ 1.4443, 43.5806 ], [ 1.444, 43.5806 ], [ 1.4436, 43.5806 ], [ 1.4435, 43.58 ], [ 1.4434, 43.5796 ], [ 1.4432, 43.5787 ], [ 1.4432, 43.5784 ], [ 1.4429, 43.578 ], [ 1.4431, 43.5778 ], [ 1.4435, 43.5777 ], [ 1.4441, 43.5771 ], [ 1.4446, 43.5765 ], [ 1.444, 43.576 ], [ 1.4439, 43.576 ], [ 1.443, 43.5761 ], [ 1.443, 43.5761 ], [ 1.4429, 43.5763 ], [ 1.4428, 43.5774 ], [ 1.4426, 43.5774 ], [ 1.4408, 43.5777 ], [ 1.4408, 43.5772 ], [ 1.4418, 43.5769 ], [ 1.4416, 43.5766 ], [ 1.4415, 43.5766 ], [ 1.4414, 43.5764 ], [ 1.4411, 43.5762 ], [ 1.4413, 43.5761 ], [ 1.4407, 43.5756 ], [ 1.4406, 43.5754 ], [ 1.4402, 43.5751 ], [ 1.4387, 43.5742 ], [ 1.438, 43.5744 ], [ 1.4374, 43.5746 ], [ 1.4377, 43.575 ], [ 1.4363, 43.5755 ], [ 1.4363, 43.5771 ], [ 1.4366, 43.5785 ], [ 1.4369, 43.5792 ], [ 1.4376, 43.5802 ], [ 1.4385, 43.5813 ], [ 1.4389, 43.5821 ] ] ], "type": "Polygon" }, "id": "25", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031010", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Empalot" }, "type": "Feature" }, { "bbox": [ 2.8651, 42.6886, 2.8724, 42.6985 ], "geometry": { "coordinates": [ [ [ 2.8724, 42.6973 ], [ 2.8723, 42.6972 ], [ 2.8721, 42.6972 ], [ 2.8718, 42.6972 ], [ 2.8716, 42.6972 ], [ 2.8714, 42.6972 ], [ 2.8712, 42.6971 ], [ 2.871, 42.6971 ], [ 2.871, 42.6971 ], [ 2.8709, 42.697 ], [ 2.8709, 42.6967 ], [ 2.8709, 42.6966 ], [ 2.8709, 42.6964 ], [ 2.8709, 42.6962 ], [ 2.8709, 42.696 ], [ 2.8709, 42.696 ], [ 2.8705, 42.696 ], [ 2.8705, 42.6959 ], [ 2.8704, 42.6958 ], [ 2.8704, 42.6956 ], [ 2.8704, 42.6955 ], [ 2.8703, 42.6953 ], [ 2.8703, 42.6952 ], [ 2.8702, 42.6949 ], [ 2.8703, 42.6948 ], [ 2.8703, 42.6946 ], [ 2.8703, 42.6945 ], [ 2.8704, 42.6945 ], [ 2.8705, 42.6944 ], [ 2.8706, 42.6944 ], [ 2.8707, 42.6944 ], [ 2.8707, 42.6943 ], [ 2.8708, 42.6943 ], [ 2.8709, 42.6942 ], [ 2.8709, 42.6942 ], [ 2.8709, 42.6941 ], [ 2.8708, 42.694 ], [ 2.8708, 42.694 ], [ 2.8707, 42.6938 ], [ 2.8705, 42.6935 ], [ 2.8704, 42.6933 ], [ 2.8703, 42.6932 ], [ 2.8703, 42.6932 ], [ 2.8703, 42.6932 ], [ 2.8702, 42.693 ], [ 2.8703, 42.6926 ], [ 2.8702, 42.6924 ], [ 2.8702, 42.692 ], [ 2.8703, 42.6921 ], [ 2.8706, 42.6918 ], [ 2.8705, 42.6918 ], [ 2.8697, 42.6914 ], [ 2.8693, 42.6912 ], [ 2.8695, 42.6908 ], [ 2.8698, 42.6904 ], [ 2.8702, 42.6901 ], [ 2.8702, 42.69 ], [ 2.8701, 42.69 ], [ 2.8701, 42.6899 ], [ 2.8698, 42.6897 ], [ 2.8693, 42.6894 ], [ 2.8681, 42.6889 ], [ 2.8665, 42.6886 ], [ 2.8659, 42.6892 ], [ 2.8657, 42.6891 ], [ 2.8651, 42.6897 ], [ 2.8661, 42.6902 ], [ 2.8663, 42.6902 ], [ 2.8665, 42.69 ], [ 2.8673, 42.6904 ], [ 2.8671, 42.6906 ], [ 2.867, 42.6907 ], [ 2.8667, 42.6908 ], [ 2.8664, 42.6908 ], [ 2.8669, 42.6917 ], [ 2.8668, 42.6917 ], [ 2.867, 42.6919 ], [ 2.867, 42.692 ], [ 2.8675, 42.692 ], [ 2.8676, 42.6922 ], [ 2.8677, 42.6923 ], [ 2.8679, 42.693 ], [ 2.8679, 42.693 ], [ 2.868, 42.693 ], [ 2.8681, 42.693 ], [ 2.8683, 42.6933 ], [ 2.8685, 42.6938 ], [ 2.8685, 42.6939 ], [ 2.8687, 42.6943 ], [ 2.8687, 42.6944 ], [ 2.8688, 42.6944 ], [ 2.8688, 42.6945 ], [ 2.869, 42.6944 ], [ 2.8692, 42.6949 ], [ 2.8693, 42.6951 ], [ 2.869, 42.6952 ], [ 2.8691, 42.6955 ], [ 2.8691, 42.6955 ], [ 2.8691, 42.6958 ], [ 2.869, 42.6958 ], [ 2.869, 42.696 ], [ 2.869, 42.696 ], [ 2.8684, 42.6961 ], [ 2.8685, 42.6963 ], [ 2.8685, 42.6963 ], [ 2.8685, 42.6967 ], [ 2.8685, 42.697 ], [ 2.8686, 42.6972 ], [ 2.8686, 42.6972 ], [ 2.8687, 42.6973 ], [ 2.8687, 42.6974 ], [ 2.8691, 42.6975 ], [ 2.8693, 42.6976 ], [ 2.8696, 42.6976 ], [ 2.8704, 42.6978 ], [ 2.8704, 42.6978 ], [ 2.8702, 42.6983 ], [ 2.8708, 42.6984 ], [ 2.8714, 42.6984 ], [ 2.8717, 42.6985 ], [ 2.8719, 42.6985 ], [ 2.872, 42.6982 ], [ 2.8723, 42.698 ], [ 2.8724, 42.6973 ] ] ], "type": "Polygon" }, "id": "26", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066002", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Saint Assiscle" }, "type": "Feature" }, { "bbox": [ 1.4277, 43.6221, 1.4323, 43.6243 ], "geometry": { "coordinates": [ [ [ 1.4277, 43.6222 ], [ 1.4277, 43.6225 ], [ 1.4278, 43.6233 ], [ 1.4277, 43.6235 ], [ 1.4277, 43.6236 ], [ 1.4277, 43.6237 ], [ 1.4277, 43.6238 ], [ 1.4282, 43.624 ], [ 1.4285, 43.6237 ], [ 1.4294, 43.624 ], [ 1.4295, 43.6235 ], [ 1.4305, 43.6238 ], [ 1.4305, 43.624 ], [ 1.4304, 43.6242 ], [ 1.4309, 43.6243 ], [ 1.431, 43.6242 ], [ 1.4311, 43.624 ], [ 1.4318, 43.6241 ], [ 1.432, 43.6237 ], [ 1.4322, 43.6233 ], [ 1.4323, 43.6232 ], [ 1.431, 43.6229 ], [ 1.4311, 43.6228 ], [ 1.4313, 43.6224 ], [ 1.4312, 43.6223 ], [ 1.4307, 43.6221 ], [ 1.4304, 43.6223 ], [ 1.4303, 43.6223 ], [ 1.4301, 43.6223 ], [ 1.43, 43.6223 ], [ 1.4298, 43.6223 ], [ 1.4298, 43.6223 ], [ 1.4288, 43.6223 ], [ 1.4277, 43.6222 ] ] ], "type": "Polygon" }, "id": "27", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031009", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Bourbaki" }, "type": "Feature" }, { "bbox": [ 2.8755, 42.7021, 2.8828, 42.7073 ], "geometry": { "coordinates": [ [ [ 2.8763, 42.7073 ], [ 2.8766, 42.7073 ], [ 2.8774, 42.7072 ], [ 2.8781, 42.7068 ], [ 2.8783, 42.7067 ], [ 2.8788, 42.7065 ], [ 2.879, 42.7064 ], [ 2.8803, 42.7064 ], [ 2.8804, 42.7064 ], [ 2.8803, 42.7065 ], [ 2.8803, 42.7066 ], [ 2.8814, 42.707 ], [ 2.8815, 42.7069 ], [ 2.8815, 42.7069 ], [ 2.8816, 42.7068 ], [ 2.8817, 42.7067 ], [ 2.8818, 42.7066 ], [ 2.8819, 42.7065 ], [ 2.882, 42.7064 ], [ 2.882, 42.7062 ], [ 2.8821, 42.7062 ], [ 2.8822, 42.7062 ], [ 2.8824, 42.7055 ], [ 2.8824, 42.7053 ], [ 2.8828, 42.7053 ], [ 2.8828, 42.7052 ], [ 2.8828, 42.7051 ], [ 2.8827, 42.7051 ], [ 2.8826, 42.705 ], [ 2.8825, 42.7049 ], [ 2.8825, 42.7044 ], [ 2.8823, 42.7043 ], [ 2.8822, 42.7043 ], [ 2.8821, 42.7043 ], [ 2.8821, 42.7042 ], [ 2.8819, 42.7042 ], [ 2.8816, 42.7041 ], [ 2.8815, 42.7041 ], [ 2.8813, 42.7044 ], [ 2.8812, 42.7044 ], [ 2.881, 42.7044 ], [ 2.8804, 42.7044 ], [ 2.8803, 42.7045 ], [ 2.8802, 42.7045 ], [ 2.8802, 42.7044 ], [ 2.8802, 42.7042 ], [ 2.8802, 42.7039 ], [ 2.8802, 42.7029 ], [ 2.8802, 42.7026 ], [ 2.8803, 42.7023 ], [ 2.8803, 42.7021 ], [ 2.88, 42.7021 ], [ 2.8796, 42.7022 ], [ 2.8795, 42.7022 ], [ 2.8794, 42.7023 ], [ 2.8792, 42.7024 ], [ 2.8789, 42.7026 ], [ 2.8786, 42.7027 ], [ 2.8784, 42.7028 ], [ 2.8783, 42.703 ], [ 2.8783, 42.7031 ], [ 2.8781, 42.7041 ], [ 2.8781, 42.7043 ], [ 2.8781, 42.7044 ], [ 2.8781, 42.7046 ], [ 2.8781, 42.7048 ], [ 2.878, 42.7049 ], [ 2.878, 42.7051 ], [ 2.8779, 42.7052 ], [ 2.8778, 42.7054 ], [ 2.8777, 42.7055 ], [ 2.8776, 42.7055 ], [ 2.8775, 42.7055 ], [ 2.8774, 42.7055 ], [ 2.8767, 42.7053 ], [ 2.8764, 42.7053 ], [ 2.8761, 42.7054 ], [ 2.8759, 42.7056 ], [ 2.8758, 42.7056 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7058 ], [ 2.8756, 42.7059 ], [ 2.8755, 42.7062 ], [ 2.8755, 42.7063 ], [ 2.8756, 42.7063 ], [ 2.876, 42.7069 ], [ 2.8763, 42.7073 ], [ 2.8763, 42.7073 ], [ 2.8763, 42.7073 ] ] ], "type": "Polygon" }, "id": "28", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066004", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Bas-Vernet Ancien Zus" }, "type": "Feature" }, { "bbox": [ 3.1999, 43.3319, 3.2299, 43.3509 ], "geometry": { "coordinates": [ [ [ 3.2251, 43.3387 ], [ 3.2251, 43.3386 ], [ 3.2253, 43.3386 ], [ 3.2257, 43.3386 ], [ 3.2259, 43.3385 ], [ 3.2261, 43.3384 ], [ 3.2264, 43.3383 ], [ 3.2264, 43.3382 ], [ 3.2262, 43.3378 ], [ 3.2262, 43.3377 ], [ 3.2262, 43.3377 ], [ 3.2262, 43.3377 ], [ 3.2265, 43.3375 ], [ 3.2265, 43.3375 ], [ 3.2264, 43.3373 ], [ 3.2272, 43.3368 ], [ 3.2273, 43.3368 ], [ 3.2279, 43.3364 ], [ 3.2282, 43.3366 ], [ 3.2287, 43.337 ], [ 3.2294, 43.3365 ], [ 3.2296, 43.3364 ], [ 3.2298, 43.3362 ], [ 3.2299, 43.3361 ], [ 3.2299, 43.3361 ], [ 3.2298, 43.3358 ], [ 3.2295, 43.3352 ], [ 3.2294, 43.3349 ], [ 3.2288, 43.3345 ], [ 3.2272, 43.3355 ], [ 3.227, 43.3355 ], [ 3.2269, 43.3356 ], [ 3.2265, 43.3358 ], [ 3.2264, 43.3359 ], [ 3.2262, 43.336 ], [ 3.2257, 43.3363 ], [ 3.2254, 43.3365 ], [ 3.2249, 43.3368 ], [ 3.2247, 43.3368 ], [ 3.223, 43.3378 ], [ 3.2228, 43.3379 ], [ 3.2219, 43.3384 ], [ 3.2214, 43.3387 ], [ 3.2212, 43.3389 ], [ 3.2206, 43.3392 ], [ 3.2203, 43.3394 ], [ 3.2203, 43.3393 ], [ 3.2202, 43.3391 ], [ 3.2202, 43.3391 ], [ 3.2197, 43.3391 ], [ 3.2196, 43.3391 ], [ 3.2195, 43.3392 ], [ 3.2195, 43.3392 ], [ 3.2195, 43.3392 ], [ 3.2189, 43.339 ], [ 3.2184, 43.3389 ], [ 3.2184, 43.3388 ], [ 3.2188, 43.3384 ], [ 3.2191, 43.338 ], [ 3.2191, 43.338 ], [ 3.2191, 43.3379 ], [ 3.2191, 43.3376 ], [ 3.219, 43.3374 ], [ 3.219, 43.3371 ], [ 3.2189, 43.337 ], [ 3.2189, 43.3352 ], [ 3.2219, 43.3348 ], [ 3.2221, 43.3346 ], [ 3.2222, 43.3344 ], [ 3.2228, 43.3339 ], [ 3.2235, 43.3334 ], [ 3.224, 43.3331 ], [ 3.2239, 43.3331 ], [ 3.2226, 43.3332 ], [ 3.2215, 43.3332 ], [ 3.2191, 43.3327 ], [ 3.2177, 43.3322 ], [ 3.2161, 43.3329 ], [ 3.2158, 43.333 ], [ 3.2153, 43.3335 ], [ 3.2134, 43.3351 ], [ 3.2128, 43.3355 ], [ 3.2117, 43.3349 ], [ 3.2116, 43.3348 ], [ 3.2114, 43.3347 ], [ 3.2113, 43.3346 ], [ 3.211, 43.3345 ], [ 3.2107, 43.3344 ], [ 3.2106, 43.3344 ], [ 3.2105, 43.3345 ], [ 3.2104, 43.3345 ], [ 3.2101, 43.3347 ], [ 3.2101, 43.3346 ], [ 3.2099, 43.3345 ], [ 3.2095, 43.3342 ], [ 3.2092, 43.3345 ], [ 3.2088, 43.3347 ], [ 3.2087, 43.3348 ], [ 3.2081, 43.3349 ], [ 3.2075, 43.3351 ], [ 3.2074, 43.335 ], [ 3.207, 43.3347 ], [ 3.2068, 43.3345 ], [ 3.2064, 43.3342 ], [ 3.2055, 43.3335 ], [ 3.2051, 43.3332 ], [ 3.2047, 43.333 ], [ 3.2039, 43.3325 ], [ 3.2034, 43.3322 ], [ 3.2029, 43.332 ], [ 3.2027, 43.3319 ], [ 3.2026, 43.332 ], [ 3.2027, 43.3321 ], [ 3.2027, 43.3321 ], [ 3.203, 43.3325 ], [ 3.2037, 43.3333 ], [ 3.2036, 43.3333 ], [ 3.2014, 43.3342 ], [ 3.2014, 43.3342 ], [ 3.2012, 43.3343 ], [ 3.2012, 43.3343 ], [ 3.2012, 43.3344 ], [ 3.2011, 43.3345 ], [ 3.2009, 43.3347 ], [ 3.2008, 43.3348 ], [ 3.2004, 43.3351 ], [ 3.2002, 43.3354 ], [ 3.1999, 43.3356 ], [ 3.2007, 43.336 ], [ 3.2008, 43.336 ], [ 3.201, 43.3361 ], [ 3.2023, 43.3367 ], [ 3.2025, 43.3368 ], [ 3.2023, 43.337 ], [ 3.2022, 43.3371 ], [ 3.2019, 43.3374 ], [ 3.2019, 43.3375 ], [ 3.2019, 43.3376 ], [ 3.2018, 43.3376 ], [ 3.2019, 43.3377 ], [ 3.2019, 43.3377 ], [ 3.2019, 43.3377 ], [ 3.202, 43.3378 ], [ 3.2023, 43.3378 ], [ 3.2031, 43.3378 ], [ 3.2034, 43.338 ], [ 3.2035, 43.3382 ], [ 3.2037, 43.3385 ], [ 3.2043, 43.3384 ], [ 3.2044, 43.3384 ], [ 3.2046, 43.3386 ], [ 3.2047, 43.3387 ], [ 3.2052, 43.339 ], [ 3.2053, 43.3391 ], [ 3.2053, 43.3391 ], [ 3.2056, 43.3388 ], [ 3.2058, 43.3386 ], [ 3.2059, 43.3386 ], [ 3.2061, 43.3386 ], [ 3.2063, 43.3387 ], [ 3.2072, 43.3389 ], [ 3.2074, 43.339 ], [ 3.2088, 43.3395 ], [ 3.2088, 43.3396 ], [ 3.2087, 43.3397 ], [ 3.2086, 43.3399 ], [ 3.2086, 43.34 ], [ 3.2085, 43.3401 ], [ 3.2084, 43.3403 ], [ 3.2083, 43.3405 ], [ 3.2081, 43.3408 ], [ 3.208, 43.3411 ], [ 3.2079, 43.3419 ], [ 3.2078, 43.3426 ], [ 3.2082, 43.3426 ], [ 3.2081, 43.343 ], [ 3.2081, 43.3431 ], [ 3.2081, 43.3432 ], [ 3.2082, 43.3434 ], [ 3.2084, 43.3437 ], [ 3.2092, 43.3436 ], [ 3.2092, 43.3438 ], [ 3.2092, 43.344 ], [ 3.2093, 43.3443 ], [ 3.2094, 43.3443 ], [ 3.2096, 43.3443 ], [ 3.2096, 43.3445 ], [ 3.2095, 43.3446 ], [ 3.2096, 43.3447 ], [ 3.2096, 43.3448 ], [ 3.2092, 43.345 ], [ 3.2093, 43.3451 ], [ 3.2096, 43.3454 ], [ 3.2091, 43.3458 ], [ 3.2086, 43.3462 ], [ 3.2083, 43.3464 ], [ 3.2083, 43.3464 ], [ 3.2083, 43.3465 ], [ 3.2083, 43.3466 ], [ 3.2083, 43.3467 ], [ 3.2082, 43.3468 ], [ 3.208, 43.347 ], [ 3.2079, 43.347 ], [ 3.2078, 43.3471 ], [ 3.2082, 43.3475 ], [ 3.2084, 43.3477 ], [ 3.2085, 43.3478 ], [ 3.2086, 43.3479 ], [ 3.2081, 43.348 ], [ 3.208, 43.348 ], [ 3.2077, 43.3481 ], [ 3.2078, 43.3484 ], [ 3.2079, 43.3488 ], [ 3.2079, 43.3491 ], [ 3.2079, 43.3491 ], [ 3.2078, 43.3492 ], [ 3.2077, 43.3492 ], [ 3.2076, 43.3492 ], [ 3.2076, 43.3496 ], [ 3.2076, 43.3497 ], [ 3.2076, 43.35 ], [ 3.2076, 43.3501 ], [ 3.208, 43.35 ], [ 3.2083, 43.35 ], [ 3.2083, 43.3503 ], [ 3.2084, 43.3504 ], [ 3.2084, 43.3506 ], [ 3.2084, 43.3508 ], [ 3.2087, 43.3507 ], [ 3.209, 43.3506 ], [ 3.2093, 43.3506 ], [ 3.2094, 43.3506 ], [ 3.2095, 43.3505 ], [ 3.2096, 43.3505 ], [ 3.2096, 43.3503 ], [ 3.2096, 43.3502 ], [ 3.2096, 43.35 ], [ 3.2096, 43.3498 ], [ 3.2096, 43.3497 ], [ 3.2096, 43.3497 ], [ 3.2096, 43.3494 ], [ 3.2096, 43.3493 ], [ 3.2095, 43.3493 ], [ 3.2093, 43.3493 ], [ 3.209, 43.3492 ], [ 3.209, 43.3489 ], [ 3.2089, 43.3485 ], [ 3.2092, 43.3485 ], [ 3.2094, 43.3485 ], [ 3.2096, 43.3484 ], [ 3.2096, 43.3484 ], [ 3.2096, 43.3483 ], [ 3.2096, 43.3482 ], [ 3.2096, 43.3481 ], [ 3.2096, 43.3479 ], [ 3.2095, 43.3477 ], [ 3.2095, 43.3476 ], [ 3.2098, 43.3472 ], [ 3.2098, 43.3471 ], [ 3.2105, 43.3468 ], [ 3.2107, 43.3467 ], [ 3.2107, 43.3467 ], [ 3.2111, 43.3471 ], [ 3.2113, 43.347 ], [ 3.2115, 43.347 ], [ 3.2115, 43.3471 ], [ 3.2117, 43.347 ], [ 3.2117, 43.347 ], [ 3.2118, 43.3471 ], [ 3.2119, 43.347 ], [ 3.212, 43.3469 ], [ 3.212, 43.3469 ], [ 3.2121, 43.347 ], [ 3.2123, 43.347 ], [ 3.2126, 43.3472 ], [ 3.2127, 43.3472 ], [ 3.2128, 43.3473 ], [ 3.2129, 43.3472 ], [ 3.2133, 43.3471 ], [ 3.2133, 43.3471 ], [ 3.2133, 43.3473 ], [ 3.2134, 43.3472 ], [ 3.2135, 43.3473 ], [ 3.2135, 43.3474 ], [ 3.2136, 43.3474 ], [ 3.2138, 43.3474 ], [ 3.2137, 43.3475 ], [ 3.2139, 43.3475 ], [ 3.214, 43.3476 ], [ 3.214, 43.3476 ], [ 3.214, 43.3477 ], [ 3.2141, 43.3478 ], [ 3.2142, 43.3484 ], [ 3.2148, 43.3483 ], [ 3.2149, 43.3486 ], [ 3.2149, 43.3486 ], [ 3.2149, 43.349 ], [ 3.2151, 43.3489 ], [ 3.2151, 43.349 ], [ 3.2152, 43.349 ], [ 3.2153, 43.349 ], [ 3.2162, 43.3488 ], [ 3.2163, 43.3487 ], [ 3.2163, 43.3488 ], [ 3.2165, 43.3491 ], [ 3.2166, 43.3493 ], [ 3.2167, 43.3495 ], [ 3.2168, 43.3496 ], [ 3.217, 43.3499 ], [ 3.2171, 43.3501 ], [ 3.2173, 43.3502 ], [ 3.2173, 43.3503 ], [ 3.2174, 43.3503 ], [ 3.2174, 43.3504 ], [ 3.2176, 43.3505 ], [ 3.2177, 43.3505 ], [ 3.2185, 43.3507 ], [ 3.219, 43.3509 ], [ 3.2191, 43.3508 ], [ 3.219, 43.3506 ], [ 3.219, 43.3506 ], [ 3.2187, 43.3503 ], [ 3.2189, 43.3502 ], [ 3.2193, 43.3499 ], [ 3.2197, 43.3496 ], [ 3.2198, 43.3495 ], [ 3.22, 43.3493 ], [ 3.2203, 43.3491 ], [ 3.2206, 43.3489 ], [ 3.2207, 43.3489 ], [ 3.2206, 43.3488 ], [ 3.2209, 43.3485 ], [ 3.2212, 43.3483 ], [ 3.2213, 43.3482 ], [ 3.2218, 43.3484 ], [ 3.2218, 43.3485 ], [ 3.222, 43.3485 ], [ 3.2221, 43.3485 ], [ 3.2223, 43.3487 ], [ 3.2227, 43.3489 ], [ 3.2228, 43.3489 ], [ 3.2228, 43.3489 ], [ 3.2229, 43.3488 ], [ 3.2232, 43.3487 ], [ 3.2232, 43.3486 ], [ 3.2231, 43.3486 ], [ 3.223, 43.3485 ], [ 3.2229, 43.3484 ], [ 3.2219, 43.3479 ], [ 3.2215, 43.3477 ], [ 3.221, 43.3475 ], [ 3.2205, 43.3472 ], [ 3.2203, 43.3471 ], [ 3.22, 43.3469 ], [ 3.2197, 43.3468 ], [ 3.2195, 43.3467 ], [ 3.2194, 43.3466 ], [ 3.2191, 43.3465 ], [ 3.219, 43.3464 ], [ 3.219, 43.3463 ], [ 3.2192, 43.346 ], [ 3.2194, 43.3456 ], [ 3.2199, 43.3448 ], [ 3.2201, 43.3444 ], [ 3.2204, 43.344 ], [ 3.2207, 43.3435 ], [ 3.2212, 43.3425 ], [ 3.2213, 43.3424 ], [ 3.2215, 43.3421 ], [ 3.2218, 43.3416 ], [ 3.2219, 43.3414 ], [ 3.2221, 43.3414 ], [ 3.2225, 43.3415 ], [ 3.2225, 43.3415 ], [ 3.2231, 43.3417 ], [ 3.2236, 43.3418 ], [ 3.2237, 43.3418 ], [ 3.2238, 43.3417 ], [ 3.2248, 43.3419 ], [ 3.2248, 43.3418 ], [ 3.2244, 43.3415 ], [ 3.2241, 43.3413 ], [ 3.2243, 43.341 ], [ 3.2244, 43.3407 ], [ 3.224, 43.3404 ], [ 3.2246, 43.3399 ], [ 3.2245, 43.3399 ], [ 3.2242, 43.3397 ], [ 3.2241, 43.3396 ], [ 3.224, 43.3395 ], [ 3.2246, 43.3392 ], [ 3.2247, 43.3391 ], [ 3.2247, 43.339 ], [ 3.225, 43.3388 ], [ 3.2251, 43.3387 ] ] ], "type": "Polygon" }, "id": "29", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034001", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.8106, 43.6198, 3.8251, 43.6441 ], "geometry": { "coordinates": [ [ [ 3.8116, 43.6234 ], [ 3.8115, 43.6235 ], [ 3.8114, 43.6237 ], [ 3.8114, 43.6238 ], [ 3.8114, 43.6239 ], [ 3.8121, 43.6247 ], [ 3.8129, 43.6257 ], [ 3.8137, 43.6265 ], [ 3.8138, 43.6266 ], [ 3.8139, 43.6268 ], [ 3.814, 43.6268 ], [ 3.8143, 43.6269 ], [ 3.8156, 43.627 ], [ 3.8162, 43.627 ], [ 3.8168, 43.627 ], [ 3.8175, 43.627 ], [ 3.8176, 43.6283 ], [ 3.8176, 43.629 ], [ 3.8176, 43.6291 ], [ 3.8177, 43.6292 ], [ 3.8185, 43.6301 ], [ 3.8161, 43.6303 ], [ 3.8163, 43.6307 ], [ 3.8163, 43.6308 ], [ 3.8163, 43.6308 ], [ 3.8164, 43.631 ], [ 3.8164, 43.6313 ], [ 3.8163, 43.6314 ], [ 3.8162, 43.6316 ], [ 3.8159, 43.6318 ], [ 3.8152, 43.6323 ], [ 3.8148, 43.6326 ], [ 3.8144, 43.6329 ], [ 3.8141, 43.633 ], [ 3.8138, 43.6334 ], [ 3.8138, 43.6335 ], [ 3.8136, 43.6337 ], [ 3.8136, 43.6338 ], [ 3.8136, 43.6338 ], [ 3.8134, 43.634 ], [ 3.8131, 43.6342 ], [ 3.813, 43.6343 ], [ 3.8129, 43.6344 ], [ 3.8129, 43.635 ], [ 3.8128, 43.635 ], [ 3.8124, 43.6351 ], [ 3.8122, 43.6351 ], [ 3.8121, 43.6352 ], [ 3.812, 43.6352 ], [ 3.8122, 43.6352 ], [ 3.8124, 43.6352 ], [ 3.8127, 43.6352 ], [ 3.8131, 43.6352 ], [ 3.8133, 43.6352 ], [ 3.8134, 43.6353 ], [ 3.8136, 43.6354 ], [ 3.8137, 43.6355 ], [ 3.8138, 43.6356 ], [ 3.8138, 43.6358 ], [ 3.8139, 43.6364 ], [ 3.8139, 43.6364 ], [ 3.814, 43.6365 ], [ 3.8141, 43.6367 ], [ 3.8143, 43.6373 ], [ 3.8148, 43.6378 ], [ 3.8149, 43.6381 ], [ 3.8145, 43.6384 ], [ 3.8144, 43.6385 ], [ 3.8141, 43.6385 ], [ 3.8138, 43.6386 ], [ 3.8137, 43.6387 ], [ 3.8136, 43.6388 ], [ 3.8135, 43.6389 ], [ 3.8135, 43.639 ], [ 3.8117, 43.639 ], [ 3.8117, 43.6393 ], [ 3.8117, 43.6394 ], [ 3.8115, 43.6394 ], [ 3.8115, 43.6393 ], [ 3.8106, 43.6393 ], [ 3.8106, 43.6396 ], [ 3.8106, 43.6398 ], [ 3.8107, 43.64 ], [ 3.8107, 43.64 ], [ 3.8108, 43.6401 ], [ 3.8109, 43.6403 ], [ 3.8114, 43.6407 ], [ 3.812, 43.6413 ], [ 3.8123, 43.6415 ], [ 3.8129, 43.6418 ], [ 3.8137, 43.6421 ], [ 3.8157, 43.6428 ], [ 3.8156, 43.6429 ], [ 3.8158, 43.643 ], [ 3.8183, 43.644 ], [ 3.8189, 43.6441 ], [ 3.8208, 43.6433 ], [ 3.8215, 43.6433 ], [ 3.8216, 43.6432 ], [ 3.8206, 43.6429 ], [ 3.8205, 43.6429 ], [ 3.8205, 43.6428 ], [ 3.8202, 43.6427 ], [ 3.8201, 43.6427 ], [ 3.8201, 43.6426 ], [ 3.8201, 43.6424 ], [ 3.82, 43.6423 ], [ 3.8199, 43.6422 ], [ 3.8198, 43.6421 ], [ 3.8195, 43.6419 ], [ 3.8192, 43.6421 ], [ 3.8192, 43.6408 ], [ 3.8203, 43.6408 ], [ 3.8203, 43.6387 ], [ 3.8199, 43.6382 ], [ 3.8199, 43.6373 ], [ 3.8197, 43.6373 ], [ 3.8195, 43.6371 ], [ 3.8195, 43.6371 ], [ 3.8192, 43.6368 ], [ 3.8187, 43.6364 ], [ 3.8184, 43.6361 ], [ 3.8183, 43.6361 ], [ 3.8182, 43.6359 ], [ 3.8179, 43.6358 ], [ 3.8177, 43.6358 ], [ 3.8176, 43.6358 ], [ 3.8172, 43.636 ], [ 3.817, 43.6361 ], [ 3.8168, 43.6358 ], [ 3.8167, 43.6357 ], [ 3.8164, 43.6355 ], [ 3.8164, 43.6354 ], [ 3.8163, 43.6353 ], [ 3.8162, 43.6351 ], [ 3.8162, 43.6348 ], [ 3.8163, 43.6347 ], [ 3.8165, 43.6345 ], [ 3.8166, 43.6344 ], [ 3.8168, 43.6343 ], [ 3.8172, 43.6343 ], [ 3.8176, 43.6342 ], [ 3.8192, 43.6342 ], [ 3.8199, 43.6342 ], [ 3.8226, 43.6344 ], [ 3.8232, 43.6344 ], [ 3.8236, 43.6343 ], [ 3.8238, 43.6342 ], [ 3.8243, 43.6339 ], [ 3.8246, 43.6338 ], [ 3.8247, 43.6336 ], [ 3.8247, 43.6334 ], [ 3.8245, 43.6319 ], [ 3.8251, 43.6317 ], [ 3.8251, 43.6305 ], [ 3.8224, 43.6305 ], [ 3.8224, 43.6298 ], [ 3.8221, 43.6284 ], [ 3.8221, 43.6282 ], [ 3.822, 43.6282 ], [ 3.8219, 43.6276 ], [ 3.8217, 43.6269 ], [ 3.8216, 43.6262 ], [ 3.8216, 43.6262 ], [ 3.8214, 43.6259 ], [ 3.8214, 43.6258 ], [ 3.8213, 43.6255 ], [ 3.8203, 43.6239 ], [ 3.8193, 43.6224 ], [ 3.8189, 43.6218 ], [ 3.8186, 43.6215 ], [ 3.8177, 43.6198 ], [ 3.8172, 43.6201 ], [ 3.8154, 43.6212 ], [ 3.8148, 43.6215 ], [ 3.8148, 43.6215 ], [ 3.8131, 43.6226 ], [ 3.8116, 43.6234 ] ] ], "type": "Polygon" }, "id": "30", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034005", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Mosson" }, "type": "Feature" }, { "bbox": [ 3.8217, 43.6117, 3.8279, 43.6151 ], "geometry": { "coordinates": [ [ [ 3.8258, 43.6149 ], [ 3.8259, 43.6149 ], [ 3.8259, 43.6144 ], [ 3.8266, 43.614 ], [ 3.8267, 43.614 ], [ 3.8265, 43.6137 ], [ 3.8267, 43.6136 ], [ 3.8271, 43.6135 ], [ 3.8272, 43.6135 ], [ 3.8273, 43.6135 ], [ 3.8278, 43.6133 ], [ 3.8277, 43.613 ], [ 3.8274, 43.6127 ], [ 3.8272, 43.6125 ], [ 3.8274, 43.6125 ], [ 3.8278, 43.6124 ], [ 3.8279, 43.6124 ], [ 3.8278, 43.6123 ], [ 3.8278, 43.6123 ], [ 3.8277, 43.6122 ], [ 3.8276, 43.6121 ], [ 3.8275, 43.6122 ], [ 3.8274, 43.6121 ], [ 3.8271, 43.6122 ], [ 3.827, 43.6121 ], [ 3.8268, 43.6122 ], [ 3.8266, 43.6124 ], [ 3.8261, 43.6117 ], [ 3.8256, 43.6118 ], [ 3.8252, 43.6118 ], [ 3.8248, 43.6119 ], [ 3.8244, 43.612 ], [ 3.8242, 43.6121 ], [ 3.8238, 43.6123 ], [ 3.8237, 43.6124 ], [ 3.8233, 43.6125 ], [ 3.823, 43.6128 ], [ 3.8228, 43.6129 ], [ 3.8225, 43.6132 ], [ 3.8225, 43.6134 ], [ 3.8222, 43.6138 ], [ 3.8218, 43.6146 ], [ 3.8217, 43.6147 ], [ 3.8217, 43.6148 ], [ 3.8218, 43.6149 ], [ 3.8219, 43.615 ], [ 3.822, 43.6151 ], [ 3.8221, 43.6151 ], [ 3.8222, 43.6151 ], [ 3.8229, 43.615 ], [ 3.8236, 43.615 ], [ 3.8239, 43.6149 ], [ 3.8244, 43.6149 ], [ 3.8246, 43.6148 ], [ 3.8249, 43.6148 ], [ 3.8257, 43.6148 ], [ 3.8258, 43.6149 ] ] ], "type": "Polygon" }, "id": "31", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034004", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Celleneuve" }, "type": "Feature" }, { "bbox": [ 3.8326, 43.6122, 3.841, 43.6202 ], "geometry": { "coordinates": [ [ [ 3.8373, 43.6202 ], [ 3.8374, 43.6201 ], [ 3.8375, 43.62 ], [ 3.8377, 43.6197 ], [ 3.8381, 43.6193 ], [ 3.8382, 43.6192 ], [ 3.8392, 43.6179 ], [ 3.8394, 43.6179 ], [ 3.8399, 43.6172 ], [ 3.8402, 43.6168 ], [ 3.8408, 43.6163 ], [ 3.841, 43.6162 ], [ 3.8404, 43.6158 ], [ 3.8402, 43.6156 ], [ 3.84, 43.6155 ], [ 3.8399, 43.6154 ], [ 3.8398, 43.6152 ], [ 3.8395, 43.6146 ], [ 3.839, 43.6138 ], [ 3.839, 43.6137 ], [ 3.8389, 43.6136 ], [ 3.8388, 43.6128 ], [ 3.8387, 43.6126 ], [ 3.8384, 43.6124 ], [ 3.838, 43.6122 ], [ 3.8354, 43.6137 ], [ 3.8353, 43.6134 ], [ 3.8338, 43.6135 ], [ 3.8337, 43.6135 ], [ 3.8328, 43.6135 ], [ 3.8326, 43.6134 ], [ 3.8327, 43.614 ], [ 3.8327, 43.6147 ], [ 3.8344, 43.6146 ], [ 3.8348, 43.6158 ], [ 3.8348, 43.6159 ], [ 3.8348, 43.6159 ], [ 3.8347, 43.616 ], [ 3.8346, 43.616 ], [ 3.8345, 43.6161 ], [ 3.8342, 43.6165 ], [ 3.8347, 43.6167 ], [ 3.835, 43.6169 ], [ 3.8347, 43.6172 ], [ 3.8347, 43.6173 ], [ 3.8346, 43.6173 ], [ 3.8345, 43.6173 ], [ 3.8345, 43.6173 ], [ 3.8343, 43.6172 ], [ 3.8341, 43.6174 ], [ 3.8342, 43.6175 ], [ 3.8343, 43.6175 ], [ 3.8348, 43.6178 ], [ 3.8343, 43.618 ], [ 3.8355, 43.6188 ], [ 3.8355, 43.6189 ], [ 3.8357, 43.619 ], [ 3.8356, 43.619 ], [ 3.8373, 43.6202 ] ] ], "type": "Polygon" }, "id": "32", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034006", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Petit Bard Pergola" }, "type": "Feature" }, { "bbox": [ 1.3266, 43.4645, 1.3373, 43.4715 ], "geometry": { "coordinates": [ [ [ 1.3327, 43.4714 ], [ 1.3323, 43.4708 ], [ 1.3324, 43.4707 ], [ 1.3324, 43.4707 ], [ 1.335, 43.4698 ], [ 1.3351, 43.4698 ], [ 1.3352, 43.4698 ], [ 1.3356, 43.4705 ], [ 1.3358, 43.4707 ], [ 1.336, 43.4708 ], [ 1.3361, 43.4709 ], [ 1.3365, 43.471 ], [ 1.337, 43.4711 ], [ 1.3373, 43.4711 ], [ 1.337, 43.4704 ], [ 1.3369, 43.4703 ], [ 1.3369, 43.4703 ], [ 1.3363, 43.4689 ], [ 1.3361, 43.4685 ], [ 1.3354, 43.4687 ], [ 1.3351, 43.4682 ], [ 1.335, 43.4681 ], [ 1.3345, 43.4683 ], [ 1.3339, 43.4684 ], [ 1.3337, 43.4686 ], [ 1.3325, 43.469 ], [ 1.3323, 43.4687 ], [ 1.3322, 43.4687 ], [ 1.3318, 43.4686 ], [ 1.332, 43.4679 ], [ 1.332, 43.4678 ], [ 1.3321, 43.4678 ], [ 1.3321, 43.4677 ], [ 1.3321, 43.4677 ], [ 1.3321, 43.4676 ], [ 1.3319, 43.4675 ], [ 1.3319, 43.4673 ], [ 1.3316, 43.4673 ], [ 1.3315, 43.4673 ], [ 1.3313, 43.4671 ], [ 1.3314, 43.467 ], [ 1.3315, 43.4668 ], [ 1.3317, 43.4662 ], [ 1.3317, 43.466 ], [ 1.3318, 43.4657 ], [ 1.3305, 43.4655 ], [ 1.3301, 43.4655 ], [ 1.3299, 43.4654 ], [ 1.3295, 43.4653 ], [ 1.3291, 43.4652 ], [ 1.3303, 43.4649 ], [ 1.3304, 43.4648 ], [ 1.3303, 43.4647 ], [ 1.3303, 43.4647 ], [ 1.3302, 43.4645 ], [ 1.3301, 43.4645 ], [ 1.3293, 43.4647 ], [ 1.3289, 43.4648 ], [ 1.3288, 43.4648 ], [ 1.3286, 43.4646 ], [ 1.3284, 43.4645 ], [ 1.3267, 43.465 ], [ 1.3266, 43.4651 ], [ 1.3266, 43.4652 ], [ 1.3269, 43.4656 ], [ 1.3275, 43.4654 ], [ 1.3288, 43.4651 ], [ 1.3292, 43.4653 ], [ 1.3297, 43.4654 ], [ 1.3299, 43.4656 ], [ 1.33, 43.4658 ], [ 1.3298, 43.4659 ], [ 1.3301, 43.4666 ], [ 1.3303, 43.4671 ], [ 1.3303, 43.4672 ], [ 1.3304, 43.4673 ], [ 1.3304, 43.4673 ], [ 1.3308, 43.4674 ], [ 1.3308, 43.4674 ], [ 1.3306, 43.4682 ], [ 1.3306, 43.4682 ], [ 1.3309, 43.4683 ], [ 1.3308, 43.4688 ], [ 1.3308, 43.469 ], [ 1.3307, 43.4694 ], [ 1.3295, 43.4696 ], [ 1.3294, 43.4697 ], [ 1.3288, 43.4699 ], [ 1.3278, 43.4701 ], [ 1.3278, 43.4702 ], [ 1.3282, 43.4711 ], [ 1.3283, 43.4711 ], [ 1.3288, 43.471 ], [ 1.3298, 43.4708 ], [ 1.33, 43.4707 ], [ 1.33, 43.4706 ], [ 1.3302, 43.4707 ], [ 1.3303, 43.4706 ], [ 1.3304, 43.4708 ], [ 1.3304, 43.4709 ], [ 1.3305, 43.4708 ], [ 1.3306, 43.4707 ], [ 1.3307, 43.4709 ], [ 1.3308, 43.4709 ], [ 1.3311, 43.4715 ], [ 1.3312, 43.4715 ], [ 1.3316, 43.4713 ], [ 1.3317, 43.4713 ], [ 1.3321, 43.4712 ], [ 1.3323, 43.4715 ], [ 1.3327, 43.4714 ] ] ], "type": "Polygon" }, "id": "33", "properties": { "code_commune": "31395", "code_departement": "31", "code_qp": "QP031001", "commune_qp": "Muret", "nom_commune": "Muret", "nom_qp": "Saint Jean" }, "type": "Feature" }, { "bbox": [ 2.2268, 43.5938, 2.234, 43.5983 ], "geometry": { "coordinates": [ [ [ 2.2322, 43.5969 ], [ 2.2331, 43.5963 ], [ 2.2333, 43.5964 ], [ 2.234, 43.5958 ], [ 2.2338, 43.5955 ], [ 2.2337, 43.5955 ], [ 2.2331, 43.5949 ], [ 2.2328, 43.5951 ], [ 2.232, 43.5955 ], [ 2.2306, 43.5962 ], [ 2.2304, 43.5959 ], [ 2.2303, 43.5958 ], [ 2.2306, 43.5956 ], [ 2.2307, 43.5957 ], [ 2.2314, 43.5953 ], [ 2.2313, 43.5952 ], [ 2.2324, 43.5947 ], [ 2.2316, 43.5938 ], [ 2.2305, 43.5944 ], [ 2.2304, 43.5944 ], [ 2.2295, 43.5949 ], [ 2.2278, 43.5958 ], [ 2.2274, 43.5954 ], [ 2.2273, 43.5955 ], [ 2.2276, 43.5958 ], [ 2.2276, 43.5958 ], [ 2.2269, 43.5962 ], [ 2.2268, 43.5963 ], [ 2.2268, 43.5963 ], [ 2.227, 43.5964 ], [ 2.2279, 43.5968 ], [ 2.2282, 43.597 ], [ 2.2285, 43.5971 ], [ 2.2287, 43.5972 ], [ 2.2288, 43.5972 ], [ 2.2291, 43.5975 ], [ 2.2306, 43.5983 ], [ 2.231, 43.5979 ], [ 2.2312, 43.5979 ], [ 2.2312, 43.5978 ], [ 2.2318, 43.5973 ], [ 2.2322, 43.5969 ], [ 2.2322, 43.5969 ] ] ], "type": "Polygon" }, "id": "34", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081002", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Laden Petit Train" }, "type": "Feature" }, { "bbox": [ 2.3542, 43.2246, 2.3595, 43.2285 ], "geometry": { "coordinates": [ [ [ 2.3586, 43.2264 ], [ 2.3582, 43.226 ], [ 2.3575, 43.2254 ], [ 2.3572, 43.2252 ], [ 2.3571, 43.2251 ], [ 2.3565, 43.2255 ], [ 2.3564, 43.2254 ], [ 2.3563, 43.2254 ], [ 2.3561, 43.2252 ], [ 2.3558, 43.225 ], [ 2.3557, 43.2249 ], [ 2.3561, 43.2247 ], [ 2.3557, 43.2246 ], [ 2.3557, 43.2246 ], [ 2.3554, 43.2246 ], [ 2.3554, 43.2246 ], [ 2.3552, 43.2246 ], [ 2.3551, 43.2246 ], [ 2.355, 43.2247 ], [ 2.3546, 43.2246 ], [ 2.3544, 43.2247 ], [ 2.3547, 43.225 ], [ 2.355, 43.2253 ], [ 2.3546, 43.2256 ], [ 2.3544, 43.2258 ], [ 2.3542, 43.226 ], [ 2.3544, 43.2261 ], [ 2.3543, 43.2262 ], [ 2.3542, 43.2263 ], [ 2.3545, 43.2265 ], [ 2.3546, 43.2265 ], [ 2.3545, 43.2268 ], [ 2.3548, 43.2268 ], [ 2.3548, 43.2271 ], [ 2.3547, 43.2275 ], [ 2.3547, 43.2276 ], [ 2.3549, 43.2277 ], [ 2.3552, 43.2277 ], [ 2.3554, 43.2277 ], [ 2.3559, 43.2277 ], [ 2.3568, 43.2278 ], [ 2.3569, 43.2279 ], [ 2.357, 43.2279 ], [ 2.3571, 43.2279 ], [ 2.3579, 43.2284 ], [ 2.358, 43.2284 ], [ 2.3581, 43.2284 ], [ 2.3582, 43.2285 ], [ 2.3583, 43.2285 ], [ 2.3584, 43.2285 ], [ 2.3585, 43.2285 ], [ 2.3585, 43.2285 ], [ 2.3586, 43.2285 ], [ 2.3587, 43.2285 ], [ 2.3588, 43.2285 ], [ 2.359, 43.2285 ], [ 2.3595, 43.2283 ], [ 2.3592, 43.2277 ], [ 2.3589, 43.2271 ], [ 2.3588, 43.2269 ], [ 2.3586, 43.2267 ], [ 2.3586, 43.2265 ], [ 2.3586, 43.2264 ] ] ], "type": "Polygon" }, "id": "35", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011006", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Grazailles" }, "type": "Feature" }, { "bbox": [ 3.8767, 43.6256, 3.8824, 43.6304 ], "geometry": { "coordinates": [ [ [ 3.8817, 43.6275 ], [ 3.8818, 43.6273 ], [ 3.8819, 43.6269 ], [ 3.8821, 43.6265 ], [ 3.8824, 43.626 ], [ 3.8814, 43.6258 ], [ 3.8803, 43.6257 ], [ 3.8795, 43.6256 ], [ 3.8791, 43.6256 ], [ 3.879, 43.6256 ], [ 3.8792, 43.6261 ], [ 3.8792, 43.6262 ], [ 3.8794, 43.6267 ], [ 3.8794, 43.6268 ], [ 3.8795, 43.627 ], [ 3.8795, 43.6271 ], [ 3.8797, 43.6274 ], [ 3.8798, 43.6275 ], [ 3.8799, 43.6275 ], [ 3.8799, 43.6276 ], [ 3.8799, 43.6276 ], [ 3.8797, 43.6277 ], [ 3.8792, 43.6279 ], [ 3.879, 43.628 ], [ 3.8789, 43.628 ], [ 3.8789, 43.6281 ], [ 3.8788, 43.6282 ], [ 3.8787, 43.6282 ], [ 3.8781, 43.6282 ], [ 3.8781, 43.6284 ], [ 3.8781, 43.6285 ], [ 3.878, 43.6285 ], [ 3.8774, 43.6287 ], [ 3.8767, 43.6289 ], [ 3.8768, 43.629 ], [ 3.8771, 43.6296 ], [ 3.8775, 43.6295 ], [ 3.8775, 43.6295 ], [ 3.8776, 43.6295 ], [ 3.8776, 43.6295 ], [ 3.8777, 43.6296 ], [ 3.8779, 43.6295 ], [ 3.878, 43.6299 ], [ 3.8781, 43.63 ], [ 3.8782, 43.6301 ], [ 3.8783, 43.6302 ], [ 3.8785, 43.6303 ], [ 3.8787, 43.6304 ], [ 3.8788, 43.6304 ], [ 3.8789, 43.6303 ], [ 3.8789, 43.6303 ], [ 3.879, 43.6303 ], [ 3.8792, 43.6301 ], [ 3.8794, 43.6299 ], [ 3.8797, 43.6297 ], [ 3.8801, 43.6293 ], [ 3.8802, 43.6292 ], [ 3.8807, 43.6289 ], [ 3.8811, 43.6286 ], [ 3.8812, 43.6285 ], [ 3.8813, 43.6284 ], [ 3.8814, 43.6283 ], [ 3.8815, 43.6282 ], [ 3.8816, 43.6279 ], [ 3.8816, 43.6277 ], [ 3.8817, 43.6275 ] ] ], "type": "Polygon" }, "id": "36", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034014", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Aiguelongue" }, "type": "Feature" }, { "bbox": [ 1.3822, 43.5783, 1.3906, 43.5831 ], "geometry": { "coordinates": [ [ [ 1.3896, 43.5828 ], [ 1.3896, 43.5827 ], [ 1.3895, 43.5826 ], [ 1.3893, 43.5824 ], [ 1.3894, 43.5824 ], [ 1.3906, 43.5819 ], [ 1.3903, 43.5815 ], [ 1.3902, 43.5814 ], [ 1.3898, 43.5808 ], [ 1.3895, 43.5802 ], [ 1.3886, 43.5804 ], [ 1.3885, 43.5805 ], [ 1.3884, 43.5804 ], [ 1.3881, 43.58 ], [ 1.3883, 43.5793 ], [ 1.3884, 43.5792 ], [ 1.3885, 43.5792 ], [ 1.3888, 43.5791 ], [ 1.3889, 43.5791 ], [ 1.3889, 43.579 ], [ 1.3885, 43.5783 ], [ 1.387, 43.5787 ], [ 1.3871, 43.579 ], [ 1.387, 43.579 ], [ 1.3867, 43.5791 ], [ 1.3861, 43.5792 ], [ 1.386, 43.5792 ], [ 1.3859, 43.5792 ], [ 1.3855, 43.5791 ], [ 1.3855, 43.5791 ], [ 1.3854, 43.5791 ], [ 1.3853, 43.5791 ], [ 1.3852, 43.5792 ], [ 1.3851, 43.5794 ], [ 1.3848, 43.5793 ], [ 1.3847, 43.5792 ], [ 1.3847, 43.5792 ], [ 1.3841, 43.579 ], [ 1.3838, 43.5791 ], [ 1.3837, 43.5788 ], [ 1.3834, 43.5787 ], [ 1.3822, 43.579 ], [ 1.3822, 43.5791 ], [ 1.3822, 43.5791 ], [ 1.3823, 43.5792 ], [ 1.3824, 43.5793 ], [ 1.3825, 43.5795 ], [ 1.3826, 43.5796 ], [ 1.3826, 43.5798 ], [ 1.3827, 43.5799 ], [ 1.3828, 43.5799 ], [ 1.3833, 43.5801 ], [ 1.3833, 43.5801 ], [ 1.3835, 43.5801 ], [ 1.3836, 43.5802 ], [ 1.3839, 43.5803 ], [ 1.384, 43.5803 ], [ 1.3841, 43.5804 ], [ 1.3842, 43.5806 ], [ 1.3844, 43.5807 ], [ 1.3846, 43.5808 ], [ 1.3848, 43.5808 ], [ 1.3855, 43.5811 ], [ 1.3857, 43.5811 ], [ 1.3859, 43.5812 ], [ 1.3858, 43.5813 ], [ 1.3858, 43.5814 ], [ 1.3858, 43.5815 ], [ 1.386, 43.5822 ], [ 1.3861, 43.5831 ], [ 1.3896, 43.5828 ] ] ], "type": "Polygon" }, "id": "37", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031006", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Pradettes" }, "type": "Feature" }, { "bbox": [ 1.3909, 43.5583, 1.4183, 43.5864 ], "geometry": { "coordinates": [ [ [ 1.4183, 43.5824 ], [ 1.4174, 43.5806 ], [ 1.4168, 43.5804 ], [ 1.4165, 43.5798 ], [ 1.4173, 43.5796 ], [ 1.4169, 43.5789 ], [ 1.4167, 43.5784 ], [ 1.4171, 43.5783 ], [ 1.4164, 43.5766 ], [ 1.416, 43.5767 ], [ 1.4159, 43.5764 ], [ 1.4158, 43.5764 ], [ 1.4154, 43.5757 ], [ 1.4152, 43.5757 ], [ 1.415, 43.5758 ], [ 1.4147, 43.5753 ], [ 1.4137, 43.5736 ], [ 1.4123, 43.574 ], [ 1.4122, 43.5737 ], [ 1.4116, 43.5725 ], [ 1.4142, 43.5718 ], [ 1.4134, 43.5704 ], [ 1.4155, 43.5698 ], [ 1.4165, 43.5706 ], [ 1.4171, 43.571 ], [ 1.4175, 43.5713 ], [ 1.4176, 43.5714 ], [ 1.4179, 43.5718 ], [ 1.4181, 43.5718 ], [ 1.4182, 43.5717 ], [ 1.418, 43.5712 ], [ 1.4174, 43.5699 ], [ 1.4162, 43.5692 ], [ 1.4158, 43.5691 ], [ 1.4151, 43.5691 ], [ 1.4147, 43.569 ], [ 1.4137, 43.5685 ], [ 1.4122, 43.5674 ], [ 1.4115, 43.5665 ], [ 1.4107, 43.5666 ], [ 1.4107, 43.5668 ], [ 1.4103, 43.5668 ], [ 1.4102, 43.5669 ], [ 1.4075, 43.5674 ], [ 1.4062, 43.5674 ], [ 1.4026, 43.5674 ], [ 1.4026, 43.5666 ], [ 1.4025, 43.5665 ], [ 1.4024, 43.5662 ], [ 1.4021, 43.5662 ], [ 1.4021, 43.5662 ], [ 1.4018, 43.5662 ], [ 1.4018, 43.5656 ], [ 1.4016, 43.5656 ], [ 1.4016, 43.5652 ], [ 1.4026, 43.5652 ], [ 1.4026, 43.5646 ], [ 1.4036, 43.5646 ], [ 1.403, 43.5638 ], [ 1.4027, 43.5635 ], [ 1.4018, 43.5623 ], [ 1.4018, 43.5612 ], [ 1.4017, 43.561 ], [ 1.4027, 43.5606 ], [ 1.4018, 43.5593 ], [ 1.4016, 43.5589 ], [ 1.4011, 43.5583 ], [ 1.4005, 43.5584 ], [ 1.3985, 43.5589 ], [ 1.3961, 43.5594 ], [ 1.3952, 43.5597 ], [ 1.393, 43.5607 ], [ 1.3909, 43.5619 ], [ 1.3937, 43.5658 ], [ 1.3965, 43.5659 ], [ 1.3966, 43.5661 ], [ 1.3971, 43.5668 ], [ 1.3973, 43.5675 ], [ 1.3971, 43.5679 ], [ 1.397, 43.5684 ], [ 1.3963, 43.5684 ], [ 1.3962, 43.5693 ], [ 1.3962, 43.5704 ], [ 1.3959, 43.5704 ], [ 1.3959, 43.5711 ], [ 1.3954, 43.5711 ], [ 1.3954, 43.5712 ], [ 1.3952, 43.5714 ], [ 1.3949, 43.5713 ], [ 1.3949, 43.5717 ], [ 1.3951, 43.5718 ], [ 1.3951, 43.5722 ], [ 1.395, 43.5722 ], [ 1.395, 43.5722 ], [ 1.3949, 43.5722 ], [ 1.3946, 43.5722 ], [ 1.3945, 43.5722 ], [ 1.3944, 43.5722 ], [ 1.3944, 43.5723 ], [ 1.3944, 43.5724 ], [ 1.3943, 43.5726 ], [ 1.3943, 43.573 ], [ 1.3958, 43.5743 ], [ 1.3957, 43.5744 ], [ 1.3957, 43.5746 ], [ 1.3959, 43.5747 ], [ 1.3947, 43.5779 ], [ 1.3947, 43.5787 ], [ 1.3966, 43.5812 ], [ 1.3978, 43.5827 ], [ 1.3992, 43.5838 ], [ 1.3994, 43.5838 ], [ 1.4001, 43.5838 ], [ 1.4004, 43.5837 ], [ 1.4004, 43.583 ], [ 1.4003, 43.5823 ], [ 1.4007, 43.5822 ], [ 1.4012, 43.5818 ], [ 1.401, 43.5813 ], [ 1.3999, 43.5797 ], [ 1.3994, 43.5797 ], [ 1.3997, 43.5803 ], [ 1.3996, 43.5803 ], [ 1.3995, 43.5805 ], [ 1.3992, 43.5804 ], [ 1.399, 43.5803 ], [ 1.3988, 43.5803 ], [ 1.3978, 43.5804 ], [ 1.3975, 43.5804 ], [ 1.3971, 43.5802 ], [ 1.3967, 43.58 ], [ 1.3966, 43.58 ], [ 1.3966, 43.5799 ], [ 1.3965, 43.5798 ], [ 1.3965, 43.5788 ], [ 1.3965, 43.5787 ], [ 1.3964, 43.5786 ], [ 1.3965, 43.5785 ], [ 1.3967, 43.5785 ], [ 1.3976, 43.5785 ], [ 1.397, 43.5765 ], [ 1.3971, 43.5757 ], [ 1.3966, 43.5757 ], [ 1.3959, 43.5754 ], [ 1.3959, 43.5752 ], [ 1.3962, 43.575 ], [ 1.3964, 43.5749 ], [ 1.3966, 43.5748 ], [ 1.397, 43.5747 ], [ 1.399, 43.5746 ], [ 1.401, 43.5745 ], [ 1.4011, 43.5748 ], [ 1.401, 43.5753 ], [ 1.401, 43.5756 ], [ 1.4012, 43.5756 ], [ 1.4012, 43.5761 ], [ 1.402, 43.5761 ], [ 1.402, 43.5761 ], [ 1.4025, 43.5761 ], [ 1.4025, 43.5753 ], [ 1.402, 43.5753 ], [ 1.4021, 43.575 ], [ 1.4021, 43.5749 ], [ 1.4022, 43.5748 ], [ 1.4025, 43.5746 ], [ 1.4026, 43.5745 ], [ 1.4028, 43.5743 ], [ 1.4053, 43.5742 ], [ 1.4058, 43.5738 ], [ 1.4082, 43.5717 ], [ 1.4084, 43.5714 ], [ 1.4086, 43.5713 ], [ 1.4087, 43.5709 ], [ 1.4091, 43.5709 ], [ 1.4093, 43.5708 ], [ 1.4098, 43.5707 ], [ 1.41, 43.5706 ], [ 1.4108, 43.5705 ], [ 1.4111, 43.5712 ], [ 1.4113, 43.5716 ], [ 1.4096, 43.5743 ], [ 1.4092, 43.5749 ], [ 1.4079, 43.5772 ], [ 1.4059, 43.58 ], [ 1.4037, 43.5836 ], [ 1.4052, 43.5836 ], [ 1.4061, 43.5842 ], [ 1.4055, 43.5851 ], [ 1.4062, 43.5853 ], [ 1.4067, 43.5844 ], [ 1.4067, 43.5843 ], [ 1.4067, 43.5843 ], [ 1.4062, 43.5841 ], [ 1.4063, 43.5839 ], [ 1.4067, 43.5835 ], [ 1.4074, 43.5838 ], [ 1.4074, 43.584 ], [ 1.4081, 43.5845 ], [ 1.4084, 43.5846 ], [ 1.409, 43.5848 ], [ 1.41, 43.585 ], [ 1.4097, 43.5857 ], [ 1.4097, 43.5857 ], [ 1.4097, 43.5858 ], [ 1.4099, 43.5858 ], [ 1.4114, 43.5864 ], [ 1.4115, 43.5864 ], [ 1.4116, 43.5864 ], [ 1.412, 43.5854 ], [ 1.4128, 43.5855 ], [ 1.4135, 43.5858 ], [ 1.4145, 43.5862 ], [ 1.4162, 43.5851 ], [ 1.4155, 43.5843 ], [ 1.4149, 43.5834 ], [ 1.4154, 43.5833 ], [ 1.4164, 43.583 ], [ 1.4171, 43.5827 ], [ 1.4179, 43.5825 ], [ 1.4183, 43.5824 ] ] ], "type": "Polygon" }, "id": "38", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031007", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Grand Mirail" }, "type": "Feature" }, { "bbox": [ 2.1293, 43.9124, 2.1414, 43.919 ], "geometry": { "coordinates": [ [ [ 2.1316, 43.917 ], [ 2.1331, 43.9166 ], [ 2.1328, 43.9157 ], [ 2.1332, 43.9156 ], [ 2.1333, 43.9155 ], [ 2.1337, 43.9154 ], [ 2.1338, 43.9153 ], [ 2.1339, 43.9153 ], [ 2.1349, 43.915 ], [ 2.135, 43.915 ], [ 2.1358, 43.9147 ], [ 2.1357, 43.9146 ], [ 2.1355, 43.9138 ], [ 2.1354, 43.9137 ], [ 2.1361, 43.9137 ], [ 2.1369, 43.9152 ], [ 2.137, 43.9152 ], [ 2.1372, 43.9154 ], [ 2.1377, 43.9151 ], [ 2.1383, 43.9154 ], [ 2.1377, 43.9158 ], [ 2.1383, 43.9162 ], [ 2.1387, 43.916 ], [ 2.1389, 43.9159 ], [ 2.1387, 43.9157 ], [ 2.1398, 43.9152 ], [ 2.1389, 43.9145 ], [ 2.1387, 43.9144 ], [ 2.1386, 43.9142 ], [ 2.1385, 43.9141 ], [ 2.1397, 43.9139 ], [ 2.1397, 43.9137 ], [ 2.1401, 43.9137 ], [ 2.1406, 43.9136 ], [ 2.1414, 43.9136 ], [ 2.1414, 43.9133 ], [ 2.1414, 43.9131 ], [ 2.1413, 43.9131 ], [ 2.1413, 43.913 ], [ 2.1391, 43.9124 ], [ 2.139, 43.9126 ], [ 2.139, 43.9127 ], [ 2.139, 43.9128 ], [ 2.1391, 43.9128 ], [ 2.1386, 43.9129 ], [ 2.1383, 43.913 ], [ 2.1382, 43.913 ], [ 2.1383, 43.9132 ], [ 2.138, 43.9133 ], [ 2.1379, 43.9132 ], [ 2.1378, 43.9133 ], [ 2.1378, 43.9131 ], [ 2.1373, 43.9132 ], [ 2.1373, 43.9131 ], [ 2.137, 43.9131 ], [ 2.137, 43.913 ], [ 2.1365, 43.9131 ], [ 2.1365, 43.9129 ], [ 2.1362, 43.9129 ], [ 2.1362, 43.913 ], [ 2.136, 43.9131 ], [ 2.1353, 43.9132 ], [ 2.135, 43.9128 ], [ 2.1333, 43.9135 ], [ 2.1332, 43.9136 ], [ 2.1332, 43.9137 ], [ 2.133, 43.9138 ], [ 2.1332, 43.9143 ], [ 2.1332, 43.9143 ], [ 2.1327, 43.9144 ], [ 2.1326, 43.9145 ], [ 2.1326, 43.9145 ], [ 2.1325, 43.9146 ], [ 2.1323, 43.9148 ], [ 2.1324, 43.9148 ], [ 2.1323, 43.9149 ], [ 2.1319, 43.9154 ], [ 2.1316, 43.9157 ], [ 2.1316, 43.916 ], [ 2.1316, 43.916 ], [ 2.1316, 43.9161 ], [ 2.1315, 43.9161 ], [ 2.1313, 43.9161 ], [ 2.1313, 43.916 ], [ 2.1312, 43.916 ], [ 2.131, 43.9159 ], [ 2.1298, 43.9159 ], [ 2.1298, 43.9159 ], [ 2.1296, 43.9159 ], [ 2.1296, 43.9162 ], [ 2.1295, 43.9162 ], [ 2.1293, 43.9167 ], [ 2.1293, 43.9172 ], [ 2.1293, 43.9176 ], [ 2.1294, 43.918 ], [ 2.1296, 43.9184 ], [ 2.1299, 43.9188 ], [ 2.1301, 43.9189 ], [ 2.1302, 43.919 ], [ 2.1307, 43.919 ], [ 2.1307, 43.9187 ], [ 2.1307, 43.9186 ], [ 2.1307, 43.9184 ], [ 2.1308, 43.9183 ], [ 2.1309, 43.9182 ], [ 2.1312, 43.918 ], [ 2.1313, 43.918 ], [ 2.1314, 43.9179 ], [ 2.1315, 43.9178 ], [ 2.1316, 43.9177 ], [ 2.1316, 43.9176 ], [ 2.1316, 43.9174 ], [ 2.1316, 43.9173 ], [ 2.1316, 43.9171 ], [ 2.1315, 43.9171 ], [ 2.1316, 43.917 ] ] ], "type": "Polygon" }, "id": "39", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081007", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Veyrières Rayssac" }, "type": "Feature" }, { "bbox": [ 2.2374, 43.6027, 2.2451, 43.6086 ], "geometry": { "coordinates": [ [ [ 2.2376, 43.6086 ], [ 2.2378, 43.6086 ], [ 2.2378, 43.6086 ], [ 2.2381, 43.6085 ], [ 2.2383, 43.6085 ], [ 2.2382, 43.6081 ], [ 2.2382, 43.608 ], [ 2.2389, 43.6079 ], [ 2.2389, 43.6078 ], [ 2.2388, 43.6076 ], [ 2.2391, 43.6075 ], [ 2.2391, 43.6076 ], [ 2.2393, 43.608 ], [ 2.2394, 43.6083 ], [ 2.2409, 43.6079 ], [ 2.2418, 43.6076 ], [ 2.2417, 43.6074 ], [ 2.2422, 43.6073 ], [ 2.2424, 43.6067 ], [ 2.2425, 43.6065 ], [ 2.2425, 43.6064 ], [ 2.2425, 43.6059 ], [ 2.2424, 43.6056 ], [ 2.2426, 43.6056 ], [ 2.2426, 43.6052 ], [ 2.2425, 43.6048 ], [ 2.2429, 43.6048 ], [ 2.2429, 43.6052 ], [ 2.243, 43.6054 ], [ 2.243, 43.6058 ], [ 2.243, 43.606 ], [ 2.243, 43.6061 ], [ 2.2431, 43.6061 ], [ 2.2431, 43.6063 ], [ 2.2431, 43.6065 ], [ 2.2431, 43.6064 ], [ 2.2433, 43.6064 ], [ 2.2439, 43.6062 ], [ 2.2446, 43.6059 ], [ 2.2449, 43.6058 ], [ 2.2451, 43.6057 ], [ 2.2451, 43.6056 ], [ 2.2451, 43.6055 ], [ 2.2449, 43.6054 ], [ 2.2446, 43.6043 ], [ 2.2447, 43.6043 ], [ 2.2443, 43.6039 ], [ 2.2436, 43.6033 ], [ 2.2435, 43.6032 ], [ 2.2431, 43.603 ], [ 2.2431, 43.6027 ], [ 2.2429, 43.6027 ], [ 2.243, 43.603 ], [ 2.2428, 43.603 ], [ 2.2428, 43.6032 ], [ 2.2429, 43.6033 ], [ 2.2429, 43.6035 ], [ 2.2429, 43.6047 ], [ 2.2425, 43.6047 ], [ 2.2424, 43.604 ], [ 2.2423, 43.604 ], [ 2.2422, 43.604 ], [ 2.242, 43.604 ], [ 2.2419, 43.604 ], [ 2.2414, 43.604 ], [ 2.2407, 43.6042 ], [ 2.2407, 43.6043 ], [ 2.2408, 43.6048 ], [ 2.2409, 43.6051 ], [ 2.2409, 43.6053 ], [ 2.2408, 43.6053 ], [ 2.2405, 43.6055 ], [ 2.2403, 43.6056 ], [ 2.2401, 43.6058 ], [ 2.2393, 43.6059 ], [ 2.2387, 43.6061 ], [ 2.2384, 43.6062 ], [ 2.2388, 43.607 ], [ 2.2389, 43.6073 ], [ 2.2383, 43.6074 ], [ 2.2379, 43.6075 ], [ 2.2374, 43.6077 ], [ 2.2376, 43.6086 ] ] ], "type": "Polygon" }, "id": "40", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081005", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.8545, 43.6049, 3.8625, 43.6078 ], "geometry": { "coordinates": [ [ [ 3.8551, 43.6078 ], [ 3.8559, 43.6075 ], [ 3.8564, 43.6073 ], [ 3.8565, 43.6072 ], [ 3.8568, 43.6071 ], [ 3.8573, 43.6068 ], [ 3.8568, 43.6064 ], [ 3.857, 43.6063 ], [ 3.8574, 43.606 ], [ 3.8576, 43.6059 ], [ 3.8577, 43.6058 ], [ 3.8578, 43.6058 ], [ 3.8579, 43.6058 ], [ 3.8581, 43.6059 ], [ 3.8582, 43.606 ], [ 3.8587, 43.6062 ], [ 3.8596, 43.6067 ], [ 3.8595, 43.6067 ], [ 3.8596, 43.6068 ], [ 3.8598, 43.6068 ], [ 3.8603, 43.6064 ], [ 3.8609, 43.6069 ], [ 3.8612, 43.6071 ], [ 3.8613, 43.6072 ], [ 3.8614, 43.6073 ], [ 3.8616, 43.6071 ], [ 3.8618, 43.6069 ], [ 3.8619, 43.6067 ], [ 3.8619, 43.6066 ], [ 3.8621, 43.6063 ], [ 3.8622, 43.6064 ], [ 3.8625, 43.6059 ], [ 3.8623, 43.6058 ], [ 3.8619, 43.6057 ], [ 3.8615, 43.6056 ], [ 3.8608, 43.6054 ], [ 3.8604, 43.6053 ], [ 3.8601, 43.6052 ], [ 3.8598, 43.6051 ], [ 3.8596, 43.6051 ], [ 3.8592, 43.605 ], [ 3.859, 43.605 ], [ 3.8588, 43.605 ], [ 3.8586, 43.605 ], [ 3.8585, 43.605 ], [ 3.8584, 43.605 ], [ 3.8581, 43.605 ], [ 3.8576, 43.6049 ], [ 3.8573, 43.6049 ], [ 3.8569, 43.6049 ], [ 3.8564, 43.6049 ], [ 3.8561, 43.6049 ], [ 3.8562, 43.6057 ], [ 3.8551, 43.6062 ], [ 3.855, 43.606 ], [ 3.8545, 43.6062 ], [ 3.8554, 43.6073 ], [ 3.855, 43.6075 ], [ 3.8549, 43.6076 ], [ 3.8551, 43.6078 ] ] ], "type": "Polygon" }, "id": "41", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034009", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Gély" }, "type": "Feature" }, { "bbox": [ 4.194, 44.2582, 4.203, 44.2626 ], "geometry": { "coordinates": [ [ [ 4.197, 44.2616 ], [ 4.1971, 44.2617 ], [ 4.197, 44.2617 ], [ 4.1972, 44.2617 ], [ 4.1972, 44.2617 ], [ 4.1969, 44.2619 ], [ 4.1969, 44.2619 ], [ 4.1968, 44.262 ], [ 4.1966, 44.2619 ], [ 4.1965, 44.2618 ], [ 4.1962, 44.2617 ], [ 4.1961, 44.2617 ], [ 4.1959, 44.2616 ], [ 4.1958, 44.2615 ], [ 4.1957, 44.2615 ], [ 4.1957, 44.2614 ], [ 4.1957, 44.2612 ], [ 4.1956, 44.2613 ], [ 4.1956, 44.2613 ], [ 4.1956, 44.2617 ], [ 4.1956, 44.2617 ], [ 4.1956, 44.2618 ], [ 4.1957, 44.262 ], [ 4.196, 44.2619 ], [ 4.1963, 44.2618 ], [ 4.1964, 44.2619 ], [ 4.1968, 44.2625 ], [ 4.197, 44.2626 ], [ 4.1974, 44.2624 ], [ 4.1972, 44.2623 ], [ 4.1974, 44.2622 ], [ 4.1975, 44.262 ], [ 4.1976, 44.262 ], [ 4.1977, 44.2621 ], [ 4.1978, 44.2621 ], [ 4.198, 44.2622 ], [ 4.1983, 44.2622 ], [ 4.1984, 44.2622 ], [ 4.1984, 44.2622 ], [ 4.1985, 44.2621 ], [ 4.1985, 44.262 ], [ 4.1987, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1989, 44.262 ], [ 4.199, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2622 ], [ 4.1992, 44.2623 ], [ 4.1992, 44.2622 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1995, 44.2623 ], [ 4.1995, 44.2623 ], [ 4.1996, 44.2623 ], [ 4.1997, 44.2623 ], [ 4.2, 44.2624 ], [ 4.2001, 44.2624 ], [ 4.2001, 44.2624 ], [ 4.2002, 44.2624 ], [ 4.2002, 44.2624 ], [ 4.2004, 44.2624 ], [ 4.2004, 44.2624 ], [ 4.2006, 44.2625 ], [ 4.2006, 44.2624 ], [ 4.2007, 44.2624 ], [ 4.2007, 44.2625 ], [ 4.2008, 44.2625 ], [ 4.201, 44.2624 ], [ 4.201, 44.2624 ], [ 4.2011, 44.2624 ], [ 4.2012, 44.2623 ], [ 4.2012, 44.2623 ], [ 4.2013, 44.2623 ], [ 4.2017, 44.2623 ], [ 4.2015, 44.2619 ], [ 4.2012, 44.262 ], [ 4.2011, 44.262 ], [ 4.2011, 44.262 ], [ 4.2011, 44.262 ], [ 4.201, 44.2619 ], [ 4.201, 44.2618 ], [ 4.201, 44.2617 ], [ 4.201, 44.2617 ], [ 4.2013, 44.2613 ], [ 4.2013, 44.2613 ], [ 4.2012, 44.2613 ], [ 4.201, 44.2613 ], [ 4.2004, 44.2612 ], [ 4.2001, 44.2612 ], [ 4.2001, 44.2611 ], [ 4.2002, 44.261 ], [ 4.2004, 44.2606 ], [ 4.1999, 44.2605 ], [ 4.2, 44.2603 ], [ 4.2, 44.2602 ], [ 4.2001, 44.2602 ], [ 4.2006, 44.2603 ], [ 4.2007, 44.2601 ], [ 4.2008, 44.2599 ], [ 4.2009, 44.2599 ], [ 4.2016, 44.2594 ], [ 4.2017, 44.2591 ], [ 4.2017, 44.259 ], [ 4.203, 44.2584 ], [ 4.2029, 44.2582 ], [ 4.2026, 44.2582 ], [ 4.202, 44.2582 ], [ 4.202, 44.2584 ], [ 4.2022, 44.2585 ], [ 4.2021, 44.2585 ], [ 4.202, 44.2585 ], [ 4.202, 44.2585 ], [ 4.2019, 44.2585 ], [ 4.2019, 44.2586 ], [ 4.2019, 44.2586 ], [ 4.202, 44.2586 ], [ 4.202, 44.2587 ], [ 4.2014, 44.2587 ], [ 4.2014, 44.2588 ], [ 4.2011, 44.2588 ], [ 4.2011, 44.2587 ], [ 4.201, 44.2586 ], [ 4.2005, 44.2587 ], [ 4.2004, 44.2584 ], [ 4.2, 44.2584 ], [ 4.1996, 44.2584 ], [ 4.1994, 44.2584 ], [ 4.1994, 44.2584 ], [ 4.1993, 44.2584 ], [ 4.1993, 44.2584 ], [ 4.1992, 44.2584 ], [ 4.199, 44.2584 ], [ 4.1988, 44.2584 ], [ 4.1985, 44.2586 ], [ 4.1984, 44.2586 ], [ 4.1985, 44.259 ], [ 4.1984, 44.2591 ], [ 4.1983, 44.2595 ], [ 4.1975, 44.2593 ], [ 4.1968, 44.2592 ], [ 4.1966, 44.2595 ], [ 4.1965, 44.2595 ], [ 4.1965, 44.2595 ], [ 4.1949, 44.2592 ], [ 4.1946, 44.259 ], [ 4.1944, 44.2592 ], [ 4.1943, 44.2593 ], [ 4.1944, 44.2594 ], [ 4.1943, 44.2595 ], [ 4.194, 44.2599 ], [ 4.1943, 44.26 ], [ 4.1943, 44.26 ], [ 4.1944, 44.2603 ], [ 4.1944, 44.2604 ], [ 4.1947, 44.2604 ], [ 4.1947, 44.2604 ], [ 4.1948, 44.2604 ], [ 4.1949, 44.2605 ], [ 4.1948, 44.2606 ], [ 4.1948, 44.2606 ], [ 4.1947, 44.2607 ], [ 4.1945, 44.2608 ], [ 4.1944, 44.2609 ], [ 4.1944, 44.2609 ], [ 4.1944, 44.261 ], [ 4.1946, 44.2612 ], [ 4.1947, 44.2613 ], [ 4.1952, 44.2611 ], [ 4.1952, 44.2611 ], [ 4.1957, 44.2611 ], [ 4.1957, 44.261 ], [ 4.1956, 44.2609 ], [ 4.1957, 44.2608 ], [ 4.1958, 44.2609 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.196, 44.2607 ], [ 4.1961, 44.2607 ], [ 4.196, 44.2607 ], [ 4.1962, 44.2608 ], [ 4.1963, 44.2607 ], [ 4.1963, 44.2607 ], [ 4.1964, 44.2607 ], [ 4.1965, 44.2607 ], [ 4.1966, 44.2607 ], [ 4.1966, 44.2607 ], [ 4.1966, 44.2608 ], [ 4.1967, 44.2608 ], [ 4.1966, 44.2608 ], [ 4.1967, 44.2609 ], [ 4.1968, 44.261 ], [ 4.1968, 44.2611 ], [ 4.1969, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1969, 44.2612 ], [ 4.1969, 44.2613 ], [ 4.1968, 44.2616 ], [ 4.1969, 44.2616 ], [ 4.1968, 44.2617 ], [ 4.1969, 44.2617 ], [ 4.1969, 44.2616 ], [ 4.197, 44.2616 ], [ 4.197, 44.2616 ] ] ], "type": "Polygon" }, "id": "42", "properties": { "code_commune": "30227", "code_departement": "30", "code_qp": "QP030014", "commune_qp": "Saint-Ambroix", "nom_commune": "Saint-Ambroix", "nom_qp": "L'Ecusson" }, "type": "Feature" }, { "bbox": [ 1.3507, 44.0158, 1.3577, 44.0229 ], "geometry": { "coordinates": [ [ [ 1.3511, 44.0207 ], [ 1.3513, 44.0209 ], [ 1.3508, 44.0212 ], [ 1.3511, 44.0214 ], [ 1.3519, 44.021 ], [ 1.3522, 44.0213 ], [ 1.3526, 44.0217 ], [ 1.3529, 44.022 ], [ 1.3531, 44.0223 ], [ 1.3532, 44.0229 ], [ 1.354, 44.0228 ], [ 1.354, 44.0225 ], [ 1.3543, 44.0226 ], [ 1.3543, 44.0224 ], [ 1.3547, 44.0224 ], [ 1.3548, 44.0227 ], [ 1.3555, 44.0225 ], [ 1.3555, 44.0225 ], [ 1.3555, 44.0223 ], [ 1.3572, 44.0224 ], [ 1.3573, 44.0217 ], [ 1.3566, 44.0217 ], [ 1.356, 44.0218 ], [ 1.356, 44.0215 ], [ 1.3561, 44.0215 ], [ 1.3561, 44.0214 ], [ 1.3561, 44.0212 ], [ 1.3561, 44.021 ], [ 1.3559, 44.0206 ], [ 1.3558, 44.0204 ], [ 1.356, 44.0204 ], [ 1.3558, 44.02 ], [ 1.3559, 44.0199 ], [ 1.3558, 44.0198 ], [ 1.3558, 44.0197 ], [ 1.3559, 44.0195 ], [ 1.3561, 44.0194 ], [ 1.3562, 44.0193 ], [ 1.3562, 44.0193 ], [ 1.3565, 44.019 ], [ 1.357, 44.0194 ], [ 1.3577, 44.0189 ], [ 1.3575, 44.0189 ], [ 1.3571, 44.0192 ], [ 1.3568, 44.0189 ], [ 1.3566, 44.019 ], [ 1.3564, 44.019 ], [ 1.3562, 44.0188 ], [ 1.3561, 44.0188 ], [ 1.356, 44.0188 ], [ 1.3559, 44.0186 ], [ 1.3558, 44.0185 ], [ 1.3557, 44.0184 ], [ 1.3561, 44.0183 ], [ 1.3565, 44.0183 ], [ 1.357, 44.018 ], [ 1.3569, 44.0179 ], [ 1.3569, 44.0178 ], [ 1.3568, 44.0172 ], [ 1.3566, 44.0172 ], [ 1.3565, 44.0166 ], [ 1.3563, 44.0159 ], [ 1.3562, 44.0158 ], [ 1.3557, 44.016 ], [ 1.355, 44.0162 ], [ 1.3537, 44.0168 ], [ 1.3529, 44.0173 ], [ 1.3524, 44.0175 ], [ 1.3521, 44.0173 ], [ 1.3518, 44.0171 ], [ 1.3515, 44.0174 ], [ 1.3514, 44.0174 ], [ 1.3513, 44.0175 ], [ 1.3513, 44.0177 ], [ 1.3512, 44.0179 ], [ 1.3515, 44.0181 ], [ 1.3514, 44.0182 ], [ 1.3511, 44.0185 ], [ 1.3511, 44.0186 ], [ 1.351, 44.0187 ], [ 1.3509, 44.0189 ], [ 1.3507, 44.0191 ], [ 1.351, 44.0193 ], [ 1.3514, 44.0195 ], [ 1.3513, 44.0197 ], [ 1.3519, 44.0202 ], [ 1.3516, 44.0204 ], [ 1.3511, 44.0207 ] ] ], "type": "Polygon" }, "id": "43", "properties": { "code_commune": "82121", "code_departement": "82", "code_qp": "QP082001", "commune_qp": "Montauban", "nom_commune": "Montauban", "nom_qp": "Cœur de Ville" }, "type": "Feature" }, { "bbox": [ 1.6033, 42.9636, 1.6111, 42.9686 ], "geometry": { "coordinates": [ [ [ 1.6046, 42.9644 ], [ 1.6043, 42.9644 ], [ 1.6043, 42.9645 ], [ 1.6042, 42.9645 ], [ 1.604, 42.9647 ], [ 1.6039, 42.9649 ], [ 1.6038, 42.965 ], [ 1.6039, 42.965 ], [ 1.6039, 42.965 ], [ 1.604, 42.9651 ], [ 1.6041, 42.9651 ], [ 1.6042, 42.9651 ], [ 1.6042, 42.9651 ], [ 1.6042, 42.965 ], [ 1.6042, 42.965 ], [ 1.6043, 42.9649 ], [ 1.6043, 42.9649 ], [ 1.6044, 42.9648 ], [ 1.6044, 42.9649 ], [ 1.6044, 42.9648 ], [ 1.6044, 42.9649 ], [ 1.6045, 42.9649 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6047, 42.9651 ], [ 1.6047, 42.9651 ], [ 1.6047, 42.9651 ], [ 1.6048, 42.9651 ], [ 1.6048, 42.9651 ], [ 1.6049, 42.9652 ], [ 1.6049, 42.9652 ], [ 1.6049, 42.9653 ], [ 1.605, 42.9653 ], [ 1.605, 42.9653 ], [ 1.6051, 42.9653 ], [ 1.605, 42.9654 ], [ 1.6051, 42.9655 ], [ 1.6051, 42.9656 ], [ 1.6052, 42.9656 ], [ 1.6052, 42.9656 ], [ 1.6052, 42.9657 ], [ 1.6051, 42.9659 ], [ 1.6052, 42.9659 ], [ 1.6052, 42.966 ], [ 1.6052, 42.9662 ], [ 1.6051, 42.9663 ], [ 1.6051, 42.9663 ], [ 1.6051, 42.9664 ], [ 1.6051, 42.9665 ], [ 1.6051, 42.9666 ], [ 1.6051, 42.9666 ], [ 1.605, 42.9666 ], [ 1.6049, 42.9667 ], [ 1.6049, 42.9667 ], [ 1.6049, 42.9667 ], [ 1.6047, 42.9668 ], [ 1.6047, 42.9668 ], [ 1.6047, 42.9668 ], [ 1.6046, 42.9668 ], [ 1.6046, 42.9668 ], [ 1.6045, 42.967 ], [ 1.6044, 42.967 ], [ 1.6043, 42.9669 ], [ 1.6042, 42.9668 ], [ 1.604, 42.9667 ], [ 1.6038, 42.9667 ], [ 1.6035, 42.9668 ], [ 1.6034, 42.9668 ], [ 1.6033, 42.9669 ], [ 1.6035, 42.9671 ], [ 1.6036, 42.9672 ], [ 1.6039, 42.9673 ], [ 1.604, 42.9673 ], [ 1.604, 42.9674 ], [ 1.6041, 42.9674 ], [ 1.6042, 42.9674 ], [ 1.6042, 42.9674 ], [ 1.6043, 42.9674 ], [ 1.6044, 42.9674 ], [ 1.6045, 42.9674 ], [ 1.6044, 42.9671 ], [ 1.6045, 42.967 ], [ 1.6046, 42.9671 ], [ 1.6047, 42.9671 ], [ 1.6049, 42.9672 ], [ 1.6051, 42.9672 ], [ 1.6052, 42.9672 ], [ 1.6052, 42.9671 ], [ 1.6053, 42.9671 ], [ 1.6055, 42.9672 ], [ 1.6056, 42.9671 ], [ 1.6056, 42.967 ], [ 1.6058, 42.9671 ], [ 1.6058, 42.9671 ], [ 1.606, 42.9669 ], [ 1.6061, 42.9667 ], [ 1.6062, 42.9667 ], [ 1.6063, 42.9667 ], [ 1.6069, 42.9667 ], [ 1.6073, 42.9668 ], [ 1.6072, 42.9669 ], [ 1.6073, 42.967 ], [ 1.6075, 42.9669 ], [ 1.6076, 42.9669 ], [ 1.6076, 42.9669 ], [ 1.6078, 42.9668 ], [ 1.6079, 42.9667 ], [ 1.6079, 42.9667 ], [ 1.6081, 42.9666 ], [ 1.6081, 42.9666 ], [ 1.6081, 42.9666 ], [ 1.6082, 42.9665 ], [ 1.6084, 42.9664 ], [ 1.6084, 42.9663 ], [ 1.6085, 42.9664 ], [ 1.6087, 42.9661 ], [ 1.6092, 42.9664 ], [ 1.6092, 42.9664 ], [ 1.6091, 42.9666 ], [ 1.6088, 42.9669 ], [ 1.6086, 42.9671 ], [ 1.6086, 42.9673 ], [ 1.6084, 42.9672 ], [ 1.6083, 42.9672 ], [ 1.6081, 42.9673 ], [ 1.608, 42.9675 ], [ 1.6077, 42.9677 ], [ 1.6077, 42.9677 ], [ 1.6079, 42.9678 ], [ 1.6079, 42.9678 ], [ 1.6081, 42.9679 ], [ 1.6082, 42.9679 ], [ 1.6082, 42.968 ], [ 1.6082, 42.9686 ], [ 1.6084, 42.9686 ], [ 1.6084, 42.9686 ], [ 1.6086, 42.9686 ], [ 1.6086, 42.9682 ], [ 1.6086, 42.968 ], [ 1.6085, 42.9679 ], [ 1.6086, 42.9678 ], [ 1.6086, 42.9678 ], [ 1.6086, 42.9677 ], [ 1.6087, 42.9676 ], [ 1.6094, 42.9668 ], [ 1.6095, 42.9668 ], [ 1.6095, 42.9668 ], [ 1.6097, 42.9665 ], [ 1.6098, 42.9665 ], [ 1.6098, 42.9664 ], [ 1.6098, 42.9664 ], [ 1.6098, 42.9663 ], [ 1.61, 42.9662 ], [ 1.61, 42.9662 ], [ 1.61, 42.9661 ], [ 1.61, 42.9661 ], [ 1.6101, 42.966 ], [ 1.6102, 42.9659 ], [ 1.6104, 42.9658 ], [ 1.6104, 42.9657 ], [ 1.6105, 42.9656 ], [ 1.6106, 42.9655 ], [ 1.6107, 42.9654 ], [ 1.6107, 42.9654 ], [ 1.611, 42.965 ], [ 1.6109, 42.965 ], [ 1.611, 42.9649 ], [ 1.6111, 42.9647 ], [ 1.6109, 42.9646 ], [ 1.6107, 42.9649 ], [ 1.6104, 42.9651 ], [ 1.6102, 42.9653 ], [ 1.61, 42.9655 ], [ 1.6098, 42.9657 ], [ 1.6096, 42.9661 ], [ 1.6095, 42.9662 ], [ 1.6093, 42.9664 ], [ 1.6092, 42.9663 ], [ 1.6088, 42.9661 ], [ 1.6092, 42.9658 ], [ 1.6093, 42.9656 ], [ 1.6095, 42.9654 ], [ 1.6097, 42.9652 ], [ 1.6094, 42.965 ], [ 1.6094, 42.9651 ], [ 1.609, 42.9653 ], [ 1.609, 42.9653 ], [ 1.6089, 42.9651 ], [ 1.6089, 42.9649 ], [ 1.6089, 42.9648 ], [ 1.6089, 42.9648 ], [ 1.6089, 42.9647 ], [ 1.6089, 42.9645 ], [ 1.6089, 42.9643 ], [ 1.6089, 42.9643 ], [ 1.6086, 42.9642 ], [ 1.6086, 42.9641 ], [ 1.6085, 42.964 ], [ 1.6083, 42.964 ], [ 1.6081, 42.964 ], [ 1.6074, 42.9639 ], [ 1.6072, 42.9639 ], [ 1.6068, 42.9638 ], [ 1.6066, 42.9638 ], [ 1.6064, 42.9638 ], [ 1.6058, 42.9637 ], [ 1.6054, 42.9636 ], [ 1.6046, 42.9636 ], [ 1.6046, 42.9641 ], [ 1.6046, 42.9644 ] ] ], "type": "Polygon" }, "id": "44", "properties": { "code_commune": "09122", "code_departement": "09", "code_qp": "QP009002", "commune_qp": "Foix", "nom_commune": "Foix", "nom_qp": "Centre Ancien" }, "type": "Feature" }, { "bbox": [ 2.244, 43.5904, 2.2551, 43.5952 ], "geometry": { "coordinates": [ [ [ 2.244, 43.593 ], [ 2.2441, 43.5931 ], [ 2.2442, 43.5932 ], [ 2.2446, 43.593 ], [ 2.2452, 43.5927 ], [ 2.2458, 43.5925 ], [ 2.2464, 43.5924 ], [ 2.2467, 43.5924 ], [ 2.2471, 43.5924 ], [ 2.2475, 43.5925 ], [ 2.2481, 43.5927 ], [ 2.2483, 43.5927 ], [ 2.2484, 43.5927 ], [ 2.249, 43.5927 ], [ 2.249, 43.5926 ], [ 2.2491, 43.5925 ], [ 2.2496, 43.5925 ], [ 2.2497, 43.5926 ], [ 2.2497, 43.5929 ], [ 2.2499, 43.5931 ], [ 2.2503, 43.5929 ], [ 2.2503, 43.5928 ], [ 2.2505, 43.5927 ], [ 2.2505, 43.5926 ], [ 2.2506, 43.5925 ], [ 2.2501, 43.5921 ], [ 2.2501, 43.592 ], [ 2.2502, 43.5919 ], [ 2.2516, 43.5919 ], [ 2.2517, 43.5919 ], [ 2.2519, 43.5921 ], [ 2.252, 43.5928 ], [ 2.2525, 43.5933 ], [ 2.2523, 43.5934 ], [ 2.2528, 43.5938 ], [ 2.2529, 43.5937 ], [ 2.253, 43.5937 ], [ 2.2533, 43.594 ], [ 2.2536, 43.5943 ], [ 2.2532, 43.5946 ], [ 2.2531, 43.5946 ], [ 2.2531, 43.5947 ], [ 2.2531, 43.5952 ], [ 2.2537, 43.5951 ], [ 2.2539, 43.5951 ], [ 2.2543, 43.5949 ], [ 2.2544, 43.5948 ], [ 2.2546, 43.5947 ], [ 2.2546, 43.5945 ], [ 2.2548, 43.5941 ], [ 2.2551, 43.5934 ], [ 2.2545, 43.5928 ], [ 2.2542, 43.5929 ], [ 2.2542, 43.5928 ], [ 2.2542, 43.5928 ], [ 2.254, 43.5926 ], [ 2.2536, 43.5928 ], [ 2.2533, 43.5926 ], [ 2.2535, 43.5925 ], [ 2.2532, 43.5922 ], [ 2.2528, 43.5924 ], [ 2.2527, 43.5923 ], [ 2.2527, 43.5923 ], [ 2.253, 43.5921 ], [ 2.2531, 43.592 ], [ 2.2533, 43.5919 ], [ 2.2537, 43.5916 ], [ 2.254, 43.5915 ], [ 2.2542, 43.5913 ], [ 2.2542, 43.5913 ], [ 2.2542, 43.5912 ], [ 2.2542, 43.5911 ], [ 2.2534, 43.5907 ], [ 2.2528, 43.5905 ], [ 2.2524, 43.5904 ], [ 2.2521, 43.5906 ], [ 2.2523, 43.5909 ], [ 2.2522, 43.591 ], [ 2.2521, 43.5911 ], [ 2.2518, 43.5908 ], [ 2.2517, 43.5907 ], [ 2.2517, 43.5906 ], [ 2.2509, 43.5907 ], [ 2.2508, 43.5905 ], [ 2.2497, 43.5906 ], [ 2.2497, 43.5907 ], [ 2.2494, 43.5908 ], [ 2.2488, 43.591 ], [ 2.2485, 43.5912 ], [ 2.2483, 43.5913 ], [ 2.2483, 43.5913 ], [ 2.2482, 43.5914 ], [ 2.2482, 43.5916 ], [ 2.248, 43.5916 ], [ 2.2477, 43.5916 ], [ 2.2472, 43.5916 ], [ 2.247, 43.5916 ], [ 2.247, 43.5915 ], [ 2.2468, 43.5913 ], [ 2.2464, 43.5914 ], [ 2.2464, 43.5914 ], [ 2.2457, 43.5916 ], [ 2.2458, 43.5917 ], [ 2.2452, 43.5918 ], [ 2.2448, 43.5919 ], [ 2.2447, 43.5919 ], [ 2.2446, 43.5918 ], [ 2.2443, 43.5919 ], [ 2.2442, 43.592 ], [ 2.2441, 43.5921 ], [ 2.244, 43.5923 ], [ 2.244, 43.5924 ], [ 2.244, 43.5927 ], [ 2.244, 43.593 ] ] ], "type": "Polygon" }, "id": "45", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081003", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Lameilhé" }, "type": "Feature" }, { "bbox": [ 1.4792, 43.5738, 1.4848, 43.5778 ], "geometry": { "coordinates": [ [ [ 1.4801, 43.5777 ], [ 1.4802, 43.5778 ], [ 1.4804, 43.5778 ], [ 1.4815, 43.5772 ], [ 1.4816, 43.5772 ], [ 1.4818, 43.5772 ], [ 1.4818, 43.5772 ], [ 1.482, 43.5771 ], [ 1.482, 43.5771 ], [ 1.4821, 43.5769 ], [ 1.4822, 43.5769 ], [ 1.4822, 43.5768 ], [ 1.4827, 43.5765 ], [ 1.483, 43.5764 ], [ 1.4833, 43.5764 ], [ 1.4834, 43.5764 ], [ 1.4838, 43.5761 ], [ 1.484, 43.576 ], [ 1.4842, 43.5758 ], [ 1.4844, 43.5757 ], [ 1.4845, 43.5756 ], [ 1.4846, 43.5754 ], [ 1.4846, 43.5754 ], [ 1.4847, 43.5753 ], [ 1.4848, 43.5753 ], [ 1.4848, 43.5753 ], [ 1.4845, 43.5751 ], [ 1.4843, 43.575 ], [ 1.4841, 43.5749 ], [ 1.4843, 43.5748 ], [ 1.4836, 43.5747 ], [ 1.4837, 43.5744 ], [ 1.4837, 43.5744 ], [ 1.4838, 43.574 ], [ 1.4838, 43.5739 ], [ 1.4839, 43.5738 ], [ 1.4837, 43.5738 ], [ 1.4835, 43.5738 ], [ 1.4835, 43.5738 ], [ 1.4833, 43.5738 ], [ 1.4819, 43.5747 ], [ 1.4818, 43.5748 ], [ 1.4817, 43.5749 ], [ 1.4816, 43.5749 ], [ 1.4814, 43.575 ], [ 1.4812, 43.5751 ], [ 1.4802, 43.5756 ], [ 1.4794, 43.576 ], [ 1.4793, 43.5761 ], [ 1.4792, 43.5763 ], [ 1.4792, 43.5763 ], [ 1.4792, 43.5764 ], [ 1.4793, 43.5768 ], [ 1.4794, 43.5772 ], [ 1.4798, 43.5778 ], [ 1.4798, 43.5778 ], [ 1.4801, 43.5777 ] ] ], "type": "Polygon" }, "id": "46", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031013", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Saint Exupéry" }, "type": "Feature" }, { "bbox": [ 1.073, 44.0999, 1.0904, 44.1069 ], "geometry": { "coordinates": [ [ [ 1.0777, 44.102 ], [ 1.0779, 44.1021 ], [ 1.078, 44.1022 ], [ 1.0784, 44.1024 ], [ 1.0787, 44.1025 ], [ 1.0796, 44.1028 ], [ 1.0807, 44.1032 ], [ 1.0818, 44.1036 ], [ 1.0818, 44.1037 ], [ 1.0819, 44.1037 ], [ 1.082, 44.1038 ], [ 1.0821, 44.1037 ], [ 1.0826, 44.1039 ], [ 1.0832, 44.1043 ], [ 1.0837, 44.1045 ], [ 1.0838, 44.1047 ], [ 1.0838, 44.1047 ], [ 1.0838, 44.1051 ], [ 1.0838, 44.1054 ], [ 1.0839, 44.1062 ], [ 1.084, 44.1065 ], [ 1.0844, 44.1065 ], [ 1.0844, 44.1066 ], [ 1.0844, 44.1067 ], [ 1.0846, 44.1068 ], [ 1.0847, 44.1068 ], [ 1.0849, 44.1068 ], [ 1.0851, 44.1068 ], [ 1.0853, 44.1068 ], [ 1.0854, 44.1068 ], [ 1.0858, 44.1069 ], [ 1.086, 44.1068 ], [ 1.0862, 44.1068 ], [ 1.0871, 44.1068 ], [ 1.0871, 44.1067 ], [ 1.0871, 44.1065 ], [ 1.0871, 44.1063 ], [ 1.0874, 44.1063 ], [ 1.0874, 44.1063 ], [ 1.0901, 44.1063 ], [ 1.0901, 44.1061 ], [ 1.0902, 44.106 ], [ 1.0901, 44.106 ], [ 1.0901, 44.1059 ], [ 1.0902, 44.106 ], [ 1.0902, 44.1059 ], [ 1.0902, 44.1059 ], [ 1.0902, 44.1058 ], [ 1.0903, 44.1057 ], [ 1.0902, 44.1057 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1055 ], [ 1.0902, 44.1055 ], [ 1.0902, 44.1055 ], [ 1.0904, 44.1055 ], [ 1.0904, 44.1054 ], [ 1.0903, 44.1052 ], [ 1.0902, 44.1053 ], [ 1.0899, 44.1053 ], [ 1.0893, 44.1054 ], [ 1.0895, 44.1053 ], [ 1.0897, 44.105 ], [ 1.0888, 44.1045 ], [ 1.0884, 44.1044 ], [ 1.0885, 44.1042 ], [ 1.0887, 44.1041 ], [ 1.0886, 44.1041 ], [ 1.0883, 44.1039 ], [ 1.088, 44.1039 ], [ 1.0879, 44.1039 ], [ 1.0879, 44.1039 ], [ 1.0878, 44.1037 ], [ 1.0877, 44.1036 ], [ 1.0875, 44.1035 ], [ 1.0879, 44.1034 ], [ 1.0878, 44.1029 ], [ 1.0872, 44.1031 ], [ 1.0871, 44.1032 ], [ 1.0869, 44.1029 ], [ 1.0868, 44.1028 ], [ 1.0867, 44.1026 ], [ 1.0865, 44.1024 ], [ 1.0864, 44.1023 ], [ 1.0863, 44.1022 ], [ 1.086, 44.1021 ], [ 1.0855, 44.102 ], [ 1.0853, 44.102 ], [ 1.0852, 44.1018 ], [ 1.0851, 44.1016 ], [ 1.085, 44.1015 ], [ 1.0847, 44.1009 ], [ 1.0844, 44.1004 ], [ 1.0844, 44.1003 ], [ 1.0841, 44.1 ], [ 1.084, 44.1 ], [ 1.0838, 44.1 ], [ 1.0837, 44.1 ], [ 1.0835, 44.1 ], [ 1.0835, 44.1 ], [ 1.0833, 44.1 ], [ 1.083, 44.0999 ], [ 1.0823, 44.1 ], [ 1.0818, 44.1 ], [ 1.0817, 44.1 ], [ 1.0814, 44.1001 ], [ 1.0811, 44.1002 ], [ 1.0799, 44.1004 ], [ 1.0788, 44.1006 ], [ 1.0786, 44.1006 ], [ 1.0782, 44.1006 ], [ 1.0781, 44.1007 ], [ 1.078, 44.1005 ], [ 1.0778, 44.0999 ], [ 1.0771, 44.1 ], [ 1.0751, 44.1 ], [ 1.0747, 44.1001 ], [ 1.0738, 44.1002 ], [ 1.0731, 44.1001 ], [ 1.0732, 44.1005 ], [ 1.0731, 44.1008 ], [ 1.073, 44.1014 ], [ 1.0742, 44.1016 ], [ 1.0745, 44.1015 ], [ 1.0746, 44.1015 ], [ 1.0747, 44.1015 ], [ 1.0747, 44.1014 ], [ 1.0751, 44.1014 ], [ 1.0754, 44.1014 ], [ 1.0757, 44.1014 ], [ 1.0766, 44.1013 ], [ 1.0769, 44.1013 ], [ 1.0771, 44.1013 ], [ 1.0774, 44.1014 ], [ 1.0775, 44.1015 ], [ 1.0776, 44.1019 ], [ 1.0777, 44.102 ] ] ], "type": "Polygon" }, "id": "47", "properties": { "code_commune": "82112", "code_departement": "82", "code_qp": "QP082003", "commune_qp": "Moissac", "nom_commune": "Moissac", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.4487, 44.4585, 1.4596, 44.4672 ], "geometry": { "coordinates": [ [ [ 1.4509, 44.4638 ], [ 1.4503, 44.4641 ], [ 1.4506, 44.4645 ], [ 1.4512, 44.4652 ], [ 1.452, 44.4648 ], [ 1.4514, 44.4643 ], [ 1.4521, 44.464 ], [ 1.4524, 44.4639 ], [ 1.4525, 44.4638 ], [ 1.4529, 44.4637 ], [ 1.4537, 44.4633 ], [ 1.4543, 44.4639 ], [ 1.4545, 44.4638 ], [ 1.4553, 44.4633 ], [ 1.4554, 44.4633 ], [ 1.4555, 44.4632 ], [ 1.4558, 44.4632 ], [ 1.4559, 44.4633 ], [ 1.4559, 44.4634 ], [ 1.456, 44.4635 ], [ 1.456, 44.4635 ], [ 1.4559, 44.4635 ], [ 1.4558, 44.4635 ], [ 1.4556, 44.4635 ], [ 1.4562, 44.464 ], [ 1.4565, 44.4642 ], [ 1.4568, 44.4645 ], [ 1.4567, 44.4646 ], [ 1.4565, 44.4647 ], [ 1.4566, 44.4648 ], [ 1.4566, 44.4651 ], [ 1.4568, 44.4653 ], [ 1.457, 44.4654 ], [ 1.4576, 44.4654 ], [ 1.4578, 44.4653 ], [ 1.458, 44.4658 ], [ 1.458, 44.4661 ], [ 1.4581, 44.4663 ], [ 1.4583, 44.4665 ], [ 1.4577, 44.4668 ], [ 1.458, 44.467 ], [ 1.4581, 44.4672 ], [ 1.4589, 44.4671 ], [ 1.459, 44.4671 ], [ 1.4589, 44.4667 ], [ 1.4589, 44.4667 ], [ 1.4591, 44.4667 ], [ 1.4592, 44.4667 ], [ 1.4593, 44.4666 ], [ 1.4593, 44.4666 ], [ 1.4594, 44.4666 ], [ 1.4596, 44.4666 ], [ 1.4596, 44.4664 ], [ 1.4596, 44.4662 ], [ 1.4595, 44.466 ], [ 1.4594, 44.4654 ], [ 1.4594, 44.4653 ], [ 1.459, 44.4653 ], [ 1.4589, 44.4651 ], [ 1.4589, 44.4651 ], [ 1.4585, 44.4651 ], [ 1.4584, 44.4648 ], [ 1.4584, 44.4646 ], [ 1.4584, 44.4644 ], [ 1.4584, 44.4642 ], [ 1.4584, 44.464 ], [ 1.4585, 44.4639 ], [ 1.4585, 44.4638 ], [ 1.4586, 44.4637 ], [ 1.4586, 44.4636 ], [ 1.4583, 44.4633 ], [ 1.457, 44.4622 ], [ 1.4559, 44.4614 ], [ 1.4552, 44.4608 ], [ 1.4547, 44.4604 ], [ 1.4541, 44.4607 ], [ 1.4537, 44.4608 ], [ 1.4535, 44.461 ], [ 1.4531, 44.4611 ], [ 1.4529, 44.4612 ], [ 1.4529, 44.4612 ], [ 1.4521, 44.4613 ], [ 1.4521, 44.4614 ], [ 1.452, 44.4614 ], [ 1.4519, 44.4611 ], [ 1.4518, 44.461 ], [ 1.4518, 44.4609 ], [ 1.4517, 44.4609 ], [ 1.4522, 44.4607 ], [ 1.4526, 44.4606 ], [ 1.4533, 44.4603 ], [ 1.4531, 44.46 ], [ 1.4518, 44.4605 ], [ 1.4515, 44.4607 ], [ 1.4514, 44.4607 ], [ 1.4512, 44.4608 ], [ 1.4509, 44.4609 ], [ 1.4507, 44.4605 ], [ 1.4505, 44.4601 ], [ 1.4503, 44.46 ], [ 1.4501, 44.4597 ], [ 1.4497, 44.4593 ], [ 1.4491, 44.4586 ], [ 1.4489, 44.4585 ], [ 1.4488, 44.4587 ], [ 1.4487, 44.4588 ], [ 1.4487, 44.4589 ], [ 1.4488, 44.459 ], [ 1.4489, 44.4595 ], [ 1.449, 44.4595 ], [ 1.4494, 44.46 ], [ 1.4489, 44.4601 ], [ 1.4491, 44.4603 ], [ 1.4493, 44.4607 ], [ 1.4496, 44.4611 ], [ 1.4498, 44.4615 ], [ 1.4499, 44.4619 ], [ 1.4502, 44.4628 ], [ 1.4502, 44.463 ], [ 1.4503, 44.4631 ], [ 1.4508, 44.4637 ], [ 1.4509, 44.4638 ] ] ], "type": "Polygon" }, "id": "48", "properties": { "code_commune": "46042", "code_departement": "46", "code_qp": "QP046001", "commune_qp": "Cahors", "nom_commune": "Cahors", "nom_qp": "Terre Rouge" }, "type": "Feature" }, { "bbox": [ 2.3371, 43.2234, 2.3456, 43.2272 ], "geometry": { "coordinates": [ [ [ 2.3455, 43.2244 ], [ 2.3456, 43.2242 ], [ 2.3456, 43.2241 ], [ 2.3455, 43.224 ], [ 2.3454, 43.224 ], [ 2.3452, 43.224 ], [ 2.3451, 43.224 ], [ 2.3447, 43.224 ], [ 2.3447, 43.224 ], [ 2.3448, 43.2238 ], [ 2.3441, 43.2236 ], [ 2.3439, 43.2235 ], [ 2.3437, 43.2235 ], [ 2.3432, 43.2234 ], [ 2.3432, 43.2236 ], [ 2.344, 43.2239 ], [ 2.3443, 43.224 ], [ 2.3443, 43.2243 ], [ 2.3443, 43.2243 ], [ 2.3442, 43.2247 ], [ 2.3441, 43.2247 ], [ 2.3439, 43.2253 ], [ 2.3438, 43.2253 ], [ 2.3428, 43.2252 ], [ 2.3428, 43.2252 ], [ 2.3428, 43.2251 ], [ 2.3427, 43.2251 ], [ 2.3425, 43.2251 ], [ 2.3424, 43.2251 ], [ 2.3419, 43.225 ], [ 2.3419, 43.225 ], [ 2.3418, 43.225 ], [ 2.3416, 43.225 ], [ 2.3411, 43.2249 ], [ 2.3409, 43.2248 ], [ 2.3405, 43.2247 ], [ 2.3399, 43.2246 ], [ 2.3398, 43.2246 ], [ 2.3396, 43.2245 ], [ 2.3394, 43.2246 ], [ 2.3391, 43.2245 ], [ 2.3391, 43.2246 ], [ 2.339, 43.2248 ], [ 2.339, 43.2251 ], [ 2.3389, 43.2252 ], [ 2.3389, 43.2252 ], [ 2.3388, 43.2253 ], [ 2.3388, 43.2253 ], [ 2.3385, 43.2257 ], [ 2.3384, 43.2258 ], [ 2.3381, 43.2261 ], [ 2.338, 43.2261 ], [ 2.3376, 43.2265 ], [ 2.3374, 43.2266 ], [ 2.3372, 43.2269 ], [ 2.3371, 43.2271 ], [ 2.3372, 43.2271 ], [ 2.3382, 43.2272 ], [ 2.3383, 43.2269 ], [ 2.3393, 43.2269 ], [ 2.3396, 43.2269 ], [ 2.3401, 43.2269 ], [ 2.3403, 43.2269 ], [ 2.3407, 43.2269 ], [ 2.3411, 43.2268 ], [ 2.3419, 43.2266 ], [ 2.3425, 43.2265 ], [ 2.3429, 43.2264 ], [ 2.3433, 43.2263 ], [ 2.3438, 43.2262 ], [ 2.344, 43.2262 ], [ 2.3449, 43.2263 ], [ 2.345, 43.2263 ], [ 2.345, 43.2258 ], [ 2.345, 43.2255 ], [ 2.3451, 43.2251 ], [ 2.3451, 43.225 ], [ 2.3452, 43.2249 ], [ 2.3455, 43.2244 ] ] ], "type": "Polygon" }, "id": "49", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011005", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Fleming La Reille" }, "type": "Feature" }, { "bbox": [ 2.0317, 44.3495, 2.0405, 44.3571 ], "geometry": { "coordinates": [ [ [ 2.0348, 44.3523 ], [ 2.0343, 44.3523 ], [ 2.0345, 44.3527 ], [ 2.0347, 44.3531 ], [ 2.0346, 44.3532 ], [ 2.0349, 44.3534 ], [ 2.035, 44.3534 ], [ 2.0352, 44.3535 ], [ 2.0354, 44.3536 ], [ 2.0357, 44.3537 ], [ 2.0363, 44.3538 ], [ 2.0368, 44.3539 ], [ 2.0368, 44.3539 ], [ 2.0374, 44.354 ], [ 2.0377, 44.354 ], [ 2.0379, 44.3541 ], [ 2.0378, 44.3542 ], [ 2.0374, 44.3542 ], [ 2.0372, 44.3543 ], [ 2.037, 44.3546 ], [ 2.0368, 44.3548 ], [ 2.0367, 44.355 ], [ 2.0365, 44.3552 ], [ 2.0364, 44.3555 ], [ 2.0361, 44.3554 ], [ 2.036, 44.3554 ], [ 2.0357, 44.3554 ], [ 2.0352, 44.3556 ], [ 2.0348, 44.355 ], [ 2.0337, 44.3554 ], [ 2.0331, 44.3555 ], [ 2.0329, 44.3556 ], [ 2.0323, 44.3555 ], [ 2.0321, 44.3559 ], [ 2.0319, 44.3561 ], [ 2.0319, 44.3561 ], [ 2.032, 44.3562 ], [ 2.0318, 44.3564 ], [ 2.0317, 44.3566 ], [ 2.0319, 44.3568 ], [ 2.0326, 44.3566 ], [ 2.0327, 44.3565 ], [ 2.0327, 44.3566 ], [ 2.0329, 44.3571 ], [ 2.0331, 44.3571 ], [ 2.0332, 44.3569 ], [ 2.0334, 44.3569 ], [ 2.0336, 44.357 ], [ 2.0337, 44.3568 ], [ 2.0338, 44.3566 ], [ 2.0341, 44.3566 ], [ 2.0339, 44.3563 ], [ 2.034, 44.3562 ], [ 2.0346, 44.356 ], [ 2.0348, 44.3558 ], [ 2.0351, 44.3558 ], [ 2.0352, 44.3558 ], [ 2.0357, 44.356 ], [ 2.036, 44.3557 ], [ 2.0362, 44.3558 ], [ 2.0365, 44.356 ], [ 2.0364, 44.3561 ], [ 2.0363, 44.3564 ], [ 2.0373, 44.3567 ], [ 2.0375, 44.3563 ], [ 2.0373, 44.3557 ], [ 2.038, 44.3555 ], [ 2.0379, 44.3554 ], [ 2.0377, 44.3551 ], [ 2.0375, 44.355 ], [ 2.038, 44.3548 ], [ 2.0379, 44.3545 ], [ 2.038, 44.3545 ], [ 2.0379, 44.3544 ], [ 2.0381, 44.3543 ], [ 2.0382, 44.3544 ], [ 2.0385, 44.3544 ], [ 2.0387, 44.3544 ], [ 2.0387, 44.3544 ], [ 2.0387, 44.354 ], [ 2.0387, 44.3539 ], [ 2.0388, 44.3536 ], [ 2.0391, 44.353 ], [ 2.0394, 44.3526 ], [ 2.0396, 44.3522 ], [ 2.04, 44.3517 ], [ 2.0404, 44.3513 ], [ 2.0404, 44.3512 ], [ 2.0405, 44.3509 ], [ 2.0404, 44.3508 ], [ 2.0401, 44.3507 ], [ 2.0397, 44.3503 ], [ 2.0395, 44.3501 ], [ 2.0394, 44.35 ], [ 2.0385, 44.3498 ], [ 2.0381, 44.3497 ], [ 2.0378, 44.3497 ], [ 2.0371, 44.3495 ], [ 2.0365, 44.3495 ], [ 2.0362, 44.35 ], [ 2.0361, 44.35 ], [ 2.0365, 44.35 ], [ 2.0366, 44.3501 ], [ 2.0367, 44.3502 ], [ 2.0367, 44.3505 ], [ 2.0367, 44.3506 ], [ 2.0368, 44.3509 ], [ 2.0369, 44.3511 ], [ 2.0363, 44.3513 ], [ 2.0351, 44.3519 ], [ 2.0348, 44.3521 ], [ 2.0348, 44.3521 ], [ 2.0348, 44.3522 ], [ 2.0348, 44.3523 ] ] ], "type": "Polygon" }, "id": "50", "properties": { "code_commune": "12300", "code_departement": "12", "code_qp": "QP012002", "commune_qp": "Villefranche-de-Rouergue", "nom_commune": "Villefranche-de-Rouergue", "nom_qp": "La Bastide" }, "type": "Feature" }, { "bbox": [ 1.3795, 43.6375, 1.3879, 43.6403 ], "geometry": { "coordinates": [ [ [ 1.3819, 43.6376 ], [ 1.3815, 43.6377 ], [ 1.381, 43.6379 ], [ 1.3807, 43.638 ], [ 1.3804, 43.6381 ], [ 1.3801, 43.6382 ], [ 1.38, 43.6383 ], [ 1.3795, 43.6385 ], [ 1.3801, 43.6394 ], [ 1.3801, 43.6394 ], [ 1.3799, 43.6394 ], [ 1.38, 43.6395 ], [ 1.3804, 43.6396 ], [ 1.3805, 43.6396 ], [ 1.3806, 43.6393 ], [ 1.3807, 43.6393 ], [ 1.3808, 43.6395 ], [ 1.381, 43.6399 ], [ 1.3815, 43.6399 ], [ 1.3815, 43.6398 ], [ 1.3816, 43.6397 ], [ 1.3819, 43.6398 ], [ 1.3819, 43.6398 ], [ 1.3826, 43.6397 ], [ 1.3828, 43.6398 ], [ 1.3829, 43.6395 ], [ 1.3853, 43.6397 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6402 ], [ 1.3853, 43.6402 ], [ 1.3859, 43.6403 ], [ 1.3862, 43.6403 ], [ 1.3863, 43.6403 ], [ 1.3865, 43.6401 ], [ 1.3867, 43.6399 ], [ 1.387, 43.6397 ], [ 1.387, 43.6397 ], [ 1.3872, 43.6398 ], [ 1.3879, 43.6392 ], [ 1.3866, 43.639 ], [ 1.3857, 43.6389 ], [ 1.3856, 43.6389 ], [ 1.3856, 43.6389 ], [ 1.3856, 43.639 ], [ 1.3855, 43.639 ], [ 1.3854, 43.6391 ], [ 1.3853, 43.639 ], [ 1.3831, 43.6389 ], [ 1.3836, 43.6376 ], [ 1.3835, 43.6375 ], [ 1.3833, 43.6375 ], [ 1.383, 43.6375 ], [ 1.3824, 43.6376 ], [ 1.3819, 43.6376 ] ] ], "type": "Polygon" }, "id": "51", "properties": { "code_commune": "31069", "code_departement": "31", "code_qp": "QP031004", "commune_qp": "Blagnac", "nom_commune": "Blagnac", "nom_qp": "Barradels" }, "type": "Feature" }, { "bbox": [ 1.4736, 43.608, 1.4801, 43.6149 ], "geometry": { "coordinates": [ [ [ 1.4736, 43.6126 ], [ 1.4753, 43.6133 ], [ 1.4758, 43.6136 ], [ 1.4761, 43.6138 ], [ 1.4764, 43.6135 ], [ 1.478, 43.6143 ], [ 1.4792, 43.6149 ], [ 1.4799, 43.6142 ], [ 1.48, 43.6142 ], [ 1.4801, 43.614 ], [ 1.4785, 43.6132 ], [ 1.478, 43.6129 ], [ 1.4774, 43.6126 ], [ 1.4773, 43.6123 ], [ 1.4772, 43.612 ], [ 1.4776, 43.6116 ], [ 1.4786, 43.6106 ], [ 1.4791, 43.6101 ], [ 1.4779, 43.6096 ], [ 1.4774, 43.6093 ], [ 1.4781, 43.6086 ], [ 1.4767, 43.608 ], [ 1.4762, 43.6086 ], [ 1.476, 43.6087 ], [ 1.4759, 43.6088 ], [ 1.4753, 43.6095 ], [ 1.4753, 43.6095 ], [ 1.4753, 43.6096 ], [ 1.4753, 43.6096 ], [ 1.4755, 43.6097 ], [ 1.4769, 43.6104 ], [ 1.4762, 43.6112 ], [ 1.4767, 43.6114 ], [ 1.4774, 43.6117 ], [ 1.4771, 43.612 ], [ 1.4772, 43.6125 ], [ 1.4771, 43.6125 ], [ 1.4767, 43.6123 ], [ 1.476, 43.6119 ], [ 1.4756, 43.6117 ], [ 1.4754, 43.6116 ], [ 1.4748, 43.6122 ], [ 1.4742, 43.6119 ], [ 1.4736, 43.6126 ] ] ], "type": "Polygon" }, "id": "52", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031014", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Soupetard" }, "type": "Feature" }, { "bbox": [ 2.8921, 42.6847, 2.8956, 42.6892 ], "geometry": { "coordinates": [ [ [ 2.8956, 42.6868 ], [ 2.8955, 42.6868 ], [ 2.8954, 42.6866 ], [ 2.8955, 42.6867 ], [ 2.8948, 42.6861 ], [ 2.8946, 42.6859 ], [ 2.8945, 42.6858 ], [ 2.8945, 42.6857 ], [ 2.8944, 42.6857 ], [ 2.8944, 42.6855 ], [ 2.8943, 42.6852 ], [ 2.8947, 42.6852 ], [ 2.8946, 42.6852 ], [ 2.8945, 42.685 ], [ 2.8943, 42.6847 ], [ 2.8939, 42.6848 ], [ 2.8935, 42.685 ], [ 2.8933, 42.6851 ], [ 2.8933, 42.6853 ], [ 2.8933, 42.6854 ], [ 2.8934, 42.6858 ], [ 2.8929, 42.6858 ], [ 2.8928, 42.6858 ], [ 2.8923, 42.6858 ], [ 2.8921, 42.6859 ], [ 2.8922, 42.686 ], [ 2.8922, 42.6867 ], [ 2.8923, 42.6867 ], [ 2.8923, 42.6868 ], [ 2.8923, 42.6871 ], [ 2.8924, 42.6873 ], [ 2.8925, 42.6876 ], [ 2.8927, 42.6881 ], [ 2.8928, 42.688 ], [ 2.8928, 42.688 ], [ 2.8928, 42.6881 ], [ 2.8928, 42.6883 ], [ 2.893, 42.6886 ], [ 2.893, 42.6887 ], [ 2.8931, 42.6889 ], [ 2.8931, 42.6889 ], [ 2.8932, 42.6891 ], [ 2.8932, 42.6892 ], [ 2.8935, 42.689 ], [ 2.8936, 42.6889 ], [ 2.8937, 42.6889 ], [ 2.8937, 42.6888 ], [ 2.8937, 42.6888 ], [ 2.8947, 42.6881 ], [ 2.895, 42.6878 ], [ 2.8951, 42.6878 ], [ 2.8954, 42.6873 ], [ 2.8956, 42.6869 ], [ 2.8956, 42.6868 ] ] ], "type": "Polygon" }, "id": "53", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066006", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Rois De Majorque" }, "type": "Feature" }, { "bbox": [ 2.892, 42.7241, 2.9024, 42.729 ], "geometry": { "coordinates": [ [ [ 2.8942, 42.7246 ], [ 2.8936, 42.7241 ], [ 2.8931, 42.7245 ], [ 2.8923, 42.7251 ], [ 2.8923, 42.7251 ], [ 2.892, 42.7253 ], [ 2.8932, 42.7264 ], [ 2.8945, 42.7275 ], [ 2.8949, 42.7278 ], [ 2.8952, 42.728 ], [ 2.896, 42.7285 ], [ 2.8964, 42.7288 ], [ 2.897, 42.7283 ], [ 2.897, 42.7284 ], [ 2.8975, 42.7287 ], [ 2.8977, 42.7289 ], [ 2.8979, 42.729 ], [ 2.8991, 42.7281 ], [ 2.8993, 42.728 ], [ 2.8994, 42.7281 ], [ 2.8996, 42.7279 ], [ 2.8999, 42.7278 ], [ 2.9001, 42.7276 ], [ 2.9003, 42.7279 ], [ 2.9004, 42.7279 ], [ 2.9007, 42.7282 ], [ 2.9007, 42.7282 ], [ 2.9011, 42.7286 ], [ 2.9018, 42.7281 ], [ 2.9019, 42.728 ], [ 2.9021, 42.7278 ], [ 2.9022, 42.7277 ], [ 2.9023, 42.7274 ], [ 2.9024, 42.7273 ], [ 2.9008, 42.7271 ], [ 2.9007, 42.7271 ], [ 2.9, 42.727 ], [ 2.8999, 42.7269 ], [ 2.8997, 42.7269 ], [ 2.8983, 42.7267 ], [ 2.8983, 42.7266 ], [ 2.8988, 42.7262 ], [ 2.8985, 42.726 ], [ 2.8982, 42.7258 ], [ 2.8981, 42.7257 ], [ 2.8979, 42.7256 ], [ 2.8979, 42.7255 ], [ 2.8978, 42.7255 ], [ 2.8977, 42.7255 ], [ 2.8977, 42.7255 ], [ 2.8975, 42.7255 ], [ 2.8974, 42.7254 ], [ 2.8974, 42.7254 ], [ 2.8972, 42.7253 ], [ 2.8971, 42.7253 ], [ 2.897, 42.7254 ], [ 2.8969, 42.7255 ], [ 2.8965, 42.7257 ], [ 2.8963, 42.7259 ], [ 2.8962, 42.7258 ], [ 2.896, 42.726 ], [ 2.8953, 42.7255 ], [ 2.8953, 42.7255 ], [ 2.8942, 42.7246 ] ] ], "type": "Polygon" }, "id": "54", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066009", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Nouveau Logis" }, "type": "Feature" }, { "bbox": [ 3.8654, 43.6347, 3.8703, 43.6395 ], "geometry": { "coordinates": [ [ [ 3.8667, 43.635 ], [ 3.8668, 43.635 ], [ 3.8666, 43.6353 ], [ 3.8659, 43.6351 ], [ 3.8657, 43.6357 ], [ 3.8663, 43.6358 ], [ 3.8664, 43.6359 ], [ 3.8659, 43.6363 ], [ 3.8654, 43.6367 ], [ 3.8659, 43.6369 ], [ 3.8662, 43.637 ], [ 3.8667, 43.6373 ], [ 3.8665, 43.6375 ], [ 3.8671, 43.6378 ], [ 3.8673, 43.6383 ], [ 3.8686, 43.6389 ], [ 3.8691, 43.6391 ], [ 3.87, 43.6395 ], [ 3.8695, 43.6389 ], [ 3.869, 43.6384 ], [ 3.869, 43.6383 ], [ 3.8693, 43.6381 ], [ 3.8694, 43.6379 ], [ 3.8697, 43.638 ], [ 3.8699, 43.6381 ], [ 3.8699, 43.6381 ], [ 3.8699, 43.6379 ], [ 3.8697, 43.6378 ], [ 3.8701, 43.6377 ], [ 3.8703, 43.6376 ], [ 3.8703, 43.6372 ], [ 3.8696, 43.6364 ], [ 3.8687, 43.6364 ], [ 3.8684, 43.6358 ], [ 3.8683, 43.6357 ], [ 3.8682, 43.6355 ], [ 3.8682, 43.6352 ], [ 3.8682, 43.6349 ], [ 3.8681, 43.6348 ], [ 3.8679, 43.6347 ], [ 3.8676, 43.6347 ], [ 3.867, 43.6347 ], [ 3.8668, 43.6347 ], [ 3.8667, 43.6349 ], [ 3.8667, 43.6349 ], [ 3.8667, 43.635 ] ] ], "type": "Polygon" }, "id": "55", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034015", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Vert-Bois" }, "type": "Feature" }, { "bbox": [ 1.3685, 44.0085, 1.3867, 44.0176 ], "geometry": { "coordinates": [ [ [ 1.3867, 44.0146 ], [ 1.3866, 44.0144 ], [ 1.3861, 44.0143 ], [ 1.3849, 44.0141 ], [ 1.3845, 44.014 ], [ 1.3838, 44.0139 ], [ 1.3848, 44.0127 ], [ 1.3842, 44.0122 ], [ 1.3836, 44.0117 ], [ 1.3827, 44.011 ], [ 1.3832, 44.0107 ], [ 1.384, 44.0103 ], [ 1.3841, 44.0102 ], [ 1.3841, 44.0102 ], [ 1.3839, 44.0101 ], [ 1.3836, 44.0099 ], [ 1.3833, 44.0096 ], [ 1.383, 44.0093 ], [ 1.3827, 44.009 ], [ 1.3825, 44.0088 ], [ 1.3824, 44.0088 ], [ 1.3821, 44.0088 ], [ 1.3818, 44.0091 ], [ 1.3807, 44.0098 ], [ 1.3813, 44.0103 ], [ 1.3809, 44.0105 ], [ 1.3806, 44.0106 ], [ 1.3804, 44.0108 ], [ 1.3803, 44.0108 ], [ 1.3802, 44.0108 ], [ 1.3802, 44.0108 ], [ 1.3793, 44.0111 ], [ 1.3792, 44.0109 ], [ 1.3789, 44.011 ], [ 1.3789, 44.0111 ], [ 1.3786, 44.0111 ], [ 1.3786, 44.0114 ], [ 1.3782, 44.0114 ], [ 1.3779, 44.0105 ], [ 1.3779, 44.0103 ], [ 1.3786, 44.01 ], [ 1.3787, 44.01 ], [ 1.379, 44.0098 ], [ 1.3797, 44.0097 ], [ 1.3796, 44.0094 ], [ 1.3788, 44.0095 ], [ 1.3787, 44.0085 ], [ 1.3781, 44.0085 ], [ 1.3777, 44.0086 ], [ 1.3774, 44.0086 ], [ 1.3774, 44.0086 ], [ 1.3771, 44.0087 ], [ 1.3764, 44.0087 ], [ 1.3762, 44.0088 ], [ 1.376, 44.0089 ], [ 1.3757, 44.009 ], [ 1.3756, 44.0092 ], [ 1.3747, 44.0099 ], [ 1.3737, 44.011 ], [ 1.3735, 44.0104 ], [ 1.3734, 44.0102 ], [ 1.3734, 44.0102 ], [ 1.3733, 44.0101 ], [ 1.3732, 44.01 ], [ 1.3733, 44.0099 ], [ 1.3732, 44.0097 ], [ 1.3724, 44.0098 ], [ 1.3723, 44.0098 ], [ 1.3721, 44.0098 ], [ 1.3721, 44.0099 ], [ 1.3713, 44.0101 ], [ 1.3716, 44.0107 ], [ 1.3718, 44.0109 ], [ 1.3713, 44.0111 ], [ 1.3711, 44.0112 ], [ 1.3708, 44.0107 ], [ 1.3703, 44.0108 ], [ 1.3704, 44.0109 ], [ 1.3698, 44.0111 ], [ 1.3697, 44.0112 ], [ 1.3699, 44.0116 ], [ 1.3693, 44.0116 ], [ 1.3688, 44.0117 ], [ 1.3685, 44.012 ], [ 1.3698, 44.0128 ], [ 1.3701, 44.0127 ], [ 1.3704, 44.0128 ], [ 1.371, 44.0132 ], [ 1.3718, 44.0138 ], [ 1.3719, 44.0138 ], [ 1.3729, 44.015 ], [ 1.3735, 44.0157 ], [ 1.3742, 44.0153 ], [ 1.3751, 44.0161 ], [ 1.3759, 44.0168 ], [ 1.3761, 44.017 ], [ 1.3766, 44.0172 ], [ 1.3773, 44.0166 ], [ 1.378, 44.016 ], [ 1.3779, 44.0159 ], [ 1.3774, 44.0156 ], [ 1.377, 44.0153 ], [ 1.3769, 44.0155 ], [ 1.3764, 44.0152 ], [ 1.3763, 44.0153 ], [ 1.3754, 44.0145 ], [ 1.3758, 44.0142 ], [ 1.3763, 44.014 ], [ 1.3754, 44.0129 ], [ 1.3754, 44.0128 ], [ 1.375, 44.0122 ], [ 1.3751, 44.0122 ], [ 1.3744, 44.0121 ], [ 1.374, 44.012 ], [ 1.3739, 44.0121 ], [ 1.3737, 44.0112 ], [ 1.3739, 44.0109 ], [ 1.3751, 44.0108 ], [ 1.3754, 44.0108 ], [ 1.3756, 44.0106 ], [ 1.3764, 44.0105 ], [ 1.3766, 44.0105 ], [ 1.3767, 44.0107 ], [ 1.3766, 44.0107 ], [ 1.3765, 44.0107 ], [ 1.3762, 44.0108 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.011 ], [ 1.3763, 44.0112 ], [ 1.3762, 44.0112 ], [ 1.3761, 44.0112 ], [ 1.3757, 44.0112 ], [ 1.3757, 44.0113 ], [ 1.3757, 44.0113 ], [ 1.3758, 44.0118 ], [ 1.3758, 44.0118 ], [ 1.3758, 44.012 ], [ 1.3757, 44.0122 ], [ 1.3765, 44.0122 ], [ 1.3769, 44.0122 ], [ 1.3771, 44.0122 ], [ 1.3773, 44.0123 ], [ 1.3784, 44.0124 ], [ 1.3786, 44.0125 ], [ 1.3788, 44.0124 ], [ 1.3789, 44.0124 ], [ 1.3792, 44.0124 ], [ 1.3793, 44.0125 ], [ 1.3794, 44.0126 ], [ 1.3804, 44.0128 ], [ 1.3806, 44.0128 ], [ 1.3809, 44.0129 ], [ 1.3812, 44.0131 ], [ 1.3814, 44.0132 ], [ 1.3814, 44.0133 ], [ 1.381, 44.0138 ], [ 1.3825, 44.0143 ], [ 1.3821, 44.0149 ], [ 1.3819, 44.0151 ], [ 1.3813, 44.0158 ], [ 1.3817, 44.0159 ], [ 1.3822, 44.0161 ], [ 1.3829, 44.0164 ], [ 1.3836, 44.0167 ], [ 1.3839, 44.0168 ], [ 1.3841, 44.0168 ], [ 1.3837, 44.0176 ], [ 1.384, 44.0176 ], [ 1.3843, 44.0176 ], [ 1.3847, 44.0169 ], [ 1.3848, 44.017 ], [ 1.3855, 44.0166 ], [ 1.3855, 44.0166 ], [ 1.3858, 44.0164 ], [ 1.3857, 44.016 ], [ 1.3864, 44.0156 ], [ 1.3863, 44.015 ], [ 1.3863, 44.0149 ], [ 1.3864, 44.0148 ], [ 1.3866, 44.0147 ], [ 1.3867, 44.0146 ], [ 1.3867, 44.0146 ] ] ], "type": "Polygon" }, "id": "56", "properties": { "code_commune": "82121", "code_departement": "82", "code_qp": "QP082002", "commune_qp": "Montauban", "nom_commune": "Montauban", "nom_qp": "Médiathèque - Chambord" }, "type": "Feature" }, { "bbox": [ 2.1581, 43.9249, 2.1666, 43.9301 ], "geometry": { "coordinates": [ [ [ 2.1634, 43.9298 ], [ 2.1645, 43.9293 ], [ 2.1646, 43.9292 ], [ 2.1644, 43.9291 ], [ 2.1648, 43.9287 ], [ 2.165, 43.9286 ], [ 2.1651, 43.9284 ], [ 2.1653, 43.9282 ], [ 2.1652, 43.9279 ], [ 2.1653, 43.9279 ], [ 2.1662, 43.9278 ], [ 2.1661, 43.9278 ], [ 2.1666, 43.9276 ], [ 2.1665, 43.9272 ], [ 2.166, 43.9272 ], [ 2.166, 43.9273 ], [ 2.1659, 43.9274 ], [ 2.1651, 43.9275 ], [ 2.165, 43.9274 ], [ 2.1646, 43.9274 ], [ 2.1646, 43.9273 ], [ 2.1644, 43.9274 ], [ 2.1643, 43.9271 ], [ 2.164, 43.9271 ], [ 2.1639, 43.9267 ], [ 2.1638, 43.9266 ], [ 2.1633, 43.9266 ], [ 2.1632, 43.9261 ], [ 2.1632, 43.9261 ], [ 2.1631, 43.926 ], [ 2.1629, 43.9257 ], [ 2.1623, 43.9257 ], [ 2.1622, 43.9253 ], [ 2.162, 43.9252 ], [ 2.1614, 43.9254 ], [ 2.1613, 43.925 ], [ 2.1607, 43.9252 ], [ 2.1596, 43.9255 ], [ 2.1596, 43.9254 ], [ 2.1592, 43.9249 ], [ 2.159, 43.9249 ], [ 2.1587, 43.925 ], [ 2.1584, 43.9252 ], [ 2.1581, 43.9253 ], [ 2.1587, 43.9267 ], [ 2.1598, 43.9265 ], [ 2.1597, 43.9259 ], [ 2.1603, 43.9259 ], [ 2.1606, 43.9259 ], [ 2.161, 43.9258 ], [ 2.1612, 43.9262 ], [ 2.1612, 43.9264 ], [ 2.1615, 43.9264 ], [ 2.1616, 43.9267 ], [ 2.1615, 43.9267 ], [ 2.1617, 43.9273 ], [ 2.1618, 43.9273 ], [ 2.1618, 43.9273 ], [ 2.1619, 43.9276 ], [ 2.1619, 43.9278 ], [ 2.162, 43.9283 ], [ 2.1616, 43.9284 ], [ 2.1611, 43.9283 ], [ 2.1611, 43.9287 ], [ 2.1611, 43.9288 ], [ 2.1621, 43.9287 ], [ 2.1622, 43.929 ], [ 2.1632, 43.9288 ], [ 2.1633, 43.9293 ], [ 2.1629, 43.9294 ], [ 2.1627, 43.9297 ], [ 2.1628, 43.9297 ], [ 2.1626, 43.9299 ], [ 2.1631, 43.9301 ], [ 2.1632, 43.9301 ], [ 2.1634, 43.9298 ] ] ], "type": "Polygon" }, "id": "57", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081008", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Lapanouse" }, "type": "Feature" }, { "bbox": [ 1.4619, 43.565, 1.4697, 43.5738 ], "geometry": { "coordinates": [ [ [ 1.4636, 43.5734 ], [ 1.4637, 43.5734 ], [ 1.4626, 43.5724 ], [ 1.4639, 43.5722 ], [ 1.4628, 43.5712 ], [ 1.464, 43.5705 ], [ 1.4639, 43.5705 ], [ 1.4641, 43.5704 ], [ 1.4642, 43.5704 ], [ 1.4645, 43.5702 ], [ 1.4647, 43.57 ], [ 1.4648, 43.5693 ], [ 1.4654, 43.5693 ], [ 1.4658, 43.5689 ], [ 1.4664, 43.5692 ], [ 1.4679, 43.5699 ], [ 1.4685, 43.5693 ], [ 1.4692, 43.5686 ], [ 1.4697, 43.5681 ], [ 1.4658, 43.5661 ], [ 1.4652, 43.5657 ], [ 1.4645, 43.565 ], [ 1.464, 43.5656 ], [ 1.4635, 43.5658 ], [ 1.4637, 43.566 ], [ 1.4633, 43.5663 ], [ 1.4634, 43.5677 ], [ 1.4643, 43.5676 ], [ 1.464, 43.569 ], [ 1.4634, 43.5691 ], [ 1.4633, 43.5702 ], [ 1.4619, 43.5705 ], [ 1.4626, 43.5713 ], [ 1.4623, 43.5715 ], [ 1.4627, 43.5719 ], [ 1.462, 43.5725 ], [ 1.4627, 43.5731 ], [ 1.4624, 43.5732 ], [ 1.463, 43.5738 ], [ 1.463, 43.5738 ], [ 1.4636, 43.5734 ] ] ], "type": "Polygon" }, "id": "58", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031015", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Rangueil" }, "type": "Feature" }, { "bbox": [ 2.9733, 43.1814, 2.9962, 43.19 ], "geometry": { "coordinates": [ [ [ 2.9837, 43.1842 ], [ 2.9837, 43.1836 ], [ 2.9812, 43.1837 ], [ 2.9808, 43.1838 ], [ 2.9807, 43.1827 ], [ 2.9807, 43.1827 ], [ 2.981, 43.1827 ], [ 2.9809, 43.1816 ], [ 2.98, 43.1815 ], [ 2.9786, 43.1815 ], [ 2.9779, 43.1814 ], [ 2.9779, 43.1819 ], [ 2.978, 43.1826 ], [ 2.978, 43.1827 ], [ 2.978, 43.1834 ], [ 2.978, 43.1834 ], [ 2.9778, 43.1834 ], [ 2.9776, 43.1834 ], [ 2.9768, 43.1833 ], [ 2.9762, 43.1833 ], [ 2.9761, 43.1833 ], [ 2.976, 43.1833 ], [ 2.9759, 43.1832 ], [ 2.9761, 43.1826 ], [ 2.9761, 43.1826 ], [ 2.9755, 43.1825 ], [ 2.9752, 43.1825 ], [ 2.9751, 43.1825 ], [ 2.975, 43.1825 ], [ 2.9749, 43.1825 ], [ 2.9749, 43.182 ], [ 2.9743, 43.1819 ], [ 2.9743, 43.1821 ], [ 2.9739, 43.1821 ], [ 2.9739, 43.182 ], [ 2.9739, 43.182 ], [ 2.9734, 43.182 ], [ 2.9734, 43.1827 ], [ 2.9733, 43.1831 ], [ 2.9735, 43.1831 ], [ 2.974, 43.1833 ], [ 2.9755, 43.1838 ], [ 2.9757, 43.1839 ], [ 2.9758, 43.1839 ], [ 2.9763, 43.1842 ], [ 2.9764, 43.1842 ], [ 2.9765, 43.1843 ], [ 2.9768, 43.1848 ], [ 2.9768, 43.1849 ], [ 2.9768, 43.1852 ], [ 2.9762, 43.1851 ], [ 2.9762, 43.1858 ], [ 2.9763, 43.1861 ], [ 2.9763, 43.1863 ], [ 2.9765, 43.1864 ], [ 2.9765, 43.1866 ], [ 2.9768, 43.1866 ], [ 2.9769, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9775, 43.1865 ], [ 2.9775, 43.1864 ], [ 2.9778, 43.1864 ], [ 2.9778, 43.1863 ], [ 2.9782, 43.1864 ], [ 2.9782, 43.1864 ], [ 2.9783, 43.1865 ], [ 2.9783, 43.1865 ], [ 2.9786, 43.1865 ], [ 2.9786, 43.1867 ], [ 2.9785, 43.1868 ], [ 2.9786, 43.1868 ], [ 2.9786, 43.1868 ], [ 2.979, 43.1868 ], [ 2.979, 43.1867 ], [ 2.9789, 43.1866 ], [ 2.9789, 43.1865 ], [ 2.9789, 43.1864 ], [ 2.9789, 43.1861 ], [ 2.9793, 43.1861 ], [ 2.9793, 43.1859 ], [ 2.9786, 43.1859 ], [ 2.9786, 43.1858 ], [ 2.9786, 43.1849 ], [ 2.9786, 43.1846 ], [ 2.979, 43.1847 ], [ 2.9791, 43.1847 ], [ 2.9794, 43.1847 ], [ 2.9798, 43.1847 ], [ 2.981, 43.185 ], [ 2.9811, 43.1847 ], [ 2.981, 43.1846 ], [ 2.981, 43.1841 ], [ 2.9817, 43.1841 ], [ 2.9822, 43.1842 ], [ 2.9824, 43.1841 ], [ 2.9825, 43.1841 ], [ 2.9832, 43.1841 ], [ 2.9832, 43.1841 ], [ 2.9833, 43.1842 ], [ 2.9833, 43.1843 ], [ 2.9836, 43.1855 ], [ 2.9837, 43.1856 ], [ 2.9839, 43.1864 ], [ 2.984, 43.1871 ], [ 2.9836, 43.1871 ], [ 2.984, 43.1877 ], [ 2.9842, 43.188 ], [ 2.9843, 43.1881 ], [ 2.9844, 43.1881 ], [ 2.9847, 43.1882 ], [ 2.9848, 43.1882 ], [ 2.985, 43.1885 ], [ 2.9852, 43.189 ], [ 2.9854, 43.1891 ], [ 2.9854, 43.1891 ], [ 2.9863, 43.1886 ], [ 2.9864, 43.1886 ], [ 2.9864, 43.1887 ], [ 2.9865, 43.1887 ], [ 2.9866, 43.1888 ], [ 2.9867, 43.1888 ], [ 2.9876, 43.1884 ], [ 2.9878, 43.1888 ], [ 2.9881, 43.1891 ], [ 2.9882, 43.1893 ], [ 2.9881, 43.1894 ], [ 2.9885, 43.1898 ], [ 2.9898, 43.189 ], [ 2.9901, 43.1888 ], [ 2.9903, 43.1886 ], [ 2.991, 43.1882 ], [ 2.9913, 43.1886 ], [ 2.9917, 43.1889 ], [ 2.9923, 43.189 ], [ 2.9929, 43.1887 ], [ 2.9933, 43.189 ], [ 2.9936, 43.1892 ], [ 2.9936, 43.1892 ], [ 2.9935, 43.1894 ], [ 2.9935, 43.1895 ], [ 2.9935, 43.1896 ], [ 2.9941, 43.1898 ], [ 2.9947, 43.19 ], [ 2.9949, 43.19 ], [ 2.9951, 43.1898 ], [ 2.9958, 43.1889 ], [ 2.9961, 43.1886 ], [ 2.9962, 43.1884 ], [ 2.9955, 43.1887 ], [ 2.9941, 43.1891 ], [ 2.9934, 43.1885 ], [ 2.993, 43.1881 ], [ 2.9928, 43.1879 ], [ 2.9928, 43.1877 ], [ 2.9929, 43.1877 ], [ 2.9932, 43.1877 ], [ 2.9934, 43.1877 ], [ 2.9939, 43.1878 ], [ 2.9942, 43.1878 ], [ 2.9942, 43.1878 ], [ 2.9943, 43.1877 ], [ 2.995, 43.1877 ], [ 2.9954, 43.1877 ], [ 2.9958, 43.1877 ], [ 2.9961, 43.1876 ], [ 2.9953, 43.1866 ], [ 2.995, 43.1867 ], [ 2.9945, 43.1869 ], [ 2.9946, 43.1871 ], [ 2.9944, 43.1872 ], [ 2.9944, 43.1872 ], [ 2.994, 43.1874 ], [ 2.9939, 43.1874 ], [ 2.9937, 43.1871 ], [ 2.9934, 43.1873 ], [ 2.9931, 43.1874 ], [ 2.9923, 43.1876 ], [ 2.9921, 43.1871 ], [ 2.9919, 43.1871 ], [ 2.992, 43.1871 ], [ 2.9916, 43.1873 ], [ 2.9916, 43.1874 ], [ 2.9915, 43.1874 ], [ 2.9909, 43.1877 ], [ 2.9908, 43.1873 ], [ 2.9907, 43.1871 ], [ 2.9906, 43.187 ], [ 2.9905, 43.187 ], [ 2.9895, 43.1871 ], [ 2.9888, 43.1872 ], [ 2.9877, 43.1872 ], [ 2.9871, 43.1873 ], [ 2.9866, 43.1873 ], [ 2.986, 43.1873 ], [ 2.9858, 43.1871 ], [ 2.9855, 43.187 ], [ 2.9853, 43.187 ], [ 2.9848, 43.187 ], [ 2.9848, 43.1866 ], [ 2.9849, 43.1865 ], [ 2.9848, 43.1859 ], [ 2.9843, 43.1859 ], [ 2.9843, 43.1856 ], [ 2.9843, 43.1855 ], [ 2.985, 43.1855 ], [ 2.9848, 43.1842 ], [ 2.9841, 43.1842 ], [ 2.9837, 43.1842 ] ] ], "type": "Polygon" }, "id": "59", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011007", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Ouest" }, "type": "Feature" }, { "bbox": [ 4.0105, 44.2164, 4.0202, 44.2295 ], "geometry": { "coordinates": [ [ [ 4.0202, 44.2165 ], [ 4.02, 44.2164 ], [ 4.0198, 44.2166 ], [ 4.0197, 44.2168 ], [ 4.0196, 44.2169 ], [ 4.0194, 44.2171 ], [ 4.0192, 44.2172 ], [ 4.0189, 44.2174 ], [ 4.0188, 44.2175 ], [ 4.0187, 44.2176 ], [ 4.0182, 44.2178 ], [ 4.0177, 44.2181 ], [ 4.0169, 44.2185 ], [ 4.0163, 44.2188 ], [ 4.016, 44.2191 ], [ 4.0151, 44.2198 ], [ 4.0147, 44.22 ], [ 4.0144, 44.2203 ], [ 4.0142, 44.2205 ], [ 4.014, 44.2206 ], [ 4.0139, 44.2207 ], [ 4.0139, 44.2208 ], [ 4.0139, 44.2208 ], [ 4.0137, 44.2208 ], [ 4.0136, 44.2208 ], [ 4.0134, 44.221 ], [ 4.0133, 44.2214 ], [ 4.0132, 44.2217 ], [ 4.0132, 44.2218 ], [ 4.0132, 44.2219 ], [ 4.0132, 44.222 ], [ 4.0137, 44.2222 ], [ 4.014, 44.2224 ], [ 4.0138, 44.2226 ], [ 4.0137, 44.2228 ], [ 4.0136, 44.223 ], [ 4.0135, 44.2232 ], [ 4.0134, 44.2234 ], [ 4.0134, 44.2236 ], [ 4.0133, 44.2236 ], [ 4.0132, 44.2239 ], [ 4.0132, 44.224 ], [ 4.0132, 44.2241 ], [ 4.0132, 44.2242 ], [ 4.0131, 44.2246 ], [ 4.0131, 44.2246 ], [ 4.0131, 44.2248 ], [ 4.013, 44.2252 ], [ 4.0129, 44.2255 ], [ 4.0128, 44.2256 ], [ 4.0128, 44.2258 ], [ 4.0127, 44.2259 ], [ 4.0126, 44.2261 ], [ 4.0125, 44.2263 ], [ 4.0124, 44.2265 ], [ 4.0123, 44.2266 ], [ 4.0121, 44.227 ], [ 4.0121, 44.227 ], [ 4.012, 44.227 ], [ 4.0118, 44.2274 ], [ 4.0117, 44.2276 ], [ 4.0116, 44.2277 ], [ 4.0114, 44.2279 ], [ 4.0112, 44.2281 ], [ 4.011, 44.2283 ], [ 4.0108, 44.2284 ], [ 4.0108, 44.2284 ], [ 4.0108, 44.2285 ], [ 4.0108, 44.2285 ], [ 4.0106, 44.2286 ], [ 4.0105, 44.2287 ], [ 4.0106, 44.2289 ], [ 4.0107, 44.2289 ], [ 4.0108, 44.2289 ], [ 4.0108, 44.2289 ], [ 4.011, 44.229 ], [ 4.011, 44.229 ], [ 4.0114, 44.2291 ], [ 4.0112, 44.2294 ], [ 4.0112, 44.2295 ], [ 4.0113, 44.2295 ], [ 4.0114, 44.2295 ], [ 4.0116, 44.2295 ], [ 4.0119, 44.2295 ], [ 4.0121, 44.2295 ], [ 4.0121, 44.2295 ], [ 4.0121, 44.2294 ], [ 4.0122, 44.2293 ], [ 4.0123, 44.2293 ], [ 4.0124, 44.2292 ], [ 4.0128, 44.2292 ], [ 4.0129, 44.229 ], [ 4.0128, 44.229 ], [ 4.0127, 44.229 ], [ 4.0127, 44.229 ], [ 4.0126, 44.229 ], [ 4.0125, 44.2289 ], [ 4.0126, 44.2289 ], [ 4.0125, 44.2289 ], [ 4.0127, 44.2287 ], [ 4.0127, 44.2287 ], [ 4.0127, 44.2287 ], [ 4.0124, 44.2285 ], [ 4.0122, 44.2285 ], [ 4.012, 44.2284 ], [ 4.0118, 44.2283 ], [ 4.0117, 44.2283 ], [ 4.0118, 44.2282 ], [ 4.0118, 44.2282 ], [ 4.0119, 44.2281 ], [ 4.012, 44.2281 ], [ 4.0119, 44.2281 ], [ 4.0119, 44.228 ], [ 4.012, 44.228 ], [ 4.0121, 44.228 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.228 ], [ 4.0125, 44.228 ], [ 4.0127, 44.2279 ], [ 4.013, 44.2277 ], [ 4.0131, 44.2277 ], [ 4.0131, 44.2276 ], [ 4.0131, 44.2275 ], [ 4.0131, 44.2274 ], [ 4.0131, 44.2273 ], [ 4.0131, 44.2272 ], [ 4.0131, 44.2272 ], [ 4.0136, 44.2272 ], [ 4.0141, 44.2272 ], [ 4.0141, 44.2272 ], [ 4.0142, 44.2272 ], [ 4.0144, 44.2272 ], [ 4.0144, 44.2273 ], [ 4.0144, 44.2274 ], [ 4.0146, 44.2275 ], [ 4.0147, 44.2275 ], [ 4.0147, 44.2275 ], [ 4.0148, 44.2275 ], [ 4.0149, 44.2276 ], [ 4.015, 44.2276 ], [ 4.015, 44.2276 ], [ 4.0151, 44.2277 ], [ 4.0151, 44.2277 ], [ 4.0151, 44.2278 ], [ 4.0152, 44.2278 ], [ 4.0153, 44.2278 ], [ 4.0153, 44.2279 ], [ 4.0154, 44.2279 ], [ 4.0155, 44.228 ], [ 4.0156, 44.2279 ], [ 4.0157, 44.2279 ], [ 4.0157, 44.2279 ], [ 4.0156, 44.2276 ], [ 4.0155, 44.2275 ], [ 4.0155, 44.2274 ], [ 4.0155, 44.2273 ], [ 4.0155, 44.2272 ], [ 4.0155, 44.2271 ], [ 4.0155, 44.2271 ], [ 4.0156, 44.227 ], [ 4.0156, 44.2269 ], [ 4.0157, 44.2268 ], [ 4.0161, 44.2265 ], [ 4.0157, 44.2258 ], [ 4.0152, 44.225 ], [ 4.0152, 44.2245 ], [ 4.0152, 44.2245 ], [ 4.0151, 44.2244 ], [ 4.0151, 44.2243 ], [ 4.015, 44.2242 ], [ 4.015, 44.2242 ], [ 4.0149, 44.224 ], [ 4.0149, 44.2239 ], [ 4.0151, 44.2238 ], [ 4.0154, 44.2236 ], [ 4.0156, 44.2235 ], [ 4.016, 44.2233 ], [ 4.0162, 44.2232 ], [ 4.0163, 44.2232 ], [ 4.0164, 44.2232 ], [ 4.0164, 44.2232 ], [ 4.0166, 44.2235 ], [ 4.0169, 44.224 ], [ 4.0171, 44.2239 ], [ 4.0173, 44.2239 ], [ 4.0174, 44.2238 ], [ 4.018, 44.2237 ], [ 4.018, 44.2237 ], [ 4.018, 44.2238 ], [ 4.0181, 44.224 ], [ 4.0185, 44.2239 ], [ 4.0188, 44.2237 ], [ 4.0187, 44.2236 ], [ 4.0188, 44.2234 ], [ 4.0187, 44.2233 ], [ 4.0187, 44.2231 ], [ 4.0186, 44.2229 ], [ 4.0187, 44.2229 ], [ 4.0185, 44.2228 ], [ 4.0184, 44.2228 ], [ 4.0183, 44.2228 ], [ 4.0182, 44.2227 ], [ 4.0182, 44.2225 ], [ 4.0183, 44.2224 ], [ 4.0186, 44.2223 ], [ 4.0186, 44.2223 ], [ 4.0188, 44.2222 ], [ 4.0188, 44.2222 ], [ 4.019, 44.2221 ], [ 4.0191, 44.2219 ], [ 4.0192, 44.2218 ], [ 4.0194, 44.2218 ], [ 4.0195, 44.2218 ], [ 4.0195, 44.2217 ], [ 4.0192, 44.2216 ], [ 4.0192, 44.2216 ], [ 4.019, 44.2215 ], [ 4.0191, 44.2214 ], [ 4.0189, 44.2213 ], [ 4.0189, 44.2212 ], [ 4.0189, 44.221 ], [ 4.019, 44.221 ], [ 4.019, 44.2209 ], [ 4.019, 44.2208 ], [ 4.019, 44.2208 ], [ 4.0191, 44.2207 ], [ 4.0191, 44.2207 ], [ 4.0191, 44.2206 ], [ 4.0192, 44.2205 ], [ 4.0193, 44.2205 ], [ 4.0196, 44.2202 ], [ 4.0197, 44.2201 ], [ 4.0197, 44.2199 ], [ 4.0202, 44.2196 ], [ 4.02, 44.2195 ], [ 4.0198, 44.2195 ], [ 4.0194, 44.2193 ], [ 4.0194, 44.2192 ], [ 4.0194, 44.2191 ], [ 4.0193, 44.219 ], [ 4.0196, 44.2187 ], [ 4.0197, 44.2186 ], [ 4.0196, 44.2185 ], [ 4.0196, 44.2185 ], [ 4.0196, 44.2184 ], [ 4.0196, 44.2183 ], [ 4.0196, 44.2181 ], [ 4.019, 44.218 ], [ 4.0193, 44.2176 ], [ 4.0193, 44.2175 ], [ 4.0195, 44.2173 ], [ 4.0196, 44.2171 ], [ 4.0199, 44.2167 ], [ 4.0202, 44.2165 ] ] ], "type": "Polygon" }, "id": "60", "properties": { "code_commune": "30132", "code_departement": "30", "code_qp": "QP030017", "commune_qp": "La Grand-Combe", "nom_commune": "La Grand-Combe", "nom_qp": "Trescol - La Levade" }, "type": "Feature" }, { "bbox": [ 3.8707, 43.5912, 3.874, 43.594 ], "geometry": { "coordinates": [ [ [ 3.8721, 43.594 ], [ 3.8726, 43.5937 ], [ 3.8729, 43.5936 ], [ 3.8733, 43.5934 ], [ 3.8734, 43.5933 ], [ 3.8737, 43.5932 ], [ 3.8738, 43.5931 ], [ 3.874, 43.593 ], [ 3.8732, 43.5921 ], [ 3.873, 43.5921 ], [ 3.8729, 43.5921 ], [ 3.8727, 43.5922 ], [ 3.8725, 43.5923 ], [ 3.8723, 43.5921 ], [ 3.8728, 43.5919 ], [ 3.8733, 43.5917 ], [ 3.8727, 43.5912 ], [ 3.8719, 43.5916 ], [ 3.8715, 43.5913 ], [ 3.8707, 43.5917 ], [ 3.8713, 43.5923 ], [ 3.8716, 43.5927 ], [ 3.8712, 43.5929 ], [ 3.8717, 43.5935 ], [ 3.8717, 43.5936 ], [ 3.8721, 43.594 ] ] ], "type": "Polygon" }, "id": "61", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034011", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Lemasson" }, "type": "Feature" }, { "bbox": [ 3.8982, 43.6178, 3.9038, 43.6215 ], "geometry": { "coordinates": [ [ [ 3.9006, 43.6185 ], [ 3.9002, 43.6184 ], [ 3.8991, 43.6183 ], [ 3.8988, 43.6183 ], [ 3.8986, 43.6183 ], [ 3.8982, 43.6184 ], [ 3.8983, 43.6185 ], [ 3.8986, 43.6188 ], [ 3.8988, 43.6189 ], [ 3.899, 43.619 ], [ 3.8994, 43.6192 ], [ 3.8996, 43.6193 ], [ 3.8997, 43.6193 ], [ 3.8999, 43.6194 ], [ 3.9002, 43.6194 ], [ 3.9005, 43.6194 ], [ 3.9007, 43.6195 ], [ 3.9008, 43.6196 ], [ 3.901, 43.6197 ], [ 3.901, 43.6198 ], [ 3.9011, 43.6199 ], [ 3.9011, 43.62 ], [ 3.9015, 43.6203 ], [ 3.9016, 43.6204 ], [ 3.9017, 43.6205 ], [ 3.9017, 43.6206 ], [ 3.9016, 43.621 ], [ 3.9016, 43.621 ], [ 3.9017, 43.6212 ], [ 3.9018, 43.6213 ], [ 3.9019, 43.6213 ], [ 3.9021, 43.6214 ], [ 3.9026, 43.6214 ], [ 3.9029, 43.6214 ], [ 3.9031, 43.6215 ], [ 3.9033, 43.6215 ], [ 3.9034, 43.6215 ], [ 3.9036, 43.6214 ], [ 3.9036, 43.6213 ], [ 3.9037, 43.6213 ], [ 3.9037, 43.6212 ], [ 3.9038, 43.6209 ], [ 3.9038, 43.6208 ], [ 3.9037, 43.6208 ], [ 3.9036, 43.6207 ], [ 3.9034, 43.6206 ], [ 3.9033, 43.6205 ], [ 3.9033, 43.6204 ], [ 3.9034, 43.6201 ], [ 3.9034, 43.62 ], [ 3.9037, 43.6198 ], [ 3.9038, 43.6197 ], [ 3.9033, 43.6195 ], [ 3.9032, 43.6195 ], [ 3.9033, 43.6191 ], [ 3.903, 43.6191 ], [ 3.9027, 43.6191 ], [ 3.9023, 43.6191 ], [ 3.9019, 43.6192 ], [ 3.9015, 43.6193 ], [ 3.9009, 43.6194 ], [ 3.9011, 43.6189 ], [ 3.9012, 43.6185 ], [ 3.9014, 43.618 ], [ 3.9014, 43.6179 ], [ 3.9012, 43.6178 ], [ 3.9011, 43.6178 ], [ 3.9009, 43.6178 ], [ 3.9008, 43.6178 ], [ 3.9007, 43.6178 ], [ 3.9007, 43.6179 ], [ 3.9006, 43.6185 ] ] ], "type": "Polygon" }, "id": "62", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034013", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Pompignane" }, "type": "Feature" }, { "bbox": [ 1.1403, 42.9816, 1.1485, 42.9867 ], "geometry": { "coordinates": [ [ [ 1.1438, 42.9863 ], [ 1.1441, 42.9864 ], [ 1.1443, 42.9865 ], [ 1.1445, 42.9866 ], [ 1.1447, 42.9867 ], [ 1.145, 42.9864 ], [ 1.145, 42.9863 ], [ 1.145, 42.9863 ], [ 1.1452, 42.9862 ], [ 1.1453, 42.9863 ], [ 1.1454, 42.9863 ], [ 1.1455, 42.9863 ], [ 1.1454, 42.9862 ], [ 1.1455, 42.9862 ], [ 1.1456, 42.9862 ], [ 1.1456, 42.9862 ], [ 1.1455, 42.9862 ], [ 1.1455, 42.9861 ], [ 1.1455, 42.9861 ], [ 1.1456, 42.9861 ], [ 1.1456, 42.986 ], [ 1.1455, 42.986 ], [ 1.1455, 42.9859 ], [ 1.146, 42.9858 ], [ 1.1465, 42.9857 ], [ 1.1467, 42.9856 ], [ 1.1468, 42.9856 ], [ 1.147, 42.9855 ], [ 1.1472, 42.9853 ], [ 1.1473, 42.9851 ], [ 1.1475, 42.9847 ], [ 1.1485, 42.9829 ], [ 1.1481, 42.9828 ], [ 1.1478, 42.9827 ], [ 1.1474, 42.9828 ], [ 1.1472, 42.9828 ], [ 1.147, 42.9827 ], [ 1.146, 42.9823 ], [ 1.1449, 42.9834 ], [ 1.1448, 42.9835 ], [ 1.1447, 42.9834 ], [ 1.1446, 42.9835 ], [ 1.1445, 42.9836 ], [ 1.1442, 42.9839 ], [ 1.1441, 42.9841 ], [ 1.144, 42.9842 ], [ 1.1435, 42.9844 ], [ 1.1432, 42.9846 ], [ 1.1433, 42.9848 ], [ 1.1427, 42.9857 ], [ 1.1421, 42.9855 ], [ 1.1422, 42.9853 ], [ 1.1429, 42.9842 ], [ 1.1432, 42.984 ], [ 1.1437, 42.9836 ], [ 1.1442, 42.9831 ], [ 1.1442, 42.9832 ], [ 1.1443, 42.9831 ], [ 1.1443, 42.9831 ], [ 1.1443, 42.983 ], [ 1.1442, 42.983 ], [ 1.1444, 42.9829 ], [ 1.1445, 42.9828 ], [ 1.1446, 42.9827 ], [ 1.1449, 42.9825 ], [ 1.1452, 42.9823 ], [ 1.1455, 42.9819 ], [ 1.1454, 42.9819 ], [ 1.1451, 42.9818 ], [ 1.1451, 42.9817 ], [ 1.1449, 42.9816 ], [ 1.1448, 42.9817 ], [ 1.1446, 42.9816 ], [ 1.1446, 42.9817 ], [ 1.1443, 42.9816 ], [ 1.1441, 42.9817 ], [ 1.1443, 42.9818 ], [ 1.1442, 42.9818 ], [ 1.1441, 42.9819 ], [ 1.144, 42.982 ], [ 1.1439, 42.982 ], [ 1.1438, 42.9821 ], [ 1.1439, 42.9821 ], [ 1.1436, 42.9825 ], [ 1.1435, 42.9824 ], [ 1.1434, 42.9824 ], [ 1.1433, 42.9825 ], [ 1.1432, 42.983 ], [ 1.1432, 42.9832 ], [ 1.1431, 42.9833 ], [ 1.1427, 42.9838 ], [ 1.1425, 42.984 ], [ 1.1413, 42.9852 ], [ 1.1412, 42.9851 ], [ 1.1406, 42.9849 ], [ 1.1403, 42.9854 ], [ 1.1412, 42.9858 ], [ 1.1413, 42.9859 ], [ 1.1415, 42.986 ], [ 1.1414, 42.9862 ], [ 1.1416, 42.9862 ], [ 1.142, 42.9857 ], [ 1.1426, 42.9859 ], [ 1.1438, 42.9863 ] ] ], "type": "Polygon" }, "id": "63", "properties": { "code_commune": "09261", "code_departement": "09", "code_qp": "QP009001", "commune_qp": "Saint-Girons", "nom_commune": "Saint-Girons", "nom_qp": "Coeur De Ville" }, "type": "Feature" }, { "bbox": [ 2.9697, 42.5983, 2.9755, 42.6013 ], "geometry": { "coordinates": [ [ [ 2.9716, 42.6011 ], [ 2.9718, 42.601 ], [ 2.972, 42.601 ], [ 2.9723, 42.601 ], [ 2.9725, 42.6009 ], [ 2.9727, 42.6009 ], [ 2.9733, 42.601 ], [ 2.9737, 42.6011 ], [ 2.9743, 42.6012 ], [ 2.9744, 42.6012 ], [ 2.9745, 42.6012 ], [ 2.9746, 42.6011 ], [ 2.975, 42.601 ], [ 2.975, 42.6009 ], [ 2.9751, 42.6008 ], [ 2.9751, 42.6006 ], [ 2.9751, 42.6006 ], [ 2.9755, 42.5995 ], [ 2.9755, 42.5993 ], [ 2.9755, 42.5992 ], [ 2.9753, 42.599 ], [ 2.9751, 42.5989 ], [ 2.9749, 42.5988 ], [ 2.9735, 42.5985 ], [ 2.9735, 42.5984 ], [ 2.9734, 42.5983 ], [ 2.9732, 42.5985 ], [ 2.9732, 42.5985 ], [ 2.9731, 42.5985 ], [ 2.9732, 42.5985 ], [ 2.9731, 42.5986 ], [ 2.973, 42.5987 ], [ 2.9728, 42.5987 ], [ 2.9728, 42.5987 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5987 ], [ 2.9726, 42.5986 ], [ 2.9724, 42.5986 ], [ 2.9722, 42.5987 ], [ 2.9722, 42.5987 ], [ 2.9722, 42.5988 ], [ 2.9723, 42.5989 ], [ 2.9724, 42.599 ], [ 2.9725, 42.5991 ], [ 2.9725, 42.5992 ], [ 2.9725, 42.5993 ], [ 2.9724, 42.5993 ], [ 2.9723, 42.5994 ], [ 2.9721, 42.5995 ], [ 2.9721, 42.5995 ], [ 2.972, 42.5995 ], [ 2.9719, 42.5994 ], [ 2.9718, 42.5994 ], [ 2.9716, 42.5994 ], [ 2.9716, 42.5995 ], [ 2.9715, 42.5996 ], [ 2.9715, 42.5996 ], [ 2.9714, 42.5996 ], [ 2.9711, 42.5995 ], [ 2.9711, 42.5995 ], [ 2.971, 42.5995 ], [ 2.9709, 42.5994 ], [ 2.9709, 42.5993 ], [ 2.9706, 42.5993 ], [ 2.9701, 42.5993 ], [ 2.9699, 42.5994 ], [ 2.9698, 42.5993 ], [ 2.9697, 42.5993 ], [ 2.9697, 42.5994 ], [ 2.9698, 42.5996 ], [ 2.9698, 42.5997 ], [ 2.9699, 42.5998 ], [ 2.97, 42.6 ], [ 2.97, 42.6001 ], [ 2.9701, 42.6003 ], [ 2.9702, 42.6004 ], [ 2.9702, 42.6005 ], [ 2.9703, 42.6006 ], [ 2.9704, 42.6006 ], [ 2.9704, 42.6006 ], [ 2.9703, 42.6009 ], [ 2.9703, 42.601 ], [ 2.9705, 42.601 ], [ 2.9709, 42.6011 ], [ 2.971, 42.6011 ], [ 2.971, 42.6012 ], [ 2.971, 42.6013 ], [ 2.9711, 42.6013 ], [ 2.9712, 42.6012 ], [ 2.9716, 42.6011 ] ] ], "type": "Polygon" }, "id": "64", "properties": { "code_commune": "66065", "code_departement": "66", "code_qp": "QP066001", "commune_qp": "Elne", "nom_commune": "Elne", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 2.8899, 42.6937, 2.9034, 42.7007 ], "geometry": { "coordinates": [ [ [ 2.9033, 42.6991 ], [ 2.9034, 42.6991 ], [ 2.9033, 42.699 ], [ 2.903, 42.6988 ], [ 2.9026, 42.6991 ], [ 2.9026, 42.6991 ], [ 2.9025, 42.699 ], [ 2.9023, 42.699 ], [ 2.9022, 42.6989 ], [ 2.9023, 42.6989 ], [ 2.9022, 42.6988 ], [ 2.9018, 42.6985 ], [ 2.902, 42.6984 ], [ 2.9021, 42.6983 ], [ 2.9023, 42.6982 ], [ 2.9021, 42.698 ], [ 2.9023, 42.6979 ], [ 2.9024, 42.6979 ], [ 2.9026, 42.6978 ], [ 2.9025, 42.6977 ], [ 2.9024, 42.6976 ], [ 2.9024, 42.6975 ], [ 2.9024, 42.6975 ], [ 2.9023, 42.6974 ], [ 2.9022, 42.6973 ], [ 2.9022, 42.6973 ], [ 2.9021, 42.6972 ], [ 2.9021, 42.6972 ], [ 2.902, 42.6971 ], [ 2.902, 42.697 ], [ 2.9019, 42.6969 ], [ 2.9018, 42.6966 ], [ 2.9018, 42.6965 ], [ 2.9017, 42.6964 ], [ 2.9017, 42.6962 ], [ 2.9017, 42.696 ], [ 2.9017, 42.6959 ], [ 2.9017, 42.6959 ], [ 2.9014, 42.6957 ], [ 2.9011, 42.6956 ], [ 2.901, 42.6955 ], [ 2.9006, 42.6952 ], [ 2.9002, 42.6955 ], [ 2.8995, 42.6961 ], [ 2.8992, 42.6962 ], [ 2.8989, 42.6964 ], [ 2.8988, 42.6963 ], [ 2.8988, 42.6961 ], [ 2.8988, 42.6961 ], [ 2.8983, 42.6961 ], [ 2.8982, 42.696 ], [ 2.8976, 42.6957 ], [ 2.8973, 42.6955 ], [ 2.8972, 42.6955 ], [ 2.8972, 42.6955 ], [ 2.8971, 42.6956 ], [ 2.8971, 42.6956 ], [ 2.8966, 42.6952 ], [ 2.8964, 42.6952 ], [ 2.8963, 42.6952 ], [ 2.896, 42.6953 ], [ 2.8956, 42.6951 ], [ 2.8954, 42.695 ], [ 2.8954, 42.6949 ], [ 2.8953, 42.6949 ], [ 2.895, 42.6948 ], [ 2.8947, 42.6948 ], [ 2.8946, 42.6948 ], [ 2.8936, 42.6948 ], [ 2.8929, 42.6947 ], [ 2.8928, 42.6951 ], [ 2.8927, 42.6951 ], [ 2.8926, 42.695 ], [ 2.8925, 42.6949 ], [ 2.8924, 42.6948 ], [ 2.8923, 42.6946 ], [ 2.8922, 42.6945 ], [ 2.8921, 42.6944 ], [ 2.8921, 42.6943 ], [ 2.892, 42.6942 ], [ 2.8916, 42.6939 ], [ 2.8915, 42.6939 ], [ 2.8913, 42.6937 ], [ 2.8903, 42.6944 ], [ 2.8906, 42.6946 ], [ 2.8908, 42.6947 ], [ 2.8906, 42.6949 ], [ 2.8904, 42.6951 ], [ 2.8901, 42.6952 ], [ 2.8899, 42.6954 ], [ 2.89, 42.6955 ], [ 2.8901, 42.6956 ], [ 2.8903, 42.6957 ], [ 2.8904, 42.6958 ], [ 2.8908, 42.696 ], [ 2.8913, 42.6964 ], [ 2.8911, 42.6966 ], [ 2.8913, 42.6968 ], [ 2.8917, 42.6971 ], [ 2.892, 42.6973 ], [ 2.8922, 42.6975 ], [ 2.8923, 42.6976 ], [ 2.8922, 42.6977 ], [ 2.892, 42.698 ], [ 2.8922, 42.6981 ], [ 2.8923, 42.6981 ], [ 2.8923, 42.6982 ], [ 2.8925, 42.6984 ], [ 2.8925, 42.6986 ], [ 2.8925, 42.6986 ], [ 2.8925, 42.6987 ], [ 2.8923, 42.6987 ], [ 2.8924, 42.6989 ], [ 2.8925, 42.6991 ], [ 2.8929, 42.6995 ], [ 2.8931, 42.6997 ], [ 2.8933, 42.7 ], [ 2.8935, 42.7002 ], [ 2.8936, 42.7003 ], [ 2.8937, 42.7003 ], [ 2.8938, 42.7001 ], [ 2.8941, 42.7003 ], [ 2.8941, 42.7003 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8943, 42.7004 ], [ 2.8945, 42.7004 ], [ 2.8948, 42.7005 ], [ 2.895, 42.7006 ], [ 2.8951, 42.7005 ], [ 2.8953, 42.7003 ], [ 2.8953, 42.7003 ], [ 2.8954, 42.7004 ], [ 2.8954, 42.7003 ], [ 2.8957, 42.7 ], [ 2.8958, 42.7 ], [ 2.8959, 42.6999 ], [ 2.8959, 42.6999 ], [ 2.896, 42.6998 ], [ 2.8961, 42.6997 ], [ 2.8963, 42.6996 ], [ 2.8963, 42.6996 ], [ 2.8964, 42.6995 ], [ 2.8965, 42.6995 ], [ 2.8965, 42.6995 ], [ 2.8966, 42.6994 ], [ 2.8966, 42.6994 ], [ 2.8967, 42.6995 ], [ 2.8967, 42.6995 ], [ 2.8969, 42.6995 ], [ 2.8969, 42.6995 ], [ 2.897, 42.6995 ], [ 2.8972, 42.6996 ], [ 2.8973, 42.6996 ], [ 2.8974, 42.6996 ], [ 2.8974, 42.6996 ], [ 2.8975, 42.6996 ], [ 2.8977, 42.6997 ], [ 2.8978, 42.6997 ], [ 2.8979, 42.6997 ], [ 2.8981, 42.6997 ], [ 2.8982, 42.6997 ], [ 2.8983, 42.6995 ], [ 2.8986, 42.6996 ], [ 2.8988, 42.6996 ], [ 2.8997, 42.6992 ], [ 2.8999, 42.6994 ], [ 2.9004, 42.6999 ], [ 2.9006, 42.7002 ], [ 2.9005, 42.7003 ], [ 2.9007, 42.7004 ], [ 2.9008, 42.7005 ], [ 2.9011, 42.7007 ], [ 2.9018, 42.7001 ], [ 2.9025, 42.6995 ], [ 2.9028, 42.6997 ], [ 2.9033, 42.6992 ], [ 2.9032, 42.6992 ], [ 2.9033, 42.6991 ] ] ], "type": "Polygon" }, "id": "65", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066008", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Centre Ancien" }, "type": "Feature" }, { "bbox": [ 1.4331, 43.6327, 1.4456, 43.6435 ], "geometry": { "coordinates": [ [ [ 1.4331, 43.6346 ], [ 1.4331, 43.635 ], [ 1.4331, 43.6353 ], [ 1.4333, 43.636 ], [ 1.4349, 43.6358 ], [ 1.435, 43.6359 ], [ 1.4366, 43.6357 ], [ 1.4368, 43.6362 ], [ 1.4376, 43.6361 ], [ 1.4373, 43.6364 ], [ 1.4382, 43.6367 ], [ 1.439, 43.6366 ], [ 1.4391, 43.6369 ], [ 1.4391, 43.6375 ], [ 1.4392, 43.6382 ], [ 1.4399, 43.6382 ], [ 1.4418, 43.6384 ], [ 1.4418, 43.6385 ], [ 1.4419, 43.6388 ], [ 1.4419, 43.6389 ], [ 1.4418, 43.6393 ], [ 1.4417, 43.64 ], [ 1.4416, 43.6404 ], [ 1.4392, 43.6403 ], [ 1.4391, 43.6418 ], [ 1.4391, 43.6429 ], [ 1.4406, 43.6431 ], [ 1.4413, 43.6432 ], [ 1.4419, 43.6432 ], [ 1.4422, 43.6435 ], [ 1.4434, 43.6431 ], [ 1.4445, 43.6429 ], [ 1.4444, 43.6423 ], [ 1.4444, 43.6409 ], [ 1.4444, 43.6401 ], [ 1.4451, 43.6401 ], [ 1.4451, 43.6395 ], [ 1.4453, 43.6395 ], [ 1.4452, 43.639 ], [ 1.4454, 43.6389 ], [ 1.4453, 43.6379 ], [ 1.4456, 43.6379 ], [ 1.4455, 43.6376 ], [ 1.4454, 43.6373 ], [ 1.4448, 43.6374 ], [ 1.4447, 43.6372 ], [ 1.4447, 43.6369 ], [ 1.4447, 43.6364 ], [ 1.4446, 43.636 ], [ 1.4442, 43.6361 ], [ 1.4441, 43.6356 ], [ 1.4439, 43.6356 ], [ 1.4439, 43.6354 ], [ 1.4434, 43.6356 ], [ 1.4426, 43.635 ], [ 1.4419, 43.6344 ], [ 1.4417, 43.6341 ], [ 1.4413, 43.6332 ], [ 1.4411, 43.6328 ], [ 1.441, 43.6327 ], [ 1.44, 43.6346 ], [ 1.4392, 43.6344 ], [ 1.4391, 43.6346 ], [ 1.4389, 43.6346 ], [ 1.4383, 43.6348 ], [ 1.4379, 43.6348 ], [ 1.4378, 43.6346 ], [ 1.4377, 43.6345 ], [ 1.4368, 43.6345 ], [ 1.4368, 43.6345 ], [ 1.4369, 43.6346 ], [ 1.4369, 43.6347 ], [ 1.4367, 43.6347 ], [ 1.4365, 43.6347 ], [ 1.4364, 43.6348 ], [ 1.4364, 43.6349 ], [ 1.4363, 43.6349 ], [ 1.436, 43.635 ], [ 1.4356, 43.635 ], [ 1.4356, 43.6346 ], [ 1.4356, 43.6343 ], [ 1.4342, 43.6344 ], [ 1.4342, 43.6346 ], [ 1.4341, 43.6346 ], [ 1.4335, 43.6346 ], [ 1.4331, 43.6346 ] ] ], "type": "Polygon" }, "id": "66", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031011", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Les Izards - La Vache" }, "type": "Feature" }, { "bbox": [ 0.0491, 43.2277, 0.0564, 43.2315 ], "geometry": { "coordinates": [ [ [ 0.0497, 43.2288 ], [ 0.05, 43.229 ], [ 0.0503, 43.2292 ], [ 0.0507, 43.2293 ], [ 0.0513, 43.2294 ], [ 0.0518, 43.2293 ], [ 0.0523, 43.2293 ], [ 0.0528, 43.2293 ], [ 0.0535, 43.2293 ], [ 0.0543, 43.2294 ], [ 0.0546, 43.2295 ], [ 0.0546, 43.2296 ], [ 0.0546, 43.23 ], [ 0.054, 43.23 ], [ 0.054, 43.2301 ], [ 0.054, 43.2302 ], [ 0.0539, 43.2315 ], [ 0.0546, 43.2315 ], [ 0.0546, 43.2313 ], [ 0.0547, 43.2311 ], [ 0.0548, 43.2309 ], [ 0.0549, 43.231 ], [ 0.0556, 43.231 ], [ 0.0558, 43.231 ], [ 0.0558, 43.2309 ], [ 0.0564, 43.2309 ], [ 0.0564, 43.2303 ], [ 0.0564, 43.2296 ], [ 0.0559, 43.2296 ], [ 0.0557, 43.2296 ], [ 0.0555, 43.2295 ], [ 0.0556, 43.2293 ], [ 0.0548, 43.2293 ], [ 0.0547, 43.2293 ], [ 0.0543, 43.2293 ], [ 0.0543, 43.228 ], [ 0.0539, 43.2281 ], [ 0.0534, 43.2281 ], [ 0.0534, 43.2277 ], [ 0.052, 43.2278 ], [ 0.0504, 43.2278 ], [ 0.0497, 43.2278 ], [ 0.0497, 43.2279 ], [ 0.0496, 43.2279 ], [ 0.0493, 43.2279 ], [ 0.0493, 43.228 ], [ 0.0493, 43.228 ], [ 0.0492, 43.2281 ], [ 0.0492, 43.2281 ], [ 0.0491, 43.2281 ], [ 0.0491, 43.2282 ], [ 0.0495, 43.2285 ], [ 0.0497, 43.2288 ], [ 0.0497, 43.2288 ] ] ], "type": "Polygon" }, "id": "67", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065001", "commune_qp": "Tarbes", "nom_commune": "Tarbes", "nom_qp": "Tarbes Ouest" }, "type": "Feature" }, { "bbox": [ 3.8367, 43.5925, 3.8495, 43.6013 ], "geometry": { "coordinates": [ [ [ 3.8479, 43.5999 ], [ 3.8475, 43.5997 ], [ 3.8472, 43.5994 ], [ 3.8466, 43.5987 ], [ 3.8464, 43.5985 ], [ 3.8469, 43.5984 ], [ 3.8467, 43.5979 ], [ 3.8464, 43.5974 ], [ 3.8459, 43.5977 ], [ 3.8455, 43.5972 ], [ 3.8457, 43.5971 ], [ 3.846, 43.597 ], [ 3.8458, 43.5968 ], [ 3.8463, 43.5965 ], [ 3.846, 43.5962 ], [ 3.845, 43.5966 ], [ 3.8436, 43.5972 ], [ 3.8428, 43.5976 ], [ 3.8418, 43.5966 ], [ 3.8422, 43.5965 ], [ 3.8421, 43.5964 ], [ 3.8418, 43.5961 ], [ 3.8415, 43.5959 ], [ 3.8413, 43.5956 ], [ 3.841, 43.5956 ], [ 3.8409, 43.5955 ], [ 3.8407, 43.5954 ], [ 3.8404, 43.5952 ], [ 3.8401, 43.595 ], [ 3.8398, 43.5947 ], [ 3.8401, 43.5944 ], [ 3.8404, 43.5946 ], [ 3.8405, 43.5945 ], [ 3.8408, 43.5946 ], [ 3.841, 43.5944 ], [ 3.8412, 43.5942 ], [ 3.8414, 43.5943 ], [ 3.8414, 43.5943 ], [ 3.8415, 43.5943 ], [ 3.8416, 43.5943 ], [ 3.8418, 43.5943 ], [ 3.8424, 43.5946 ], [ 3.8425, 43.5946 ], [ 3.8425, 43.5946 ], [ 3.8426, 43.5946 ], [ 3.8431, 43.5935 ], [ 3.8431, 43.5934 ], [ 3.843, 43.5934 ], [ 3.8425, 43.5935 ], [ 3.8422, 43.5929 ], [ 3.8417, 43.5926 ], [ 3.8416, 43.5925 ], [ 3.8415, 43.5925 ], [ 3.8407, 43.5932 ], [ 3.8406, 43.5932 ], [ 3.8405, 43.5933 ], [ 3.8399, 43.5931 ], [ 3.8396, 43.593 ], [ 3.8388, 43.5942 ], [ 3.8386, 43.5942 ], [ 3.8385, 43.5943 ], [ 3.8388, 43.5946 ], [ 3.8385, 43.5948 ], [ 3.8382, 43.5946 ], [ 3.8378, 43.5948 ], [ 3.8376, 43.5947 ], [ 3.8374, 43.5949 ], [ 3.8372, 43.595 ], [ 3.8369, 43.5949 ], [ 3.8367, 43.5952 ], [ 3.8369, 43.5953 ], [ 3.837, 43.5955 ], [ 3.8369, 43.5956 ], [ 3.8368, 43.5957 ], [ 3.8368, 43.5958 ], [ 3.8368, 43.5959 ], [ 3.8368, 43.5961 ], [ 3.8369, 43.5961 ], [ 3.8372, 43.5963 ], [ 3.8375, 43.5965 ], [ 3.8378, 43.5966 ], [ 3.8385, 43.5968 ], [ 3.839, 43.5963 ], [ 3.8388, 43.5961 ], [ 3.8391, 43.5958 ], [ 3.8393, 43.5956 ], [ 3.8394, 43.5956 ], [ 3.8395, 43.5957 ], [ 3.8396, 43.5957 ], [ 3.8399, 43.5961 ], [ 3.84, 43.5962 ], [ 3.8401, 43.5964 ], [ 3.8405, 43.5966 ], [ 3.8412, 43.5969 ], [ 3.8415, 43.5971 ], [ 3.8418, 43.5984 ], [ 3.8431, 43.5996 ], [ 3.8454, 43.6008 ], [ 3.8461, 43.6011 ], [ 3.8466, 43.6012 ], [ 3.8484, 43.6013 ], [ 3.8494, 43.601 ], [ 3.8495, 43.6008 ], [ 3.8484, 43.6003 ], [ 3.8479, 43.5999 ] ] ], "type": "Polygon" }, "id": "68", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034007", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Pas Du Loup - Val De Croze" }, "type": "Feature" }, { "bbox": [ 2.5906, 44.3632, 2.6018, 44.3674 ], "geometry": { "coordinates": [ [ [ 2.5926, 44.3671 ], [ 2.5927, 44.3672 ], [ 2.5929, 44.3674 ], [ 2.5933, 44.3672 ], [ 2.594, 44.367 ], [ 2.5947, 44.3668 ], [ 2.5949, 44.3667 ], [ 2.5954, 44.3666 ], [ 2.5956, 44.3665 ], [ 2.5965, 44.3661 ], [ 2.5972, 44.3656 ], [ 2.5977, 44.3652 ], [ 2.598, 44.365 ], [ 2.5988, 44.3655 ], [ 2.5996, 44.3653 ], [ 2.5998, 44.3653 ], [ 2.6001, 44.3652 ], [ 2.6005, 44.3647 ], [ 2.6006, 44.3646 ], [ 2.6006, 44.3646 ], [ 2.6009, 44.3646 ], [ 2.6013, 44.3645 ], [ 2.6014, 44.3645 ], [ 2.6016, 44.3645 ], [ 2.6017, 44.3644 ], [ 2.6018, 44.3643 ], [ 2.6016, 44.3643 ], [ 2.6015, 44.3642 ], [ 2.6013, 44.3641 ], [ 2.6011, 44.3641 ], [ 2.6016, 44.3638 ], [ 2.6018, 44.3634 ], [ 2.6015, 44.3632 ], [ 2.6011, 44.3634 ], [ 2.6009, 44.3635 ], [ 2.6003, 44.3639 ], [ 2.5994, 44.3637 ], [ 2.5991, 44.3636 ], [ 2.5974, 44.3635 ], [ 2.597, 44.3636 ], [ 2.5969, 44.3637 ], [ 2.5967, 44.3638 ], [ 2.5963, 44.3641 ], [ 2.5959, 44.3642 ], [ 2.5955, 44.3643 ], [ 2.5947, 44.3645 ], [ 2.5945, 44.3645 ], [ 2.5942, 44.3645 ], [ 2.5941, 44.3643 ], [ 2.594, 44.3641 ], [ 2.5927, 44.3642 ], [ 2.5924, 44.3642 ], [ 2.5922, 44.3642 ], [ 2.592, 44.3642 ], [ 2.5919, 44.3643 ], [ 2.5918, 44.3644 ], [ 2.5919, 44.3647 ], [ 2.5921, 44.3646 ], [ 2.5921, 44.3648 ], [ 2.5921, 44.3649 ], [ 2.5921, 44.3651 ], [ 2.592, 44.3651 ], [ 2.5919, 44.3652 ], [ 2.5919, 44.3652 ], [ 2.5919, 44.3653 ], [ 2.5919, 44.3653 ], [ 2.5919, 44.3654 ], [ 2.592, 44.3654 ], [ 2.592, 44.3655 ], [ 2.5918, 44.3656 ], [ 2.5918, 44.3657 ], [ 2.5911, 44.3657 ], [ 2.5912, 44.3658 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.366 ], [ 2.5906, 44.3661 ], [ 2.5907, 44.3663 ], [ 2.5908, 44.3663 ], [ 2.5909, 44.3663 ], [ 2.5911, 44.3662 ], [ 2.5913, 44.3664 ], [ 2.592, 44.3664 ], [ 2.5921, 44.3664 ], [ 2.5926, 44.3671 ] ] ], "type": "Polygon" }, "id": "69", "properties": { "code_commune": "12176", "code_departement": "12", "code_qp": "QP012001", "commune_qp": "Onet-le-Château", "nom_commune": "Onet-le-Château", "nom_qp": "Quatre Saisons" }, "type": "Feature" }, { "bbox": [ -0.0437, 43.0836, -0.0404, 43.0895 ], "geometry": { "coordinates": [ [ [ -0.0418, 43.0892 ], [ -0.0417, 43.0895 ], [ -0.0408, 43.0893 ], [ -0.0404, 43.0888 ], [ -0.0405, 43.0885 ], [ -0.0406, 43.0883 ], [ -0.0407, 43.088 ], [ -0.0408, 43.0879 ], [ -0.0408, 43.0878 ], [ -0.0409, 43.0877 ], [ -0.0407, 43.0872 ], [ -0.0407, 43.0869 ], [ -0.0407, 43.0868 ], [ -0.0407, 43.0867 ], [ -0.0412, 43.0865 ], [ -0.0419, 43.0865 ], [ -0.0421, 43.0865 ], [ -0.0421, 43.086 ], [ -0.0421, 43.0851 ], [ -0.0414, 43.0845 ], [ -0.0414, 43.0843 ], [ -0.0414, 43.0841 ], [ -0.0414, 43.0838 ], [ -0.0415, 43.0838 ], [ -0.0416, 43.0837 ], [ -0.0417, 43.0837 ], [ -0.0421, 43.0837 ], [ -0.0429, 43.0836 ], [ -0.0433, 43.0836 ], [ -0.0437, 43.0836 ], [ -0.0437, 43.0837 ], [ -0.0435, 43.0838 ], [ -0.0434, 43.0851 ], [ -0.0433, 43.0851 ], [ -0.0433, 43.0856 ], [ -0.0433, 43.0861 ], [ -0.0433, 43.0861 ], [ -0.0432, 43.0865 ], [ -0.0432, 43.0867 ], [ -0.0431, 43.0867 ], [ -0.043, 43.0875 ], [ -0.0429, 43.0881 ], [ -0.0427, 43.0891 ], [ -0.0427, 43.0893 ], [ -0.0418, 43.0892 ] ] ], "type": "Polygon" }, "id": "70", "properties": { "code_commune": "65286", "code_departement": "65", "code_qp": "QP065004", "commune_qp": "Lourdes", "nom_commune": "Lourdes", "nom_qp": "Ophite" }, "type": "Feature" }, { "bbox": [ 4.3577, 43.8386, 4.3726, 43.8447 ], "geometry": { "coordinates": [ [ [ 4.3726, 43.8407 ], [ 4.3721, 43.8405 ], [ 4.3712, 43.8403 ], [ 4.3707, 43.8402 ], [ 4.3701, 43.8397 ], [ 4.3695, 43.8393 ], [ 4.3691, 43.839 ], [ 4.3688, 43.8388 ], [ 4.3665, 43.8391 ], [ 4.3657, 43.8391 ], [ 4.3645, 43.8392 ], [ 4.3643, 43.8393 ], [ 4.3641, 43.8392 ], [ 4.3637, 43.839 ], [ 4.3634, 43.8392 ], [ 4.3635, 43.8396 ], [ 4.3635, 43.8398 ], [ 4.3635, 43.8398 ], [ 4.363, 43.84 ], [ 4.3629, 43.84 ], [ 4.3626, 43.8393 ], [ 4.3626, 43.8391 ], [ 4.3626, 43.8391 ], [ 4.3626, 43.839 ], [ 4.3625, 43.8389 ], [ 4.3624, 43.8388 ], [ 4.3622, 43.8387 ], [ 4.3621, 43.8387 ], [ 4.362, 43.8386 ], [ 4.3617, 43.8386 ], [ 4.3616, 43.8386 ], [ 4.3615, 43.8387 ], [ 4.3612, 43.8388 ], [ 4.3606, 43.8391 ], [ 4.3605, 43.8391 ], [ 4.3604, 43.8391 ], [ 4.3599, 43.839 ], [ 4.3599, 43.8393 ], [ 4.3599, 43.8395 ], [ 4.3602, 43.84 ], [ 4.3603, 43.8403 ], [ 4.3603, 43.8404 ], [ 4.36, 43.8404 ], [ 4.3598, 43.8405 ], [ 4.3596, 43.8405 ], [ 4.3591, 43.8405 ], [ 4.3589, 43.8405 ], [ 4.3581, 43.8404 ], [ 4.358, 43.8408 ], [ 4.3579, 43.8413 ], [ 4.3579, 43.8415 ], [ 4.3577, 43.8419 ], [ 4.3582, 43.842 ], [ 4.3583, 43.8421 ], [ 4.3582, 43.8423 ], [ 4.3579, 43.8429 ], [ 4.3577, 43.8433 ], [ 4.3582, 43.8433 ], [ 4.3582, 43.8434 ], [ 4.3587, 43.8435 ], [ 4.3587, 43.8435 ], [ 4.3595, 43.8436 ], [ 4.3597, 43.8436 ], [ 4.3602, 43.8436 ], [ 4.3607, 43.8437 ], [ 4.3607, 43.8437 ], [ 4.3615, 43.8438 ], [ 4.3623, 43.8438 ], [ 4.3624, 43.8436 ], [ 4.3625, 43.8434 ], [ 4.3626, 43.8433 ], [ 4.3625, 43.8423 ], [ 4.3624, 43.8416 ], [ 4.3623, 43.841 ], [ 4.3622, 43.8403 ], [ 4.3629, 43.8402 ], [ 4.3649, 43.8401 ], [ 4.3652, 43.8402 ], [ 4.3656, 43.8404 ], [ 4.3663, 43.841 ], [ 4.3672, 43.8417 ], [ 4.3672, 43.8417 ], [ 4.3675, 43.8426 ], [ 4.3676, 43.8428 ], [ 4.3677, 43.8435 ], [ 4.3677, 43.8437 ], [ 4.3677, 43.8442 ], [ 4.3677, 43.8447 ], [ 4.3686, 43.844 ], [ 4.3692, 43.8433 ], [ 4.3696, 43.8429 ], [ 4.3698, 43.8427 ], [ 4.3704, 43.8423 ], [ 4.3704, 43.8423 ], [ 4.3716, 43.8425 ], [ 4.3718, 43.8419 ], [ 4.372, 43.8415 ], [ 4.372, 43.8415 ], [ 4.372, 43.8415 ], [ 4.3722, 43.8415 ], [ 4.3726, 43.8407 ] ] ], "type": "Polygon" }, "id": "71", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030004", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Gambetta-Richelieu" }, "type": "Feature" }, { "bbox": [ 3.8427, 43.617, 3.8555, 43.6246 ], "geometry": { "coordinates": [ [ [ 3.8548, 43.6206 ], [ 3.8549, 43.6201 ], [ 3.8543, 43.6201 ], [ 3.8533, 43.6201 ], [ 3.8521, 43.62 ], [ 3.8505, 43.62 ], [ 3.8482, 43.6213 ], [ 3.8475, 43.6212 ], [ 3.8475, 43.6212 ], [ 3.8474, 43.6212 ], [ 3.847, 43.6213 ], [ 3.8465, 43.621 ], [ 3.8465, 43.621 ], [ 3.8465, 43.6209 ], [ 3.8465, 43.6208 ], [ 3.8459, 43.6207 ], [ 3.8459, 43.6207 ], [ 3.8458, 43.6207 ], [ 3.8458, 43.6205 ], [ 3.8459, 43.6202 ], [ 3.8461, 43.6199 ], [ 3.8462, 43.6198 ], [ 3.8462, 43.6198 ], [ 3.8462, 43.6197 ], [ 3.8463, 43.6196 ], [ 3.8464, 43.6195 ], [ 3.8464, 43.6194 ], [ 3.8465, 43.6192 ], [ 3.8466, 43.6191 ], [ 3.8466, 43.619 ], [ 3.8466, 43.6189 ], [ 3.8466, 43.6187 ], [ 3.8462, 43.6186 ], [ 3.8463, 43.6184 ], [ 3.8469, 43.6179 ], [ 3.8474, 43.618 ], [ 3.8477, 43.6174 ], [ 3.8471, 43.6174 ], [ 3.8465, 43.6175 ], [ 3.8464, 43.6175 ], [ 3.8459, 43.617 ], [ 3.8459, 43.6171 ], [ 3.8458, 43.6171 ], [ 3.8452, 43.6171 ], [ 3.8451, 43.6171 ], [ 3.8439, 43.618 ], [ 3.8442, 43.6181 ], [ 3.8435, 43.6189 ], [ 3.8427, 43.6194 ], [ 3.8436, 43.6198 ], [ 3.8432, 43.6203 ], [ 3.8437, 43.6206 ], [ 3.8435, 43.6209 ], [ 3.8432, 43.6213 ], [ 3.8434, 43.6214 ], [ 3.8435, 43.6215 ], [ 3.8437, 43.6215 ], [ 3.8438, 43.6215 ], [ 3.8443, 43.6215 ], [ 3.8444, 43.6217 ], [ 3.8444, 43.6219 ], [ 3.8446, 43.6219 ], [ 3.8447, 43.622 ], [ 3.844, 43.6225 ], [ 3.8444, 43.623 ], [ 3.8452, 43.6225 ], [ 3.8459, 43.6221 ], [ 3.8468, 43.6218 ], [ 3.8473, 43.6217 ], [ 3.8477, 43.6216 ], [ 3.8478, 43.6217 ], [ 3.8479, 43.6217 ], [ 3.8481, 43.6218 ], [ 3.8481, 43.6218 ], [ 3.8483, 43.6224 ], [ 3.8491, 43.6222 ], [ 3.8492, 43.6222 ], [ 3.8498, 43.6224 ], [ 3.8499, 43.6224 ], [ 3.85, 43.6224 ], [ 3.8504, 43.623 ], [ 3.8495, 43.6234 ], [ 3.8492, 43.6237 ], [ 3.8492, 43.6238 ], [ 3.8492, 43.6238 ], [ 3.8493, 43.6241 ], [ 3.8493, 43.6243 ], [ 3.8494, 43.6243 ], [ 3.8498, 43.6245 ], [ 3.85, 43.6246 ], [ 3.8501, 43.6245 ], [ 3.8504, 43.6244 ], [ 3.8509, 43.624 ], [ 3.8513, 43.6235 ], [ 3.8516, 43.6233 ], [ 3.8519, 43.6231 ], [ 3.852, 43.6231 ], [ 3.8525, 43.6235 ], [ 3.8529, 43.6237 ], [ 3.8537, 43.6231 ], [ 3.8536, 43.623 ], [ 3.8535, 43.6227 ], [ 3.8538, 43.6226 ], [ 3.8542, 43.6226 ], [ 3.8545, 43.6226 ], [ 3.8547, 43.6224 ], [ 3.8555, 43.6219 ], [ 3.855, 43.6217 ], [ 3.855, 43.6217 ], [ 3.8545, 43.6216 ], [ 3.8544, 43.6215 ], [ 3.855, 43.6212 ], [ 3.8551, 43.6211 ], [ 3.8552, 43.6209 ], [ 3.8549, 43.6206 ], [ 3.8548, 43.6206 ] ] ], "type": "Polygon" }, "id": "72", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034008", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Cévennes" }, "type": "Feature" }, { "bbox": [ 4.3816, 43.8369, 4.396, 43.8472 ], "geometry": { "coordinates": [ [ [ 4.3863, 43.8422 ], [ 4.3821, 43.8428 ], [ 4.3817, 43.8429 ], [ 4.3816, 43.843 ], [ 4.3816, 43.8432 ], [ 4.3829, 43.8443 ], [ 4.3826, 43.8444 ], [ 4.3825, 43.8446 ], [ 4.3824, 43.8447 ], [ 4.3821, 43.8448 ], [ 4.3822, 43.8454 ], [ 4.3849, 43.8461 ], [ 4.385, 43.846 ], [ 4.3839, 43.8451 ], [ 4.3843, 43.8449 ], [ 4.3846, 43.8447 ], [ 4.3852, 43.8444 ], [ 4.3856, 43.8445 ], [ 4.3863, 43.8449 ], [ 4.3866, 43.8451 ], [ 4.3871, 43.8453 ], [ 4.3874, 43.8454 ], [ 4.3879, 43.8456 ], [ 4.3884, 43.8458 ], [ 4.3888, 43.846 ], [ 4.3892, 43.8463 ], [ 4.3896, 43.8465 ], [ 4.3898, 43.8466 ], [ 4.39, 43.8466 ], [ 4.3901, 43.8467 ], [ 4.3903, 43.8467 ], [ 4.3905, 43.8468 ], [ 4.3907, 43.8468 ], [ 4.3916, 43.8469 ], [ 4.3929, 43.8469 ], [ 4.3942, 43.8471 ], [ 4.3949, 43.8472 ], [ 4.3959, 43.8471 ], [ 4.396, 43.8469 ], [ 4.3955, 43.8466 ], [ 4.3952, 43.8463 ], [ 4.3949, 43.8461 ], [ 4.3947, 43.8459 ], [ 4.3942, 43.8454 ], [ 4.3935, 43.8448 ], [ 4.3925, 43.8441 ], [ 4.3916, 43.8433 ], [ 4.3913, 43.8431 ], [ 4.3905, 43.8423 ], [ 4.3904, 43.8422 ], [ 4.3903, 43.8421 ], [ 4.39, 43.8418 ], [ 4.3897, 43.8415 ], [ 4.3897, 43.8412 ], [ 4.3895, 43.841 ], [ 4.389, 43.8401 ], [ 4.3885, 43.8389 ], [ 4.3881, 43.8372 ], [ 4.388, 43.837 ], [ 4.3875, 43.8369 ], [ 4.3871, 43.8369 ], [ 4.3869, 43.8375 ], [ 4.3867, 43.8383 ], [ 4.3866, 43.8388 ], [ 4.3866, 43.8389 ], [ 4.3868, 43.839 ], [ 4.3873, 43.8392 ], [ 4.3873, 43.8393 ], [ 4.3872, 43.8396 ], [ 4.3869, 43.8402 ], [ 4.3882, 43.8405 ], [ 4.388, 43.8409 ], [ 4.3885, 43.8411 ], [ 4.3886, 43.8411 ], [ 4.3885, 43.8414 ], [ 4.3874, 43.8412 ], [ 4.3873, 43.8412 ], [ 4.3872, 43.8417 ], [ 4.3867, 43.8416 ], [ 4.3865, 43.8416 ], [ 4.3862, 43.8421 ], [ 4.3863, 43.8422 ] ] ], "type": "Polygon" }, "id": "73", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030005", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Chemin-Bas D'Avignon - Clos D'Orville" }, "type": "Feature" }, { "bbox": [ 4.3932, 43.8528, 4.4027, 43.8608 ], "geometry": { "coordinates": [ [ [ 4.3977, 43.8531 ], [ 4.3975, 43.8528 ], [ 4.3972, 43.8529 ], [ 4.3973, 43.8531 ], [ 4.3969, 43.8532 ], [ 4.397, 43.8534 ], [ 4.3969, 43.8538 ], [ 4.3968, 43.8543 ], [ 4.3966, 43.8546 ], [ 4.3967, 43.8546 ], [ 4.3965, 43.8548 ], [ 4.3963, 43.8552 ], [ 4.3962, 43.8554 ], [ 4.3962, 43.8554 ], [ 4.3957, 43.8553 ], [ 4.3956, 43.8553 ], [ 4.3954, 43.8552 ], [ 4.3953, 43.8552 ], [ 4.395, 43.8556 ], [ 4.3947, 43.856 ], [ 4.3946, 43.8559 ], [ 4.3944, 43.8561 ], [ 4.3944, 43.8561 ], [ 4.3944, 43.8562 ], [ 4.3943, 43.8562 ], [ 4.3942, 43.8562 ], [ 4.3941, 43.8563 ], [ 4.394, 43.8563 ], [ 4.3936, 43.8563 ], [ 4.3934, 43.8567 ], [ 4.3935, 43.8567 ], [ 4.3933, 43.857 ], [ 4.3932, 43.857 ], [ 4.3932, 43.8571 ], [ 4.3935, 43.8573 ], [ 4.3938, 43.8575 ], [ 4.394, 43.8576 ], [ 4.3942, 43.8577 ], [ 4.3945, 43.8578 ], [ 4.3945, 43.8578 ], [ 4.3944, 43.8579 ], [ 4.3944, 43.8581 ], [ 4.3943, 43.8582 ], [ 4.3943, 43.8583 ], [ 4.3943, 43.8585 ], [ 4.3944, 43.8586 ], [ 4.3946, 43.8586 ], [ 4.3949, 43.8586 ], [ 4.395, 43.8587 ], [ 4.3949, 43.8592 ], [ 4.395, 43.8593 ], [ 4.3957, 43.8595 ], [ 4.3959, 43.8596 ], [ 4.396, 43.8596 ], [ 4.3962, 43.8596 ], [ 4.3964, 43.8593 ], [ 4.3964, 43.8589 ], [ 4.3961, 43.8589 ], [ 4.3961, 43.8589 ], [ 4.3958, 43.8588 ], [ 4.3957, 43.8586 ], [ 4.3957, 43.8584 ], [ 4.3957, 43.8583 ], [ 4.3957, 43.8582 ], [ 4.3961, 43.8582 ], [ 4.3963, 43.8583 ], [ 4.3963, 43.8582 ], [ 4.3964, 43.8582 ], [ 4.3965, 43.8583 ], [ 4.3966, 43.8583 ], [ 4.3966, 43.8585 ], [ 4.3965, 43.8586 ], [ 4.3964, 43.8589 ], [ 4.397, 43.8589 ], [ 4.3973, 43.8589 ], [ 4.3975, 43.8588 ], [ 4.3974, 43.8587 ], [ 4.3973, 43.8585 ], [ 4.3972, 43.8583 ], [ 4.3972, 43.8583 ], [ 4.3971, 43.8582 ], [ 4.3971, 43.8581 ], [ 4.3971, 43.8579 ], [ 4.3971, 43.8577 ], [ 4.3972, 43.8575 ], [ 4.3977, 43.8575 ], [ 4.3976, 43.8577 ], [ 4.3977, 43.8577 ], [ 4.3981, 43.8579 ], [ 4.3983, 43.858 ], [ 4.3984, 43.858 ], [ 4.3986, 43.8582 ], [ 4.3984, 43.8584 ], [ 4.3983, 43.8583 ], [ 4.3983, 43.8584 ], [ 4.3982, 43.8584 ], [ 4.3981, 43.8585 ], [ 4.398, 43.8586 ], [ 4.398, 43.8586 ], [ 4.3981, 43.8586 ], [ 4.3983, 43.8586 ], [ 4.3986, 43.8586 ], [ 4.3988, 43.8588 ], [ 4.399, 43.8589 ], [ 4.3993, 43.8592 ], [ 4.3987, 43.8597 ], [ 4.3989, 43.8599 ], [ 4.3997, 43.8592 ], [ 4.3998, 43.8593 ], [ 4.3998, 43.8594 ], [ 4.4, 43.8595 ], [ 4.4001, 43.8597 ], [ 4.4002, 43.8597 ], [ 4.4003, 43.8597 ], [ 4.4007, 43.8599 ], [ 4.4011, 43.8603 ], [ 4.401, 43.8603 ], [ 4.4015, 43.8608 ], [ 4.4018, 43.8607 ], [ 4.4017, 43.8606 ], [ 4.402, 43.8604 ], [ 4.4022, 43.8605 ], [ 4.4023, 43.8605 ], [ 4.4024, 43.8605 ], [ 4.4025, 43.8605 ], [ 4.4026, 43.8603 ], [ 4.4027, 43.8603 ], [ 4.4027, 43.8602 ], [ 4.4027, 43.8602 ], [ 4.4027, 43.86 ], [ 4.4024, 43.8593 ], [ 4.4023, 43.8591 ], [ 4.4021, 43.8587 ], [ 4.402, 43.8583 ], [ 4.4013, 43.8572 ], [ 4.4003, 43.8576 ], [ 4.4002, 43.8578 ], [ 4.4001, 43.8579 ], [ 4.4001, 43.8579 ], [ 4.4002, 43.8579 ], [ 4.4, 43.8582 ], [ 4.3999, 43.8581 ], [ 4.3997, 43.8581 ], [ 4.3996, 43.8581 ], [ 4.3995, 43.858 ], [ 4.3997, 43.8579 ], [ 4.3998, 43.8575 ], [ 4.3998, 43.8575 ], [ 4.3997, 43.8572 ], [ 4.3997, 43.8571 ], [ 4.3999, 43.8566 ], [ 4.4, 43.8564 ], [ 4.4001, 43.8563 ], [ 4.4001, 43.8563 ], [ 4.4002, 43.8562 ], [ 4.4004, 43.8561 ], [ 4.4005, 43.856 ], [ 4.4006, 43.8559 ], [ 4.4005, 43.8558 ], [ 4.4003, 43.8556 ], [ 4.4, 43.8554 ], [ 4.3995, 43.8551 ], [ 4.3991, 43.8548 ], [ 4.3989, 43.8546 ], [ 4.3986, 43.8544 ], [ 4.3982, 43.854 ], [ 4.3981, 43.8538 ], [ 4.398, 43.8538 ], [ 4.3979, 43.8534 ], [ 4.3979, 43.8533 ], [ 4.3977, 43.8531 ] ] ], "type": "Polygon" }, "id": "74", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030006", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Mas De Mingue" }, "type": "Feature" }, { "bbox": [ 3.8752, 43.58, 3.8901, 43.5942 ], "geometry": { "coordinates": [ [ [ 3.8763, 43.5812 ], [ 3.8766, 43.5814 ], [ 3.8762, 43.5818 ], [ 3.8766, 43.5821 ], [ 3.8769, 43.5822 ], [ 3.8773, 43.5822 ], [ 3.8776, 43.5822 ], [ 3.8779, 43.5821 ], [ 3.8782, 43.582 ], [ 3.8784, 43.5819 ], [ 3.8786, 43.5817 ], [ 3.8797, 43.5822 ], [ 3.8805, 43.5829 ], [ 3.8829, 43.5865 ], [ 3.884, 43.588 ], [ 3.8827, 43.5884 ], [ 3.8838, 43.5894 ], [ 3.8836, 43.5894 ], [ 3.8844, 43.5906 ], [ 3.8832, 43.5911 ], [ 3.8822, 43.5915 ], [ 3.883, 43.5927 ], [ 3.8824, 43.5929 ], [ 3.8826, 43.5932 ], [ 3.8839, 43.5927 ], [ 3.8845, 43.5935 ], [ 3.8848, 43.5938 ], [ 3.8852, 43.5942 ], [ 3.8854, 43.5941 ], [ 3.8856, 43.5939 ], [ 3.8859, 43.5937 ], [ 3.8861, 43.5935 ], [ 3.8863, 43.5933 ], [ 3.8861, 43.5931 ], [ 3.8861, 43.593 ], [ 3.8862, 43.5929 ], [ 3.8867, 43.5924 ], [ 3.8854, 43.5907 ], [ 3.8857, 43.5905 ], [ 3.8856, 43.5902 ], [ 3.886, 43.5901 ], [ 3.8876, 43.5896 ], [ 3.8879, 43.5895 ], [ 3.8886, 43.5894 ], [ 3.8894, 43.5894 ], [ 3.8896, 43.5894 ], [ 3.8895, 43.5891 ], [ 3.8897, 43.5889 ], [ 3.89, 43.5887 ], [ 3.8901, 43.5882 ], [ 3.89, 43.5879 ], [ 3.8895, 43.5872 ], [ 3.8892, 43.5868 ], [ 3.8887, 43.5857 ], [ 3.8883, 43.5853 ], [ 3.8882, 43.5846 ], [ 3.8881, 43.5843 ], [ 3.888, 43.5843 ], [ 3.8875, 43.5835 ], [ 3.8871, 43.5831 ], [ 3.886, 43.5821 ], [ 3.8856, 43.5819 ], [ 3.8837, 43.5812 ], [ 3.8824, 43.5808 ], [ 3.8821, 43.5807 ], [ 3.8819, 43.5808 ], [ 3.8813, 43.5811 ], [ 3.8812, 43.5813 ], [ 3.8809, 43.5815 ], [ 3.8804, 43.5818 ], [ 3.8789, 43.5815 ], [ 3.879, 43.5813 ], [ 3.879, 43.5812 ], [ 3.879, 43.581 ], [ 3.8788, 43.581 ], [ 3.8787, 43.581 ], [ 3.8786, 43.5808 ], [ 3.8784, 43.5806 ], [ 3.8782, 43.5804 ], [ 3.8778, 43.5802 ], [ 3.8776, 43.5802 ], [ 3.8775, 43.5802 ], [ 3.8771, 43.5802 ], [ 3.8767, 43.5803 ], [ 3.8765, 43.58 ], [ 3.8761, 43.5802 ], [ 3.8759, 43.58 ], [ 3.8752, 43.5804 ], [ 3.8762, 43.5806 ], [ 3.8763, 43.5807 ], [ 3.8764, 43.581 ], [ 3.8764, 43.5811 ], [ 3.8764, 43.5811 ], [ 3.8763, 43.5812 ] ] ], "type": "Polygon" }, "id": "75", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034012", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Près D'Arènes" }, "type": "Feature" }, { "bbox": [ 0.7183, 43.1062, 0.7301, 43.1123 ], "geometry": { "coordinates": [ [ [ 0.7224, 43.1089 ], [ 0.7222, 43.1095 ], [ 0.7222, 43.1098 ], [ 0.7217, 43.1097 ], [ 0.7215, 43.11 ], [ 0.7214, 43.11 ], [ 0.7213, 43.1101 ], [ 0.723, 43.1103 ], [ 0.7229, 43.1106 ], [ 0.7229, 43.1107 ], [ 0.7227, 43.111 ], [ 0.7228, 43.111 ], [ 0.7234, 43.1111 ], [ 0.7241, 43.1112 ], [ 0.7242, 43.1113 ], [ 0.7242, 43.1116 ], [ 0.7242, 43.1117 ], [ 0.7245, 43.1117 ], [ 0.7245, 43.1123 ], [ 0.7257, 43.1122 ], [ 0.7259, 43.1121 ], [ 0.7263, 43.1121 ], [ 0.7264, 43.1118 ], [ 0.7263, 43.1117 ], [ 0.7263, 43.1114 ], [ 0.7263, 43.1112 ], [ 0.7271, 43.1112 ], [ 0.7271, 43.1109 ], [ 0.7276, 43.1109 ], [ 0.7279, 43.1109 ], [ 0.7279, 43.1109 ], [ 0.728, 43.1102 ], [ 0.7283, 43.1103 ], [ 0.729, 43.1103 ], [ 0.729, 43.1105 ], [ 0.7292, 43.1105 ], [ 0.7294, 43.1105 ], [ 0.7295, 43.1106 ], [ 0.7297, 43.1106 ], [ 0.7298, 43.1107 ], [ 0.7299, 43.1107 ], [ 0.73, 43.1105 ], [ 0.7301, 43.1103 ], [ 0.7296, 43.1101 ], [ 0.729, 43.1096 ], [ 0.7286, 43.1095 ], [ 0.7286, 43.1093 ], [ 0.7286, 43.1091 ], [ 0.7298, 43.1065 ], [ 0.7295, 43.1065 ], [ 0.7292, 43.1066 ], [ 0.7286, 43.1067 ], [ 0.7283, 43.1067 ], [ 0.7278, 43.1069 ], [ 0.7277, 43.1069 ], [ 0.7276, 43.107 ], [ 0.7274, 43.1073 ], [ 0.7273, 43.1073 ], [ 0.7272, 43.1073 ], [ 0.7268, 43.1073 ], [ 0.7267, 43.1075 ], [ 0.7265, 43.1076 ], [ 0.7266, 43.1079 ], [ 0.7263, 43.1078 ], [ 0.7262, 43.1078 ], [ 0.7261, 43.1077 ], [ 0.7261, 43.1075 ], [ 0.726, 43.1075 ], [ 0.7259, 43.1074 ], [ 0.7253, 43.1071 ], [ 0.7252, 43.1071 ], [ 0.725, 43.1071 ], [ 0.7249, 43.1071 ], [ 0.7247, 43.107 ], [ 0.7238, 43.1068 ], [ 0.7229, 43.1065 ], [ 0.7221, 43.1063 ], [ 0.7217, 43.1062 ], [ 0.7215, 43.1062 ], [ 0.7215, 43.1062 ], [ 0.7212, 43.1063 ], [ 0.721, 43.1063 ], [ 0.7209, 43.1064 ], [ 0.7208, 43.1066 ], [ 0.7208, 43.1067 ], [ 0.7207, 43.1068 ], [ 0.7204, 43.1067 ], [ 0.72, 43.1066 ], [ 0.7191, 43.1063 ], [ 0.719, 43.1066 ], [ 0.7189, 43.1066 ], [ 0.7187, 43.1069 ], [ 0.7186, 43.1071 ], [ 0.7186, 43.1071 ], [ 0.7186, 43.1072 ], [ 0.7183, 43.1071 ], [ 0.7184, 43.1074 ], [ 0.7186, 43.1074 ], [ 0.7187, 43.1078 ], [ 0.7189, 43.1078 ], [ 0.719, 43.1079 ], [ 0.7191, 43.1079 ], [ 0.7191, 43.1082 ], [ 0.7191, 43.1083 ], [ 0.7191, 43.1088 ], [ 0.7189, 43.1088 ], [ 0.7191, 43.1091 ], [ 0.7201, 43.1086 ], [ 0.7202, 43.1086 ], [ 0.7207, 43.1084 ], [ 0.7208, 43.1084 ], [ 0.7209, 43.1085 ], [ 0.7209, 43.1085 ], [ 0.7217, 43.1087 ], [ 0.7224, 43.1089 ] ] ], "type": "Polygon" }, "id": "76", "properties": { "code_commune": "31483", "code_departement": "31", "code_qp": "QP031003", "commune_qp": "Saint-Gaudens", "nom_commune": "Saint-Gaudens", "nom_qp": "Coeur De Ville" }, "type": "Feature" }, { "bbox": [ 3.7479, 43.4489, 3.7537, 43.4538 ], "geometry": { "coordinates": [ [ [ 3.7501, 43.4538 ], [ 3.7503, 43.4535 ], [ 3.7504, 43.4534 ], [ 3.7506, 43.4532 ], [ 3.7509, 43.4529 ], [ 3.7509, 43.4528 ], [ 3.751, 43.4528 ], [ 3.7513, 43.4526 ], [ 3.7514, 43.4525 ], [ 3.7516, 43.4524 ], [ 3.7516, 43.4524 ], [ 3.7518, 43.4521 ], [ 3.7523, 43.4516 ], [ 3.7524, 43.4516 ], [ 3.7527, 43.4513 ], [ 3.7533, 43.451 ], [ 3.7534, 43.4509 ], [ 3.7537, 43.4505 ], [ 3.7534, 43.4503 ], [ 3.7529, 43.45 ], [ 3.7518, 43.4493 ], [ 3.7515, 43.4491 ], [ 3.7512, 43.4489 ], [ 3.7511, 43.4489 ], [ 3.7511, 43.449 ], [ 3.751, 43.4491 ], [ 3.7507, 43.4492 ], [ 3.7513, 43.4497 ], [ 3.7517, 43.45 ], [ 3.7519, 43.4502 ], [ 3.7521, 43.4503 ], [ 3.7524, 43.4504 ], [ 3.7518, 43.4508 ], [ 3.7517, 43.4508 ], [ 3.7514, 43.451 ], [ 3.7513, 43.4511 ], [ 3.7512, 43.4513 ], [ 3.751, 43.4512 ], [ 3.7507, 43.4514 ], [ 3.751, 43.4516 ], [ 3.7507, 43.4518 ], [ 3.7507, 43.4518 ], [ 3.7503, 43.4521 ], [ 3.7504, 43.4522 ], [ 3.7505, 43.4523 ], [ 3.7502, 43.4526 ], [ 3.7501, 43.4525 ], [ 3.7492, 43.4518 ], [ 3.7491, 43.4519 ], [ 3.7487, 43.4521 ], [ 3.7486, 43.4522 ], [ 3.7485, 43.4523 ], [ 3.7483, 43.4523 ], [ 3.7481, 43.4524 ], [ 3.748, 43.4525 ], [ 3.748, 43.4526 ], [ 3.7479, 43.4527 ], [ 3.7479, 43.4527 ], [ 3.748, 43.4528 ], [ 3.7481, 43.4531 ], [ 3.7483, 43.4533 ], [ 3.7484, 43.4534 ], [ 3.7485, 43.4535 ], [ 3.749, 43.4533 ], [ 3.7491, 43.4532 ], [ 3.7492, 43.4532 ], [ 3.7493, 43.4533 ], [ 3.7494, 43.4533 ], [ 3.7495, 43.4534 ], [ 3.7495, 43.4534 ], [ 3.7497, 43.4535 ], [ 3.7498, 43.4536 ], [ 3.7498, 43.4536 ], [ 3.7498, 43.4537 ], [ 3.7501, 43.4538 ] ] ], "type": "Polygon" }, "id": "77", "properties": { "code_commune": "34108", "code_departement": "34", "code_qp": "QP034016", "commune_qp": "Frontignan", "nom_commune": "Frontignan", "nom_qp": "Les Deux Pins" }, "type": "Feature" }, { "bbox": [ 3.6911, 43.3997, 3.701, 43.4078 ], "geometry": { "coordinates": [ [ [ 3.6965, 43.4013 ], [ 3.6964, 43.4009 ], [ 3.6962, 43.4002 ], [ 3.6961, 43.3998 ], [ 3.6951, 43.3998 ], [ 3.695, 43.3998 ], [ 3.695, 43.3997 ], [ 3.6946, 43.3997 ], [ 3.6943, 43.3997 ], [ 3.6941, 43.3997 ], [ 3.694, 43.3998 ], [ 3.694, 43.4 ], [ 3.6938, 43.4 ], [ 3.6935, 43.4 ], [ 3.6931, 43.3997 ], [ 3.6929, 43.4001 ], [ 3.6928, 43.4001 ], [ 3.6927, 43.4004 ], [ 3.6927, 43.4005 ], [ 3.6926, 43.4008 ], [ 3.6926, 43.4008 ], [ 3.6925, 43.4013 ], [ 3.6925, 43.4015 ], [ 3.6927, 43.4015 ], [ 3.6928, 43.4014 ], [ 3.6928, 43.4016 ], [ 3.6929, 43.4016 ], [ 3.6929, 43.4016 ], [ 3.693, 43.4016 ], [ 3.693, 43.4016 ], [ 3.6931, 43.4016 ], [ 3.6933, 43.4016 ], [ 3.6933, 43.4017 ], [ 3.6933, 43.4017 ], [ 3.6936, 43.4017 ], [ 3.6936, 43.4018 ], [ 3.6939, 43.4018 ], [ 3.6939, 43.4019 ], [ 3.6942, 43.4019 ], [ 3.6941, 43.4022 ], [ 3.6941, 43.4022 ], [ 3.6941, 43.4023 ], [ 3.6938, 43.4023 ], [ 3.6938, 43.4024 ], [ 3.6939, 43.4024 ], [ 3.6939, 43.4025 ], [ 3.6938, 43.4025 ], [ 3.6934, 43.4025 ], [ 3.6931, 43.4025 ], [ 3.6927, 43.4024 ], [ 3.6923, 43.4024 ], [ 3.6927, 43.4031 ], [ 3.6928, 43.4033 ], [ 3.6937, 43.4034 ], [ 3.6937, 43.4037 ], [ 3.6935, 43.4037 ], [ 3.6934, 43.4039 ], [ 3.6931, 43.4039 ], [ 3.6931, 43.4039 ], [ 3.693, 43.404 ], [ 3.6929, 43.4041 ], [ 3.6928, 43.4041 ], [ 3.6927, 43.4042 ], [ 3.6925, 43.4042 ], [ 3.6915, 43.4041 ], [ 3.6914, 43.4043 ], [ 3.6914, 43.4044 ], [ 3.6914, 43.4046 ], [ 3.6914, 43.4048 ], [ 3.6912, 43.4058 ], [ 3.6911, 43.4065 ], [ 3.6915, 43.4066 ], [ 3.692, 43.4066 ], [ 3.6919, 43.4067 ], [ 3.6925, 43.4067 ], [ 3.6925, 43.4068 ], [ 3.6928, 43.4068 ], [ 3.6927, 43.407 ], [ 3.693, 43.407 ], [ 3.693, 43.4067 ], [ 3.693, 43.4066 ], [ 3.6933, 43.4066 ], [ 3.6932, 43.4078 ], [ 3.6935, 43.4076 ], [ 3.6939, 43.4072 ], [ 3.6941, 43.4066 ], [ 3.6933, 43.4065 ], [ 3.6934, 43.406 ], [ 3.6935, 43.4055 ], [ 3.6935, 43.4053 ], [ 3.6935, 43.405 ], [ 3.6939, 43.4051 ], [ 3.6943, 43.4051 ], [ 3.6944, 43.404 ], [ 3.6945, 43.4037 ], [ 3.6945, 43.4036 ], [ 3.6943, 43.4036 ], [ 3.6944, 43.4033 ], [ 3.6943, 43.4033 ], [ 3.6943, 43.4033 ], [ 3.6944, 43.4032 ], [ 3.6944, 43.4032 ], [ 3.6945, 43.4032 ], [ 3.6946, 43.4029 ], [ 3.6945, 43.4029 ], [ 3.6945, 43.4027 ], [ 3.6945, 43.4026 ], [ 3.6946, 43.4026 ], [ 3.6946, 43.4025 ], [ 3.6945, 43.4024 ], [ 3.6945, 43.4019 ], [ 3.6947, 43.4019 ], [ 3.6951, 43.402 ], [ 3.6956, 43.402 ], [ 3.6956, 43.4016 ], [ 3.6959, 43.4016 ], [ 3.6959, 43.4018 ], [ 3.6959, 43.4018 ], [ 3.6958, 43.4018 ], [ 3.6958, 43.4018 ], [ 3.6959, 43.4018 ], [ 3.6959, 43.4019 ], [ 3.6958, 43.4019 ], [ 3.6958, 43.402 ], [ 3.6966, 43.402 ], [ 3.6967, 43.402 ], [ 3.6967, 43.4019 ], [ 3.697, 43.4018 ], [ 3.6977, 43.4018 ], [ 3.6977, 43.4025 ], [ 3.6981, 43.4025 ], [ 3.6981, 43.4028 ], [ 3.6984, 43.4028 ], [ 3.6986, 43.4028 ], [ 3.6986, 43.4027 ], [ 3.6987, 43.4027 ], [ 3.6991, 43.403 ], [ 3.699, 43.4031 ], [ 3.699, 43.4031 ], [ 3.6994, 43.4033 ], [ 3.6993, 43.404 ], [ 3.6994, 43.4045 ], [ 3.6994, 43.4045 ], [ 3.6993, 43.4048 ], [ 3.6993, 43.4049 ], [ 3.6992, 43.4049 ], [ 3.6992, 43.4049 ], [ 3.6991, 43.4051 ], [ 3.6991, 43.4052 ], [ 3.6991, 43.4052 ], [ 3.6991, 43.4052 ], [ 3.699, 43.4052 ], [ 3.699, 43.4054 ], [ 3.6993, 43.4054 ], [ 3.6993, 43.4055 ], [ 3.6993, 43.4055 ], [ 3.6993, 43.4056 ], [ 3.6989, 43.4055 ], [ 3.6989, 43.4056 ], [ 3.6992, 43.4056 ], [ 3.699, 43.4059 ], [ 3.6992, 43.406 ], [ 3.6995, 43.4057 ], [ 3.6996, 43.4056 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4059 ], [ 3.6999, 43.4059 ], [ 3.6999, 43.4061 ], [ 3.7001, 43.4061 ], [ 3.7001, 43.4062 ], [ 3.7002, 43.4062 ], [ 3.7004, 43.4062 ], [ 3.7004, 43.4064 ], [ 3.7003, 43.4066 ], [ 3.7001, 43.4067 ], [ 3.7003, 43.4068 ], [ 3.7006, 43.4066 ], [ 3.7005, 43.4065 ], [ 3.7006, 43.4065 ], [ 3.7007, 43.4065 ], [ 3.7007, 43.4064 ], [ 3.7006, 43.4064 ], [ 3.7006, 43.4063 ], [ 3.7008, 43.4063 ], [ 3.7008, 43.4062 ], [ 3.7006, 43.4063 ], [ 3.7006, 43.4062 ], [ 3.7006, 43.4062 ], [ 3.7008, 43.4061 ], [ 3.7007, 43.4061 ], [ 3.7005, 43.4061 ], [ 3.7005, 43.406 ], [ 3.7005, 43.4059 ], [ 3.7004, 43.4059 ], [ 3.7002, 43.4059 ], [ 3.7001, 43.4055 ], [ 3.7, 43.4054 ], [ 3.7007, 43.4054 ], [ 3.7007, 43.4053 ], [ 3.7003, 43.4052 ], [ 3.7004, 43.4052 ], [ 3.7002, 43.405 ], [ 3.7001, 43.4049 ], [ 3.7, 43.4048 ], [ 3.7001, 43.4046 ], [ 3.6998, 43.4046 ], [ 3.7, 43.4042 ], [ 3.7002, 43.4041 ], [ 3.7004, 43.4041 ], [ 3.7005, 43.4041 ], [ 3.7006, 43.4042 ], [ 3.7009, 43.404 ], [ 3.701, 43.4041 ], [ 3.701, 43.4036 ], [ 3.7004, 43.4033 ], [ 3.7005, 43.4032 ], [ 3.7004, 43.4031 ], [ 3.7003, 43.4033 ], [ 3.7002, 43.4033 ], [ 3.7003, 43.4031 ], [ 3.7001, 43.4031 ], [ 3.7001, 43.4032 ], [ 3.7, 43.4032 ], [ 3.7, 43.4031 ], [ 3.7, 43.4031 ], [ 3.6999, 43.4031 ], [ 3.6999, 43.4029 ], [ 3.6997, 43.4029 ], [ 3.6997, 43.4028 ], [ 3.6994, 43.4028 ], [ 3.6995, 43.4025 ], [ 3.6986, 43.4025 ], [ 3.6986, 43.4024 ], [ 3.6981, 43.4024 ], [ 3.6981, 43.4022 ], [ 3.6983, 43.4022 ], [ 3.6983, 43.4021 ], [ 3.6979, 43.4021 ], [ 3.698, 43.402 ], [ 3.698, 43.402 ], [ 3.698, 43.4019 ], [ 3.698, 43.4019 ], [ 3.698, 43.4019 ], [ 3.698, 43.4017 ], [ 3.6977, 43.4017 ], [ 3.697, 43.4015 ], [ 3.6966, 43.4016 ], [ 3.6965, 43.4013 ] ] ], "type": "Polygon" }, "id": "78", "properties": { "code_commune": "34301", "code_departement": "34", "code_qp": "QP034018", "commune_qp": "Sète", "nom_commune": "Sète", "nom_qp": "Centre Ville - Ile Sud" }, "type": "Feature" }, { "bbox": [ 4.6479, 44.2542, 4.6525, 44.2583 ], "geometry": { "coordinates": [ [ [ 4.6485, 44.2583 ], [ 4.6488, 44.2582 ], [ 4.649, 44.2582 ], [ 4.6492, 44.2581 ], [ 4.6493, 44.2581 ], [ 4.6498, 44.2581 ], [ 4.6499, 44.258 ], [ 4.65, 44.258 ], [ 4.65, 44.2579 ], [ 4.6501, 44.2579 ], [ 4.6501, 44.258 ], [ 4.6501, 44.2583 ], [ 4.6505, 44.2583 ], [ 4.6509, 44.2578 ], [ 4.6511, 44.2576 ], [ 4.6514, 44.2572 ], [ 4.6517, 44.2568 ], [ 4.6518, 44.2566 ], [ 4.6519, 44.2563 ], [ 4.652, 44.2561 ], [ 4.6523, 44.2554 ], [ 4.6524, 44.2551 ], [ 4.6524, 44.2551 ], [ 4.6524, 44.2547 ], [ 4.6525, 44.2543 ], [ 4.652, 44.2544 ], [ 4.6519, 44.2543 ], [ 4.6517, 44.2543 ], [ 4.6512, 44.2542 ], [ 4.6511, 44.2544 ], [ 4.6511, 44.2545 ], [ 4.6508, 44.2546 ], [ 4.6507, 44.2546 ], [ 4.6505, 44.2546 ], [ 4.6505, 44.2546 ], [ 4.6505, 44.2547 ], [ 4.6504, 44.2546 ], [ 4.6503, 44.2547 ], [ 4.6502, 44.2547 ], [ 4.6502, 44.2547 ], [ 4.6501, 44.2546 ], [ 4.6501, 44.2546 ], [ 4.65, 44.2546 ], [ 4.65, 44.2546 ], [ 4.6499, 44.2546 ], [ 4.6497, 44.2546 ], [ 4.6497, 44.2546 ], [ 4.6496, 44.2546 ], [ 4.6496, 44.2547 ], [ 4.6495, 44.2547 ], [ 4.6496, 44.2547 ], [ 4.6495, 44.2546 ], [ 4.6494, 44.2546 ], [ 4.6493, 44.2546 ], [ 4.6493, 44.2548 ], [ 4.6491, 44.2548 ], [ 4.649, 44.2548 ], [ 4.6485, 44.2549 ], [ 4.6483, 44.2548 ], [ 4.6482, 44.255 ], [ 4.6482, 44.2551 ], [ 4.6483, 44.2552 ], [ 4.6484, 44.2555 ], [ 4.6481, 44.2555 ], [ 4.648, 44.2555 ], [ 4.648, 44.2556 ], [ 4.6479, 44.2557 ], [ 4.6481, 44.2557 ], [ 4.6481, 44.2558 ], [ 4.6481, 44.2558 ], [ 4.6482, 44.2559 ], [ 4.6481, 44.2559 ], [ 4.6481, 44.256 ], [ 4.648, 44.256 ], [ 4.648, 44.2561 ], [ 4.6481, 44.2561 ], [ 4.6481, 44.2562 ], [ 4.648, 44.2562 ], [ 4.648, 44.2563 ], [ 4.648, 44.2563 ], [ 4.648, 44.2564 ], [ 4.648, 44.2565 ], [ 4.6479, 44.2565 ], [ 4.6479, 44.2566 ], [ 4.6479, 44.2566 ], [ 4.6479, 44.2568 ], [ 4.648, 44.2568 ], [ 4.648, 44.2568 ], [ 4.648, 44.2568 ], [ 4.6481, 44.2569 ], [ 4.6481, 44.257 ], [ 4.6481, 44.257 ], [ 4.6481, 44.2571 ], [ 4.6481, 44.2571 ], [ 4.6481, 44.2571 ], [ 4.6482, 44.2571 ], [ 4.6482, 44.2572 ], [ 4.6483, 44.2572 ], [ 4.6483, 44.2572 ], [ 4.6481, 44.2572 ], [ 4.6481, 44.2573 ], [ 4.6482, 44.2573 ], [ 4.6481, 44.2573 ], [ 4.6481, 44.2573 ], [ 4.6481, 44.2574 ], [ 4.6482, 44.2574 ], [ 4.6482, 44.2574 ], [ 4.6481, 44.2574 ], [ 4.6481, 44.2574 ], [ 4.6482, 44.2575 ], [ 4.6482, 44.2575 ], [ 4.6483, 44.2576 ], [ 4.6483, 44.2576 ], [ 4.6482, 44.2576 ], [ 4.6482, 44.2577 ], [ 4.6481, 44.2577 ], [ 4.6481, 44.2578 ], [ 4.6482, 44.258 ], [ 4.6482, 44.2581 ], [ 4.6482, 44.2582 ], [ 4.6483, 44.2582 ], [ 4.6484, 44.2583 ], [ 4.6485, 44.2583 ] ] ], "type": "Polygon" }, "id": "79", "properties": { "code_commune": "30202", "code_departement": "30", "code_qp": "QP030011", "commune_qp": "Pont-Saint-Esprit", "nom_commune": "Pont-Saint-Esprit", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.9763, 43.76, 2.0026, 43.7681 ], "geometry": { "coordinates": [ [ [ 2.0023, 43.7645 ], [ 2.0025, 43.7645 ], [ 2.0026, 43.7642 ], [ 2.0026, 43.764 ], [ 2.0025, 43.7639 ], [ 2.0017, 43.7639 ], [ 2.0013, 43.7624 ], [ 2.0012, 43.7624 ], [ 1.9999, 43.7624 ], [ 1.9988, 43.7624 ], [ 1.9977, 43.7625 ], [ 1.9977, 43.7625 ], [ 1.997, 43.7625 ], [ 1.9969, 43.7627 ], [ 1.9966, 43.7629 ], [ 1.9965, 43.763 ], [ 1.9964, 43.7631 ], [ 1.9963, 43.7631 ], [ 1.9963, 43.763 ], [ 1.996, 43.7627 ], [ 1.9959, 43.7626 ], [ 1.9958, 43.7626 ], [ 1.9957, 43.7625 ], [ 1.9954, 43.7626 ], [ 1.9919, 43.7628 ], [ 1.9914, 43.7629 ], [ 1.9907, 43.7629 ], [ 1.9905, 43.7628 ], [ 1.9903, 43.7625 ], [ 1.9912, 43.7623 ], [ 1.9915, 43.7621 ], [ 1.9931, 43.7615 ], [ 1.9944, 43.7611 ], [ 1.9948, 43.7611 ], [ 1.9943, 43.7602 ], [ 1.9939, 43.7601 ], [ 1.9929, 43.76 ], [ 1.9889, 43.76 ], [ 1.9878, 43.7601 ], [ 1.9876, 43.7602 ], [ 1.9873, 43.7604 ], [ 1.9869, 43.7607 ], [ 1.9867, 43.7608 ], [ 1.9866, 43.7608 ], [ 1.9851, 43.7608 ], [ 1.9851, 43.7622 ], [ 1.985, 43.7622 ], [ 1.9832, 43.7622 ], [ 1.982, 43.7622 ], [ 1.9813, 43.7622 ], [ 1.981, 43.7621 ], [ 1.9792, 43.7614 ], [ 1.979, 43.7615 ], [ 1.9784, 43.7615 ], [ 1.9781, 43.7618 ], [ 1.9763, 43.7618 ], [ 1.9766, 43.7636 ], [ 1.977, 43.7641 ], [ 1.9779, 43.7645 ], [ 1.9778, 43.7643 ], [ 1.9785, 43.764 ], [ 1.9794, 43.7636 ], [ 1.9796, 43.7636 ], [ 1.9806, 43.7634 ], [ 1.9815, 43.7647 ], [ 1.9824, 43.7643 ], [ 1.983, 43.764 ], [ 1.9838, 43.7637 ], [ 1.9843, 43.7635 ], [ 1.9853, 43.7633 ], [ 1.9855, 43.7642 ], [ 1.9875, 43.764 ], [ 1.9874, 43.7638 ], [ 1.988, 43.7637 ], [ 1.988, 43.7638 ], [ 1.9884, 43.7637 ], [ 1.9884, 43.7637 ], [ 1.9889, 43.7636 ], [ 1.989, 43.7638 ], [ 1.9892, 43.7639 ], [ 1.9894, 43.7634 ], [ 1.9898, 43.7628 ], [ 1.9903, 43.763 ], [ 1.9902, 43.7631 ], [ 1.99, 43.7635 ], [ 1.99, 43.7636 ], [ 1.9903, 43.7637 ], [ 1.9903, 43.7636 ], [ 1.9904, 43.7635 ], [ 1.9907, 43.7635 ], [ 1.9909, 43.7637 ], [ 1.991, 43.7638 ], [ 1.9913, 43.7642 ], [ 1.9916, 43.7646 ], [ 1.9917, 43.7647 ], [ 1.9919, 43.7648 ], [ 1.9923, 43.7649 ], [ 1.9931, 43.7652 ], [ 1.9932, 43.7652 ], [ 1.9947, 43.7649 ], [ 1.9971, 43.7646 ], [ 1.9974, 43.7645 ], [ 1.9979, 43.7661 ], [ 1.9967, 43.7663 ], [ 1.9968, 43.7667 ], [ 1.9989, 43.768 ], [ 1.999, 43.7679 ], [ 1.9991, 43.7681 ], [ 2.0003, 43.7679 ], [ 2.0004, 43.7679 ], [ 2.0005, 43.7679 ], [ 2.0012, 43.7662 ], [ 2.0017, 43.7648 ], [ 2.0019, 43.7645 ], [ 2.0023, 43.7645 ] ] ], "type": "Polygon" }, "id": "80", "properties": { "code_commune": "81105", "code_departement": "81", "code_qp": "QP081011", "commune_qp": "Graulhet", "nom_commune": "Graulhet", "nom_qp": "Crins - En Gach" }, "type": "Feature" }, { "bbox": [ 2.1471, 44.0485, 2.1615, 44.0577 ], "geometry": { "coordinates": [ [ [ 2.1605, 44.0528 ], [ 2.1608, 44.0525 ], [ 2.1609, 44.0522 ], [ 2.161, 44.0514 ], [ 2.1609, 44.0513 ], [ 2.1608, 44.0511 ], [ 2.161, 44.0511 ], [ 2.1614, 44.0509 ], [ 2.1612, 44.0505 ], [ 2.1615, 44.0504 ], [ 2.1615, 44.0502 ], [ 2.1612, 44.0499 ], [ 2.1609, 44.0498 ], [ 2.1606, 44.0497 ], [ 2.1603, 44.0498 ], [ 2.1592, 44.05 ], [ 2.1584, 44.0499 ], [ 2.1584, 44.0497 ], [ 2.1583, 44.0496 ], [ 2.158, 44.0497 ], [ 2.1581, 44.0507 ], [ 2.1582, 44.0517 ], [ 2.1582, 44.0518 ], [ 2.1579, 44.0519 ], [ 2.1564, 44.0525 ], [ 2.1558, 44.0518 ], [ 2.1539, 44.0519 ], [ 2.1538, 44.0508 ], [ 2.1537, 44.0504 ], [ 2.1537, 44.0498 ], [ 2.1533, 44.0499 ], [ 2.1532, 44.0497 ], [ 2.1532, 44.0495 ], [ 2.1533, 44.0492 ], [ 2.1535, 44.0491 ], [ 2.1536, 44.0491 ], [ 2.1537, 44.049 ], [ 2.1534, 44.0488 ], [ 2.1536, 44.0486 ], [ 2.1533, 44.0485 ], [ 2.1529, 44.0489 ], [ 2.1527, 44.049 ], [ 2.1525, 44.049 ], [ 2.1521, 44.0491 ], [ 2.1519, 44.0491 ], [ 2.1513, 44.0498 ], [ 2.151, 44.05 ], [ 2.1509, 44.05 ], [ 2.1494, 44.0501 ], [ 2.1492, 44.0501 ], [ 2.1492, 44.0501 ], [ 2.1471, 44.0502 ], [ 2.1473, 44.0507 ], [ 2.1475, 44.051 ], [ 2.1477, 44.0512 ], [ 2.1482, 44.0514 ], [ 2.1483, 44.0515 ], [ 2.1486, 44.0515 ], [ 2.1488, 44.0515 ], [ 2.1508, 44.0519 ], [ 2.1516, 44.0521 ], [ 2.1522, 44.0521 ], [ 2.1534, 44.052 ], [ 2.1535, 44.052 ], [ 2.1535, 44.0521 ], [ 2.1539, 44.0526 ], [ 2.1539, 44.0526 ], [ 2.154, 44.0528 ], [ 2.1541, 44.0528 ], [ 2.154, 44.0529 ], [ 2.1541, 44.053 ], [ 2.1542, 44.0531 ], [ 2.1542, 44.0531 ], [ 2.1543, 44.0532 ], [ 2.1544, 44.0533 ], [ 2.154, 44.0534 ], [ 2.1549, 44.054 ], [ 2.155, 44.0539 ], [ 2.1567, 44.0531 ], [ 2.1571, 44.0529 ], [ 2.1576, 44.0535 ], [ 2.1573, 44.0536 ], [ 2.1572, 44.0536 ], [ 2.157, 44.0536 ], [ 2.1563, 44.0538 ], [ 2.1562, 44.0538 ], [ 2.1559, 44.054 ], [ 2.1558, 44.054 ], [ 2.1555, 44.054 ], [ 2.155, 44.054 ], [ 2.1547, 44.0543 ], [ 2.1546, 44.0545 ], [ 2.1547, 44.0547 ], [ 2.1547, 44.0548 ], [ 2.1541, 44.0548 ], [ 2.1535, 44.0544 ], [ 2.1535, 44.0544 ], [ 2.1533, 44.0544 ], [ 2.1526, 44.0545 ], [ 2.1524, 44.0546 ], [ 2.1522, 44.0543 ], [ 2.1519, 44.0544 ], [ 2.151, 44.0535 ], [ 2.1502, 44.054 ], [ 2.1501, 44.0542 ], [ 2.1502, 44.0543 ], [ 2.1503, 44.0545 ], [ 2.1504, 44.0546 ], [ 2.1501, 44.0551 ], [ 2.15, 44.0552 ], [ 2.1501, 44.0554 ], [ 2.1498, 44.0555 ], [ 2.1482, 44.056 ], [ 2.1487, 44.0561 ], [ 2.1492, 44.0561 ], [ 2.1492, 44.0571 ], [ 2.15, 44.057 ], [ 2.151, 44.0571 ], [ 2.1513, 44.0572 ], [ 2.1515, 44.0572 ], [ 2.1518, 44.0574 ], [ 2.1522, 44.0575 ], [ 2.1525, 44.0576 ], [ 2.1527, 44.0577 ], [ 2.153, 44.0576 ], [ 2.1532, 44.0576 ], [ 2.154, 44.0573 ], [ 2.1546, 44.0571 ], [ 2.1549, 44.0571 ], [ 2.1552, 44.057 ], [ 2.1555, 44.0568 ], [ 2.1558, 44.0564 ], [ 2.156, 44.0562 ], [ 2.1561, 44.0562 ], [ 2.1564, 44.0559 ], [ 2.1573, 44.0552 ], [ 2.1578, 44.0557 ], [ 2.1586, 44.0553 ], [ 2.1589, 44.0552 ], [ 2.1598, 44.0552 ], [ 2.1599, 44.0552 ], [ 2.1603, 44.055 ], [ 2.1611, 44.0545 ], [ 2.1596, 44.0535 ], [ 2.1595, 44.0535 ], [ 2.16, 44.0531 ], [ 2.1605, 44.0528 ] ] ], "type": "Polygon" }, "id": "81", "properties": { "code_commune": "81060", "code_departement": "81", "code_qp": "QP081009", "commune_qp": "Carmaux", "nom_commune": "Carmaux", "nom_qp": "Rajol - Cérou - Gourgatieux - Bouloc - Verrerie" }, "type": "Feature" }, { "bbox": [ 3.312, 43.7269, 3.3249, 43.7361 ], "geometry": { "coordinates": [ [ [ 3.3249, 43.731 ], [ 3.3246, 43.731 ], [ 3.3246, 43.731 ], [ 3.3244, 43.731 ], [ 3.3244, 43.7308 ], [ 3.3244, 43.7307 ], [ 3.3244, 43.7305 ], [ 3.3243, 43.7305 ], [ 3.3244, 43.7303 ], [ 3.3244, 43.7303 ], [ 3.3244, 43.7299 ], [ 3.3243, 43.7298 ], [ 3.3242, 43.7298 ], [ 3.3243, 43.7297 ], [ 3.3243, 43.7296 ], [ 3.3241, 43.7295 ], [ 3.3238, 43.7292 ], [ 3.3241, 43.7289 ], [ 3.3241, 43.7289 ], [ 3.3242, 43.7288 ], [ 3.3241, 43.7287 ], [ 3.324, 43.7285 ], [ 3.3238, 43.7283 ], [ 3.3237, 43.7281 ], [ 3.3232, 43.7278 ], [ 3.3231, 43.7279 ], [ 3.3233, 43.728 ], [ 3.3232, 43.7281 ], [ 3.3232, 43.7282 ], [ 3.3232, 43.7283 ], [ 3.3233, 43.7285 ], [ 3.3234, 43.7286 ], [ 3.3235, 43.7286 ], [ 3.3235, 43.7286 ], [ 3.3235, 43.7288 ], [ 3.3234, 43.729 ], [ 3.3231, 43.7291 ], [ 3.3229, 43.7291 ], [ 3.3227, 43.7291 ], [ 3.3224, 43.7291 ], [ 3.3223, 43.729 ], [ 3.3221, 43.729 ], [ 3.3221, 43.7289 ], [ 3.322, 43.7289 ], [ 3.3219, 43.7288 ], [ 3.3217, 43.7288 ], [ 3.3213, 43.7287 ], [ 3.3211, 43.7286 ], [ 3.321, 43.7287 ], [ 3.3208, 43.7287 ], [ 3.3205, 43.7287 ], [ 3.3202, 43.7288 ], [ 3.3202, 43.7289 ], [ 3.3201, 43.7289 ], [ 3.3197, 43.7287 ], [ 3.3197, 43.7286 ], [ 3.3197, 43.7285 ], [ 3.3196, 43.7283 ], [ 3.3195, 43.7282 ], [ 3.3194, 43.7282 ], [ 3.3193, 43.7281 ], [ 3.3187, 43.7281 ], [ 3.3182, 43.7278 ], [ 3.3181, 43.7277 ], [ 3.318, 43.7276 ], [ 3.3179, 43.7274 ], [ 3.3178, 43.7273 ], [ 3.3174, 43.7271 ], [ 3.3172, 43.727 ], [ 3.3167, 43.727 ], [ 3.3163, 43.727 ], [ 3.3161, 43.727 ], [ 3.3158, 43.7269 ], [ 3.3158, 43.7269 ], [ 3.3161, 43.7272 ], [ 3.3162, 43.7273 ], [ 3.3162, 43.7274 ], [ 3.316, 43.7278 ], [ 3.316, 43.7278 ], [ 3.3161, 43.728 ], [ 3.3163, 43.728 ], [ 3.3161, 43.7281 ], [ 3.3159, 43.7283 ], [ 3.316, 43.7284 ], [ 3.3161, 43.7288 ], [ 3.3161, 43.7288 ], [ 3.3163, 43.7291 ], [ 3.3163, 43.7292 ], [ 3.3162, 43.7294 ], [ 3.3167, 43.7295 ], [ 3.3166, 43.7297 ], [ 3.3168, 43.73 ], [ 3.3169, 43.7303 ], [ 3.3164, 43.7303 ], [ 3.3165, 43.7305 ], [ 3.3166, 43.7307 ], [ 3.3164, 43.7307 ], [ 3.3165, 43.7309 ], [ 3.3165, 43.7309 ], [ 3.316, 43.7312 ], [ 3.3149, 43.7318 ], [ 3.3147, 43.7319 ], [ 3.3146, 43.732 ], [ 3.3136, 43.7324 ], [ 3.313, 43.7327 ], [ 3.3125, 43.7329 ], [ 3.312, 43.7332 ], [ 3.3121, 43.7334 ], [ 3.3122, 43.7335 ], [ 3.3122, 43.7336 ], [ 3.3129, 43.7334 ], [ 3.3132, 43.7333 ], [ 3.3142, 43.7328 ], [ 3.3148, 43.7326 ], [ 3.3157, 43.7322 ], [ 3.3162, 43.7324 ], [ 3.3163, 43.7323 ], [ 3.3161, 43.7322 ], [ 3.3163, 43.7321 ], [ 3.3165, 43.732 ], [ 3.3166, 43.7318 ], [ 3.3168, 43.7316 ], [ 3.3171, 43.7313 ], [ 3.3174, 43.7315 ], [ 3.3175, 43.7315 ], [ 3.3176, 43.7317 ], [ 3.3177, 43.7318 ], [ 3.3177, 43.732 ], [ 3.3177, 43.7322 ], [ 3.3177, 43.7323 ], [ 3.3181, 43.7325 ], [ 3.3182, 43.7326 ], [ 3.3184, 43.7329 ], [ 3.3187, 43.7331 ], [ 3.319, 43.7329 ], [ 3.3191, 43.7329 ], [ 3.3193, 43.733 ], [ 3.3195, 43.7333 ], [ 3.3176, 43.7349 ], [ 3.3179, 43.735 ], [ 3.3174, 43.7354 ], [ 3.3176, 43.7355 ], [ 3.3176, 43.7355 ], [ 3.3177, 43.7356 ], [ 3.3176, 43.7357 ], [ 3.3175, 43.7357 ], [ 3.3175, 43.7358 ], [ 3.3176, 43.7359 ], [ 3.3176, 43.7359 ], [ 3.3183, 43.7361 ], [ 3.3184, 43.7361 ], [ 3.3187, 43.736 ], [ 3.3188, 43.7358 ], [ 3.3188, 43.7358 ], [ 3.3189, 43.7357 ], [ 3.319, 43.7358 ], [ 3.3194, 43.7356 ], [ 3.3195, 43.7355 ], [ 3.3198, 43.7355 ], [ 3.3206, 43.7354 ], [ 3.3205, 43.7351 ], [ 3.3194, 43.7352 ], [ 3.3197, 43.7349 ], [ 3.32, 43.7346 ], [ 3.3205, 43.7341 ], [ 3.3198, 43.7334 ], [ 3.3203, 43.733 ], [ 3.3205, 43.7329 ], [ 3.3207, 43.7327 ], [ 3.3208, 43.7328 ], [ 3.3212, 43.7325 ], [ 3.3215, 43.7322 ], [ 3.322, 43.7321 ], [ 3.3223, 43.732 ], [ 3.3227, 43.7322 ], [ 3.3233, 43.7323 ], [ 3.3236, 43.7323 ], [ 3.3236, 43.7325 ], [ 3.3236, 43.7327 ], [ 3.3237, 43.7332 ], [ 3.3239, 43.7337 ], [ 3.3249, 43.7338 ], [ 3.3249, 43.7334 ], [ 3.3246, 43.7335 ], [ 3.3245, 43.7331 ], [ 3.3245, 43.7329 ], [ 3.3244, 43.7324 ], [ 3.3244, 43.7324 ], [ 3.3245, 43.7324 ], [ 3.3246, 43.7321 ], [ 3.3246, 43.732 ], [ 3.3248, 43.7318 ], [ 3.3247, 43.7318 ], [ 3.3248, 43.7315 ], [ 3.3248, 43.7315 ], [ 3.3248, 43.7314 ], [ 3.3248, 43.7314 ], [ 3.3248, 43.7313 ], [ 3.3249, 43.7312 ], [ 3.3249, 43.731 ] ] ], "type": "Polygon" }, "id": "82", "properties": { "code_commune": "34142", "code_departement": "34", "code_qp": "QP034022", "commune_qp": "Lodève", "nom_commune": "Lodève", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.153, 43.6131, 3.1621, 43.6187 ], "geometry": { "coordinates": [ [ [ 3.1553, 43.6173 ], [ 3.1553, 43.6176 ], [ 3.1559, 43.6174 ], [ 3.1558, 43.6174 ], [ 3.1561, 43.6173 ], [ 3.1561, 43.6172 ], [ 3.1562, 43.6167 ], [ 3.1562, 43.6164 ], [ 3.1562, 43.6163 ], [ 3.1562, 43.6162 ], [ 3.157, 43.6162 ], [ 3.157, 43.6166 ], [ 3.157, 43.6173 ], [ 3.1568, 43.6175 ], [ 3.1568, 43.6175 ], [ 3.1567, 43.6176 ], [ 3.1567, 43.6176 ], [ 3.1566, 43.6177 ], [ 3.1575, 43.6182 ], [ 3.1578, 43.6179 ], [ 3.1585, 43.6183 ], [ 3.1589, 43.6185 ], [ 3.1593, 43.6187 ], [ 3.1601, 43.6181 ], [ 3.1605, 43.6177 ], [ 3.1608, 43.6175 ], [ 3.161, 43.6176 ], [ 3.1611, 43.6175 ], [ 3.1613, 43.6176 ], [ 3.1615, 43.6177 ], [ 3.1617, 43.6179 ], [ 3.1617, 43.6179 ], [ 3.1621, 43.6177 ], [ 3.1618, 43.6175 ], [ 3.162, 43.6174 ], [ 3.1615, 43.6169 ], [ 3.1614, 43.6168 ], [ 3.1614, 43.6168 ], [ 3.1613, 43.6167 ], [ 3.1613, 43.6167 ], [ 3.1611, 43.6163 ], [ 3.1609, 43.6161 ], [ 3.1609, 43.6161 ], [ 3.1608, 43.6161 ], [ 3.1608, 43.616 ], [ 3.1607, 43.6159 ], [ 3.1608, 43.6158 ], [ 3.1608, 43.6157 ], [ 3.1609, 43.6156 ], [ 3.1609, 43.6156 ], [ 3.1611, 43.6155 ], [ 3.1605, 43.615 ], [ 3.1597, 43.6145 ], [ 3.1596, 43.6144 ], [ 3.1595, 43.6142 ], [ 3.1595, 43.6142 ], [ 3.1593, 43.6141 ], [ 3.1595, 43.614 ], [ 3.1594, 43.6139 ], [ 3.1594, 43.6139 ], [ 3.1594, 43.6139 ], [ 3.1592, 43.6139 ], [ 3.1596, 43.6135 ], [ 3.1592, 43.6132 ], [ 3.159, 43.6131 ], [ 3.1589, 43.6131 ], [ 3.1585, 43.6133 ], [ 3.1583, 43.6134 ], [ 3.1582, 43.6134 ], [ 3.158, 43.6135 ], [ 3.158, 43.6135 ], [ 3.1575, 43.6137 ], [ 3.1576, 43.6139 ], [ 3.1576, 43.6139 ], [ 3.1576, 43.6139 ], [ 3.1577, 43.614 ], [ 3.1571, 43.6143 ], [ 3.1571, 43.6143 ], [ 3.157, 43.6144 ], [ 3.1569, 43.6143 ], [ 3.1569, 43.6143 ], [ 3.1568, 43.6142 ], [ 3.1567, 43.6143 ], [ 3.1566, 43.6142 ], [ 3.1563, 43.6144 ], [ 3.1564, 43.6145 ], [ 3.1565, 43.6147 ], [ 3.1568, 43.6149 ], [ 3.1569, 43.6149 ], [ 3.1569, 43.615 ], [ 3.1569, 43.615 ], [ 3.1569, 43.615 ], [ 3.157, 43.615 ], [ 3.1571, 43.6151 ], [ 3.1573, 43.6151 ], [ 3.1574, 43.6152 ], [ 3.1572, 43.6153 ], [ 3.1572, 43.6156 ], [ 3.1571, 43.6159 ], [ 3.1571, 43.6161 ], [ 3.1562, 43.6161 ], [ 3.1562, 43.6159 ], [ 3.1559, 43.6154 ], [ 3.1557, 43.6154 ], [ 3.1553, 43.6153 ], [ 3.1551, 43.6153 ], [ 3.1547, 43.6152 ], [ 3.1544, 43.6152 ], [ 3.1544, 43.6151 ], [ 3.1536, 43.6154 ], [ 3.1535, 43.6154 ], [ 3.1535, 43.6154 ], [ 3.1537, 43.6156 ], [ 3.1538, 43.6158 ], [ 3.1537, 43.6158 ], [ 3.1535, 43.6159 ], [ 3.1534, 43.6159 ], [ 3.153, 43.6161 ], [ 3.153, 43.6162 ], [ 3.1535, 43.6169 ], [ 3.1536, 43.6168 ], [ 3.1537, 43.617 ], [ 3.1537, 43.6171 ], [ 3.1537, 43.6172 ], [ 3.1539, 43.6173 ], [ 3.1541, 43.6176 ], [ 3.1541, 43.6176 ], [ 3.1543, 43.6175 ], [ 3.1543, 43.6176 ], [ 3.1553, 43.6173 ] ] ], "type": "Polygon" }, "id": "83", "properties": { "code_commune": "34028", "code_departement": "34", "code_qp": "QP034020", "commune_qp": "Bédarieux", "nom_commune": "Bédarieux", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.6053, 43.107, 1.6151, 43.1218 ], "geometry": { "coordinates": [ [ [ 1.6151, 43.108 ], [ 1.6148, 43.108 ], [ 1.6148, 43.1079 ], [ 1.6141, 43.1079 ], [ 1.6144, 43.1073 ], [ 1.6143, 43.1073 ], [ 1.6142, 43.1073 ], [ 1.6141, 43.1073 ], [ 1.614, 43.1072 ], [ 1.6138, 43.1071 ], [ 1.6137, 43.1071 ], [ 1.6135, 43.1071 ], [ 1.6134, 43.107 ], [ 1.6129, 43.1071 ], [ 1.6125, 43.1072 ], [ 1.6123, 43.1073 ], [ 1.6121, 43.1073 ], [ 1.612, 43.1074 ], [ 1.6115, 43.1075 ], [ 1.6109, 43.1077 ], [ 1.6108, 43.1077 ], [ 1.6106, 43.1077 ], [ 1.6099, 43.1077 ], [ 1.6097, 43.1077 ], [ 1.6094, 43.1077 ], [ 1.6089, 43.1077 ], [ 1.6084, 43.1077 ], [ 1.6081, 43.1077 ], [ 1.608, 43.1078 ], [ 1.6078, 43.108 ], [ 1.6073, 43.1085 ], [ 1.6074, 43.109 ], [ 1.6075, 43.1093 ], [ 1.6082, 43.109 ], [ 1.6083, 43.1091 ], [ 1.6089, 43.1088 ], [ 1.6093, 43.1093 ], [ 1.6102, 43.109 ], [ 1.611, 43.1095 ], [ 1.6112, 43.1097 ], [ 1.6116, 43.1102 ], [ 1.6117, 43.1104 ], [ 1.6121, 43.1109 ], [ 1.612, 43.111 ], [ 1.6115, 43.1111 ], [ 1.6114, 43.111 ], [ 1.6113, 43.111 ], [ 1.6113, 43.111 ], [ 1.6109, 43.1111 ], [ 1.6109, 43.1111 ], [ 1.6105, 43.111 ], [ 1.6097, 43.1107 ], [ 1.6096, 43.1107 ], [ 1.6095, 43.1107 ], [ 1.6093, 43.1108 ], [ 1.609, 43.1111 ], [ 1.6092, 43.1111 ], [ 1.6093, 43.1112 ], [ 1.6095, 43.1115 ], [ 1.6096, 43.1115 ], [ 1.6097, 43.1116 ], [ 1.6097, 43.1117 ], [ 1.6097, 43.1118 ], [ 1.6096, 43.112 ], [ 1.6096, 43.1124 ], [ 1.6095, 43.1126 ], [ 1.6085, 43.1126 ], [ 1.6085, 43.1128 ], [ 1.6085, 43.1129 ], [ 1.6085, 43.1131 ], [ 1.6085, 43.1131 ], [ 1.6086, 43.1131 ], [ 1.6087, 43.1131 ], [ 1.6089, 43.1131 ], [ 1.609, 43.113 ], [ 1.6091, 43.1131 ], [ 1.6093, 43.1131 ], [ 1.6094, 43.1131 ], [ 1.6094, 43.1131 ], [ 1.6095, 43.1131 ], [ 1.6095, 43.1132 ], [ 1.6096, 43.1132 ], [ 1.6096, 43.1132 ], [ 1.6097, 43.1132 ], [ 1.6099, 43.1133 ], [ 1.61, 43.1133 ], [ 1.6102, 43.1134 ], [ 1.6104, 43.1134 ], [ 1.6107, 43.1136 ], [ 1.6105, 43.1138 ], [ 1.6102, 43.1139 ], [ 1.6105, 43.1142 ], [ 1.6106, 43.1143 ], [ 1.6106, 43.1144 ], [ 1.6106, 43.1144 ], [ 1.6109, 43.1146 ], [ 1.6108, 43.1147 ], [ 1.6104, 43.1148 ], [ 1.6098, 43.115 ], [ 1.6095, 43.1151 ], [ 1.6097, 43.1153 ], [ 1.6095, 43.1154 ], [ 1.6094, 43.1155 ], [ 1.6094, 43.1156 ], [ 1.6093, 43.1156 ], [ 1.6089, 43.1157 ], [ 1.6087, 43.1153 ], [ 1.6081, 43.1154 ], [ 1.6076, 43.1147 ], [ 1.6072, 43.1145 ], [ 1.607, 43.1144 ], [ 1.6069, 43.1144 ], [ 1.6068, 43.1143 ], [ 1.6068, 43.1143 ], [ 1.6068, 43.1143 ], [ 1.6069, 43.1141 ], [ 1.6066, 43.1139 ], [ 1.6065, 43.1139 ], [ 1.6065, 43.1138 ], [ 1.6064, 43.1137 ], [ 1.6063, 43.1137 ], [ 1.6062, 43.1137 ], [ 1.6061, 43.1137 ], [ 1.6062, 43.1137 ], [ 1.6059, 43.1135 ], [ 1.6057, 43.1135 ], [ 1.6055, 43.1138 ], [ 1.6054, 43.114 ], [ 1.6053, 43.1143 ], [ 1.6054, 43.1144 ], [ 1.6054, 43.1144 ], [ 1.6055, 43.1145 ], [ 1.6055, 43.1145 ], [ 1.6056, 43.1145 ], [ 1.6064, 43.115 ], [ 1.6066, 43.115 ], [ 1.6067, 43.1152 ], [ 1.6069, 43.1154 ], [ 1.607, 43.1156 ], [ 1.6071, 43.1157 ], [ 1.6073, 43.1161 ], [ 1.6074, 43.1164 ], [ 1.6075, 43.1165 ], [ 1.6078, 43.1166 ], [ 1.608, 43.1167 ], [ 1.608, 43.1167 ], [ 1.6082, 43.1166 ], [ 1.6089, 43.1173 ], [ 1.6092, 43.1177 ], [ 1.6094, 43.1178 ], [ 1.6094, 43.1179 ], [ 1.6095, 43.1181 ], [ 1.6095, 43.1182 ], [ 1.6094, 43.1182 ], [ 1.609, 43.1182 ], [ 1.609, 43.1188 ], [ 1.6089, 43.1191 ], [ 1.6088, 43.1193 ], [ 1.6087, 43.1195 ], [ 1.6087, 43.1197 ], [ 1.6088, 43.1198 ], [ 1.609, 43.12 ], [ 1.6098, 43.1206 ], [ 1.6099, 43.1207 ], [ 1.61, 43.1206 ], [ 1.6105, 43.1204 ], [ 1.6109, 43.1203 ], [ 1.6111, 43.1202 ], [ 1.6113, 43.1202 ], [ 1.6115, 43.1203 ], [ 1.6115, 43.1204 ], [ 1.6116, 43.1204 ], [ 1.6116, 43.1207 ], [ 1.6117, 43.1213 ], [ 1.6124, 43.1214 ], [ 1.6125, 43.1215 ], [ 1.6128, 43.1217 ], [ 1.613, 43.1217 ], [ 1.6134, 43.1218 ], [ 1.6133, 43.1217 ], [ 1.6131, 43.1214 ], [ 1.6128, 43.1213 ], [ 1.6131, 43.1209 ], [ 1.6134, 43.1211 ], [ 1.6137, 43.1209 ], [ 1.6141, 43.1207 ], [ 1.614, 43.1207 ], [ 1.6134, 43.1206 ], [ 1.613, 43.1205 ], [ 1.6127, 43.1206 ], [ 1.6125, 43.1206 ], [ 1.6124, 43.1205 ], [ 1.6125, 43.1203 ], [ 1.6125, 43.12 ], [ 1.6129, 43.12 ], [ 1.6124, 43.1194 ], [ 1.6122, 43.1193 ], [ 1.6125, 43.1192 ], [ 1.6125, 43.1191 ], [ 1.6127, 43.119 ], [ 1.613, 43.1188 ], [ 1.6131, 43.1187 ], [ 1.6135, 43.1185 ], [ 1.6136, 43.1185 ], [ 1.6138, 43.1184 ], [ 1.614, 43.1184 ], [ 1.6142, 43.1182 ], [ 1.6145, 43.118 ], [ 1.6147, 43.1178 ], [ 1.6148, 43.1177 ], [ 1.6149, 43.1175 ], [ 1.6149, 43.1174 ], [ 1.6149, 43.1172 ], [ 1.6149, 43.1169 ], [ 1.6148, 43.1165 ], [ 1.6148, 43.1163 ], [ 1.6147, 43.116 ], [ 1.6146, 43.1155 ], [ 1.6145, 43.1151 ], [ 1.6141, 43.1152 ], [ 1.614, 43.1152 ], [ 1.6139, 43.1153 ], [ 1.6138, 43.1153 ], [ 1.6138, 43.1152 ], [ 1.6137, 43.1152 ], [ 1.6134, 43.1153 ], [ 1.6134, 43.1152 ], [ 1.6132, 43.1152 ], [ 1.6132, 43.1152 ], [ 1.6131, 43.1152 ], [ 1.6131, 43.1153 ], [ 1.6129, 43.1153 ], [ 1.6129, 43.1152 ], [ 1.6127, 43.1153 ], [ 1.6127, 43.1151 ], [ 1.6125, 43.1152 ], [ 1.6124, 43.1151 ], [ 1.6124, 43.1151 ], [ 1.6123, 43.1151 ], [ 1.6121, 43.1149 ], [ 1.6119, 43.1146 ], [ 1.6119, 43.1145 ], [ 1.6116, 43.1142 ], [ 1.6117, 43.1142 ], [ 1.6115, 43.1141 ], [ 1.6115, 43.1141 ], [ 1.6115, 43.114 ], [ 1.6114, 43.114 ], [ 1.6115, 43.114 ], [ 1.6112, 43.1138 ], [ 1.6116, 43.1135 ], [ 1.6121, 43.1137 ], [ 1.6122, 43.1135 ], [ 1.6116, 43.1131 ], [ 1.611, 43.1127 ], [ 1.6113, 43.1125 ], [ 1.6116, 43.1124 ], [ 1.612, 43.1121 ], [ 1.612, 43.112 ], [ 1.6125, 43.1118 ], [ 1.6124, 43.1117 ], [ 1.6123, 43.1117 ], [ 1.6122, 43.1117 ], [ 1.6122, 43.1116 ], [ 1.6122, 43.1116 ], [ 1.612, 43.1115 ], [ 1.6123, 43.1113 ], [ 1.613, 43.111 ], [ 1.6132, 43.1109 ], [ 1.6134, 43.1108 ], [ 1.614, 43.1106 ], [ 1.6147, 43.1102 ], [ 1.6147, 43.1102 ], [ 1.6147, 43.1101 ], [ 1.6146, 43.1099 ], [ 1.6145, 43.1098 ], [ 1.6144, 43.1097 ], [ 1.6141, 43.1094 ], [ 1.6138, 43.1091 ], [ 1.6138, 43.1087 ], [ 1.6138, 43.1084 ], [ 1.6139, 43.1084 ], [ 1.6142, 43.1084 ], [ 1.6147, 43.1084 ], [ 1.6148, 43.1084 ], [ 1.6151, 43.108 ] ] ], "type": "Polygon" }, "id": "84", "properties": { "code_commune": "09225", "code_departement": "09", "code_qp": "QP009003", "commune_qp": "Pamiers", "nom_commune": "Pamiers", "nom_qp": "Centre Ancien - La Gloriette" }, "type": "Feature" }, { "bbox": [ 3.4658, 43.3088, 3.4746, 43.3166 ], "geometry": { "coordinates": [ [ [ 3.4736, 43.316 ], [ 3.4736, 43.3158 ], [ 3.4736, 43.3155 ], [ 3.4735, 43.3151 ], [ 3.4734, 43.3147 ], [ 3.4733, 43.3145 ], [ 3.4733, 43.3143 ], [ 3.4732, 43.314 ], [ 3.4735, 43.3139 ], [ 3.4739, 43.3137 ], [ 3.4741, 43.3132 ], [ 3.4741, 43.3131 ], [ 3.474, 43.3131 ], [ 3.474, 43.3131 ], [ 3.4739, 43.3127 ], [ 3.4737, 43.3117 ], [ 3.4746, 43.3116 ], [ 3.4745, 43.3112 ], [ 3.4735, 43.3111 ], [ 3.4739, 43.3107 ], [ 3.4742, 43.3105 ], [ 3.4746, 43.3102 ], [ 3.4745, 43.3102 ], [ 3.4745, 43.3101 ], [ 3.4745, 43.3101 ], [ 3.4741, 43.3102 ], [ 3.4737, 43.3102 ], [ 3.4733, 43.3103 ], [ 3.4733, 43.3102 ], [ 3.4731, 43.3099 ], [ 3.4729, 43.3099 ], [ 3.4725, 43.31 ], [ 3.4721, 43.31 ], [ 3.4718, 43.31 ], [ 3.4718, 43.31 ], [ 3.4718, 43.3091 ], [ 3.4715, 43.3091 ], [ 3.4715, 43.3091 ], [ 3.471, 43.3089 ], [ 3.471, 43.3089 ], [ 3.4708, 43.3088 ], [ 3.4704, 43.3088 ], [ 3.4703, 43.3088 ], [ 3.4702, 43.3088 ], [ 3.4702, 43.3089 ], [ 3.4701, 43.3089 ], [ 3.4701, 43.3089 ], [ 3.47, 43.3089 ], [ 3.47, 43.309 ], [ 3.4699, 43.309 ], [ 3.4699, 43.309 ], [ 3.4699, 43.309 ], [ 3.4698, 43.309 ], [ 3.4697, 43.309 ], [ 3.4696, 43.3089 ], [ 3.4693, 43.3089 ], [ 3.4692, 43.3088 ], [ 3.4691, 43.3088 ], [ 3.469, 43.3088 ], [ 3.4685, 43.309 ], [ 3.4685, 43.309 ], [ 3.4686, 43.3092 ], [ 3.4687, 43.3093 ], [ 3.4687, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4682, 43.3096 ], [ 3.4681, 43.3097 ], [ 3.4681, 43.3097 ], [ 3.4682, 43.3099 ], [ 3.468, 43.3099 ], [ 3.4681, 43.3101 ], [ 3.4681, 43.3102 ], [ 3.4682, 43.3104 ], [ 3.4682, 43.3104 ], [ 3.4682, 43.3105 ], [ 3.4682, 43.3106 ], [ 3.4659, 43.3109 ], [ 3.466, 43.3111 ], [ 3.4658, 43.3112 ], [ 3.4659, 43.3114 ], [ 3.4661, 43.3114 ], [ 3.4661, 43.3116 ], [ 3.4662, 43.3117 ], [ 3.4663, 43.3119 ], [ 3.4666, 43.3122 ], [ 3.4668, 43.3124 ], [ 3.4669, 43.3126 ], [ 3.4669, 43.3126 ], [ 3.4669, 43.3126 ], [ 3.4674, 43.3133 ], [ 3.4675, 43.3134 ], [ 3.4676, 43.3135 ], [ 3.4678, 43.3136 ], [ 3.4682, 43.3138 ], [ 3.4686, 43.314 ], [ 3.4689, 43.3142 ], [ 3.4692, 43.3144 ], [ 3.4694, 43.3145 ], [ 3.4696, 43.3147 ], [ 3.469, 43.3148 ], [ 3.4682, 43.315 ], [ 3.4677, 43.3146 ], [ 3.4668, 43.315 ], [ 3.4666, 43.3151 ], [ 3.4663, 43.3153 ], [ 3.4662, 43.3153 ], [ 3.4664, 43.3154 ], [ 3.4664, 43.3154 ], [ 3.4665, 43.3154 ], [ 3.467, 43.3156 ], [ 3.4672, 43.3155 ], [ 3.4677, 43.3159 ], [ 3.4683, 43.3153 ], [ 3.47, 43.3148 ], [ 3.4704, 43.315 ], [ 3.4706, 43.3151 ], [ 3.4708, 43.3152 ], [ 3.4724, 43.3161 ], [ 3.4726, 43.3164 ], [ 3.4733, 43.3166 ], [ 3.4734, 43.3165 ], [ 3.4734, 43.316 ], [ 3.4736, 43.316 ] ] ], "type": "Polygon" }, "id": "85", "properties": { "code_commune": "34003", "code_departement": "34", "code_qp": "QP034019", "commune_qp": "Agde", "nom_commune": "Agde", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 0.0545, 43.2405, 0.0703, 43.2469 ], "geometry": { "coordinates": [ [ [ 0.0611, 43.2419 ], [ 0.0611, 43.2425 ], [ 0.061, 43.2425 ], [ 0.061, 43.2431 ], [ 0.0614, 43.2431 ], [ 0.0616, 43.2431 ], [ 0.0616, 43.2431 ], [ 0.0615, 43.2433 ], [ 0.0612, 43.2435 ], [ 0.0601, 43.2436 ], [ 0.0595, 43.2436 ], [ 0.0595, 43.2436 ], [ 0.059, 43.2436 ], [ 0.059, 43.2438 ], [ 0.059, 43.2444 ], [ 0.059, 43.2445 ], [ 0.0589, 43.2447 ], [ 0.0589, 43.2449 ], [ 0.0588, 43.2449 ], [ 0.0588, 43.2449 ], [ 0.0582, 43.2449 ], [ 0.0578, 43.2449 ], [ 0.0568, 43.2449 ], [ 0.0568, 43.245 ], [ 0.0565, 43.2449 ], [ 0.0559, 43.2449 ], [ 0.0559, 43.245 ], [ 0.0559, 43.2453 ], [ 0.0559, 43.2454 ], [ 0.0558, 43.2455 ], [ 0.0557, 43.2455 ], [ 0.0556, 43.2455 ], [ 0.0555, 43.2455 ], [ 0.0553, 43.2454 ], [ 0.0553, 43.2454 ], [ 0.0553, 43.2453 ], [ 0.0553, 43.2451 ], [ 0.0553, 43.245 ], [ 0.0553, 43.2449 ], [ 0.0552, 43.2449 ], [ 0.0552, 43.2448 ], [ 0.0551, 43.2447 ], [ 0.0548, 43.2446 ], [ 0.0547, 43.2446 ], [ 0.0546, 43.2458 ], [ 0.0546, 43.2459 ], [ 0.0545, 43.2459 ], [ 0.0545, 43.2461 ], [ 0.0545, 43.2463 ], [ 0.0546, 43.2466 ], [ 0.055, 43.2469 ], [ 0.0557, 43.2468 ], [ 0.0558, 43.2461 ], [ 0.0558, 43.2461 ], [ 0.0558, 43.2456 ], [ 0.0559, 43.2455 ], [ 0.0559, 43.2455 ], [ 0.056, 43.2455 ], [ 0.0561, 43.2457 ], [ 0.0562, 43.2459 ], [ 0.0563, 43.2459 ], [ 0.0565, 43.246 ], [ 0.057, 43.246 ], [ 0.0574, 43.2461 ], [ 0.0576, 43.2459 ], [ 0.0577, 43.2458 ], [ 0.058, 43.2456 ], [ 0.0583, 43.2454 ], [ 0.0586, 43.2452 ], [ 0.059, 43.2449 ], [ 0.0591, 43.245 ], [ 0.0595, 43.2452 ], [ 0.0602, 43.2445 ], [ 0.0609, 43.2438 ], [ 0.061, 43.2439 ], [ 0.0611, 43.2439 ], [ 0.0614, 43.2439 ], [ 0.0614, 43.244 ], [ 0.0615, 43.244 ], [ 0.0615, 43.2442 ], [ 0.0614, 43.2456 ], [ 0.0613, 43.2459 ], [ 0.0614, 43.2459 ], [ 0.0625, 43.2465 ], [ 0.0627, 43.2466 ], [ 0.0628, 43.2466 ], [ 0.0633, 43.2466 ], [ 0.0646, 43.2466 ], [ 0.0651, 43.2467 ], [ 0.0656, 43.2456 ], [ 0.0657, 43.2456 ], [ 0.0667, 43.2458 ], [ 0.0667, 43.2457 ], [ 0.0668, 43.2458 ], [ 0.0674, 43.2458 ], [ 0.0679, 43.2459 ], [ 0.0684, 43.2459 ], [ 0.0684, 43.2459 ], [ 0.0684, 43.2458 ], [ 0.0684, 43.2458 ], [ 0.0685, 43.2457 ], [ 0.0687, 43.2457 ], [ 0.0689, 43.2456 ], [ 0.0691, 43.2454 ], [ 0.0686, 43.245 ], [ 0.0686, 43.245 ], [ 0.0683, 43.2449 ], [ 0.0684, 43.2449 ], [ 0.0684, 43.2447 ], [ 0.0685, 43.2446 ], [ 0.0685, 43.2445 ], [ 0.0685, 43.2442 ], [ 0.0685, 43.2441 ], [ 0.0693, 43.2442 ], [ 0.07, 43.2442 ], [ 0.0701, 43.2437 ], [ 0.0701, 43.2436 ], [ 0.0702, 43.2434 ], [ 0.0703, 43.243 ], [ 0.0703, 43.2429 ], [ 0.0703, 43.2426 ], [ 0.0697, 43.2426 ], [ 0.0696, 43.2425 ], [ 0.0696, 43.2426 ], [ 0.0695, 43.2426 ], [ 0.0694, 43.2426 ], [ 0.0694, 43.2427 ], [ 0.0694, 43.2427 ], [ 0.0692, 43.243 ], [ 0.069, 43.2431 ], [ 0.069, 43.2432 ], [ 0.069, 43.2432 ], [ 0.069, 43.2432 ], [ 0.069, 43.2433 ], [ 0.069, 43.2434 ], [ 0.0682, 43.2433 ], [ 0.0683, 43.243 ], [ 0.0683, 43.2425 ], [ 0.0683, 43.2425 ], [ 0.0683, 43.2424 ], [ 0.0683, 43.2419 ], [ 0.0674, 43.2419 ], [ 0.0674, 43.2415 ], [ 0.0672, 43.2415 ], [ 0.0671, 43.2417 ], [ 0.0667, 43.2422 ], [ 0.0667, 43.2423 ], [ 0.0659, 43.2423 ], [ 0.0657, 43.2423 ], [ 0.0656, 43.2425 ], [ 0.0641, 43.2424 ], [ 0.064, 43.2424 ], [ 0.0639, 43.2425 ], [ 0.0638, 43.2425 ], [ 0.0635, 43.2428 ], [ 0.063, 43.2426 ], [ 0.0625, 43.2423 ], [ 0.0627, 43.2421 ], [ 0.0626, 43.242 ], [ 0.0626, 43.2421 ], [ 0.0621, 43.2421 ], [ 0.0621, 43.242 ], [ 0.062, 43.242 ], [ 0.0619, 43.242 ], [ 0.0617, 43.242 ], [ 0.0616, 43.242 ], [ 0.0616, 43.2405 ], [ 0.0612, 43.2405 ], [ 0.0609, 43.2405 ], [ 0.0603, 43.2406 ], [ 0.0597, 43.2407 ], [ 0.0591, 43.2408 ], [ 0.0588, 43.2408 ], [ 0.0587, 43.2409 ], [ 0.059, 43.2416 ], [ 0.0591, 43.2418 ], [ 0.0591, 43.242 ], [ 0.0591, 43.242 ], [ 0.0595, 43.2419 ], [ 0.0597, 43.2419 ], [ 0.0601, 43.2419 ], [ 0.0611, 43.2418 ], [ 0.0611, 43.2419 ] ] ], "type": "Polygon" }, "id": "86", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065002", "commune_qp": "Tarbes", "nom_commune": "Tarbes", "nom_qp": "Tarbes Nord" }, "type": "Feature" }, { "bbox": [ 1.8884, 43.8981, 1.9055, 43.91 ], "geometry": { "coordinates": [ [ [ 1.8974, 43.9039 ], [ 1.8973, 43.9038 ], [ 1.8973, 43.9038 ], [ 1.8972, 43.9038 ], [ 1.8972, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8972, 43.9035 ], [ 1.8972, 43.9034 ], [ 1.8965, 43.9033 ], [ 1.8963, 43.9033 ], [ 1.8962, 43.9032 ], [ 1.8961, 43.9031 ], [ 1.8959, 43.903 ], [ 1.8957, 43.9029 ], [ 1.8956, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8954, 43.9029 ], [ 1.8953, 43.9029 ], [ 1.8952, 43.9028 ], [ 1.8951, 43.9028 ], [ 1.8951, 43.9028 ], [ 1.895, 43.9028 ], [ 1.8949, 43.9028 ], [ 1.8948, 43.903 ], [ 1.8946, 43.9029 ], [ 1.8944, 43.9028 ], [ 1.8945, 43.9027 ], [ 1.8941, 43.9025 ], [ 1.8939, 43.9024 ], [ 1.8936, 43.9024 ], [ 1.8934, 43.9023 ], [ 1.8933, 43.9023 ], [ 1.8934, 43.9021 ], [ 1.8932, 43.9021 ], [ 1.8927, 43.9022 ], [ 1.8923, 43.9023 ], [ 1.8923, 43.902 ], [ 1.8922, 43.902 ], [ 1.8922, 43.9018 ], [ 1.8922, 43.9015 ], [ 1.8921, 43.9014 ], [ 1.8921, 43.9012 ], [ 1.8922, 43.9008 ], [ 1.8922, 43.9007 ], [ 1.8923, 43.9005 ], [ 1.8924, 43.9004 ], [ 1.8922, 43.9002 ], [ 1.8919, 43.9 ], [ 1.8918, 43.9001 ], [ 1.8916, 43.9002 ], [ 1.8914, 43.9003 ], [ 1.8912, 43.9004 ], [ 1.891, 43.9006 ], [ 1.8909, 43.9006 ], [ 1.8908, 43.9006 ], [ 1.8906, 43.9006 ], [ 1.8905, 43.9006 ], [ 1.8906, 43.9005 ], [ 1.8907, 43.9005 ], [ 1.8909, 43.9003 ], [ 1.8911, 43.9002 ], [ 1.8912, 43.9001 ], [ 1.8912, 43.9 ], [ 1.8912, 43.8999 ], [ 1.8912, 43.8998 ], [ 1.8913, 43.8997 ], [ 1.8913, 43.8996 ], [ 1.8915, 43.8994 ], [ 1.8915, 43.8994 ], [ 1.8916, 43.8993 ], [ 1.8917, 43.8993 ], [ 1.8919, 43.8992 ], [ 1.8921, 43.899 ], [ 1.8925, 43.8987 ], [ 1.8919, 43.8987 ], [ 1.8915, 43.8986 ], [ 1.8913, 43.8985 ], [ 1.8911, 43.8985 ], [ 1.8907, 43.8984 ], [ 1.8906, 43.8982 ], [ 1.8905, 43.8982 ], [ 1.8903, 43.8981 ], [ 1.89, 43.8981 ], [ 1.8899, 43.8983 ], [ 1.8897, 43.8986 ], [ 1.8894, 43.8989 ], [ 1.8892, 43.899 ], [ 1.889, 43.8992 ], [ 1.889, 43.8992 ], [ 1.8887, 43.8996 ], [ 1.8889, 43.8998 ], [ 1.8884, 43.9003 ], [ 1.8898, 43.9015 ], [ 1.8902, 43.9018 ], [ 1.8906, 43.9022 ], [ 1.8906, 43.9022 ], [ 1.8907, 43.9024 ], [ 1.8909, 43.9026 ], [ 1.8909, 43.9026 ], [ 1.8911, 43.9027 ], [ 1.8912, 43.9027 ], [ 1.8913, 43.9028 ], [ 1.8913, 43.9029 ], [ 1.8914, 43.903 ], [ 1.8915, 43.9032 ], [ 1.8916, 43.9033 ], [ 1.8917, 43.9034 ], [ 1.8918, 43.9035 ], [ 1.8921, 43.9035 ], [ 1.8927, 43.9037 ], [ 1.8928, 43.9037 ], [ 1.893, 43.9038 ], [ 1.893, 43.9039 ], [ 1.8931, 43.904 ], [ 1.8931, 43.9041 ], [ 1.8931, 43.9042 ], [ 1.8931, 43.9043 ], [ 1.893, 43.9046 ], [ 1.893, 43.9047 ], [ 1.8931, 43.9049 ], [ 1.8939, 43.9049 ], [ 1.8942, 43.9049 ], [ 1.8946, 43.9048 ], [ 1.8949, 43.9048 ], [ 1.8956, 43.9048 ], [ 1.8957, 43.9048 ], [ 1.8959, 43.9048 ], [ 1.896, 43.9049 ], [ 1.8961, 43.9049 ], [ 1.896, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8968, 43.9049 ], [ 1.8968, 43.9049 ], [ 1.8969, 43.9049 ], [ 1.8969, 43.9046 ], [ 1.8969, 43.9046 ], [ 1.8971, 43.9046 ], [ 1.8973, 43.9046 ], [ 1.8973, 43.9047 ], [ 1.8975, 43.9047 ], [ 1.8977, 43.9047 ], [ 1.8978, 43.9048 ], [ 1.8979, 43.9048 ], [ 1.8979, 43.9049 ], [ 1.8981, 43.9051 ], [ 1.8981, 43.9052 ], [ 1.8987, 43.9063 ], [ 1.9006, 43.9058 ], [ 1.9008, 43.906 ], [ 1.9014, 43.9068 ], [ 1.9016, 43.9072 ], [ 1.9019, 43.9075 ], [ 1.902, 43.9076 ], [ 1.9021, 43.9078 ], [ 1.9023, 43.9083 ], [ 1.9027, 43.9089 ], [ 1.9031, 43.9094 ], [ 1.9035, 43.9099 ], [ 1.9036, 43.91 ], [ 1.9036, 43.91 ], [ 1.9037, 43.91 ], [ 1.9043, 43.9094 ], [ 1.9052, 43.9087 ], [ 1.9055, 43.9084 ], [ 1.9042, 43.9062 ], [ 1.9041, 43.9061 ], [ 1.904, 43.9061 ], [ 1.9038, 43.9061 ], [ 1.9037, 43.9061 ], [ 1.9035, 43.9061 ], [ 1.9033, 43.9061 ], [ 1.9032, 43.9061 ], [ 1.9031, 43.9061 ], [ 1.9028, 43.906 ], [ 1.9022, 43.9058 ], [ 1.9016, 43.9056 ], [ 1.9012, 43.9055 ], [ 1.9008, 43.9054 ], [ 1.9004, 43.9053 ], [ 1.9001, 43.9052 ], [ 1.8993, 43.9051 ], [ 1.8992, 43.9051 ], [ 1.8987, 43.905 ], [ 1.8984, 43.905 ], [ 1.8983, 43.9049 ], [ 1.8982, 43.9049 ], [ 1.898, 43.9049 ], [ 1.898, 43.9049 ], [ 1.898, 43.9048 ], [ 1.8979, 43.9048 ], [ 1.8978, 43.9047 ], [ 1.8978, 43.9046 ], [ 1.8977, 43.9045 ], [ 1.8974, 43.9039 ] ] ], "type": "Polygon" }, "id": "87", "properties": { "code_commune": "81099", "code_departement": "81", "code_qp": "QP081010", "commune_qp": "Gaillac", "nom_commune": "Gaillac", "nom_qp": "Lentajou - Catalanis" }, "type": "Feature" }, { "bbox": [ 0.5908, 43.6323, 0.5997, 43.6392 ], "geometry": { "coordinates": [ [ [ 0.5963, 43.6372 ], [ 0.5963, 43.6371 ], [ 0.5964, 43.637 ], [ 0.5963, 43.6369 ], [ 0.5961, 43.6356 ], [ 0.5959, 43.6349 ], [ 0.5959, 43.6347 ], [ 0.5959, 43.6345 ], [ 0.5958, 43.6344 ], [ 0.5956, 43.6342 ], [ 0.5953, 43.6337 ], [ 0.595, 43.6333 ], [ 0.5948, 43.633 ], [ 0.5947, 43.6329 ], [ 0.5944, 43.6326 ], [ 0.5942, 43.6325 ], [ 0.5938, 43.6324 ], [ 0.5932, 43.6323 ], [ 0.593, 43.6323 ], [ 0.5928, 43.6323 ], [ 0.5926, 43.6323 ], [ 0.5924, 43.6323 ], [ 0.5921, 43.6324 ], [ 0.5922, 43.6327 ], [ 0.5921, 43.6327 ], [ 0.592, 43.6328 ], [ 0.5923, 43.6339 ], [ 0.5921, 43.6339 ], [ 0.5921, 43.6342 ], [ 0.5922, 43.6342 ], [ 0.5914, 43.6343 ], [ 0.5915, 43.6347 ], [ 0.5914, 43.6347 ], [ 0.5915, 43.6349 ], [ 0.5914, 43.6349 ], [ 0.5915, 43.6352 ], [ 0.5909, 43.6353 ], [ 0.5908, 43.6353 ], [ 0.5908, 43.6353 ], [ 0.5911, 43.636 ], [ 0.5911, 43.6361 ], [ 0.5913, 43.636 ], [ 0.5916, 43.636 ], [ 0.5919, 43.6359 ], [ 0.592, 43.6363 ], [ 0.5925, 43.6363 ], [ 0.5925, 43.6363 ], [ 0.5929, 43.6362 ], [ 0.5931, 43.6367 ], [ 0.5931, 43.6367 ], [ 0.5933, 43.6372 ], [ 0.5932, 43.6373 ], [ 0.5933, 43.6375 ], [ 0.5934, 43.6376 ], [ 0.5939, 43.6375 ], [ 0.5941, 43.6381 ], [ 0.5941, 43.6382 ], [ 0.5946, 43.6381 ], [ 0.5949, 43.6379 ], [ 0.5957, 43.6375 ], [ 0.5961, 43.6373 ], [ 0.5964, 43.6376 ], [ 0.5966, 43.6375 ], [ 0.5967, 43.6375 ], [ 0.5968, 43.6376 ], [ 0.5967, 43.6377 ], [ 0.5972, 43.6381 ], [ 0.596, 43.6386 ], [ 0.5961, 43.6386 ], [ 0.5962, 43.6387 ], [ 0.5966, 43.639 ], [ 0.5968, 43.6391 ], [ 0.5969, 43.6392 ], [ 0.5975, 43.6389 ], [ 0.5977, 43.6389 ], [ 0.5982, 43.6386 ], [ 0.598, 43.6381 ], [ 0.5981, 43.6381 ], [ 0.5983, 43.6381 ], [ 0.5983, 43.6379 ], [ 0.5985, 43.6378 ], [ 0.5989, 43.6376 ], [ 0.5991, 43.6374 ], [ 0.5993, 43.6373 ], [ 0.5994, 43.6371 ], [ 0.5995, 43.6369 ], [ 0.5996, 43.6366 ], [ 0.5997, 43.6366 ], [ 0.5997, 43.6365 ], [ 0.5997, 43.6364 ], [ 0.5997, 43.6363 ], [ 0.5994, 43.6364 ], [ 0.5994, 43.6364 ], [ 0.5992, 43.6363 ], [ 0.5989, 43.6361 ], [ 0.5988, 43.6362 ], [ 0.5985, 43.6363 ], [ 0.5981, 43.6365 ], [ 0.5978, 43.6366 ], [ 0.5974, 43.6367 ], [ 0.5971, 43.6368 ], [ 0.5969, 43.6369 ], [ 0.5967, 43.6371 ], [ 0.5966, 43.6371 ], [ 0.5964, 43.6372 ], [ 0.5964, 43.6372 ], [ 0.5963, 43.6372 ] ] ], "type": "Polygon" }, "id": "88", "properties": { "code_commune": "32013", "code_departement": "32", "code_qp": "QP032001", "commune_qp": "Auch", "nom_commune": "Auch", "nom_qp": "Grand Garros" }, "type": "Feature" }, { "bbox": [ 3.2468, 43.3314, 3.2605, 43.3417 ], "geometry": { "coordinates": [ [ [ 3.259, 43.3402 ], [ 3.2587, 43.34 ], [ 3.2587, 43.34 ], [ 3.2586, 43.34 ], [ 3.2584, 43.3401 ], [ 3.2583, 43.3402 ], [ 3.2583, 43.3401 ], [ 3.2583, 43.3399 ], [ 3.2582, 43.3396 ], [ 3.2581, 43.3391 ], [ 3.2573, 43.3393 ], [ 3.257, 43.3389 ], [ 3.257, 43.3388 ], [ 3.2568, 43.3384 ], [ 3.2567, 43.3383 ], [ 3.2569, 43.3379 ], [ 3.2571, 43.338 ], [ 3.2574, 43.3377 ], [ 3.2578, 43.3378 ], [ 3.2579, 43.3379 ], [ 3.258, 43.3379 ], [ 3.2579, 43.3378 ], [ 3.2583, 43.3373 ], [ 3.2583, 43.3373 ], [ 3.2584, 43.3372 ], [ 3.2584, 43.3372 ], [ 3.2587, 43.3369 ], [ 3.2589, 43.3366 ], [ 3.2589, 43.3366 ], [ 3.2589, 43.3364 ], [ 3.2588, 43.336 ], [ 3.2596, 43.3359 ], [ 3.2599, 43.3358 ], [ 3.26, 43.3357 ], [ 3.2602, 43.3356 ], [ 3.2603, 43.3355 ], [ 3.2604, 43.3354 ], [ 3.2604, 43.3353 ], [ 3.2605, 43.3351 ], [ 3.2595, 43.3351 ], [ 3.2595, 43.3348 ], [ 3.2589, 43.3348 ], [ 3.2586, 43.3348 ], [ 3.2586, 43.3348 ], [ 3.2585, 43.335 ], [ 3.2585, 43.3352 ], [ 3.2584, 43.3352 ], [ 3.2578, 43.3352 ], [ 3.2575, 43.3353 ], [ 3.2574, 43.3352 ], [ 3.2573, 43.3352 ], [ 3.2569, 43.3352 ], [ 3.2567, 43.3352 ], [ 3.2567, 43.3353 ], [ 3.2566, 43.3349 ], [ 3.2567, 43.3348 ], [ 3.2567, 43.334 ], [ 3.2566, 43.3336 ], [ 3.2565, 43.3336 ], [ 3.2561, 43.3336 ], [ 3.2557, 43.3336 ], [ 3.2554, 43.3336 ], [ 3.2552, 43.3336 ], [ 3.2549, 43.3336 ], [ 3.2542, 43.3336 ], [ 3.2537, 43.3336 ], [ 3.2528, 43.3336 ], [ 3.2524, 43.3336 ], [ 3.2522, 43.3336 ], [ 3.252, 43.3336 ], [ 3.2519, 43.3336 ], [ 3.2514, 43.3336 ], [ 3.2513, 43.3336 ], [ 3.2512, 43.3336 ], [ 3.2508, 43.3336 ], [ 3.2506, 43.3333 ], [ 3.2506, 43.3333 ], [ 3.2506, 43.3332 ], [ 3.2506, 43.3331 ], [ 3.2506, 43.3329 ], [ 3.2506, 43.3328 ], [ 3.2506, 43.3326 ], [ 3.2506, 43.3325 ], [ 3.2506, 43.3321 ], [ 3.2506, 43.3318 ], [ 3.2506, 43.3317 ], [ 3.2506, 43.3315 ], [ 3.2506, 43.3315 ], [ 3.2505, 43.3315 ], [ 3.2505, 43.3314 ], [ 3.2498, 43.3314 ], [ 3.2495, 43.3314 ], [ 3.2493, 43.3314 ], [ 3.2491, 43.3315 ], [ 3.2491, 43.3317 ], [ 3.2488, 43.3318 ], [ 3.2488, 43.3319 ], [ 3.2487, 43.3319 ], [ 3.2487, 43.332 ], [ 3.2487, 43.3321 ], [ 3.2487, 43.3321 ], [ 3.2487, 43.3322 ], [ 3.2488, 43.3323 ], [ 3.2488, 43.3323 ], [ 3.2487, 43.3323 ], [ 3.2485, 43.3325 ], [ 3.2485, 43.3326 ], [ 3.2486, 43.3327 ], [ 3.2485, 43.3328 ], [ 3.2485, 43.3328 ], [ 3.2484, 43.3328 ], [ 3.2484, 43.3329 ], [ 3.2483, 43.3329 ], [ 3.2482, 43.3328 ], [ 3.2482, 43.3328 ], [ 3.2479, 43.3328 ], [ 3.2474, 43.3328 ], [ 3.2474, 43.3328 ], [ 3.2473, 43.3329 ], [ 3.2473, 43.333 ], [ 3.2472, 43.333 ], [ 3.2472, 43.3331 ], [ 3.2472, 43.3332 ], [ 3.2472, 43.3333 ], [ 3.2472, 43.3333 ], [ 3.2471, 43.3336 ], [ 3.2471, 43.3338 ], [ 3.2471, 43.334 ], [ 3.2471, 43.3342 ], [ 3.2471, 43.3343 ], [ 3.247, 43.3345 ], [ 3.247, 43.3346 ], [ 3.247, 43.3347 ], [ 3.247, 43.3348 ], [ 3.2471, 43.3349 ], [ 3.2471, 43.3349 ], [ 3.2472, 43.335 ], [ 3.2471, 43.335 ], [ 3.2472, 43.3351 ], [ 3.2468, 43.3352 ], [ 3.2468, 43.3352 ], [ 3.2468, 43.3357 ], [ 3.247, 43.3357 ], [ 3.247, 43.3357 ], [ 3.247, 43.3359 ], [ 3.2475, 43.3359 ], [ 3.2477, 43.3359 ], [ 3.2478, 43.3359 ], [ 3.2478, 43.3358 ], [ 3.2477, 43.3357 ], [ 3.2476, 43.3355 ], [ 3.2475, 43.3353 ], [ 3.2474, 43.3351 ], [ 3.2473, 43.3349 ], [ 3.2472, 43.3349 ], [ 3.2478, 43.3347 ], [ 3.2481, 43.3346 ], [ 3.2484, 43.3345 ], [ 3.2484, 43.3344 ], [ 3.2484, 43.3342 ], [ 3.249, 43.3342 ], [ 3.2493, 43.3341 ], [ 3.2494, 43.334 ], [ 3.2496, 43.334 ], [ 3.2497, 43.3339 ], [ 3.2498, 43.3339 ], [ 3.2499, 43.3339 ], [ 3.25, 43.3339 ], [ 3.2501, 43.3339 ], [ 3.2502, 43.3341 ], [ 3.2502, 43.3342 ], [ 3.2502, 43.3343 ], [ 3.2502, 43.3348 ], [ 3.2502, 43.3352 ], [ 3.2502, 43.3354 ], [ 3.2502, 43.3356 ], [ 3.2502, 43.3356 ], [ 3.2501, 43.3357 ], [ 3.2501, 43.3359 ], [ 3.2501, 43.3365 ], [ 3.2501, 43.3365 ], [ 3.2501, 43.3366 ], [ 3.2502, 43.3366 ], [ 3.2503, 43.3366 ], [ 3.2504, 43.3366 ], [ 3.2504, 43.337 ], [ 3.2502, 43.3371 ], [ 3.2502, 43.337 ], [ 3.2502, 43.3371 ], [ 3.2502, 43.3372 ], [ 3.2496, 43.3374 ], [ 3.2492, 43.3376 ], [ 3.2494, 43.3378 ], [ 3.2495, 43.3379 ], [ 3.2495, 43.3379 ], [ 3.2496, 43.3379 ], [ 3.25, 43.3379 ], [ 3.2501, 43.3379 ], [ 3.2502, 43.3379 ], [ 3.2502, 43.3379 ], [ 3.2503, 43.3379 ], [ 3.2505, 43.3379 ], [ 3.2507, 43.338 ], [ 3.2509, 43.338 ], [ 3.251, 43.338 ], [ 3.251, 43.338 ], [ 3.2511, 43.3381 ], [ 3.2516, 43.3387 ], [ 3.2521, 43.3393 ], [ 3.2523, 43.3392 ], [ 3.2527, 43.3391 ], [ 3.2527, 43.3391 ], [ 3.2527, 43.339 ], [ 3.2529, 43.339 ], [ 3.253, 43.339 ], [ 3.2532, 43.3389 ], [ 3.2533, 43.3388 ], [ 3.2534, 43.3387 ], [ 3.2534, 43.3387 ], [ 3.2536, 43.3386 ], [ 3.2537, 43.3384 ], [ 3.2538, 43.3384 ], [ 3.2539, 43.3382 ], [ 3.2541, 43.338 ], [ 3.2542, 43.338 ], [ 3.2542, 43.3379 ], [ 3.2547, 43.3374 ], [ 3.2547, 43.3374 ], [ 3.2549, 43.3374 ], [ 3.2556, 43.3378 ], [ 3.2556, 43.3381 ], [ 3.2557, 43.3392 ], [ 3.2557, 43.3393 ], [ 3.2557, 43.3394 ], [ 3.2557, 43.3395 ], [ 3.2558, 43.3399 ], [ 3.2559, 43.3411 ], [ 3.2559, 43.3414 ], [ 3.2559, 43.3415 ], [ 3.2563, 43.3415 ], [ 3.2569, 43.3415 ], [ 3.2574, 43.3416 ], [ 3.258, 43.3417 ], [ 3.2584, 43.3417 ], [ 3.2585, 43.3417 ], [ 3.2586, 43.3415 ], [ 3.2586, 43.3414 ], [ 3.2587, 43.3411 ], [ 3.2588, 43.3408 ], [ 3.2591, 43.3403 ], [ 3.259, 43.3402 ] ] ], "type": "Polygon" }, "id": "89", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034003", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Devèze" }, "type": "Feature" }, { "bbox": [ 1.3182, 43.4559, 1.3307, 43.4649 ], "geometry": { "coordinates": [ [ [ 1.321, 43.464 ], [ 1.3214, 43.4638 ], [ 1.3218, 43.4638 ], [ 1.3214, 43.4627 ], [ 1.3218, 43.4626 ], [ 1.3221, 43.4624 ], [ 1.3227, 43.4622 ], [ 1.3229, 43.4625 ], [ 1.3234, 43.4628 ], [ 1.3246, 43.4624 ], [ 1.3248, 43.4624 ], [ 1.3252, 43.4622 ], [ 1.3254, 43.4622 ], [ 1.3256, 43.4622 ], [ 1.326, 43.4621 ], [ 1.3262, 43.4621 ], [ 1.3263, 43.4621 ], [ 1.3263, 43.4618 ], [ 1.3262, 43.4614 ], [ 1.3262, 43.4614 ], [ 1.3265, 43.4614 ], [ 1.3265, 43.4614 ], [ 1.327, 43.4613 ], [ 1.3272, 43.4613 ], [ 1.3276, 43.4612 ], [ 1.3283, 43.4611 ], [ 1.3289, 43.461 ], [ 1.3289, 43.461 ], [ 1.3291, 43.4611 ], [ 1.3292, 43.4611 ], [ 1.3294, 43.4612 ], [ 1.33, 43.4614 ], [ 1.3301, 43.4612 ], [ 1.3303, 43.4612 ], [ 1.3304, 43.4612 ], [ 1.3305, 43.4612 ], [ 1.3305, 43.4612 ], [ 1.3307, 43.4611 ], [ 1.3301, 43.4608 ], [ 1.3299, 43.4607 ], [ 1.3296, 43.4606 ], [ 1.3292, 43.4605 ], [ 1.329, 43.4605 ], [ 1.3288, 43.4603 ], [ 1.3287, 43.4602 ], [ 1.3286, 43.4601 ], [ 1.3285, 43.4601 ], [ 1.3281, 43.4598 ], [ 1.3277, 43.4595 ], [ 1.3275, 43.4594 ], [ 1.3275, 43.4594 ], [ 1.3275, 43.4593 ], [ 1.3275, 43.4593 ], [ 1.3274, 43.4592 ], [ 1.3275, 43.4592 ], [ 1.327, 43.4587 ], [ 1.3266, 43.4586 ], [ 1.3262, 43.458 ], [ 1.3262, 43.4579 ], [ 1.3261, 43.4578 ], [ 1.3259, 43.4575 ], [ 1.3258, 43.4573 ], [ 1.3257, 43.4573 ], [ 1.3256, 43.4573 ], [ 1.3254, 43.4573 ], [ 1.3253, 43.457 ], [ 1.3253, 43.4568 ], [ 1.3252, 43.4567 ], [ 1.3252, 43.4565 ], [ 1.3252, 43.4564 ], [ 1.325, 43.4562 ], [ 1.3249, 43.4561 ], [ 1.3249, 43.456 ], [ 1.3247, 43.4559 ], [ 1.3234, 43.4563 ], [ 1.3236, 43.4566 ], [ 1.3238, 43.4568 ], [ 1.3241, 43.4572 ], [ 1.3246, 43.4576 ], [ 1.3255, 43.4583 ], [ 1.3262, 43.4589 ], [ 1.3262, 43.459 ], [ 1.3262, 43.459 ], [ 1.3257, 43.4594 ], [ 1.3254, 43.4597 ], [ 1.325, 43.46 ], [ 1.3246, 43.4603 ], [ 1.3246, 43.4605 ], [ 1.3245, 43.4606 ], [ 1.3247, 43.4607 ], [ 1.3246, 43.4609 ], [ 1.3246, 43.4609 ], [ 1.3245, 43.461 ], [ 1.3245, 43.461 ], [ 1.3244, 43.4611 ], [ 1.3244, 43.4612 ], [ 1.3242, 43.4614 ], [ 1.3241, 43.4614 ], [ 1.3241, 43.4614 ], [ 1.324, 43.4614 ], [ 1.3239, 43.4615 ], [ 1.3236, 43.4615 ], [ 1.3233, 43.4615 ], [ 1.3232, 43.4615 ], [ 1.323, 43.4616 ], [ 1.323, 43.4616 ], [ 1.3226, 43.4618 ], [ 1.3226, 43.4617 ], [ 1.3223, 43.4618 ], [ 1.3216, 43.462 ], [ 1.3215, 43.4623 ], [ 1.3212, 43.4622 ], [ 1.3208, 43.4621 ], [ 1.3201, 43.4619 ], [ 1.32, 43.4618 ], [ 1.3202, 43.4613 ], [ 1.3202, 43.4613 ], [ 1.3201, 43.4613 ], [ 1.3201, 43.4612 ], [ 1.3202, 43.461 ], [ 1.3198, 43.4609 ], [ 1.3192, 43.4613 ], [ 1.319, 43.4616 ], [ 1.3194, 43.4617 ], [ 1.3199, 43.4618 ], [ 1.32, 43.4619 ], [ 1.3201, 43.4624 ], [ 1.3201, 43.4628 ], [ 1.3209, 43.4628 ], [ 1.321, 43.4628 ], [ 1.3207, 43.4629 ], [ 1.3201, 43.4632 ], [ 1.3193, 43.4636 ], [ 1.3192, 43.4637 ], [ 1.3187, 43.4638 ], [ 1.3182, 43.4639 ], [ 1.3185, 43.4646 ], [ 1.3198, 43.4649 ], [ 1.3203, 43.4647 ], [ 1.3203, 43.4647 ], [ 1.3203, 43.4646 ], [ 1.3212, 43.4644 ], [ 1.321, 43.464 ] ] ], "type": "Polygon" }, "id": "90", "properties": { "code_commune": "31395", "code_departement": "31", "code_qp": "QP031002", "commune_qp": "Muret", "nom_commune": "Muret", "nom_qp": "Centre Ouest" }, "type": "Feature" }, { "bbox": [ 2.9064, 42.6896, 2.9104, 42.6948 ], "geometry": { "coordinates": [ [ [ 2.9104, 42.6943 ], [ 2.9102, 42.6942 ], [ 2.9089, 42.6926 ], [ 2.908, 42.6915 ], [ 2.9077, 42.6912 ], [ 2.9078, 42.6912 ], [ 2.908, 42.691 ], [ 2.909, 42.6906 ], [ 2.9089, 42.6906 ], [ 2.9088, 42.6905 ], [ 2.9073, 42.6896 ], [ 2.907, 42.6899 ], [ 2.9075, 42.6904 ], [ 2.9077, 42.6905 ], [ 2.908, 42.6909 ], [ 2.9077, 42.6911 ], [ 2.9075, 42.6912 ], [ 2.9069, 42.6915 ], [ 2.9065, 42.6917 ], [ 2.9064, 42.6919 ], [ 2.9064, 42.6921 ], [ 2.9065, 42.6927 ], [ 2.9066, 42.6928 ], [ 2.9066, 42.6929 ], [ 2.9066, 42.6929 ], [ 2.9072, 42.6936 ], [ 2.9072, 42.6937 ], [ 2.9073, 42.6938 ], [ 2.9073, 42.6938 ], [ 2.9073, 42.6938 ], [ 2.9072, 42.6938 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9071, 42.694 ], [ 2.907, 42.694 ], [ 2.9069, 42.6941 ], [ 2.9068, 42.6941 ], [ 2.9068, 42.6942 ], [ 2.9068, 42.6942 ], [ 2.9067, 42.6942 ], [ 2.9067, 42.6945 ], [ 2.9066, 42.6947 ], [ 2.9067, 42.6948 ], [ 2.9069, 42.6948 ], [ 2.9069, 42.6948 ], [ 2.907, 42.6948 ], [ 2.9071, 42.6948 ], [ 2.9079, 42.6948 ], [ 2.908, 42.6948 ], [ 2.9082, 42.6948 ], [ 2.9084, 42.6946 ], [ 2.9085, 42.6946 ], [ 2.9091, 42.6943 ], [ 2.9091, 42.6943 ], [ 2.9091, 42.6943 ], [ 2.9092, 42.6943 ], [ 2.9097, 42.6945 ], [ 2.9099, 42.6945 ], [ 2.9099, 42.6945 ], [ 2.91, 42.6945 ], [ 2.91, 42.6945 ], [ 2.9104, 42.6943 ] ] ], "type": "Polygon" }, "id": "91", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066010", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Champs De Mars" }, "type": "Feature" }, { "bbox": [ 3.8632, 43.6049, 3.8725, 43.609 ], "geometry": { "coordinates": [ [ [ 3.8669, 43.609 ], [ 3.8671, 43.6089 ], [ 3.8676, 43.6086 ], [ 3.8684, 43.6082 ], [ 3.8686, 43.6081 ], [ 3.8687, 43.6082 ], [ 3.8688, 43.6082 ], [ 3.869, 43.6085 ], [ 3.8685, 43.6086 ], [ 3.8687, 43.6088 ], [ 3.8689, 43.6088 ], [ 3.8688, 43.6087 ], [ 3.869, 43.6087 ], [ 3.8692, 43.6087 ], [ 3.8692, 43.6087 ], [ 3.8694, 43.6087 ], [ 3.8694, 43.6086 ], [ 3.8694, 43.6086 ], [ 3.8695, 43.6089 ], [ 3.8696, 43.6089 ], [ 3.8696, 43.609 ], [ 3.8697, 43.6089 ], [ 3.8696, 43.6088 ], [ 3.8696, 43.6088 ], [ 3.8698, 43.6087 ], [ 3.8698, 43.6087 ], [ 3.8699, 43.6087 ], [ 3.8698, 43.6087 ], [ 3.8701, 43.6086 ], [ 3.8701, 43.6086 ], [ 3.8701, 43.6085 ], [ 3.8703, 43.6085 ], [ 3.8703, 43.6085 ], [ 3.8704, 43.6085 ], [ 3.8705, 43.6085 ], [ 3.8706, 43.6085 ], [ 3.8707, 43.6085 ], [ 3.8707, 43.6085 ], [ 3.8709, 43.6085 ], [ 3.8709, 43.6085 ], [ 3.8713, 43.6085 ], [ 3.8713, 43.6084 ], [ 3.8716, 43.6084 ], [ 3.8716, 43.6085 ], [ 3.872, 43.6086 ], [ 3.8721, 43.6085 ], [ 3.8724, 43.6086 ], [ 3.8725, 43.6084 ], [ 3.8722, 43.6083 ], [ 3.8722, 43.6083 ], [ 3.8723, 43.6081 ], [ 3.8722, 43.6081 ], [ 3.872, 43.6082 ], [ 3.872, 43.6082 ], [ 3.8716, 43.6079 ], [ 3.8714, 43.6077 ], [ 3.8711, 43.6075 ], [ 3.8708, 43.6072 ], [ 3.8699, 43.6077 ], [ 3.8691, 43.6069 ], [ 3.8685, 43.6062 ], [ 3.868, 43.6064 ], [ 3.8679, 43.6063 ], [ 3.8677, 43.6062 ], [ 3.8677, 43.6062 ], [ 3.8676, 43.6061 ], [ 3.8675, 43.6061 ], [ 3.8674, 43.6061 ], [ 3.8673, 43.6062 ], [ 3.8672, 43.6059 ], [ 3.8671, 43.6058 ], [ 3.8661, 43.6052 ], [ 3.866, 43.6051 ], [ 3.8656, 43.605 ], [ 3.8654, 43.6049 ], [ 3.8653, 43.6049 ], [ 3.8652, 43.605 ], [ 3.8651, 43.605 ], [ 3.865, 43.605 ], [ 3.865, 43.6051 ], [ 3.8649, 43.6052 ], [ 3.8649, 43.6053 ], [ 3.8649, 43.6054 ], [ 3.8648, 43.6056 ], [ 3.8647, 43.6058 ], [ 3.8638, 43.6055 ], [ 3.8635, 43.6061 ], [ 3.8636, 43.6061 ], [ 3.8634, 43.6066 ], [ 3.8633, 43.6068 ], [ 3.8632, 43.6071 ], [ 3.8635, 43.6073 ], [ 3.8636, 43.6074 ], [ 3.8638, 43.6078 ], [ 3.8636, 43.6083 ], [ 3.8639, 43.6083 ], [ 3.864, 43.6085 ], [ 3.8642, 43.6085 ], [ 3.8661, 43.6085 ], [ 3.8667, 43.6085 ], [ 3.8667, 43.6086 ], [ 3.8667, 43.6086 ], [ 3.8667, 43.6087 ], [ 3.8668, 43.6087 ], [ 3.8668, 43.6087 ], [ 3.8669, 43.6087 ], [ 3.8669, 43.609 ] ] ], "type": "Polygon" }, "id": "92", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034010", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Figuerolles" }, "type": "Feature" }, { "bbox": [ 2.2124, 43.0514, 2.2229, 43.0613 ], "geometry": { "coordinates": [ [ [ 2.2203, 43.0524 ], [ 2.2201, 43.0523 ], [ 2.2202, 43.052 ], [ 2.22, 43.0519 ], [ 2.2201, 43.0517 ], [ 2.2203, 43.0515 ], [ 2.2203, 43.0514 ], [ 2.2203, 43.0514 ], [ 2.2202, 43.0514 ], [ 2.22, 43.0514 ], [ 2.2198, 43.0515 ], [ 2.2196, 43.0516 ], [ 2.2194, 43.0518 ], [ 2.2192, 43.052 ], [ 2.2188, 43.0523 ], [ 2.2185, 43.0521 ], [ 2.2184, 43.0521 ], [ 2.2183, 43.0521 ], [ 2.2182, 43.0521 ], [ 2.2182, 43.0521 ], [ 2.2181, 43.0521 ], [ 2.218, 43.0521 ], [ 2.218, 43.0521 ], [ 2.2179, 43.0525 ], [ 2.2178, 43.0527 ], [ 2.2173, 43.0526 ], [ 2.2168, 43.0524 ], [ 2.2165, 43.0522 ], [ 2.2165, 43.0523 ], [ 2.2161, 43.0521 ], [ 2.2157, 43.0523 ], [ 2.2153, 43.0526 ], [ 2.2156, 43.0528 ], [ 2.2147, 43.0534 ], [ 2.2145, 43.0536 ], [ 2.2143, 43.0538 ], [ 2.2139, 43.0542 ], [ 2.2135, 43.0546 ], [ 2.2145, 43.0546 ], [ 2.2144, 43.0549 ], [ 2.2147, 43.055 ], [ 2.2148, 43.0549 ], [ 2.2151, 43.055 ], [ 2.2151, 43.0549 ], [ 2.2153, 43.055 ], [ 2.2155, 43.0547 ], [ 2.216, 43.0547 ], [ 2.2158, 43.055 ], [ 2.2157, 43.0551 ], [ 2.2154, 43.0555 ], [ 2.2153, 43.0559 ], [ 2.2147, 43.0563 ], [ 2.2137, 43.0561 ], [ 2.2141, 43.0554 ], [ 2.2134, 43.0551 ], [ 2.213, 43.0551 ], [ 2.2129, 43.0552 ], [ 2.2127, 43.0557 ], [ 2.2125, 43.056 ], [ 2.2124, 43.0563 ], [ 2.2124, 43.0565 ], [ 2.2129, 43.0564 ], [ 2.2134, 43.0562 ], [ 2.2135, 43.0567 ], [ 2.2137, 43.0569 ], [ 2.2138, 43.057 ], [ 2.2139, 43.057 ], [ 2.2141, 43.057 ], [ 2.2155, 43.0575 ], [ 2.2156, 43.0574 ], [ 2.2157, 43.0573 ], [ 2.2157, 43.0573 ], [ 2.2167, 43.0564 ], [ 2.217, 43.0561 ], [ 2.2177, 43.0554 ], [ 2.2187, 43.0558 ], [ 2.219, 43.0558 ], [ 2.2192, 43.0559 ], [ 2.2193, 43.0559 ], [ 2.2199, 43.0559 ], [ 2.2201, 43.0559 ], [ 2.2201, 43.0561 ], [ 2.22, 43.0567 ], [ 2.2205, 43.0567 ], [ 2.2205, 43.0569 ], [ 2.2205, 43.057 ], [ 2.2205, 43.057 ], [ 2.2207, 43.057 ], [ 2.2208, 43.0571 ], [ 2.221, 43.0571 ], [ 2.221, 43.0572 ], [ 2.2211, 43.0572 ], [ 2.2212, 43.0573 ], [ 2.2213, 43.0575 ], [ 2.2213, 43.0577 ], [ 2.2214, 43.0578 ], [ 2.2213, 43.0579 ], [ 2.2213, 43.0579 ], [ 2.2207, 43.0579 ], [ 2.2206, 43.0584 ], [ 2.22, 43.0584 ], [ 2.22, 43.0586 ], [ 2.2205, 43.0587 ], [ 2.2205, 43.0587 ], [ 2.2207, 43.0589 ], [ 2.2207, 43.059 ], [ 2.2206, 43.0592 ], [ 2.2206, 43.0592 ], [ 2.2207, 43.0593 ], [ 2.2208, 43.0593 ], [ 2.2208, 43.0596 ], [ 2.2207, 43.0596 ], [ 2.2203, 43.0596 ], [ 2.2197, 43.0597 ], [ 2.2186, 43.0598 ], [ 2.2178, 43.0599 ], [ 2.218, 43.0607 ], [ 2.2181, 43.0613 ], [ 2.2184, 43.0613 ], [ 2.2186, 43.0612 ], [ 2.219, 43.0611 ], [ 2.2193, 43.0611 ], [ 2.2198, 43.061 ], [ 2.2198, 43.0604 ], [ 2.2201, 43.0604 ], [ 2.22, 43.0601 ], [ 2.2212, 43.06 ], [ 2.2211, 43.0597 ], [ 2.2211, 43.0597 ], [ 2.2211, 43.0596 ], [ 2.2211, 43.0595 ], [ 2.2212, 43.0592 ], [ 2.2213, 43.0587 ], [ 2.2214, 43.0582 ], [ 2.2214, 43.058 ], [ 2.2214, 43.0579 ], [ 2.2215, 43.0578 ], [ 2.2219, 43.0578 ], [ 2.2223, 43.0578 ], [ 2.2223, 43.058 ], [ 2.2228, 43.0579 ], [ 2.2228, 43.0577 ], [ 2.2228, 43.0569 ], [ 2.2229, 43.0561 ], [ 2.2227, 43.0561 ], [ 2.2227, 43.0562 ], [ 2.2226, 43.0562 ], [ 2.2225, 43.0562 ], [ 2.2224, 43.0563 ], [ 2.2224, 43.0564 ], [ 2.2223, 43.0574 ], [ 2.2213, 43.0575 ], [ 2.2212, 43.0573 ], [ 2.2211, 43.0571 ], [ 2.2209, 43.057 ], [ 2.2209, 43.0569 ], [ 2.2209, 43.0568 ], [ 2.2208, 43.0567 ], [ 2.2205, 43.0562 ], [ 2.2203, 43.0559 ], [ 2.2201, 43.0557 ], [ 2.2202, 43.0553 ], [ 2.2203, 43.055 ], [ 2.2205, 43.055 ], [ 2.2207, 43.055 ], [ 2.2207, 43.055 ], [ 2.221, 43.0551 ], [ 2.2211, 43.0548 ], [ 2.2212, 43.0547 ], [ 2.2213, 43.0545 ], [ 2.2213, 43.0544 ], [ 2.2213, 43.0544 ], [ 2.2209, 43.0544 ], [ 2.2207, 43.0543 ], [ 2.2201, 43.0542 ], [ 2.219, 43.054 ], [ 2.2193, 43.0538 ], [ 2.2194, 43.0536 ], [ 2.2197, 43.0532 ], [ 2.22, 43.0529 ], [ 2.2203, 43.0524 ] ] ], "type": "Polygon" }, "id": "93", "properties": { "code_commune": "11206", "code_departement": "11", "code_qp": "QP011001", "commune_qp": "Limoux", "nom_commune": "Limoux", "nom_qp": "Quartier Aude" }, "type": "Feature" }, { "bbox": [ 4.6115, 44.1552, 4.6259, 44.1628 ], "geometry": { "coordinates": [ [ [ 4.6258, 44.1607 ], [ 4.6257, 44.1605 ], [ 4.6254, 44.1602 ], [ 4.6254, 44.1601 ], [ 4.6252, 44.16 ], [ 4.6251, 44.1599 ], [ 4.625, 44.1598 ], [ 4.6248, 44.1597 ], [ 4.6246, 44.1593 ], [ 4.6225, 44.1564 ], [ 4.6223, 44.1563 ], [ 4.6221, 44.156 ], [ 4.6219, 44.1559 ], [ 4.6218, 44.1558 ], [ 4.6216, 44.1557 ], [ 4.6208, 44.1557 ], [ 4.6192, 44.1556 ], [ 4.619, 44.1555 ], [ 4.618, 44.1555 ], [ 4.6177, 44.1554 ], [ 4.6175, 44.1554 ], [ 4.6173, 44.1554 ], [ 4.6171, 44.1553 ], [ 4.617, 44.1552 ], [ 4.6169, 44.1553 ], [ 4.6169, 44.1554 ], [ 4.6168, 44.1554 ], [ 4.6168, 44.1555 ], [ 4.6167, 44.1556 ], [ 4.6168, 44.1558 ], [ 4.6169, 44.1559 ], [ 4.617, 44.1561 ], [ 4.6172, 44.1564 ], [ 4.6169, 44.1565 ], [ 4.6165, 44.1566 ], [ 4.6161, 44.1566 ], [ 4.6157, 44.1561 ], [ 4.6154, 44.1557 ], [ 4.6153, 44.1556 ], [ 4.6153, 44.1556 ], [ 4.6153, 44.1555 ], [ 4.6144, 44.1557 ], [ 4.6145, 44.156 ], [ 4.6147, 44.1565 ], [ 4.6143, 44.1566 ], [ 4.614, 44.1566 ], [ 4.614, 44.1566 ], [ 4.614, 44.1567 ], [ 4.6141, 44.1568 ], [ 4.6145, 44.157 ], [ 4.6146, 44.1571 ], [ 4.6147, 44.1572 ], [ 4.6151, 44.1577 ], [ 4.6152, 44.1579 ], [ 4.6151, 44.1579 ], [ 4.6152, 44.1582 ], [ 4.6152, 44.1582 ], [ 4.6134, 44.1585 ], [ 4.6133, 44.1585 ], [ 4.6133, 44.1585 ], [ 4.6134, 44.1587 ], [ 4.6136, 44.159 ], [ 4.6139, 44.1597 ], [ 4.6137, 44.1598 ], [ 4.6129, 44.1598 ], [ 4.612, 44.16 ], [ 4.6116, 44.1601 ], [ 4.6116, 44.1601 ], [ 4.6115, 44.1602 ], [ 4.6115, 44.1604 ], [ 4.6116, 44.161 ], [ 4.6117, 44.1628 ], [ 4.6125, 44.1627 ], [ 4.6123, 44.1612 ], [ 4.6123, 44.16 ], [ 4.6124, 44.1599 ], [ 4.6129, 44.1599 ], [ 4.6138, 44.1598 ], [ 4.6139, 44.1597 ], [ 4.6136, 44.159 ], [ 4.6146, 44.159 ], [ 4.6147, 44.159 ], [ 4.6156, 44.1589 ], [ 4.6157, 44.1588 ], [ 4.6179, 44.1581 ], [ 4.618, 44.158 ], [ 4.618, 44.1582 ], [ 4.6181, 44.1583 ], [ 4.6182, 44.1585 ], [ 4.6184, 44.1587 ], [ 4.6186, 44.1589 ], [ 4.6189, 44.1594 ], [ 4.6194, 44.1592 ], [ 4.6195, 44.1595 ], [ 4.6196, 44.1595 ], [ 4.6197, 44.1595 ], [ 4.6198, 44.1598 ], [ 4.6197, 44.1598 ], [ 4.6197, 44.1602 ], [ 4.6206, 44.1602 ], [ 4.6208, 44.1602 ], [ 4.621, 44.1601 ], [ 4.6211, 44.1602 ], [ 4.6211, 44.1602 ], [ 4.6212, 44.1604 ], [ 4.6215, 44.1603 ], [ 4.6215, 44.1604 ], [ 4.6225, 44.1603 ], [ 4.6226, 44.1603 ], [ 4.6226, 44.1601 ], [ 4.6226, 44.1598 ], [ 4.623, 44.1598 ], [ 4.6234, 44.1598 ], [ 4.6235, 44.16 ], [ 4.6238, 44.1599 ], [ 4.624, 44.1602 ], [ 4.624, 44.1602 ], [ 4.6243, 44.1602 ], [ 4.6243, 44.1604 ], [ 4.6242, 44.1606 ], [ 4.6243, 44.1607 ], [ 4.6243, 44.1609 ], [ 4.6252, 44.1607 ], [ 4.6252, 44.1608 ], [ 4.6254, 44.1607 ], [ 4.6255, 44.161 ], [ 4.6256, 44.161 ], [ 4.6257, 44.1609 ], [ 4.6258, 44.1609 ], [ 4.6258, 44.1608 ], [ 4.6259, 44.1608 ], [ 4.6258, 44.1607 ] ] ], "type": "Polygon" }, "id": "94", "properties": { "code_commune": "30028", "code_departement": "30", "code_qp": "QP030010", "commune_qp": "Bagnols-sur-Cèze", "nom_commune": "Bagnols-sur-Cèze", "nom_qp": "Escanaux - Coronelle - Citadelle - Vigan Braquet" }, "type": "Feature" }, { "bbox": [ 4.4107, 44.0178, 4.4182, 44.0292 ], "geometry": { "coordinates": [ [ [ 4.4182, 44.0186 ], [ 4.418, 44.018 ], [ 4.4179, 44.0178 ], [ 4.4176, 44.0179 ], [ 4.4174, 44.0179 ], [ 4.4165, 44.0182 ], [ 4.4163, 44.0182 ], [ 4.4162, 44.0183 ], [ 4.416, 44.0183 ], [ 4.4159, 44.0183 ], [ 4.4159, 44.0183 ], [ 4.4158, 44.0183 ], [ 4.4155, 44.0184 ], [ 4.4152, 44.0186 ], [ 4.4146, 44.0187 ], [ 4.4145, 44.0188 ], [ 4.4144, 44.0188 ], [ 4.4138, 44.019 ], [ 4.4136, 44.0191 ], [ 4.4133, 44.0192 ], [ 4.4131, 44.0193 ], [ 4.4129, 44.0194 ], [ 4.4125, 44.0195 ], [ 4.4122, 44.0196 ], [ 4.4118, 44.0197 ], [ 4.4111, 44.02 ], [ 4.4113, 44.0204 ], [ 4.4115, 44.0208 ], [ 4.4117, 44.0212 ], [ 4.4122, 44.022 ], [ 4.4119, 44.0222 ], [ 4.4116, 44.0224 ], [ 4.4116, 44.0224 ], [ 4.4113, 44.0227 ], [ 4.4112, 44.0228 ], [ 4.411, 44.0229 ], [ 4.4108, 44.0233 ], [ 4.4108, 44.0234 ], [ 4.4107, 44.0239 ], [ 4.4107, 44.024 ], [ 4.4107, 44.0242 ], [ 4.4108, 44.0243 ], [ 4.4109, 44.0245 ], [ 4.4111, 44.0247 ], [ 4.4112, 44.0248 ], [ 4.4113, 44.0248 ], [ 4.412, 44.0251 ], [ 4.4121, 44.0252 ], [ 4.4122, 44.0252 ], [ 4.4123, 44.0253 ], [ 4.4126, 44.0253 ], [ 4.4126, 44.0254 ], [ 4.4126, 44.0254 ], [ 4.4126, 44.0254 ], [ 4.413, 44.0255 ], [ 4.4131, 44.0256 ], [ 4.4133, 44.0256 ], [ 4.4138, 44.0256 ], [ 4.4137, 44.0257 ], [ 4.4137, 44.0259 ], [ 4.4136, 44.0261 ], [ 4.4135, 44.0262 ], [ 4.4135, 44.0263 ], [ 4.4135, 44.0264 ], [ 4.4136, 44.0265 ], [ 4.4136, 44.0265 ], [ 4.4137, 44.0266 ], [ 4.4138, 44.0267 ], [ 4.4139, 44.0268 ], [ 4.4141, 44.0269 ], [ 4.4145, 44.027 ], [ 4.4144, 44.0271 ], [ 4.4145, 44.0272 ], [ 4.4147, 44.0274 ], [ 4.4149, 44.0276 ], [ 4.4151, 44.0278 ], [ 4.4157, 44.0287 ], [ 4.4158, 44.0288 ], [ 4.4159, 44.0288 ], [ 4.4161, 44.029 ], [ 4.4162, 44.0291 ], [ 4.4163, 44.0292 ], [ 4.417, 44.029 ], [ 4.4175, 44.0288 ], [ 4.4175, 44.0288 ], [ 4.4175, 44.0287 ], [ 4.4176, 44.0286 ], [ 4.4176, 44.0282 ], [ 4.4176, 44.0276 ], [ 4.4176, 44.0274 ], [ 4.4175, 44.0271 ], [ 4.4175, 44.027 ], [ 4.4175, 44.0268 ], [ 4.4174, 44.0267 ], [ 4.4173, 44.0263 ], [ 4.4173, 44.0262 ], [ 4.4173, 44.0261 ], [ 4.4172, 44.026 ], [ 4.4172, 44.0257 ], [ 4.4171, 44.0252 ], [ 4.4171, 44.0251 ], [ 4.417, 44.0249 ], [ 4.417, 44.0248 ], [ 4.4169, 44.0247 ], [ 4.4169, 44.0247 ], [ 4.4168, 44.0246 ], [ 4.4167, 44.0246 ], [ 4.4166, 44.0245 ], [ 4.4158, 44.0243 ], [ 4.4155, 44.024 ], [ 4.4153, 44.0239 ], [ 4.415, 44.0237 ], [ 4.4146, 44.0234 ], [ 4.4142, 44.0231 ], [ 4.4141, 44.023 ], [ 4.4147, 44.0215 ], [ 4.4149, 44.0211 ], [ 4.4152, 44.0202 ], [ 4.4155, 44.0194 ], [ 4.416, 44.0196 ], [ 4.4164, 44.0198 ], [ 4.4168, 44.0196 ], [ 4.4172, 44.0194 ], [ 4.4174, 44.0193 ], [ 4.4174, 44.0193 ], [ 4.4175, 44.0193 ], [ 4.4175, 44.0192 ], [ 4.4176, 44.0192 ], [ 4.4177, 44.0191 ], [ 4.4179, 44.0189 ], [ 4.4181, 44.0187 ], [ 4.4182, 44.0186 ] ] ], "type": "Polygon" }, "id": "95", "properties": { "code_commune": "30334", "code_departement": "30", "code_qp": "QP030018", "commune_qp": "Uzès", "nom_commune": "Uzès", "nom_qp": "Quartier Prioritaire D'Uzès" }, "type": "Feature" }, { "bbox": [ 2.1515, 43.9406, 2.1586, 43.9467 ], "geometry": { "coordinates": [ [ [ 2.1567, 43.9451 ], [ 2.1558, 43.9446 ], [ 2.1559, 43.9446 ], [ 2.1556, 43.9445 ], [ 2.1558, 43.9443 ], [ 2.1558, 43.9441 ], [ 2.1555, 43.9439 ], [ 2.156, 43.9436 ], [ 2.1562, 43.9436 ], [ 2.1564, 43.9437 ], [ 2.1565, 43.9438 ], [ 2.1566, 43.9438 ], [ 2.1567, 43.9438 ], [ 2.1569, 43.9438 ], [ 2.1571, 43.9439 ], [ 2.1573, 43.9439 ], [ 2.1575, 43.9438 ], [ 2.1576, 43.9438 ], [ 2.1579, 43.9438 ], [ 2.158, 43.9438 ], [ 2.1581, 43.9438 ], [ 2.1581, 43.9438 ], [ 2.1582, 43.9438 ], [ 2.1582, 43.9437 ], [ 2.1583, 43.9436 ], [ 2.1585, 43.9435 ], [ 2.1586, 43.9433 ], [ 2.1586, 43.9432 ], [ 2.1586, 43.9431 ], [ 2.1586, 43.943 ], [ 2.1586, 43.9428 ], [ 2.1586, 43.9426 ], [ 2.1585, 43.9422 ], [ 2.1584, 43.9419 ], [ 2.158, 43.9418 ], [ 2.1571, 43.9413 ], [ 2.157, 43.9413 ], [ 2.1569, 43.9413 ], [ 2.1569, 43.9413 ], [ 2.1565, 43.9411 ], [ 2.1564, 43.9411 ], [ 2.1563, 43.941 ], [ 2.1564, 43.941 ], [ 2.1562, 43.9409 ], [ 2.156, 43.9412 ], [ 2.1558, 43.9411 ], [ 2.1557, 43.9411 ], [ 2.1557, 43.9411 ], [ 2.1556, 43.9409 ], [ 2.1555, 43.9406 ], [ 2.1554, 43.9406 ], [ 2.1554, 43.9407 ], [ 2.1552, 43.9407 ], [ 2.1551, 43.9407 ], [ 2.155, 43.9407 ], [ 2.1542, 43.9407 ], [ 2.1542, 43.941 ], [ 2.1539, 43.941 ], [ 2.1537, 43.941 ], [ 2.1535, 43.941 ], [ 2.1533, 43.9411 ], [ 2.1532, 43.9412 ], [ 2.1531, 43.9413 ], [ 2.153, 43.9414 ], [ 2.1529, 43.9415 ], [ 2.1529, 43.9416 ], [ 2.1529, 43.9417 ], [ 2.1529, 43.9417 ], [ 2.1529, 43.9418 ], [ 2.1526, 43.942 ], [ 2.1523, 43.9423 ], [ 2.1521, 43.9423 ], [ 2.1521, 43.9424 ], [ 2.1519, 43.9424 ], [ 2.1518, 43.9425 ], [ 2.1517, 43.9425 ], [ 2.1515, 43.9425 ], [ 2.1517, 43.943 ], [ 2.1517, 43.9431 ], [ 2.1519, 43.9431 ], [ 2.153, 43.943 ], [ 2.1532, 43.943 ], [ 2.154, 43.9434 ], [ 2.1541, 43.9434 ], [ 2.1543, 43.9435 ], [ 2.154, 43.9438 ], [ 2.1543, 43.9439 ], [ 2.1541, 43.944 ], [ 2.154, 43.9441 ], [ 2.1539, 43.9442 ], [ 2.1538, 43.9444 ], [ 2.1538, 43.9445 ], [ 2.1537, 43.9446 ], [ 2.1537, 43.9447 ], [ 2.1536, 43.9448 ], [ 2.1536, 43.9452 ], [ 2.1535, 43.9455 ], [ 2.1535, 43.9456 ], [ 2.1535, 43.9457 ], [ 2.1536, 43.9458 ], [ 2.1536, 43.9459 ], [ 2.1537, 43.9461 ], [ 2.1538, 43.9462 ], [ 2.1539, 43.9463 ], [ 2.1541, 43.9463 ], [ 2.1546, 43.9466 ], [ 2.1549, 43.9467 ], [ 2.1552, 43.9464 ], [ 2.1553, 43.9464 ], [ 2.1554, 43.9465 ], [ 2.1554, 43.9462 ], [ 2.1556, 43.9462 ], [ 2.1556, 43.9462 ], [ 2.1557, 43.9462 ], [ 2.1558, 43.9462 ], [ 2.1559, 43.9462 ], [ 2.1559, 43.9461 ], [ 2.1562, 43.9458 ], [ 2.1564, 43.9458 ], [ 2.1565, 43.9456 ], [ 2.1563, 43.9456 ], [ 2.1564, 43.9455 ], [ 2.1565, 43.9453 ], [ 2.1567, 43.9451 ] ] ], "type": "Polygon" }, "id": "96", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081006", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Cantepau" }, "type": "Feature" }, { "bbox": [ 2.2488, 43.6026, 2.2616, 43.6152 ], "geometry": { "coordinates": [ [ [ 2.255, 43.6138 ], [ 2.2548, 43.6142 ], [ 2.2547, 43.6144 ], [ 2.2546, 43.6145 ], [ 2.2544, 43.6147 ], [ 2.2543, 43.6148 ], [ 2.254, 43.615 ], [ 2.2543, 43.6152 ], [ 2.2545, 43.6151 ], [ 2.2549, 43.6149 ], [ 2.2552, 43.6148 ], [ 2.2551, 43.6145 ], [ 2.2558, 43.6144 ], [ 2.2562, 43.6135 ], [ 2.2563, 43.6135 ], [ 2.2565, 43.6133 ], [ 2.2562, 43.6132 ], [ 2.2563, 43.6131 ], [ 2.2562, 43.6131 ], [ 2.2563, 43.6129 ], [ 2.2566, 43.6129 ], [ 2.2567, 43.6129 ], [ 2.2568, 43.6129 ], [ 2.2569, 43.6129 ], [ 2.257, 43.6129 ], [ 2.257, 43.6128 ], [ 2.2571, 43.6128 ], [ 2.2571, 43.6127 ], [ 2.2571, 43.6127 ], [ 2.2572, 43.6125 ], [ 2.2573, 43.6124 ], [ 2.2574, 43.6123 ], [ 2.2575, 43.6122 ], [ 2.2577, 43.6121 ], [ 2.2579, 43.612 ], [ 2.2579, 43.6119 ], [ 2.2579, 43.6118 ], [ 2.258, 43.6107 ], [ 2.258, 43.6104 ], [ 2.258, 43.6103 ], [ 2.2579, 43.6103 ], [ 2.2567, 43.6103 ], [ 2.2567, 43.6103 ], [ 2.2565, 43.6103 ], [ 2.2564, 43.6103 ], [ 2.2563, 43.6102 ], [ 2.2562, 43.6102 ], [ 2.256, 43.6102 ], [ 2.2559, 43.6102 ], [ 2.256, 43.6097 ], [ 2.2561, 43.6089 ], [ 2.2561, 43.6089 ], [ 2.2564, 43.6088 ], [ 2.2565, 43.6088 ], [ 2.2564, 43.6087 ], [ 2.2564, 43.6086 ], [ 2.2565, 43.6086 ], [ 2.2565, 43.6085 ], [ 2.2568, 43.6084 ], [ 2.2569, 43.6084 ], [ 2.257, 43.6084 ], [ 2.2571, 43.6085 ], [ 2.2573, 43.6085 ], [ 2.2574, 43.6085 ], [ 2.2576, 43.6085 ], [ 2.2577, 43.6085 ], [ 2.2579, 43.6084 ], [ 2.258, 43.6081 ], [ 2.258, 43.6079 ], [ 2.2579, 43.6078 ], [ 2.2577, 43.6077 ], [ 2.2576, 43.6076 ], [ 2.2576, 43.6075 ], [ 2.2576, 43.6075 ], [ 2.2576, 43.6074 ], [ 2.2586, 43.6068 ], [ 2.2601, 43.606 ], [ 2.2605, 43.6058 ], [ 2.2611, 43.6054 ], [ 2.2613, 43.6052 ], [ 2.2614, 43.6052 ], [ 2.2615, 43.6051 ], [ 2.2616, 43.605 ], [ 2.2616, 43.6049 ], [ 2.2615, 43.6049 ], [ 2.2613, 43.6047 ], [ 2.2611, 43.6044 ], [ 2.2603, 43.6035 ], [ 2.2595, 43.6026 ], [ 2.259, 43.6029 ], [ 2.2583, 43.6032 ], [ 2.2589, 43.6038 ], [ 2.258, 43.6044 ], [ 2.2582, 43.6045 ], [ 2.257, 43.6049 ], [ 2.2556, 43.6053 ], [ 2.2558, 43.6058 ], [ 2.256, 43.6063 ], [ 2.2561, 43.6063 ], [ 2.2547, 43.6067 ], [ 2.254, 43.6061 ], [ 2.2537, 43.6063 ], [ 2.252, 43.6073 ], [ 2.2523, 43.6073 ], [ 2.2528, 43.6075 ], [ 2.2552, 43.608 ], [ 2.2551, 43.6082 ], [ 2.2551, 43.6082 ], [ 2.2551, 43.6082 ], [ 2.2554, 43.6084 ], [ 2.2554, 43.6086 ], [ 2.2553, 43.6086 ], [ 2.2549, 43.6087 ], [ 2.2547, 43.6087 ], [ 2.2545, 43.6087 ], [ 2.2539, 43.6087 ], [ 2.2538, 43.6096 ], [ 2.2538, 43.6098 ], [ 2.2531, 43.6096 ], [ 2.2529, 43.6098 ], [ 2.2512, 43.6096 ], [ 2.2515, 43.6099 ], [ 2.2505, 43.6104 ], [ 2.251, 43.611 ], [ 2.2525, 43.6102 ], [ 2.2526, 43.6101 ], [ 2.2529, 43.6099 ], [ 2.253, 43.6099 ], [ 2.2534, 43.6103 ], [ 2.2538, 43.6103 ], [ 2.2538, 43.6105 ], [ 2.2538, 43.6107 ], [ 2.2538, 43.6109 ], [ 2.2536, 43.611 ], [ 2.2524, 43.6116 ], [ 2.2536, 43.6119 ], [ 2.2536, 43.6119 ], [ 2.2534, 43.6123 ], [ 2.2535, 43.6123 ], [ 2.2533, 43.6127 ], [ 2.2533, 43.6128 ], [ 2.2522, 43.6131 ], [ 2.2523, 43.6134 ], [ 2.2517, 43.6135 ], [ 2.2513, 43.6136 ], [ 2.2513, 43.6137 ], [ 2.2514, 43.6138 ], [ 2.2504, 43.6141 ], [ 2.2502, 43.6139 ], [ 2.2502, 43.614 ], [ 2.2498, 43.6141 ], [ 2.2495, 43.6136 ], [ 2.2488, 43.6138 ], [ 2.2491, 43.6143 ], [ 2.2492, 43.6145 ], [ 2.2492, 43.6146 ], [ 2.2492, 43.6147 ], [ 2.2493, 43.6147 ], [ 2.2495, 43.6148 ], [ 2.2495, 43.6148 ], [ 2.2498, 43.6147 ], [ 2.2499, 43.6147 ], [ 2.2502, 43.6145 ], [ 2.2508, 43.6144 ], [ 2.2516, 43.6141 ], [ 2.2524, 43.6138 ], [ 2.2528, 43.6137 ], [ 2.2531, 43.6136 ], [ 2.2534, 43.6135 ], [ 2.2536, 43.6135 ], [ 2.2537, 43.6135 ], [ 2.255, 43.6138 ] ] ], "type": "Polygon" }, "id": "97", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081004", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Aillot Bisséous Lardaillé" }, "type": "Feature" }, { "bbox": [ 1.4126, 43.5904, 1.4202, 43.595 ], "geometry": { "coordinates": [ [ [ 1.4184, 43.591 ], [ 1.4183, 43.5909 ], [ 1.4177, 43.5907 ], [ 1.4174, 43.5906 ], [ 1.4169, 43.5904 ], [ 1.4164, 43.5915 ], [ 1.4169, 43.5916 ], [ 1.4165, 43.5922 ], [ 1.4165, 43.5922 ], [ 1.416, 43.5931 ], [ 1.4159, 43.5931 ], [ 1.415, 43.593 ], [ 1.4151, 43.5927 ], [ 1.4153, 43.5924 ], [ 1.4151, 43.5923 ], [ 1.4142, 43.5921 ], [ 1.4141, 43.5929 ], [ 1.4141, 43.593 ], [ 1.414, 43.593 ], [ 1.414, 43.5934 ], [ 1.4135, 43.5933 ], [ 1.4131, 43.5933 ], [ 1.4128, 43.5939 ], [ 1.4128, 43.5939 ], [ 1.4126, 43.5944 ], [ 1.4128, 43.5945 ], [ 1.4129, 43.5945 ], [ 1.4153, 43.5949 ], [ 1.4153, 43.5949 ], [ 1.4155, 43.5949 ], [ 1.4155, 43.5949 ], [ 1.4156, 43.5949 ], [ 1.4158, 43.5941 ], [ 1.4163, 43.5942 ], [ 1.4163, 43.5943 ], [ 1.4178, 43.5944 ], [ 1.4179, 43.5941 ], [ 1.4192, 43.5942 ], [ 1.4193, 43.5949 ], [ 1.4199, 43.595 ], [ 1.4199, 43.5948 ], [ 1.42, 43.5948 ], [ 1.4202, 43.594 ], [ 1.4202, 43.594 ], [ 1.4196, 43.5941 ], [ 1.4199, 43.5932 ], [ 1.4197, 43.5931 ], [ 1.4197, 43.5931 ], [ 1.4195, 43.593 ], [ 1.4196, 43.593 ], [ 1.4196, 43.5929 ], [ 1.4194, 43.5928 ], [ 1.4194, 43.5928 ], [ 1.4193, 43.5927 ], [ 1.4193, 43.5927 ], [ 1.4189, 43.5927 ], [ 1.4188, 43.5927 ], [ 1.4187, 43.5927 ], [ 1.4187, 43.5927 ], [ 1.4178, 43.5929 ], [ 1.4175, 43.5928 ], [ 1.4176, 43.5925 ], [ 1.4176, 43.5924 ], [ 1.4175, 43.5924 ], [ 1.4176, 43.5922 ], [ 1.4177, 43.5915 ], [ 1.4178, 43.5915 ], [ 1.4185, 43.5914 ], [ 1.4185, 43.5911 ], [ 1.4184, 43.591 ] ] ], "type": "Polygon" }, "id": "98", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031008", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Arènes" }, "type": "Feature" }, { "bbox": [ 2.3607, 43.502, 2.3691, 43.5087 ], "geometry": { "coordinates": [ [ [ 2.3622, 43.5087 ], [ 2.3624, 43.5085 ], [ 2.3627, 43.5087 ], [ 2.3634, 43.508 ], [ 2.3639, 43.5075 ], [ 2.364, 43.5073 ], [ 2.3643, 43.507 ], [ 2.3643, 43.5069 ], [ 2.3646, 43.5068 ], [ 2.3647, 43.5069 ], [ 2.3653, 43.5069 ], [ 2.3668, 43.5069 ], [ 2.3668, 43.5072 ], [ 2.3668, 43.5083 ], [ 2.3673, 43.5083 ], [ 2.3673, 43.508 ], [ 2.3672, 43.508 ], [ 2.3673, 43.5069 ], [ 2.3675, 43.507 ], [ 2.3676, 43.507 ], [ 2.3677, 43.5064 ], [ 2.3677, 43.5059 ], [ 2.3669, 43.5059 ], [ 2.3669, 43.5054 ], [ 2.3669, 43.5054 ], [ 2.3669, 43.5053 ], [ 2.367, 43.5052 ], [ 2.3671, 43.5048 ], [ 2.3672, 43.5042 ], [ 2.3673, 43.5041 ], [ 2.3673, 43.5041 ], [ 2.3674, 43.504 ], [ 2.3676, 43.504 ], [ 2.3677, 43.5041 ], [ 2.3678, 43.5044 ], [ 2.3679, 43.5045 ], [ 2.3681, 43.5045 ], [ 2.3682, 43.5044 ], [ 2.3682, 43.5044 ], [ 2.3681, 43.5043 ], [ 2.3681, 43.5042 ], [ 2.3681, 43.5042 ], [ 2.3681, 43.504 ], [ 2.3682, 43.5039 ], [ 2.3683, 43.5038 ], [ 2.3684, 43.5037 ], [ 2.3683, 43.5037 ], [ 2.3681, 43.5036 ], [ 2.3686, 43.5032 ], [ 2.3691, 43.5028 ], [ 2.3686, 43.502 ], [ 2.3673, 43.5035 ], [ 2.3672, 43.5036 ], [ 2.3669, 43.5039 ], [ 2.3668, 43.5042 ], [ 2.3667, 43.5045 ], [ 2.3667, 43.5044 ], [ 2.3665, 43.5043 ], [ 2.3663, 43.5044 ], [ 2.366, 43.5042 ], [ 2.366, 43.5042 ], [ 2.3662, 43.5039 ], [ 2.3668, 43.5034 ], [ 2.3668, 43.5033 ], [ 2.3666, 43.5031 ], [ 2.3665, 43.5031 ], [ 2.3662, 43.5031 ], [ 2.3647, 43.5033 ], [ 2.3647, 43.5033 ], [ 2.3639, 43.5035 ], [ 2.3637, 43.5036 ], [ 2.3637, 43.5036 ], [ 2.3636, 43.5034 ], [ 2.3634, 43.5034 ], [ 2.3634, 43.5034 ], [ 2.3631, 43.5034 ], [ 2.363, 43.5033 ], [ 2.3629, 43.5034 ], [ 2.3626, 43.5035 ], [ 2.3626, 43.5034 ], [ 2.3625, 43.5034 ], [ 2.3624, 43.5034 ], [ 2.3622, 43.5033 ], [ 2.3608, 43.5042 ], [ 2.361, 43.5045 ], [ 2.363, 43.5051 ], [ 2.3632, 43.5048 ], [ 2.3635, 43.5048 ], [ 2.3636, 43.5048 ], [ 2.3638, 43.5053 ], [ 2.3639, 43.5055 ], [ 2.3632, 43.5056 ], [ 2.3623, 43.506 ], [ 2.3623, 43.506 ], [ 2.3623, 43.506 ], [ 2.3623, 43.5061 ], [ 2.3624, 43.5064 ], [ 2.3613, 43.5066 ], [ 2.3613, 43.5066 ], [ 2.3611, 43.5067 ], [ 2.3611, 43.5068 ], [ 2.3613, 43.507 ], [ 2.3607, 43.5077 ], [ 2.3611, 43.5079 ], [ 2.3618, 43.5082 ], [ 2.3617, 43.5084 ], [ 2.3622, 43.5087 ] ] ], "type": "Polygon" }, "id": "99", "properties": { "code_commune": "81021", "code_departement": "81", "code_qp": "QP081001", "commune_qp": "Aussillon", "nom_commune": "Aussillon", "nom_qp": "La Falgalarié" }, "type": "Feature" }, { "bbox": [ 0.0774, 43.2212, 0.0918, 43.2328 ], "geometry": { "coordinates": [ [ [ 0.0818, 43.2324 ], [ 0.0818, 43.2323 ], [ 0.0816, 43.2321 ], [ 0.0816, 43.2319 ], [ 0.0816, 43.2318 ], [ 0.0822, 43.2317 ], [ 0.0822, 43.2316 ], [ 0.0823, 43.2314 ], [ 0.0825, 43.2315 ], [ 0.0826, 43.2315 ], [ 0.083, 43.2306 ], [ 0.0828, 43.2305 ], [ 0.083, 43.23 ], [ 0.0834, 43.2301 ], [ 0.0843, 43.2304 ], [ 0.0847, 43.2305 ], [ 0.085, 43.2306 ], [ 0.0852, 43.2306 ], [ 0.0868, 43.231 ], [ 0.087, 43.2313 ], [ 0.0873, 43.2316 ], [ 0.0874, 43.2319 ], [ 0.0874, 43.232 ], [ 0.0875, 43.2322 ], [ 0.0904, 43.2328 ], [ 0.0905, 43.2328 ], [ 0.0906, 43.2327 ], [ 0.0908, 43.2322 ], [ 0.0912, 43.2317 ], [ 0.0915, 43.2311 ], [ 0.0894, 43.2309 ], [ 0.0895, 43.2307 ], [ 0.0892, 43.2307 ], [ 0.0892, 43.2309 ], [ 0.0876, 43.2306 ], [ 0.0878, 43.2298 ], [ 0.088, 43.2295 ], [ 0.088, 43.2293 ], [ 0.088, 43.2292 ], [ 0.0881, 43.2287 ], [ 0.0883, 43.2285 ], [ 0.0885, 43.2284 ], [ 0.0886, 43.2283 ], [ 0.0888, 43.228 ], [ 0.0892, 43.2273 ], [ 0.0895, 43.2268 ], [ 0.0897, 43.2263 ], [ 0.0898, 43.2261 ], [ 0.0898, 43.226 ], [ 0.09, 43.2255 ], [ 0.0901, 43.2253 ], [ 0.0903, 43.2251 ], [ 0.0904, 43.2248 ], [ 0.0905, 43.2245 ], [ 0.0906, 43.2243 ], [ 0.0906, 43.2243 ], [ 0.0908, 43.2239 ], [ 0.0908, 43.2239 ], [ 0.0909, 43.2238 ], [ 0.0909, 43.2238 ], [ 0.0909, 43.2237 ], [ 0.091, 43.2236 ], [ 0.0911, 43.2236 ], [ 0.0911, 43.2234 ], [ 0.0912, 43.2231 ], [ 0.0911, 43.223 ], [ 0.0911, 43.223 ], [ 0.091, 43.2229 ], [ 0.091, 43.2228 ], [ 0.0911, 43.2227 ], [ 0.0911, 43.2227 ], [ 0.0912, 43.2227 ], [ 0.0914, 43.2226 ], [ 0.0915, 43.2224 ], [ 0.0917, 43.2219 ], [ 0.0918, 43.2216 ], [ 0.0918, 43.2214 ], [ 0.0918, 43.2212 ], [ 0.0915, 43.2213 ], [ 0.0915, 43.2213 ], [ 0.091, 43.2214 ], [ 0.091, 43.2215 ], [ 0.0909, 43.2217 ], [ 0.0907, 43.2223 ], [ 0.0905, 43.2227 ], [ 0.0905, 43.2228 ], [ 0.0904, 43.2233 ], [ 0.0902, 43.2235 ], [ 0.0902, 43.2235 ], [ 0.0902, 43.2235 ], [ 0.09, 43.2239 ], [ 0.0897, 43.2245 ], [ 0.0897, 43.2245 ], [ 0.0894, 43.2251 ], [ 0.0891, 43.2257 ], [ 0.0889, 43.2264 ], [ 0.0888, 43.2267 ], [ 0.0884, 43.2267 ], [ 0.088, 43.2266 ], [ 0.0879, 43.2272 ], [ 0.0879, 43.2275 ], [ 0.0879, 43.2275 ], [ 0.0875, 43.2276 ], [ 0.0872, 43.2276 ], [ 0.0872, 43.2277 ], [ 0.0869, 43.2279 ], [ 0.0868, 43.2281 ], [ 0.0867, 43.2281 ], [ 0.0866, 43.2281 ], [ 0.0851, 43.228 ], [ 0.0844, 43.2283 ], [ 0.0841, 43.2279 ], [ 0.084, 43.2279 ], [ 0.0835, 43.2278 ], [ 0.083, 43.2288 ], [ 0.0827, 43.2288 ], [ 0.0821, 43.2289 ], [ 0.0811, 43.2289 ], [ 0.0804, 43.2289 ], [ 0.0804, 43.2279 ], [ 0.0804, 43.2279 ], [ 0.0804, 43.2276 ], [ 0.0803, 43.2276 ], [ 0.0799, 43.2276 ], [ 0.0799, 43.2275 ], [ 0.0799, 43.2274 ], [ 0.0799, 43.227 ], [ 0.0799, 43.2264 ], [ 0.0799, 43.2262 ], [ 0.0799, 43.2258 ], [ 0.0798, 43.2256 ], [ 0.0798, 43.2255 ], [ 0.0797, 43.2255 ], [ 0.0797, 43.2254 ], [ 0.0798, 43.2253 ], [ 0.0799, 43.2253 ], [ 0.08, 43.2253 ], [ 0.0802, 43.2251 ], [ 0.0804, 43.2249 ], [ 0.0809, 43.2244 ], [ 0.0811, 43.2242 ], [ 0.0812, 43.2243 ], [ 0.0813, 43.2242 ], [ 0.0813, 43.224 ], [ 0.0815, 43.2239 ], [ 0.0816, 43.2238 ], [ 0.0814, 43.2237 ], [ 0.0815, 43.2235 ], [ 0.0813, 43.2234 ], [ 0.0811, 43.2234 ], [ 0.0811, 43.2232 ], [ 0.0812, 43.223 ], [ 0.0812, 43.2229 ], [ 0.0802, 43.2227 ], [ 0.0797, 43.2229 ], [ 0.0796, 43.223 ], [ 0.0795, 43.223 ], [ 0.0794, 43.2231 ], [ 0.0792, 43.2236 ], [ 0.0789, 43.2235 ], [ 0.0786, 43.2236 ], [ 0.0782, 43.2235 ], [ 0.0781, 43.2239 ], [ 0.0782, 43.2239 ], [ 0.078, 43.2243 ], [ 0.078, 43.2244 ], [ 0.078, 43.2244 ], [ 0.078, 43.2246 ], [ 0.0779, 43.2246 ], [ 0.078, 43.2246 ], [ 0.078, 43.2247 ], [ 0.0782, 43.2247 ], [ 0.0782, 43.2249 ], [ 0.0784, 43.2249 ], [ 0.0786, 43.2249 ], [ 0.0784, 43.2252 ], [ 0.0784, 43.2252 ], [ 0.0784, 43.2253 ], [ 0.0783, 43.2254 ], [ 0.0779, 43.2257 ], [ 0.0777, 43.2259 ], [ 0.0776, 43.2263 ], [ 0.0778, 43.2263 ], [ 0.0776, 43.227 ], [ 0.0775, 43.2278 ], [ 0.0775, 43.2278 ], [ 0.0774, 43.2284 ], [ 0.0775, 43.2284 ], [ 0.0779, 43.2284 ], [ 0.0784, 43.2285 ], [ 0.0785, 43.2285 ], [ 0.0793, 43.2289 ], [ 0.0795, 43.2289 ], [ 0.0794, 43.2291 ], [ 0.0793, 43.2293 ], [ 0.0788, 43.2302 ], [ 0.0795, 43.2303 ], [ 0.0806, 43.2305 ], [ 0.0818, 43.2307 ], [ 0.0816, 43.2308 ], [ 0.0815, 43.2309 ], [ 0.0811, 43.2311 ], [ 0.0811, 43.2311 ], [ 0.081, 43.2311 ], [ 0.0809, 43.2311 ], [ 0.0808, 43.2318 ], [ 0.0807, 43.2318 ], [ 0.0797, 43.2319 ], [ 0.0798, 43.2326 ], [ 0.0807, 43.2325 ], [ 0.0813, 43.2325 ], [ 0.0817, 43.2324 ], [ 0.0818, 43.2324 ] ] ], "type": "Polygon" }, "id": "100", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065003", "commune_qp": "Tarbes", "nom_commune": "Séméac, Tarbes", "nom_qp": "Tarbes Est" }, "type": "Feature" }, { "bbox": [ 1.3353, 43.5363, 1.3406, 43.5391 ], "geometry": { "coordinates": [ [ [ 1.3353, 43.5369 ], [ 1.3354, 43.537 ], [ 1.3363, 43.5379 ], [ 1.3361, 43.538 ], [ 1.336, 43.5381 ], [ 1.3365, 43.5386 ], [ 1.3366, 43.5387 ], [ 1.3367, 43.5388 ], [ 1.3371, 43.5391 ], [ 1.3374, 43.5391 ], [ 1.3374, 43.5391 ], [ 1.3376, 43.5391 ], [ 1.3376, 43.5391 ], [ 1.3376, 43.539 ], [ 1.3381, 43.5391 ], [ 1.3383, 43.5391 ], [ 1.3387, 43.5389 ], [ 1.3386, 43.5388 ], [ 1.3388, 43.5388 ], [ 1.3391, 43.5386 ], [ 1.3392, 43.5388 ], [ 1.3394, 43.5388 ], [ 1.3395, 43.5388 ], [ 1.3397, 43.5387 ], [ 1.34, 43.5385 ], [ 1.3403, 43.5384 ], [ 1.3406, 43.5382 ], [ 1.3403, 43.5381 ], [ 1.3391, 43.5375 ], [ 1.3366, 43.5363 ], [ 1.3355, 43.5369 ], [ 1.3354, 43.5369 ], [ 1.3353, 43.5369 ] ] ], "type": "Polygon" }, "id": "101", "properties": { "code_commune": "31157", "code_departement": "31", "code_qp": "QP031017", "commune_qp": "Cugnaux", "nom_commune": "Cugnaux", "nom_qp": "Vivier Maçon" }, "type": "Feature" }, { "bbox": [ 1.3134, 43.6043, 1.3237, 43.6067 ], "geometry": { "coordinates": [ [ [ 1.3236, 43.6052 ], [ 1.3233, 43.6051 ], [ 1.3231, 43.6051 ], [ 1.3226, 43.6051 ], [ 1.3214, 43.605 ], [ 1.3196, 43.6048 ], [ 1.3174, 43.6046 ], [ 1.3162, 43.6045 ], [ 1.3153, 43.6045 ], [ 1.3134, 43.6043 ], [ 1.3137, 43.6046 ], [ 1.314, 43.605 ], [ 1.3147, 43.6047 ], [ 1.3149, 43.6047 ], [ 1.315, 43.6047 ], [ 1.3151, 43.6047 ], [ 1.3154, 43.6047 ], [ 1.3156, 43.605 ], [ 1.3162, 43.6048 ], [ 1.3162, 43.605 ], [ 1.3161, 43.6057 ], [ 1.3161, 43.6059 ], [ 1.3161, 43.6061 ], [ 1.3162, 43.6062 ], [ 1.3168, 43.6063 ], [ 1.3195, 43.6065 ], [ 1.3212, 43.6066 ], [ 1.322, 43.6067 ], [ 1.3224, 43.6067 ], [ 1.3233, 43.6067 ], [ 1.3234, 43.6067 ], [ 1.3235, 43.6067 ], [ 1.3235, 43.6066 ], [ 1.3235, 43.6065 ], [ 1.3235, 43.6062 ], [ 1.3236, 43.6058 ], [ 1.3236, 43.6056 ], [ 1.3237, 43.6054 ], [ 1.3236, 43.6052 ] ] ], "type": "Polygon" }, "id": "102", "properties": { "code_commune": "31149", "code_departement": "31", "code_qp": "QP031016", "commune_qp": "Colomiers", "nom_commune": "Colomiers", "nom_qp": "En Jacca" }, "type": "Feature" }, { "bbox": [ 1.4387, 43.6182, 1.446, 43.6219 ], "geometry": { "coordinates": [ [ [ 1.4416, 43.6184 ], [ 1.4409, 43.6185 ], [ 1.441, 43.6196 ], [ 1.4411, 43.62 ], [ 1.4411, 43.6201 ], [ 1.4401, 43.6205 ], [ 1.4399, 43.62 ], [ 1.4394, 43.6201 ], [ 1.4394, 43.62 ], [ 1.4387, 43.6201 ], [ 1.4388, 43.6204 ], [ 1.4388, 43.6204 ], [ 1.439, 43.621 ], [ 1.4397, 43.6208 ], [ 1.4397, 43.6208 ], [ 1.4401, 43.6219 ], [ 1.4406, 43.6217 ], [ 1.4401, 43.6206 ], [ 1.4412, 43.6202 ], [ 1.4413, 43.6201 ], [ 1.4421, 43.62 ], [ 1.4437, 43.6195 ], [ 1.446, 43.6188 ], [ 1.446, 43.6188 ], [ 1.4458, 43.6187 ], [ 1.4456, 43.6187 ], [ 1.4453, 43.6186 ], [ 1.4451, 43.6185 ], [ 1.4447, 43.6184 ], [ 1.4447, 43.6184 ], [ 1.4428, 43.6188 ], [ 1.4427, 43.6186 ], [ 1.4425, 43.6182 ], [ 1.4423, 43.6182 ], [ 1.4416, 43.6184 ] ] ], "type": "Polygon" }, "id": "103", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031018", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Négreneys" }, "type": "Feature" }, { "bbox": [ 1.4672, 43.607, 1.4729, 43.6102 ], "geometry": { "coordinates": [ [ [ 1.4729, 43.6074 ], [ 1.4727, 43.6073 ], [ 1.4727, 43.6073 ], [ 1.4724, 43.6071 ], [ 1.4722, 43.607 ], [ 1.4712, 43.6072 ], [ 1.471, 43.6073 ], [ 1.4706, 43.6073 ], [ 1.4692, 43.6073 ], [ 1.4681, 43.6072 ], [ 1.4672, 43.6072 ], [ 1.4675, 43.6073 ], [ 1.4676, 43.6074 ], [ 1.4679, 43.6076 ], [ 1.4681, 43.6077 ], [ 1.4686, 43.6079 ], [ 1.4698, 43.6086 ], [ 1.4686, 43.6096 ], [ 1.4694, 43.6102 ], [ 1.4701, 43.6096 ], [ 1.4724, 43.6079 ], [ 1.4725, 43.6078 ], [ 1.4728, 43.6076 ], [ 1.4729, 43.6074 ] ] ], "type": "Polygon" }, "id": "104", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031019", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "La Gloire" }, "type": "Feature" } ], "type": "FeatureCollection" }, "hovertemplate": "%{hovertext}

Quartier Prioritaire=%{location}
Taux d'Activité des Femmes=%{customdata[0]}
Taux Total en Emploi Précaire=%{customdata[1]}
Taux d'Activité Total=%{z}", "hovertext": [ "Pradettes", "Grand Mirail", "Arènes", "Bourbaki", "Empalot", "Les Izards - La Vache", "Cépière Beauregard", "Saint Exupéry", "Soupetard", "Rangueil", "Négreneys", "La Gloire" ], "locations": [ "Pradettes", "Grand Mirail", "Arènes", "Bourbaki", "Empalot", "Les Izards - La Vache", "Cépière Beauregard", "Saint Exupéry", "Soupetard", "Rangueil", "Négreneys", "La Gloire" ], "name": "", "subplot": "mapbox", "type": "choroplethmapbox", "z": [ 48.7, 38.1, 42.4, 36.1, 42.5, 43.9, 41.7, 62, 57.8, 22, 56.3, 57.1 ] } ], "layout": { "autosize": true, "coloraxis": { "colorbar": { "title": { "text": "Taux d'Activité Total" } }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ] }, "legend": { "tracegroupgap": 0 }, "mapbox": { "bearing": 0, "center": { "lat": 43.62455640653181, "lon": 1.4386040061492622 }, "domain": { "x": [ 0, 1 ], "y": [ 0, 1 ] }, "pitch": 0, "style": "carto-positron", "zoom": 11.678048363100565 }, "margin": { "b": 0, "l": 0, "r": 0, "t": 25 }, "template": { "data": { "bar": [ { "error_x": { "color": "#2a3f5f" }, "error_y": { "color": "#2a3f5f" }, "marker": { "line": { "color": "#E5ECF6", "width": 0.5 }, "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "bar" } ], "barpolar": [ { "marker": { "line": { "color": "#E5ECF6", "width": 0.5 }, "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "barpolar" } ], "carpet": [ { "aaxis": { "endlinecolor": "#2a3f5f", "gridcolor": "white", "linecolor": "white", "minorgridcolor": "white", "startlinecolor": "#2a3f5f" }, "baxis": { "endlinecolor": "#2a3f5f", "gridcolor": "white", "linecolor": "white", "minorgridcolor": "white", "startlinecolor": "#2a3f5f" }, "type": "carpet" } ], "choropleth": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "choropleth" } ], "contour": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "contour" } ], "contourcarpet": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "contourcarpet" } ], "heatmap": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "heatmap" } ], "heatmapgl": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "heatmapgl" } ], "histogram": [ { "marker": { "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "histogram" } ], "histogram2d": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "histogram2d" } ], "histogram2dcontour": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "histogram2dcontour" } ], "mesh3d": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "mesh3d" } ], "parcoords": [ { "line": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "parcoords" } ], "pie": [ { "automargin": true, "type": "pie" } ], "scatter": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatter" } ], "scatter3d": [ { "line": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatter3d" } ], "scattercarpet": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattercarpet" } ], "scattergeo": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattergeo" } ], "scattergl": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattergl" } ], "scattermapbox": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattermapbox" } ], "scatterpolar": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterpolar" } ], "scatterpolargl": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterpolargl" } ], "scatterternary": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterternary" } ], "surface": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "surface" } ], "table": [ { "cells": { "fill": { "color": "#EBF0F8" }, "line": { "color": "white" } }, "header": { "fill": { "color": "#C8D4E3" }, "line": { "color": "white" } }, "type": "table" } ] }, "layout": { "annotationdefaults": { "arrowcolor": "#2a3f5f", "arrowhead": 0, "arrowwidth": 1 }, "autotypenumbers": "strict", "coloraxis": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "colorscale": { "diverging": [ [ 0, "#8e0152" ], [ 0.1, "#c51b7d" ], [ 0.2, "#de77ae" ], [ 0.3, "#f1b6da" ], [ 0.4, "#fde0ef" ], [ 0.5, "#f7f7f7" ], [ 0.6, "#e6f5d0" ], [ 0.7, "#b8e186" ], [ 0.8, "#7fbc41" ], [ 0.9, "#4d9221" ], [ 1, "#276419" ] ], "sequential": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "sequentialminus": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ] }, "colorway": [ "#636efa", "#EF553B", "#00cc96", "#ab63fa", "#FFA15A", "#19d3f3", "#FF6692", "#B6E880", "#FF97FF", "#FECB52" ], "font": { "color": "#2a3f5f" }, "geo": { "bgcolor": "white", "lakecolor": "white", "landcolor": "#E5ECF6", "showlakes": true, "showland": true, "subunitcolor": "white" }, "hoverlabel": { "align": "left" }, "hovermode": "closest", "mapbox": { "style": "light" }, "paper_bgcolor": "white", "plot_bgcolor": "#E5ECF6", "polar": { "angularaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "bgcolor": "#E5ECF6", "radialaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" } }, "scene": { "xaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" }, "yaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" }, "zaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" } }, "shapedefaults": { "line": { "color": "#2a3f5f" } }, "ternary": { "aaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "baxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "bgcolor": "#E5ECF6", "caxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" } }, "title": { "x": 0.05 }, "xaxis": { "automargin": true, "gridcolor": "white", "linecolor": "white", "ticks": "", "title": { "standoff": 15 }, "zerolinecolor": "white", "zerolinewidth": 2 }, "yaxis": { "automargin": true, "gridcolor": "white", "linecolor": "white", "ticks": "", "title": { "standoff": 15 }, "zerolinecolor": "white", "zerolinewidth": 2 } } }, "title": { "text": "Taux d'Activité Total selon le Q.P - Commune de Toulouse" } } }, "image/png": "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", "text/html": [ "
" ] }, "metadata": {}, "output_type": "display_data" }, { "name": "stdout", "output_type": "stream", "text": [ "\n" ] }, { "data": { "application/vnd.plotly.v1+json": { "config": { "plotlyServerURL": "https://plot.ly" }, "data": [ { "coloraxis": "coloraxis", "customdata": [ [ 44.8, 30 ], [ 32.5, 25.7 ], [ 38, 24.7 ], [ 41.1, null ], [ 38.2, 28.5 ], [ 42.1, 20.9 ], [ 34.1, null ], [ 58.5, 19.8 ], [ 56.1, 15.9 ], [ 25.2, 38.7 ], [ 53.6, 24 ], [ 52.6, 22.3 ] ], "featureidkey": "properties.nom_qp", "geojson": { "bbox": [ -0.0437, 42.5983, 4.6525, 44.4672 ], "features": [ { "bbox": [ 2.8882, 42.7035, 2.9005, 42.7101 ], "geometry": { "coordinates": [ [ [ 2.9005, 42.7081 ], [ 2.9004, 42.7077 ], [ 2.9004, 42.7075 ], [ 2.9003, 42.7074 ], [ 2.9003, 42.7069 ], [ 2.9, 42.7069 ], [ 2.9001, 42.7067 ], [ 2.9002, 42.7065 ], [ 2.9002, 42.7064 ], [ 2.9002, 42.7063 ], [ 2.9002, 42.7062 ], [ 2.9001, 42.7062 ], [ 2.9001, 42.7061 ], [ 2.8994, 42.7059 ], [ 2.8979, 42.7055 ], [ 2.8976, 42.7054 ], [ 2.8972, 42.7053 ], [ 2.8964, 42.7051 ], [ 2.8961, 42.705 ], [ 2.8957, 42.7049 ], [ 2.8957, 42.7049 ], [ 2.8953, 42.7047 ], [ 2.8949, 42.7046 ], [ 2.8948, 42.7045 ], [ 2.8946, 42.7045 ], [ 2.8944, 42.7044 ], [ 2.8941, 42.7044 ], [ 2.8938, 42.7043 ], [ 2.8934, 42.7042 ], [ 2.8933, 42.7042 ], [ 2.8932, 42.7042 ], [ 2.8931, 42.7041 ], [ 2.8927, 42.7042 ], [ 2.8926, 42.7043 ], [ 2.8923, 42.7043 ], [ 2.8916, 42.7041 ], [ 2.8915, 42.7041 ], [ 2.8906, 42.7039 ], [ 2.8905, 42.7039 ], [ 2.8896, 42.7037 ], [ 2.8889, 42.7035 ], [ 2.8887, 42.7039 ], [ 2.8886, 42.7042 ], [ 2.8891, 42.7044 ], [ 2.8898, 42.7046 ], [ 2.8904, 42.7049 ], [ 2.8904, 42.705 ], [ 2.8905, 42.7049 ], [ 2.8907, 42.705 ], [ 2.8908, 42.705 ], [ 2.8914, 42.7053 ], [ 2.8916, 42.7053 ], [ 2.8914, 42.7056 ], [ 2.8912, 42.7056 ], [ 2.891, 42.7056 ], [ 2.8905, 42.7056 ], [ 2.8898, 42.7056 ], [ 2.8893, 42.7056 ], [ 2.8892, 42.7056 ], [ 2.889, 42.7057 ], [ 2.8888, 42.7059 ], [ 2.8887, 42.7059 ], [ 2.8887, 42.706 ], [ 2.8885, 42.706 ], [ 2.8884, 42.706 ], [ 2.8884, 42.706 ], [ 2.8883, 42.7061 ], [ 2.8882, 42.7064 ], [ 2.8887, 42.7065 ], [ 2.8888, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8893, 42.7062 ], [ 2.8893, 42.7061 ], [ 2.8893, 42.7061 ], [ 2.8905, 42.7062 ], [ 2.891, 42.7062 ], [ 2.8911, 42.7063 ], [ 2.8918, 42.7064 ], [ 2.8918, 42.7065 ], [ 2.892, 42.7065 ], [ 2.8925, 42.7066 ], [ 2.8925, 42.7067 ], [ 2.8926, 42.7067 ], [ 2.8928, 42.7069 ], [ 2.8932, 42.7072 ], [ 2.8931, 42.7073 ], [ 2.893, 42.7076 ], [ 2.8929, 42.7079 ], [ 2.8923, 42.7077 ], [ 2.892, 42.7077 ], [ 2.8919, 42.7077 ], [ 2.8919, 42.7077 ], [ 2.8918, 42.7077 ], [ 2.8918, 42.7077 ], [ 2.8916, 42.7077 ], [ 2.8916, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8914, 42.7076 ], [ 2.8913, 42.7075 ], [ 2.8912, 42.7078 ], [ 2.8911, 42.7081 ], [ 2.8911, 42.7082 ], [ 2.8909, 42.7086 ], [ 2.8907, 42.7092 ], [ 2.8906, 42.7093 ], [ 2.8906, 42.7095 ], [ 2.8905, 42.7096 ], [ 2.8908, 42.7096 ], [ 2.8909, 42.7096 ], [ 2.891, 42.7095 ], [ 2.8913, 42.7097 ], [ 2.8916, 42.7098 ], [ 2.8917, 42.7099 ], [ 2.8921, 42.71 ], [ 2.8921, 42.71 ], [ 2.8921, 42.7101 ], [ 2.8924, 42.7101 ], [ 2.8924, 42.71 ], [ 2.8924, 42.71 ], [ 2.8925, 42.7097 ], [ 2.8926, 42.7095 ], [ 2.8926, 42.7094 ], [ 2.8926, 42.7094 ], [ 2.8927, 42.7093 ], [ 2.8929, 42.7093 ], [ 2.893, 42.7094 ], [ 2.893, 42.7094 ], [ 2.893, 42.7094 ], [ 2.8933, 42.7088 ], [ 2.8936, 42.7082 ], [ 2.8938, 42.7081 ], [ 2.8937, 42.7081 ], [ 2.894, 42.7079 ], [ 2.894, 42.7079 ], [ 2.8946, 42.7083 ], [ 2.8946, 42.7083 ], [ 2.8948, 42.7083 ], [ 2.8952, 42.7084 ], [ 2.8955, 42.7084 ], [ 2.8958, 42.7085 ], [ 2.8958, 42.7085 ], [ 2.8959, 42.7084 ], [ 2.8964, 42.7082 ], [ 2.8967, 42.7081 ], [ 2.8965, 42.7078 ], [ 2.8965, 42.7078 ], [ 2.8963, 42.7076 ], [ 2.8962, 42.7075 ], [ 2.896, 42.7072 ], [ 2.8958, 42.707 ], [ 2.8957, 42.7068 ], [ 2.8959, 42.7068 ], [ 2.8959, 42.7068 ], [ 2.8957, 42.7066 ], [ 2.8957, 42.7065 ], [ 2.8958, 42.7065 ], [ 2.8962, 42.7063 ], [ 2.8963, 42.7063 ], [ 2.8964, 42.7062 ], [ 2.8965, 42.7062 ], [ 2.8967, 42.7062 ], [ 2.8968, 42.7063 ], [ 2.8968, 42.7063 ], [ 2.8969, 42.7066 ], [ 2.897, 42.7069 ], [ 2.8973, 42.7071 ], [ 2.8973, 42.7072 ], [ 2.8977, 42.7073 ], [ 2.898, 42.707 ], [ 2.899, 42.7074 ], [ 2.8992, 42.7075 ], [ 2.8992, 42.7075 ], [ 2.8992, 42.7076 ], [ 2.8995, 42.7077 ], [ 2.8995, 42.7077 ], [ 2.8999, 42.7079 ], [ 2.9005, 42.7081 ] ] ], "type": "Polygon" }, "id": "0", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066007", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Bas-Vernet Nouveau QPV" }, "type": "Feature" }, { "bbox": [ 4.0233, 44.2076, 4.0343, 44.2164 ], "geometry": { "coordinates": [ [ [ 4.0343, 44.2092 ], [ 4.0343, 44.2091 ], [ 4.0343, 44.209 ], [ 4.0342, 44.209 ], [ 4.0328, 44.2087 ], [ 4.0319, 44.2084 ], [ 4.0303, 44.208 ], [ 4.0298, 44.2079 ], [ 4.0294, 44.2077 ], [ 4.0288, 44.2076 ], [ 4.0285, 44.2076 ], [ 4.0282, 44.2076 ], [ 4.028, 44.2076 ], [ 4.0278, 44.2076 ], [ 4.0276, 44.2076 ], [ 4.0274, 44.2076 ], [ 4.027, 44.2077 ], [ 4.0267, 44.2078 ], [ 4.0265, 44.2079 ], [ 4.026, 44.2081 ], [ 4.0255, 44.2084 ], [ 4.0254, 44.2085 ], [ 4.0256, 44.2089 ], [ 4.0258, 44.2092 ], [ 4.0258, 44.2093 ], [ 4.0258, 44.2095 ], [ 4.0258, 44.2095 ], [ 4.0257, 44.2096 ], [ 4.0255, 44.2098 ], [ 4.0252, 44.21 ], [ 4.0251, 44.2102 ], [ 4.0245, 44.2103 ], [ 4.0247, 44.2105 ], [ 4.0247, 44.2105 ], [ 4.0246, 44.2106 ], [ 4.0245, 44.2106 ], [ 4.0243, 44.2107 ], [ 4.0245, 44.2108 ], [ 4.0245, 44.2108 ], [ 4.0249, 44.2111 ], [ 4.0249, 44.2111 ], [ 4.0251, 44.2114 ], [ 4.0248, 44.2115 ], [ 4.0245, 44.2117 ], [ 4.0242, 44.2119 ], [ 4.0238, 44.2122 ], [ 4.0237, 44.2123 ], [ 4.0233, 44.2126 ], [ 4.0239, 44.213 ], [ 4.0244, 44.2125 ], [ 4.0241, 44.2123 ], [ 4.024, 44.2123 ], [ 4.024, 44.2123 ], [ 4.0241, 44.2121 ], [ 4.0241, 44.2122 ], [ 4.0242, 44.2121 ], [ 4.0243, 44.212 ], [ 4.0244, 44.212 ], [ 4.0244, 44.212 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0246, 44.2118 ], [ 4.0246, 44.2118 ], [ 4.0246, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0248, 44.2118 ], [ 4.025, 44.2118 ], [ 4.0251, 44.2119 ], [ 4.0252, 44.212 ], [ 4.0252, 44.212 ], [ 4.0253, 44.212 ], [ 4.0253, 44.2119 ], [ 4.0254, 44.2119 ], [ 4.0255, 44.212 ], [ 4.0257, 44.2118 ], [ 4.0257, 44.2118 ], [ 4.0258, 44.2118 ], [ 4.0258, 44.2118 ], [ 4.0259, 44.2118 ], [ 4.026, 44.2119 ], [ 4.0261, 44.2119 ], [ 4.0262, 44.2119 ], [ 4.0262, 44.2119 ], [ 4.0263, 44.2118 ], [ 4.0264, 44.2118 ], [ 4.0265, 44.2118 ], [ 4.0266, 44.2118 ], [ 4.0267, 44.2118 ], [ 4.0269, 44.2118 ], [ 4.027, 44.2119 ], [ 4.0276, 44.212 ], [ 4.028, 44.2121 ], [ 4.0282, 44.2121 ], [ 4.0284, 44.2125 ], [ 4.0284, 44.2126 ], [ 4.0284, 44.2128 ], [ 4.0284, 44.2128 ], [ 4.0284, 44.2132 ], [ 4.0285, 44.2134 ], [ 4.0286, 44.2136 ], [ 4.0288, 44.2136 ], [ 4.0288, 44.2136 ], [ 4.0288, 44.2137 ], [ 4.0289, 44.2137 ], [ 4.029, 44.2139 ], [ 4.0291, 44.2141 ], [ 4.0292, 44.2142 ], [ 4.0292, 44.2142 ], [ 4.0291, 44.2143 ], [ 4.029, 44.2144 ], [ 4.029, 44.2144 ], [ 4.0289, 44.2145 ], [ 4.0289, 44.2146 ], [ 4.0286, 44.2146 ], [ 4.0281, 44.2147 ], [ 4.0278, 44.2147 ], [ 4.0278, 44.2148 ], [ 4.0278, 44.2148 ], [ 4.0278, 44.2151 ], [ 4.0278, 44.2153 ], [ 4.0278, 44.2154 ], [ 4.0276, 44.2154 ], [ 4.0276, 44.2156 ], [ 4.0273, 44.2156 ], [ 4.0273, 44.216 ], [ 4.0273, 44.216 ], [ 4.0275, 44.216 ], [ 4.0283, 44.216 ], [ 4.0283, 44.216 ], [ 4.0284, 44.216 ], [ 4.0284, 44.216 ], [ 4.0285, 44.2161 ], [ 4.0286, 44.2161 ], [ 4.0287, 44.2162 ], [ 4.0288, 44.2162 ], [ 4.0295, 44.2162 ], [ 4.0296, 44.2162 ], [ 4.0299, 44.2162 ], [ 4.0305, 44.216 ], [ 4.0306, 44.2159 ], [ 4.031, 44.2158 ], [ 4.0311, 44.2158 ], [ 4.0312, 44.216 ], [ 4.0312, 44.216 ], [ 4.0315, 44.2164 ], [ 4.0318, 44.2164 ], [ 4.0321, 44.2163 ], [ 4.0325, 44.2161 ], [ 4.0321, 44.2157 ], [ 4.0331, 44.2154 ], [ 4.0331, 44.2152 ], [ 4.0331, 44.2152 ], [ 4.033, 44.215 ], [ 4.033, 44.2146 ], [ 4.0329, 44.2144 ], [ 4.0336, 44.2145 ], [ 4.034, 44.2143 ], [ 4.0336, 44.2139 ], [ 4.0336, 44.2139 ], [ 4.0337, 44.2139 ], [ 4.0339, 44.2138 ], [ 4.0339, 44.2138 ], [ 4.034, 44.2135 ], [ 4.034, 44.2135 ], [ 4.0341, 44.2135 ], [ 4.0342, 44.2135 ], [ 4.0342, 44.2135 ], [ 4.0343, 44.2135 ], [ 4.0343, 44.2135 ], [ 4.0343, 44.2134 ], [ 4.0343, 44.2134 ], [ 4.0342, 44.2133 ], [ 4.034, 44.2131 ], [ 4.0339, 44.2131 ], [ 4.0339, 44.213 ], [ 4.0338, 44.2128 ], [ 4.0337, 44.2127 ], [ 4.0336, 44.2127 ], [ 4.0334, 44.2126 ], [ 4.0332, 44.2124 ], [ 4.0327, 44.2121 ], [ 4.0326, 44.212 ], [ 4.0325, 44.2119 ], [ 4.0323, 44.2119 ], [ 4.0316, 44.2114 ], [ 4.0315, 44.2113 ], [ 4.0315, 44.2112 ], [ 4.0314, 44.2109 ], [ 4.0317, 44.2109 ], [ 4.032, 44.2105 ], [ 4.0323, 44.2104 ], [ 4.0325, 44.2103 ], [ 4.033, 44.2101 ], [ 4.0331, 44.2101 ], [ 4.0333, 44.21 ], [ 4.0334, 44.2097 ], [ 4.0336, 44.2097 ], [ 4.0337, 44.2096 ], [ 4.0339, 44.2095 ], [ 4.0339, 44.2095 ], [ 4.0342, 44.2093 ], [ 4.0343, 44.2092 ] ] ], "type": "Polygon" }, "id": "1", "properties": { "code_commune": "30132", "code_departement": "30", "code_qp": "QP030016", "commune_qp": "La Grand-Combe", "nom_commune": "La Grand-Combe", "nom_qp": "Centre Ville - Arboux" }, "type": "Feature" }, { "bbox": [ 4.4296, 43.6741, 4.438, 43.6845 ], "geometry": { "coordinates": [ [ [ 4.438, 43.6827 ], [ 4.438, 43.6826 ], [ 4.438, 43.6826 ], [ 4.4376, 43.6824 ], [ 4.4375, 43.6823 ], [ 4.4374, 43.6823 ], [ 4.4373, 43.6823 ], [ 4.4371, 43.6819 ], [ 4.4367, 43.6817 ], [ 4.4362, 43.6815 ], [ 4.4353, 43.6813 ], [ 4.4351, 43.6809 ], [ 4.4351, 43.6804 ], [ 4.4353, 43.6801 ], [ 4.4363, 43.68 ], [ 4.4362, 43.6799 ], [ 4.4361, 43.6796 ], [ 4.436, 43.6794 ], [ 4.4359, 43.6794 ], [ 4.4359, 43.6793 ], [ 4.4359, 43.6792 ], [ 4.4358, 43.6791 ], [ 4.4358, 43.6791 ], [ 4.4356, 43.679 ], [ 4.4355, 43.679 ], [ 4.4353, 43.679 ], [ 4.4349, 43.679 ], [ 4.4343, 43.6791 ], [ 4.4341, 43.6791 ], [ 4.4336, 43.679 ], [ 4.4337, 43.6789 ], [ 4.4336, 43.6788 ], [ 4.4336, 43.6787 ], [ 4.4336, 43.6786 ], [ 4.4336, 43.6786 ], [ 4.4335, 43.6784 ], [ 4.4335, 43.6783 ], [ 4.4335, 43.6782 ], [ 4.4335, 43.6781 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6777 ], [ 4.4336, 43.6776 ], [ 4.4336, 43.6776 ], [ 4.4335, 43.6775 ], [ 4.4335, 43.6774 ], [ 4.4334, 43.6772 ], [ 4.4334, 43.6772 ], [ 4.4336, 43.6771 ], [ 4.4338, 43.6771 ], [ 4.4338, 43.677 ], [ 4.4337, 43.6766 ], [ 4.4336, 43.6765 ], [ 4.4336, 43.6763 ], [ 4.4336, 43.6761 ], [ 4.4336, 43.6761 ], [ 4.4333, 43.6757 ], [ 4.4332, 43.6756 ], [ 4.4326, 43.6752 ], [ 4.4324, 43.6751 ], [ 4.4325, 43.6748 ], [ 4.4325, 43.6748 ], [ 4.4324, 43.6747 ], [ 4.4324, 43.6746 ], [ 4.4325, 43.6746 ], [ 4.4325, 43.6744 ], [ 4.4324, 43.6743 ], [ 4.4324, 43.6742 ], [ 4.4324, 43.6741 ], [ 4.4322, 43.6743 ], [ 4.4317, 43.6748 ], [ 4.4312, 43.6752 ], [ 4.4309, 43.6755 ], [ 4.4306, 43.6759 ], [ 4.4304, 43.6761 ], [ 4.4299, 43.6765 ], [ 4.4298, 43.6766 ], [ 4.4297, 43.6768 ], [ 4.4297, 43.6771 ], [ 4.4296, 43.6772 ], [ 4.4296, 43.6779 ], [ 4.4298, 43.6779 ], [ 4.4299, 43.678 ], [ 4.4299, 43.678 ], [ 4.4299, 43.6781 ], [ 4.43, 43.6781 ], [ 4.4301, 43.6782 ], [ 4.4303, 43.6783 ], [ 4.4305, 43.6784 ], [ 4.4306, 43.6784 ], [ 4.4307, 43.6785 ], [ 4.4309, 43.6785 ], [ 4.4309, 43.6786 ], [ 4.431, 43.6786 ], [ 4.4311, 43.6788 ], [ 4.4311, 43.6788 ], [ 4.4312, 43.6788 ], [ 4.4312, 43.679 ], [ 4.4312, 43.679 ], [ 4.4314, 43.6791 ], [ 4.4318, 43.6791 ], [ 4.432, 43.6792 ], [ 4.4322, 43.6792 ], [ 4.4326, 43.6792 ], [ 4.4327, 43.6792 ], [ 4.4331, 43.6801 ], [ 4.4332, 43.6801 ], [ 4.4332, 43.6802 ], [ 4.4333, 43.6804 ], [ 4.4334, 43.6805 ], [ 4.4326, 43.6811 ], [ 4.433, 43.6812 ], [ 4.4327, 43.6813 ], [ 4.4326, 43.6814 ], [ 4.4325, 43.6815 ], [ 4.4325, 43.6815 ], [ 4.4322, 43.6816 ], [ 4.4321, 43.6815 ], [ 4.4319, 43.6815 ], [ 4.4318, 43.6816 ], [ 4.4318, 43.6816 ], [ 4.4318, 43.6816 ], [ 4.4319, 43.6817 ], [ 4.432, 43.6818 ], [ 4.4319, 43.6818 ], [ 4.4319, 43.6819 ], [ 4.4315, 43.6821 ], [ 4.4315, 43.6821 ], [ 4.4315, 43.6822 ], [ 4.4316, 43.6822 ], [ 4.4313, 43.6825 ], [ 4.4331, 43.6825 ], [ 4.4336, 43.6825 ], [ 4.4336, 43.6825 ], [ 4.4337, 43.6826 ], [ 4.4339, 43.6826 ], [ 4.4342, 43.6826 ], [ 4.4342, 43.6826 ], [ 4.4343, 43.6827 ], [ 4.4346, 43.6828 ], [ 4.4349, 43.6828 ], [ 4.4354, 43.6831 ], [ 4.4356, 43.6832 ], [ 4.4359, 43.6833 ], [ 4.4361, 43.6835 ], [ 4.4362, 43.6836 ], [ 4.4366, 43.6839 ], [ 4.4369, 43.6841 ], [ 4.4372, 43.6842 ], [ 4.4376, 43.6845 ], [ 4.4378, 43.6844 ], [ 4.4376, 43.6841 ], [ 4.4376, 43.6841 ], [ 4.4378, 43.684 ], [ 4.4379, 43.6839 ], [ 4.4379, 43.6835 ], [ 4.438, 43.6827 ] ] ], "type": "Polygon" }, "id": "2", "properties": { "code_commune": "30258", "code_departement": "30", "code_qp": "QP030009", "commune_qp": "Saint-Gilles", "nom_commune": "Saint-Gilles", "nom_qp": "Sabatot - Centre Ancien" }, "type": "Feature" }, { "bbox": [ 2.3637, 43.2054, 2.3794, 43.2191 ], "geometry": { "coordinates": [ [ [ 2.3743, 43.218 ], [ 2.3742, 43.2177 ], [ 2.3741, 43.2174 ], [ 2.3741, 43.2174 ], [ 2.374, 43.2175 ], [ 2.3738, 43.2173 ], [ 2.3732, 43.2176 ], [ 2.3725, 43.2179 ], [ 2.3723, 43.218 ], [ 2.3717, 43.2173 ], [ 2.3714, 43.2171 ], [ 2.3713, 43.2171 ], [ 2.3712, 43.217 ], [ 2.3708, 43.2165 ], [ 2.3704, 43.2162 ], [ 2.3702, 43.2163 ], [ 2.3702, 43.2163 ], [ 2.3699, 43.2165 ], [ 2.3693, 43.2156 ], [ 2.3697, 43.2155 ], [ 2.37, 43.2153 ], [ 2.3689, 43.2141 ], [ 2.3688, 43.214 ], [ 2.3693, 43.2138 ], [ 2.3697, 43.2136 ], [ 2.3702, 43.2133 ], [ 2.3705, 43.2132 ], [ 2.3709, 43.213 ], [ 2.3711, 43.2129 ], [ 2.3716, 43.213 ], [ 2.3721, 43.2131 ], [ 2.3736, 43.2144 ], [ 2.3753, 43.2136 ], [ 2.3778, 43.2125 ], [ 2.3782, 43.2123 ], [ 2.3788, 43.212 ], [ 2.379, 43.2118 ], [ 2.3789, 43.2116 ], [ 2.3794, 43.2114 ], [ 2.3792, 43.2112 ], [ 2.3792, 43.2111 ], [ 2.3792, 43.2105 ], [ 2.3791, 43.2099 ], [ 2.3788, 43.21 ], [ 2.3786, 43.2097 ], [ 2.3783, 43.2088 ], [ 2.3782, 43.2088 ], [ 2.3781, 43.2082 ], [ 2.3777, 43.2083 ], [ 2.3776, 43.2079 ], [ 2.3776, 43.2079 ], [ 2.3776, 43.2075 ], [ 2.3774, 43.2075 ], [ 2.3774, 43.2073 ], [ 2.3774, 43.2073 ], [ 2.3774, 43.2072 ], [ 2.3776, 43.2072 ], [ 2.3775, 43.2069 ], [ 2.3775, 43.2068 ], [ 2.3783, 43.2068 ], [ 2.3783, 43.2068 ], [ 2.3786, 43.2068 ], [ 2.3787, 43.2067 ], [ 2.3788, 43.2062 ], [ 2.379, 43.2055 ], [ 2.3786, 43.2055 ], [ 2.3784, 43.2055 ], [ 2.3764, 43.2057 ], [ 2.3757, 43.2058 ], [ 2.3752, 43.2057 ], [ 2.3747, 43.2057 ], [ 2.3739, 43.2056 ], [ 2.373, 43.2054 ], [ 2.3728, 43.2054 ], [ 2.3724, 43.2061 ], [ 2.3723, 43.2064 ], [ 2.372, 43.2071 ], [ 2.3727, 43.207 ], [ 2.3734, 43.2069 ], [ 2.374, 43.2068 ], [ 2.3744, 43.2067 ], [ 2.3745, 43.2067 ], [ 2.3749, 43.2065 ], [ 2.3751, 43.2073 ], [ 2.3758, 43.2072 ], [ 2.3758, 43.2072 ], [ 2.3763, 43.2071 ], [ 2.3765, 43.2071 ], [ 2.3769, 43.207 ], [ 2.3768, 43.2072 ], [ 2.3769, 43.2075 ], [ 2.3767, 43.2076 ], [ 2.3768, 43.2082 ], [ 2.377, 43.2082 ], [ 2.377, 43.2087 ], [ 2.377, 43.2088 ], [ 2.3778, 43.2088 ], [ 2.3781, 43.2095 ], [ 2.378, 43.2096 ], [ 2.3782, 43.2098 ], [ 2.3781, 43.2098 ], [ 2.3784, 43.2102 ], [ 2.3776, 43.2105 ], [ 2.3773, 43.2106 ], [ 2.3768, 43.2108 ], [ 2.3757, 43.2112 ], [ 2.3721, 43.2126 ], [ 2.3718, 43.2126 ], [ 2.3717, 43.2126 ], [ 2.3713, 43.2124 ], [ 2.3712, 43.2124 ], [ 2.3717, 43.212 ], [ 2.3711, 43.2114 ], [ 2.3711, 43.2114 ], [ 2.3709, 43.2112 ], [ 2.3709, 43.2112 ], [ 2.3706, 43.211 ], [ 2.3701, 43.2113 ], [ 2.3701, 43.2113 ], [ 2.37, 43.2113 ], [ 2.3692, 43.2117 ], [ 2.3691, 43.2117 ], [ 2.3693, 43.2119 ], [ 2.3694, 43.212 ], [ 2.3691, 43.2121 ], [ 2.3686, 43.2123 ], [ 2.3685, 43.2124 ], [ 2.3685, 43.2124 ], [ 2.3683, 43.2123 ], [ 2.3683, 43.2123 ], [ 2.3683, 43.2123 ], [ 2.3681, 43.2123 ], [ 2.3678, 43.2124 ], [ 2.3676, 43.2124 ], [ 2.3669, 43.2126 ], [ 2.3668, 43.2126 ], [ 2.3664, 43.2127 ], [ 2.3666, 43.2131 ], [ 2.3667, 43.2133 ], [ 2.3662, 43.2136 ], [ 2.3661, 43.2136 ], [ 2.3665, 43.2144 ], [ 2.3665, 43.2145 ], [ 2.3666, 43.2147 ], [ 2.3668, 43.2149 ], [ 2.3664, 43.215 ], [ 2.3654, 43.2152 ], [ 2.3654, 43.2155 ], [ 2.3653, 43.2156 ], [ 2.3651, 43.2157 ], [ 2.365, 43.2157 ], [ 2.3646, 43.2158 ], [ 2.3645, 43.2158 ], [ 2.3645, 43.2158 ], [ 2.3644, 43.2158 ], [ 2.3644, 43.2159 ], [ 2.3644, 43.2159 ], [ 2.3644, 43.216 ], [ 2.3644, 43.2161 ], [ 2.3637, 43.2161 ], [ 2.3638, 43.2162 ], [ 2.3639, 43.2167 ], [ 2.3642, 43.2165 ], [ 2.3646, 43.2164 ], [ 2.3647, 43.2163 ], [ 2.3652, 43.2162 ], [ 2.3654, 43.2164 ], [ 2.3656, 43.2165 ], [ 2.3659, 43.2163 ], [ 2.3661, 43.2164 ], [ 2.3663, 43.2164 ], [ 2.3669, 43.2161 ], [ 2.3672, 43.2168 ], [ 2.3675, 43.2175 ], [ 2.3676, 43.2177 ], [ 2.3676, 43.2178 ], [ 2.368, 43.2184 ], [ 2.3681, 43.2185 ], [ 2.3679, 43.2188 ], [ 2.3678, 43.2188 ], [ 2.368, 43.2188 ], [ 2.3683, 43.2189 ], [ 2.3688, 43.2189 ], [ 2.3697, 43.2189 ], [ 2.3701, 43.219 ], [ 2.3709, 43.219 ], [ 2.3713, 43.219 ], [ 2.3719, 43.2191 ], [ 2.3722, 43.2191 ], [ 2.3722, 43.219 ], [ 2.3725, 43.2188 ], [ 2.3735, 43.2184 ], [ 2.3743, 43.218 ] ] ], "type": "Polygon" }, "id": "3", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011002", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "La Conte - Ozanam" }, "type": "Feature" }, { "bbox": [ 4.2702, 43.6938, 4.2823, 43.701 ], "geometry": { "coordinates": [ [ [ 4.2819, 43.7001 ], [ 4.2818, 43.7 ], [ 4.2818, 43.6999 ], [ 4.2817, 43.6999 ], [ 4.2817, 43.6998 ], [ 4.2818, 43.6996 ], [ 4.2818, 43.6996 ], [ 4.2818, 43.6996 ], [ 4.2819, 43.6995 ], [ 4.2823, 43.6994 ], [ 4.2822, 43.6994 ], [ 4.2821, 43.6993 ], [ 4.282, 43.6993 ], [ 4.2815, 43.6992 ], [ 4.2818, 43.6986 ], [ 4.2815, 43.6985 ], [ 4.2813, 43.6985 ], [ 4.2813, 43.6984 ], [ 4.2817, 43.6974 ], [ 4.2817, 43.6974 ], [ 4.281, 43.6972 ], [ 4.2808, 43.6972 ], [ 4.2806, 43.6971 ], [ 4.2804, 43.6971 ], [ 4.2802, 43.697 ], [ 4.28, 43.697 ], [ 4.2793, 43.6971 ], [ 4.2786, 43.6972 ], [ 4.2785, 43.6974 ], [ 4.2785, 43.6975 ], [ 4.2783, 43.6974 ], [ 4.2782, 43.6974 ], [ 4.2782, 43.6974 ], [ 4.2782, 43.6972 ], [ 4.2782, 43.6971 ], [ 4.2782, 43.6969 ], [ 4.2782, 43.6969 ], [ 4.2782, 43.6968 ], [ 4.2772, 43.6966 ], [ 4.2771, 43.6968 ], [ 4.2769, 43.6973 ], [ 4.2759, 43.6971 ], [ 4.2758, 43.6971 ], [ 4.2759, 43.6969 ], [ 4.2759, 43.6968 ], [ 4.2756, 43.6967 ], [ 4.2757, 43.6964 ], [ 4.2758, 43.6963 ], [ 4.2752, 43.6962 ], [ 4.2753, 43.6961 ], [ 4.2754, 43.696 ], [ 4.2748, 43.6958 ], [ 4.2745, 43.6963 ], [ 4.2742, 43.6967 ], [ 4.2741, 43.697 ], [ 4.274, 43.6971 ], [ 4.2739, 43.697 ], [ 4.2737, 43.697 ], [ 4.2734, 43.6969 ], [ 4.2735, 43.6966 ], [ 4.2736, 43.6965 ], [ 4.2737, 43.6964 ], [ 4.2739, 43.696 ], [ 4.2738, 43.696 ], [ 4.2739, 43.6959 ], [ 4.2737, 43.6956 ], [ 4.2738, 43.6956 ], [ 4.2734, 43.695 ], [ 4.273, 43.6951 ], [ 4.2728, 43.6947 ], [ 4.2731, 43.6946 ], [ 4.273, 43.6946 ], [ 4.2729, 43.6943 ], [ 4.2731, 43.6942 ], [ 4.2729, 43.6938 ], [ 4.2722, 43.6941 ], [ 4.2721, 43.6942 ], [ 4.2707, 43.6947 ], [ 4.2702, 43.695 ], [ 4.2703, 43.6953 ], [ 4.2702, 43.6953 ], [ 4.2705, 43.696 ], [ 4.2705, 43.6961 ], [ 4.2707, 43.6965 ], [ 4.271, 43.697 ], [ 4.2711, 43.6974 ], [ 4.2715, 43.6975 ], [ 4.2716, 43.6976 ], [ 4.272, 43.6976 ], [ 4.2725, 43.6977 ], [ 4.2726, 43.6977 ], [ 4.2728, 43.6978 ], [ 4.2729, 43.6978 ], [ 4.2732, 43.6979 ], [ 4.2733, 43.698 ], [ 4.2733, 43.698 ], [ 4.2734, 43.698 ], [ 4.2734, 43.698 ], [ 4.2735, 43.698 ], [ 4.2735, 43.698 ], [ 4.2737, 43.6976 ], [ 4.2753, 43.6981 ], [ 4.2755, 43.6982 ], [ 4.2765, 43.6985 ], [ 4.2763, 43.6988 ], [ 4.2763, 43.6989 ], [ 4.2763, 43.699 ], [ 4.2772, 43.6992 ], [ 4.2772, 43.6993 ], [ 4.2775, 43.6993 ], [ 4.2775, 43.6994 ], [ 4.2775, 43.6994 ], [ 4.2775, 43.6995 ], [ 4.2777, 43.6995 ], [ 4.278, 43.6996 ], [ 4.2783, 43.6996 ], [ 4.2783, 43.6997 ], [ 4.2797, 43.7 ], [ 4.2798, 43.7001 ], [ 4.2798, 43.7001 ], [ 4.2798, 43.7001 ], [ 4.2797, 43.7004 ], [ 4.2802, 43.7005 ], [ 4.2803, 43.7005 ], [ 4.2805, 43.7007 ], [ 4.2809, 43.7009 ], [ 4.2811, 43.701 ], [ 4.2811, 43.701 ], [ 4.2812, 43.701 ], [ 4.2814, 43.701 ], [ 4.2817, 43.7009 ], [ 4.2818, 43.7009 ], [ 4.2818, 43.7007 ], [ 4.2818, 43.7006 ], [ 4.2818, 43.7006 ], [ 4.2819, 43.7004 ], [ 4.282, 43.7003 ], [ 4.282, 43.7001 ], [ 4.2819, 43.7001 ] ] ], "type": "Polygon" }, "id": "4", "properties": { "code_commune": "30341", "code_departement": "30", "code_qp": "QP030015", "commune_qp": "Vauvert", "nom_commune": "Vauvert", "nom_qp": "Les Costières" }, "type": "Feature" }, { "bbox": [ 3.6599, 43.4106, 3.667, 43.4154 ], "geometry": { "coordinates": [ [ [ 3.667, 43.4154 ], [ 3.667, 43.4145 ], [ 3.667, 43.4143 ], [ 3.6669, 43.4141 ], [ 3.6668, 43.4139 ], [ 3.6665, 43.4137 ], [ 3.666, 43.4133 ], [ 3.6653, 43.4128 ], [ 3.6652, 43.4127 ], [ 3.6653, 43.4126 ], [ 3.6654, 43.4124 ], [ 3.6653, 43.4122 ], [ 3.6653, 43.4121 ], [ 3.6653, 43.412 ], [ 3.6644, 43.4114 ], [ 3.6638, 43.4118 ], [ 3.6635, 43.4115 ], [ 3.664, 43.4111 ], [ 3.6637, 43.4109 ], [ 3.6631, 43.4113 ], [ 3.6623, 43.4106 ], [ 3.6619, 43.4109 ], [ 3.6613, 43.4114 ], [ 3.6606, 43.4119 ], [ 3.6606, 43.4119 ], [ 3.6602, 43.4121 ], [ 3.6601, 43.4121 ], [ 3.66, 43.4121 ], [ 3.66, 43.4122 ], [ 3.6599, 43.4124 ], [ 3.6599, 43.4125 ], [ 3.6608, 43.4131 ], [ 3.661, 43.4132 ], [ 3.6623, 43.4141 ], [ 3.6624, 43.4141 ], [ 3.6625, 43.4142 ], [ 3.6626, 43.4142 ], [ 3.6627, 43.4143 ], [ 3.6628, 43.4145 ], [ 3.6632, 43.4144 ], [ 3.6635, 43.4142 ], [ 3.6636, 43.4142 ], [ 3.6637, 43.4143 ], [ 3.6642, 43.4146 ], [ 3.6644, 43.4145 ], [ 3.6648, 43.4143 ], [ 3.665, 43.4144 ], [ 3.6652, 43.4142 ], [ 3.6669, 43.4154 ], [ 3.667, 43.4154 ], [ 3.667, 43.4154 ] ] ], "type": "Polygon" }, "id": "5", "properties": { "code_commune": "34301", "code_departement": "34", "code_qp": "QP034017", "commune_qp": "Sète", "nom_commune": "Sète", "nom_qp": "Ile De Thau" }, "type": "Feature" }, { "bbox": [ 2.8805, 42.7129, 2.902, 42.7278 ], "geometry": { "coordinates": [ [ [ 2.902, 42.7151 ], [ 2.902, 42.7149 ], [ 2.902, 42.7148 ], [ 2.9019, 42.7146 ], [ 2.9019, 42.7145 ], [ 2.9018, 42.7144 ], [ 2.9018, 42.7143 ], [ 2.9016, 42.7141 ], [ 2.9016, 42.7139 ], [ 2.9014, 42.7137 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9012, 42.7135 ], [ 2.9011, 42.7134 ], [ 2.9009, 42.7133 ], [ 2.9008, 42.7132 ], [ 2.9006, 42.713 ], [ 2.9005, 42.713 ], [ 2.9005, 42.7129 ], [ 2.9005, 42.7129 ], [ 2.9004, 42.713 ], [ 2.9002, 42.7131 ], [ 2.8998, 42.7135 ], [ 2.8993, 42.714 ], [ 2.8993, 42.714 ], [ 2.8991, 42.7144 ], [ 2.8987, 42.7143 ], [ 2.8984, 42.7142 ], [ 2.8983, 42.7142 ], [ 2.898, 42.7141 ], [ 2.8978, 42.714 ], [ 2.8974, 42.7139 ], [ 2.8972, 42.7139 ], [ 2.897, 42.7138 ], [ 2.8967, 42.7138 ], [ 2.8966, 42.7138 ], [ 2.8965, 42.7137 ], [ 2.8963, 42.7137 ], [ 2.8961, 42.7137 ], [ 2.8959, 42.7137 ], [ 2.8958, 42.7138 ], [ 2.8958, 42.7139 ], [ 2.8958, 42.714 ], [ 2.8957, 42.7142 ], [ 2.8957, 42.7145 ], [ 2.8956, 42.7146 ], [ 2.8956, 42.715 ], [ 2.8955, 42.7153 ], [ 2.8955, 42.7155 ], [ 2.8955, 42.7157 ], [ 2.8955, 42.7159 ], [ 2.8956, 42.7162 ], [ 2.8956, 42.7164 ], [ 2.8957, 42.7165 ], [ 2.8957, 42.7167 ], [ 2.8953, 42.7167 ], [ 2.8951, 42.7168 ], [ 2.8948, 42.7169 ], [ 2.8946, 42.7168 ], [ 2.8943, 42.7168 ], [ 2.8939, 42.7169 ], [ 2.8934, 42.7171 ], [ 2.8931, 42.7172 ], [ 2.8927, 42.7173 ], [ 2.8924, 42.7174 ], [ 2.8918, 42.7174 ], [ 2.8913, 42.7175 ], [ 2.8909, 42.7175 ], [ 2.8908, 42.7174 ], [ 2.8909, 42.7173 ], [ 2.8908, 42.7173 ], [ 2.8908, 42.7173 ], [ 2.8906, 42.7173 ], [ 2.8902, 42.7174 ], [ 2.8893, 42.7175 ], [ 2.8881, 42.7176 ], [ 2.8881, 42.7178 ], [ 2.8881, 42.718 ], [ 2.888, 42.7182 ], [ 2.8881, 42.7183 ], [ 2.8882, 42.7184 ], [ 2.8882, 42.7185 ], [ 2.8882, 42.7185 ], [ 2.8882, 42.7186 ], [ 2.8883, 42.7188 ], [ 2.8882, 42.7188 ], [ 2.8882, 42.7189 ], [ 2.8882, 42.7189 ], [ 2.8881, 42.719 ], [ 2.888, 42.7198 ], [ 2.8875, 42.7198 ], [ 2.8874, 42.7198 ], [ 2.8873, 42.7198 ], [ 2.8873, 42.7198 ], [ 2.8872, 42.7199 ], [ 2.8868, 42.7198 ], [ 2.8865, 42.7197 ], [ 2.8863, 42.7204 ], [ 2.8861, 42.7208 ], [ 2.886, 42.7208 ], [ 2.8858, 42.7208 ], [ 2.8857, 42.7208 ], [ 2.8857, 42.7208 ], [ 2.8856, 42.7207 ], [ 2.8853, 42.7205 ], [ 2.8852, 42.7206 ], [ 2.8849, 42.7209 ], [ 2.8848, 42.721 ], [ 2.8842, 42.721 ], [ 2.8843, 42.721 ], [ 2.8842, 42.721 ], [ 2.8836, 42.7212 ], [ 2.8834, 42.7213 ], [ 2.8831, 42.7213 ], [ 2.8834, 42.7213 ], [ 2.8835, 42.7213 ], [ 2.8837, 42.7214 ], [ 2.8837, 42.7215 ], [ 2.8836, 42.7219 ], [ 2.8835, 42.7219 ], [ 2.8835, 42.7221 ], [ 2.8834, 42.7222 ], [ 2.8834, 42.7224 ], [ 2.8827, 42.7224 ], [ 2.8825, 42.7224 ], [ 2.8823, 42.7224 ], [ 2.8818, 42.7224 ], [ 2.8817, 42.7224 ], [ 2.8815, 42.7224 ], [ 2.8811, 42.7224 ], [ 2.8811, 42.7227 ], [ 2.8811, 42.7229 ], [ 2.8811, 42.7231 ], [ 2.8811, 42.7231 ], [ 2.881, 42.7231 ], [ 2.881, 42.7233 ], [ 2.8809, 42.7234 ], [ 2.8811, 42.7234 ], [ 2.881, 42.7237 ], [ 2.8811, 42.7237 ], [ 2.8813, 42.7237 ], [ 2.8814, 42.7237 ], [ 2.8813, 42.7238 ], [ 2.8813, 42.724 ], [ 2.8815, 42.724 ], [ 2.8813, 42.7245 ], [ 2.8812, 42.7246 ], [ 2.8819, 42.7247 ], [ 2.8816, 42.725 ], [ 2.881, 42.7255 ], [ 2.8806, 42.7258 ], [ 2.8807, 42.7259 ], [ 2.8807, 42.7259 ], [ 2.8806, 42.726 ], [ 2.8806, 42.7261 ], [ 2.8805, 42.7261 ], [ 2.8805, 42.7262 ], [ 2.8805, 42.7262 ], [ 2.8805, 42.7263 ], [ 2.8806, 42.7264 ], [ 2.8806, 42.7265 ], [ 2.8806, 42.7266 ], [ 2.8806, 42.7267 ], [ 2.8807, 42.727 ], [ 2.8807, 42.7273 ], [ 2.8813, 42.7272 ], [ 2.8814, 42.7272 ], [ 2.8817, 42.7272 ], [ 2.8818, 42.7272 ], [ 2.8822, 42.7271 ], [ 2.8823, 42.7271 ], [ 2.8825, 42.727 ], [ 2.8827, 42.727 ], [ 2.8827, 42.727 ], [ 2.8829, 42.7271 ], [ 2.883, 42.727 ], [ 2.8831, 42.7271 ], [ 2.8836, 42.7274 ], [ 2.8836, 42.7274 ], [ 2.8838, 42.7275 ], [ 2.8841, 42.7277 ], [ 2.8842, 42.7277 ], [ 2.8844, 42.7277 ], [ 2.8849, 42.7278 ], [ 2.885, 42.7278 ], [ 2.8851, 42.7278 ], [ 2.8854, 42.7277 ], [ 2.8854, 42.7276 ], [ 2.8854, 42.7275 ], [ 2.8854, 42.7269 ], [ 2.8861, 42.7268 ], [ 2.8859, 42.7267 ], [ 2.8858, 42.7266 ], [ 2.8859, 42.7264 ], [ 2.886, 42.7261 ], [ 2.886, 42.7261 ], [ 2.8861, 42.7261 ], [ 2.886, 42.7259 ], [ 2.886, 42.7258 ], [ 2.886, 42.7258 ], [ 2.886, 42.7258 ], [ 2.8859, 42.7257 ], [ 2.8858, 42.7254 ], [ 2.8858, 42.7252 ], [ 2.8858, 42.7252 ], [ 2.8857, 42.7249 ], [ 2.8857, 42.7247 ], [ 2.8856, 42.7244 ], [ 2.8856, 42.7242 ], [ 2.8855, 42.7241 ], [ 2.8855, 42.7241 ], [ 2.8853, 42.7242 ], [ 2.8849, 42.7242 ], [ 2.8841, 42.7243 ], [ 2.884, 42.7243 ], [ 2.884, 42.7243 ], [ 2.8838, 42.7231 ], [ 2.8837, 42.723 ], [ 2.884, 42.7228 ], [ 2.8843, 42.7225 ], [ 2.8848, 42.7221 ], [ 2.885, 42.7219 ], [ 2.8851, 42.7219 ], [ 2.8853, 42.722 ], [ 2.8853, 42.722 ], [ 2.8854, 42.722 ], [ 2.8855, 42.7221 ], [ 2.8855, 42.7221 ], [ 2.8856, 42.7221 ], [ 2.8856, 42.7221 ], [ 2.8857, 42.7222 ], [ 2.8858, 42.7222 ], [ 2.886, 42.7222 ], [ 2.8861, 42.7222 ], [ 2.8862, 42.7222 ], [ 2.8863, 42.7223 ], [ 2.8866, 42.7222 ], [ 2.8866, 42.7222 ], [ 2.8869, 42.7222 ], [ 2.8871, 42.7223 ], [ 2.8871, 42.7224 ], [ 2.8875, 42.7224 ], [ 2.8877, 42.7224 ], [ 2.888, 42.7224 ], [ 2.8883, 42.7225 ], [ 2.8883, 42.7223 ], [ 2.8884, 42.7222 ], [ 2.8885, 42.722 ], [ 2.8886, 42.7219 ], [ 2.8888, 42.7216 ], [ 2.8888, 42.7216 ], [ 2.8886, 42.7215 ], [ 2.8885, 42.7214 ], [ 2.8883, 42.7214 ], [ 2.8882, 42.7213 ], [ 2.8879, 42.7212 ], [ 2.8879, 42.7211 ], [ 2.8881, 42.721 ], [ 2.8882, 42.7209 ], [ 2.8883, 42.7209 ], [ 2.8885, 42.7209 ], [ 2.8888, 42.7208 ], [ 2.889, 42.7208 ], [ 2.8891, 42.7208 ], [ 2.8892, 42.7207 ], [ 2.8892, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8895, 42.7207 ], [ 2.8895, 42.7206 ], [ 2.8897, 42.7205 ], [ 2.8897, 42.7204 ], [ 2.8898, 42.7204 ], [ 2.89, 42.7204 ], [ 2.8901, 42.7203 ], [ 2.8904, 42.7202 ], [ 2.8907, 42.7201 ], [ 2.8909, 42.7201 ], [ 2.891, 42.7201 ], [ 2.8911, 42.7201 ], [ 2.8911, 42.72 ], [ 2.8912, 42.72 ], [ 2.8913, 42.72 ], [ 2.8918, 42.7198 ], [ 2.8919, 42.7197 ], [ 2.8923, 42.7196 ], [ 2.8923, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8925, 42.7196 ], [ 2.8928, 42.7194 ], [ 2.893, 42.7192 ], [ 2.8924, 42.7189 ], [ 2.8924, 42.7188 ], [ 2.8923, 42.7188 ], [ 2.8922, 42.7188 ], [ 2.892, 42.7188 ], [ 2.8918, 42.7188 ], [ 2.8918, 42.7187 ], [ 2.8917, 42.7184 ], [ 2.8918, 42.7184 ], [ 2.8921, 42.7183 ], [ 2.8925, 42.7182 ], [ 2.8933, 42.7181 ], [ 2.8933, 42.7182 ], [ 2.8942, 42.7184 ], [ 2.8953, 42.7186 ], [ 2.8953, 42.7184 ], [ 2.8955, 42.718 ], [ 2.8956, 42.7176 ], [ 2.8956, 42.7176 ], [ 2.8956, 42.7173 ], [ 2.8956, 42.7173 ], [ 2.8957, 42.7173 ], [ 2.8959, 42.7174 ], [ 2.8961, 42.7174 ], [ 2.8963, 42.7175 ], [ 2.8967, 42.7176 ], [ 2.8972, 42.7177 ], [ 2.8975, 42.7178 ], [ 2.8978, 42.7178 ], [ 2.898, 42.7179 ], [ 2.8984, 42.7179 ], [ 2.8987, 42.718 ], [ 2.8988, 42.7175 ], [ 2.8993, 42.7177 ], [ 2.8995, 42.7174 ], [ 2.8997, 42.7172 ], [ 2.9, 42.7169 ], [ 2.9001, 42.7168 ], [ 2.9002, 42.7167 ], [ 2.9003, 42.7166 ], [ 2.9011, 42.7167 ], [ 2.9011, 42.7165 ], [ 2.901, 42.7165 ], [ 2.9011, 42.7164 ], [ 2.9011, 42.7162 ], [ 2.9011, 42.716 ], [ 2.901, 42.7159 ], [ 2.9007, 42.7156 ], [ 2.9004, 42.7153 ], [ 2.9005, 42.7151 ], [ 2.9006, 42.7152 ], [ 2.9008, 42.7153 ], [ 2.9011, 42.7154 ], [ 2.9015, 42.7153 ], [ 2.9016, 42.7153 ], [ 2.9018, 42.7152 ], [ 2.902, 42.7152 ], [ 2.902, 42.7151 ] ] ], "type": "Polygon" }, "id": "6", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066005", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Diagonale Du Haut - Moyen-Vernet" }, "type": "Feature" }, { "bbox": [ 2.8756, 42.6876, 2.8837, 42.7006 ], "geometry": { "coordinates": [ [ [ 2.8837, 42.6899 ], [ 2.8836, 42.6899 ], [ 2.8831, 42.6897 ], [ 2.8827, 42.6896 ], [ 2.8826, 42.6896 ], [ 2.8825, 42.6895 ], [ 2.8824, 42.6896 ], [ 2.8818, 42.6896 ], [ 2.8816, 42.6895 ], [ 2.8816, 42.6894 ], [ 2.8816, 42.6893 ], [ 2.8816, 42.6893 ], [ 2.8817, 42.6893 ], [ 2.8816, 42.6891 ], [ 2.8816, 42.689 ], [ 2.8816, 42.6889 ], [ 2.8816, 42.6888 ], [ 2.8816, 42.6888 ], [ 2.8816, 42.6885 ], [ 2.8816, 42.6884 ], [ 2.8816, 42.6883 ], [ 2.8818, 42.6882 ], [ 2.8818, 42.6881 ], [ 2.8818, 42.6878 ], [ 2.8814, 42.6878 ], [ 2.8813, 42.6878 ], [ 2.8813, 42.6876 ], [ 2.8809, 42.6876 ], [ 2.8809, 42.6877 ], [ 2.8809, 42.6881 ], [ 2.8806, 42.688 ], [ 2.8805, 42.688 ], [ 2.8804, 42.6883 ], [ 2.8804, 42.6884 ], [ 2.8794, 42.6881 ], [ 2.8794, 42.6882 ], [ 2.879, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6882 ], [ 2.8789, 42.6883 ], [ 2.8786, 42.6882 ], [ 2.8782, 42.6881 ], [ 2.8781, 42.6883 ], [ 2.878, 42.6885 ], [ 2.8779, 42.6888 ], [ 2.8777, 42.6891 ], [ 2.8777, 42.6891 ], [ 2.8782, 42.6893 ], [ 2.8787, 42.6896 ], [ 2.8792, 42.6898 ], [ 2.8797, 42.6901 ], [ 2.88, 42.6902 ], [ 2.8804, 42.6904 ], [ 2.8808, 42.6906 ], [ 2.881, 42.6908 ], [ 2.8812, 42.6909 ], [ 2.8815, 42.691 ], [ 2.8815, 42.6911 ], [ 2.8813, 42.6915 ], [ 2.8813, 42.6916 ], [ 2.8812, 42.6916 ], [ 2.8808, 42.6917 ], [ 2.8806, 42.6917 ], [ 2.8804, 42.6918 ], [ 2.8803, 42.6919 ], [ 2.8802, 42.692 ], [ 2.8801, 42.6921 ], [ 2.8799, 42.6924 ], [ 2.8796, 42.6926 ], [ 2.8794, 42.6927 ], [ 2.8791, 42.6927 ], [ 2.8789, 42.6928 ], [ 2.8789, 42.6928 ], [ 2.8788, 42.6928 ], [ 2.8788, 42.6928 ], [ 2.8787, 42.6929 ], [ 2.8786, 42.6929 ], [ 2.8788, 42.6931 ], [ 2.8787, 42.6932 ], [ 2.8785, 42.6935 ], [ 2.878, 42.6934 ], [ 2.8771, 42.6931 ], [ 2.8769, 42.693 ], [ 2.8768, 42.6931 ], [ 2.8767, 42.6931 ], [ 2.8767, 42.6932 ], [ 2.8766, 42.6933 ], [ 2.8765, 42.6934 ], [ 2.8765, 42.6934 ], [ 2.8765, 42.6935 ], [ 2.8765, 42.6938 ], [ 2.8765, 42.694 ], [ 2.8765, 42.6941 ], [ 2.8765, 42.6944 ], [ 2.8763, 42.6943 ], [ 2.8763, 42.6944 ], [ 2.8762, 42.6946 ], [ 2.8761, 42.6949 ], [ 2.876, 42.6953 ], [ 2.876, 42.6955 ], [ 2.876, 42.6956 ], [ 2.8761, 42.6956 ], [ 2.8763, 42.6956 ], [ 2.8764, 42.6956 ], [ 2.8764, 42.6956 ], [ 2.8765, 42.6957 ], [ 2.8766, 42.6957 ], [ 2.8767, 42.6958 ], [ 2.8769, 42.6959 ], [ 2.8768, 42.696 ], [ 2.8768, 42.6964 ], [ 2.8768, 42.6968 ], [ 2.8768, 42.6969 ], [ 2.8768, 42.697 ], [ 2.8767, 42.6972 ], [ 2.8766, 42.6973 ], [ 2.8766, 42.6973 ], [ 2.8765, 42.6974 ], [ 2.8763, 42.6974 ], [ 2.876, 42.6974 ], [ 2.876, 42.6977 ], [ 2.876, 42.698 ], [ 2.8759, 42.6983 ], [ 2.8759, 42.6985 ], [ 2.8759, 42.6986 ], [ 2.8758, 42.6986 ], [ 2.8757, 42.699 ], [ 2.8756, 42.6991 ], [ 2.8761, 42.6991 ], [ 2.8766, 42.6992 ], [ 2.8771, 42.6993 ], [ 2.8772, 42.6993 ], [ 2.8774, 42.6993 ], [ 2.8778, 42.6994 ], [ 2.8778, 42.6994 ], [ 2.878, 42.6995 ], [ 2.8782, 42.6996 ], [ 2.8785, 42.6996 ], [ 2.8789, 42.6998 ], [ 2.8791, 42.6999 ], [ 2.8794, 42.7 ], [ 2.8799, 42.7001 ], [ 2.8808, 42.7004 ], [ 2.8815, 42.7006 ], [ 2.8817, 42.7006 ], [ 2.8817, 42.7003 ], [ 2.8814, 42.7003 ], [ 2.8814, 42.7003 ], [ 2.8809, 42.7001 ], [ 2.881, 42.6996 ], [ 2.8811, 42.6993 ], [ 2.8811, 42.6992 ], [ 2.8803, 42.6991 ], [ 2.8798, 42.6991 ], [ 2.8794, 42.699 ], [ 2.8789, 42.6989 ], [ 2.8785, 42.6989 ], [ 2.8781, 42.6988 ], [ 2.878, 42.6988 ], [ 2.8778, 42.6988 ], [ 2.8778, 42.6987 ], [ 2.8778, 42.6985 ], [ 2.8778, 42.6982 ], [ 2.8779, 42.698 ], [ 2.8779, 42.6976 ], [ 2.878, 42.6977 ], [ 2.8783, 42.6977 ], [ 2.8784, 42.6972 ], [ 2.8787, 42.6967 ], [ 2.8798, 42.6968 ], [ 2.8798, 42.6968 ], [ 2.8799, 42.6968 ], [ 2.8801, 42.6968 ], [ 2.8804, 42.6968 ], [ 2.8805, 42.6968 ], [ 2.881, 42.6969 ], [ 2.8812, 42.6969 ], [ 2.8812, 42.6969 ], [ 2.8814, 42.6969 ], [ 2.8815, 42.6969 ], [ 2.8815, 42.6969 ], [ 2.8815, 42.6971 ], [ 2.8816, 42.6971 ], [ 2.8816, 42.6972 ], [ 2.8822, 42.6973 ], [ 2.8822, 42.6972 ], [ 2.8823, 42.6969 ], [ 2.8823, 42.6969 ], [ 2.8826, 42.697 ], [ 2.8829, 42.6965 ], [ 2.8831, 42.6963 ], [ 2.8831, 42.6962 ], [ 2.8833, 42.696 ], [ 2.8832, 42.6959 ], [ 2.8828, 42.6958 ], [ 2.8829, 42.6956 ], [ 2.8832, 42.6957 ], [ 2.8833, 42.6955 ], [ 2.8832, 42.6955 ], [ 2.8832, 42.6954 ], [ 2.883, 42.6953 ], [ 2.8823, 42.6952 ], [ 2.8823, 42.6952 ], [ 2.8821, 42.6951 ], [ 2.882, 42.6953 ], [ 2.8813, 42.6952 ], [ 2.8811, 42.6951 ], [ 2.8812, 42.6946 ], [ 2.8813, 42.6942 ], [ 2.8814, 42.6939 ], [ 2.8815, 42.6937 ], [ 2.8808, 42.6936 ], [ 2.8805, 42.6935 ], [ 2.881, 42.6922 ], [ 2.8816, 42.6921 ], [ 2.8817, 42.6921 ], [ 2.8817, 42.692 ], [ 2.8818, 42.6919 ], [ 2.8824, 42.6917 ], [ 2.8826, 42.6917 ], [ 2.8827, 42.6915 ], [ 2.8827, 42.6916 ], [ 2.8831, 42.691 ], [ 2.883, 42.691 ], [ 2.8833, 42.6905 ], [ 2.8835, 42.6901 ], [ 2.8836, 42.69 ], [ 2.8837, 42.6899 ] ] ], "type": "Polygon" }, "id": "7", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066003", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Gare" }, "type": "Feature" }, { "bbox": [ 2.3465, 43.2102, 2.3579, 43.2164 ], "geometry": { "coordinates": [ [ [ 2.3579, 43.2105 ], [ 2.3578, 43.2103 ], [ 2.3577, 43.2102 ], [ 2.3571, 43.2102 ], [ 2.3567, 43.2102 ], [ 2.3562, 43.2102 ], [ 2.356, 43.2103 ], [ 2.3558, 43.2103 ], [ 2.3552, 43.2104 ], [ 2.3552, 43.2105 ], [ 2.3473, 43.2105 ], [ 2.3472, 43.2105 ], [ 2.347, 43.211 ], [ 2.3468, 43.2118 ], [ 2.3466, 43.2118 ], [ 2.3465, 43.2124 ], [ 2.3466, 43.2125 ], [ 2.3465, 43.2126 ], [ 2.3465, 43.2127 ], [ 2.3466, 43.2128 ], [ 2.3468, 43.2128 ], [ 2.3471, 43.2134 ], [ 2.3471, 43.2134 ], [ 2.3475, 43.2142 ], [ 2.3474, 43.2142 ], [ 2.348, 43.2151 ], [ 2.348, 43.2151 ], [ 2.3479, 43.2151 ], [ 2.3483, 43.2157 ], [ 2.3487, 43.2164 ], [ 2.3489, 43.2164 ], [ 2.3489, 43.2164 ], [ 2.353, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3536, 43.2163 ], [ 2.3539, 43.2156 ], [ 2.3544, 43.2148 ], [ 2.3544, 43.2148 ], [ 2.3548, 43.2141 ], [ 2.355, 43.2138 ], [ 2.3554, 43.213 ], [ 2.3554, 43.2126 ], [ 2.3555, 43.2126 ], [ 2.3554, 43.2126 ], [ 2.3552, 43.2118 ], [ 2.3555, 43.2119 ], [ 2.3556, 43.2119 ], [ 2.3558, 43.2118 ], [ 2.3573, 43.2116 ], [ 2.3575, 43.2116 ], [ 2.3575, 43.2117 ], [ 2.3576, 43.2116 ], [ 2.3576, 43.2114 ], [ 2.3579, 43.2105 ] ] ], "type": "Polygon" }, "id": "8", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011004", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Bastide Pont-Vieux" }, "type": "Feature" }, { "bbox": [ 2.9955, 43.1804, 3.0095, 43.1877 ], "geometry": { "coordinates": [ [ [ 3.0095, 43.1855 ], [ 3.0095, 43.1854 ], [ 3.0095, 43.1853 ], [ 3.0095, 43.1853 ], [ 3.0094, 43.1852 ], [ 3.0094, 43.1851 ], [ 3.0093, 43.185 ], [ 3.0091, 43.1848 ], [ 3.009, 43.1846 ], [ 3.0089, 43.1845 ], [ 3.0082, 43.1847 ], [ 3.0082, 43.1847 ], [ 3.0078, 43.1848 ], [ 3.0077, 43.1848 ], [ 3.0076, 43.1847 ], [ 3.0075, 43.1846 ], [ 3.0075, 43.1845 ], [ 3.0074, 43.1844 ], [ 3.0076, 43.1844 ], [ 3.0075, 43.1843 ], [ 3.0075, 43.1842 ], [ 3.0074, 43.1841 ], [ 3.0073, 43.1841 ], [ 3.0072, 43.184 ], [ 3.0072, 43.1839 ], [ 3.007, 43.1838 ], [ 3.007, 43.1837 ], [ 3.0068, 43.1837 ], [ 3.0067, 43.1835 ], [ 3.0066, 43.1834 ], [ 3.0066, 43.1834 ], [ 3.0065, 43.1833 ], [ 3.0065, 43.1833 ], [ 3.0064, 43.1833 ], [ 3.0059, 43.1834 ], [ 3.0058, 43.1834 ], [ 3.0057, 43.1835 ], [ 3.0056, 43.1833 ], [ 3.0056, 43.1833 ], [ 3.0055, 43.1833 ], [ 3.0055, 43.1833 ], [ 3.0054, 43.1832 ], [ 3.0054, 43.1832 ], [ 3.0054, 43.1832 ], [ 3.0053, 43.1831 ], [ 3.0053, 43.1832 ], [ 3.0053, 43.1831 ], [ 3.0052, 43.1831 ], [ 3.0051, 43.1831 ], [ 3.005, 43.1829 ], [ 3.004, 43.1823 ], [ 3.0039, 43.1822 ], [ 3.0037, 43.1819 ], [ 3.0036, 43.1819 ], [ 3.0036, 43.1819 ], [ 3.0035, 43.1819 ], [ 3.0034, 43.1819 ], [ 3.0032, 43.1817 ], [ 3.0032, 43.1817 ], [ 3.0031, 43.1818 ], [ 3.003, 43.1817 ], [ 3.0029, 43.1817 ], [ 3.0029, 43.1817 ], [ 3.0028, 43.1816 ], [ 3.0027, 43.1815 ], [ 3.0026, 43.1816 ], [ 3.0023, 43.1817 ], [ 3.0023, 43.1816 ], [ 3.0021, 43.1813 ], [ 3.0018, 43.181 ], [ 3.0015, 43.1808 ], [ 3.0014, 43.1807 ], [ 3.0013, 43.1807 ], [ 3.001, 43.1807 ], [ 3.001, 43.1808 ], [ 3.0011, 43.1812 ], [ 3.0008, 43.1813 ], [ 3.0004, 43.1813 ], [ 3.0001, 43.1814 ], [ 2.9999, 43.1814 ], [ 2.9996, 43.1813 ], [ 2.9995, 43.1814 ], [ 2.9993, 43.1814 ], [ 2.9993, 43.1814 ], [ 2.9992, 43.1814 ], [ 2.9992, 43.1813 ], [ 2.9992, 43.1812 ], [ 2.9991, 43.1812 ], [ 2.999, 43.1808 ], [ 2.9987, 43.1809 ], [ 2.9983, 43.181 ], [ 2.9977, 43.1812 ], [ 2.9976, 43.181 ], [ 2.9975, 43.1807 ], [ 2.9973, 43.1804 ], [ 2.997, 43.1804 ], [ 2.9966, 43.1804 ], [ 2.9968, 43.1808 ], [ 2.9971, 43.1812 ], [ 2.997, 43.1813 ], [ 2.9968, 43.1813 ], [ 2.9961, 43.1814 ], [ 2.9955, 43.1815 ], [ 2.9956, 43.1818 ], [ 2.9955, 43.1819 ], [ 2.9955, 43.1823 ], [ 2.9957, 43.1823 ], [ 2.9957, 43.1828 ], [ 2.9957, 43.183 ], [ 2.9958, 43.183 ], [ 2.9959, 43.183 ], [ 2.9959, 43.1832 ], [ 2.9959, 43.1832 ], [ 2.9959, 43.1832 ], [ 2.9963, 43.1833 ], [ 2.9965, 43.1834 ], [ 2.9967, 43.1835 ], [ 2.9968, 43.1836 ], [ 2.9969, 43.1836 ], [ 2.9971, 43.1836 ], [ 2.9971, 43.1836 ], [ 2.9972, 43.1836 ], [ 2.9977, 43.1835 ], [ 2.9978, 43.1836 ], [ 2.9989, 43.1844 ], [ 2.9992, 43.1847 ], [ 2.9995, 43.1849 ], [ 2.9996, 43.1848 ], [ 2.9997, 43.1847 ], [ 2.9998, 43.1847 ], [ 2.9999, 43.1847 ], [ 3.0001, 43.1846 ], [ 3.0002, 43.1846 ], [ 3.0005, 43.1844 ], [ 3.0008, 43.1843 ], [ 3.0012, 43.1841 ], [ 3.0016, 43.184 ], [ 3.0017, 43.1839 ], [ 3.0019, 43.1839 ], [ 3.0023, 43.1837 ], [ 3.0026, 43.1839 ], [ 3.0027, 43.184 ], [ 3.0028, 43.1841 ], [ 3.0028, 43.1842 ], [ 3.0032, 43.1852 ], [ 3.0033, 43.1852 ], [ 3.0033, 43.1853 ], [ 3.0037, 43.1851 ], [ 3.0037, 43.1852 ], [ 3.0038, 43.1854 ], [ 3.0039, 43.1855 ], [ 3.004, 43.1857 ], [ 3.004, 43.1858 ], [ 3.0041, 43.1858 ], [ 3.0042, 43.1859 ], [ 3.0043, 43.1859 ], [ 3.0044, 43.1859 ], [ 3.0045, 43.1859 ], [ 3.0045, 43.186 ], [ 3.0045, 43.1862 ], [ 3.0045, 43.1863 ], [ 3.0046, 43.1864 ], [ 3.0046, 43.1864 ], [ 3.0047, 43.1865 ], [ 3.0048, 43.1866 ], [ 3.0049, 43.1867 ], [ 3.0049, 43.1868 ], [ 3.005, 43.1869 ], [ 3.0051, 43.187 ], [ 3.0052, 43.1871 ], [ 3.0053, 43.1873 ], [ 3.0056, 43.187 ], [ 3.0064, 43.1873 ], [ 3.0072, 43.1877 ], [ 3.0073, 43.1877 ], [ 3.0074, 43.1876 ], [ 3.0075, 43.1873 ], [ 3.0076, 43.1872 ], [ 3.0078, 43.1871 ], [ 3.0079, 43.1871 ], [ 3.008, 43.1871 ], [ 3.008, 43.1871 ], [ 3.0082, 43.1871 ], [ 3.0087, 43.1864 ], [ 3.0093, 43.1858 ], [ 3.0094, 43.1856 ], [ 3.0095, 43.1855 ] ] ], "type": "Polygon" }, "id": "9", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011008", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Centre" }, "type": "Feature" }, { "bbox": [ 3.0116, 43.192, 3.0172, 43.1962 ], "geometry": { "coordinates": [ [ [ 3.0167, 43.1938 ], [ 3.0165, 43.1936 ], [ 3.0165, 43.1934 ], [ 3.0163, 43.1933 ], [ 3.0159, 43.1928 ], [ 3.0157, 43.1927 ], [ 3.0155, 43.1924 ], [ 3.0152, 43.192 ], [ 3.0141, 43.1924 ], [ 3.014, 43.1925 ], [ 3.0139, 43.1924 ], [ 3.0137, 43.1921 ], [ 3.013, 43.1924 ], [ 3.0123, 43.1926 ], [ 3.0129, 43.1937 ], [ 3.0126, 43.1938 ], [ 3.0126, 43.1938 ], [ 3.0128, 43.1944 ], [ 3.0131, 43.195 ], [ 3.0126, 43.1952 ], [ 3.0126, 43.1952 ], [ 3.0126, 43.1954 ], [ 3.0116, 43.1956 ], [ 3.0123, 43.1962 ], [ 3.0123, 43.1962 ], [ 3.0133, 43.196 ], [ 3.0131, 43.1954 ], [ 3.0135, 43.1953 ], [ 3.0143, 43.1952 ], [ 3.0144, 43.1952 ], [ 3.0145, 43.1952 ], [ 3.0149, 43.1951 ], [ 3.0149, 43.1951 ], [ 3.0149, 43.1954 ], [ 3.015, 43.1957 ], [ 3.015, 43.1957 ], [ 3.0158, 43.1952 ], [ 3.0159, 43.1952 ], [ 3.0162, 43.195 ], [ 3.0166, 43.1947 ], [ 3.017, 43.1945 ], [ 3.0171, 43.1944 ], [ 3.0172, 43.1943 ], [ 3.0172, 43.1941 ], [ 3.0171, 43.194 ], [ 3.017, 43.1939 ], [ 3.0169, 43.1938 ], [ 3.0167, 43.1938 ] ] ], "type": "Polygon" }, "id": "10", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011009", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Est" }, "type": "Feature" }, { "bbox": [ 4.3233, 43.8189, 4.342, 43.8338 ], "geometry": { "coordinates": [ [ [ 4.3277, 43.8276 ], [ 4.3268, 43.8273 ], [ 4.3267, 43.8274 ], [ 4.3259, 43.8287 ], [ 4.3256, 43.8292 ], [ 4.3252, 43.8299 ], [ 4.3251, 43.8301 ], [ 4.3249, 43.8301 ], [ 4.3245, 43.8303 ], [ 4.3242, 43.8303 ], [ 4.3238, 43.8305 ], [ 4.3235, 43.8307 ], [ 4.3233, 43.8308 ], [ 4.3233, 43.8311 ], [ 4.3234, 43.8312 ], [ 4.3239, 43.8319 ], [ 4.324, 43.8321 ], [ 4.324, 43.8323 ], [ 4.3242, 43.8324 ], [ 4.3244, 43.8325 ], [ 4.3246, 43.8326 ], [ 4.3251, 43.8329 ], [ 4.3253, 43.8329 ], [ 4.3254, 43.8329 ], [ 4.3256, 43.8329 ], [ 4.3257, 43.8328 ], [ 4.3258, 43.8327 ], [ 4.326, 43.8325 ], [ 4.3263, 43.8321 ], [ 4.3263, 43.832 ], [ 4.3264, 43.8321 ], [ 4.3268, 43.8322 ], [ 4.3269, 43.832 ], [ 4.327, 43.832 ], [ 4.3273, 43.832 ], [ 4.3273, 43.832 ], [ 4.3278, 43.8322 ], [ 4.3283, 43.8324 ], [ 4.3283, 43.8323 ], [ 4.3285, 43.8324 ], [ 4.3287, 43.8329 ], [ 4.3284, 43.833 ], [ 4.3289, 43.8333 ], [ 4.3286, 43.8336 ], [ 4.3291, 43.8338 ], [ 4.3293, 43.8336 ], [ 4.3301, 43.8334 ], [ 4.3308, 43.8331 ], [ 4.3306, 43.8329 ], [ 4.3307, 43.8325 ], [ 4.3308, 43.8325 ], [ 4.3309, 43.8324 ], [ 4.331, 43.8323 ], [ 4.3317, 43.8326 ], [ 4.3317, 43.8325 ], [ 4.3317, 43.8325 ], [ 4.3317, 43.8324 ], [ 4.3316, 43.8323 ], [ 4.3316, 43.8322 ], [ 4.3319, 43.8322 ], [ 4.332, 43.8322 ], [ 4.3321, 43.8322 ], [ 4.3323, 43.8322 ], [ 4.3329, 43.8321 ], [ 4.3329, 43.8321 ], [ 4.3329, 43.832 ], [ 4.3329, 43.8319 ], [ 4.3332, 43.8315 ], [ 4.3333, 43.8314 ], [ 4.3334, 43.8312 ], [ 4.3337, 43.8307 ], [ 4.3332, 43.8306 ], [ 4.3333, 43.8305 ], [ 4.333, 43.8304 ], [ 4.3323, 43.8301 ], [ 4.333, 43.8291 ], [ 4.3331, 43.8288 ], [ 4.3332, 43.8286 ], [ 4.3332, 43.8285 ], [ 4.3334, 43.8288 ], [ 4.3335, 43.8289 ], [ 4.3335, 43.8289 ], [ 4.3336, 43.829 ], [ 4.3337, 43.8291 ], [ 4.3339, 43.8291 ], [ 4.334, 43.8292 ], [ 4.3341, 43.8292 ], [ 4.3344, 43.8292 ], [ 4.3345, 43.8292 ], [ 4.335, 43.8291 ], [ 4.3356, 43.8289 ], [ 4.3356, 43.8288 ], [ 4.3356, 43.8287 ], [ 4.3358, 43.8284 ], [ 4.3365, 43.8285 ], [ 4.3367, 43.8285 ], [ 4.3368, 43.8286 ], [ 4.3369, 43.8287 ], [ 4.3377, 43.8292 ], [ 4.338, 43.8289 ], [ 4.338, 43.8288 ], [ 4.3381, 43.8287 ], [ 4.3382, 43.8288 ], [ 4.3383, 43.8286 ], [ 4.3384, 43.8287 ], [ 4.3384, 43.8287 ], [ 4.3379, 43.8284 ], [ 4.338, 43.828 ], [ 4.3383, 43.828 ], [ 4.3386, 43.8281 ], [ 4.3387, 43.8282 ], [ 4.3387, 43.8281 ], [ 4.3386, 43.8278 ], [ 4.3386, 43.8278 ], [ 4.3387, 43.8275 ], [ 4.3388, 43.8275 ], [ 4.3388, 43.8272 ], [ 4.3384, 43.8274 ], [ 4.3381, 43.8275 ], [ 4.3379, 43.8275 ], [ 4.3378, 43.8274 ], [ 4.3381, 43.8268 ], [ 4.3382, 43.8265 ], [ 4.3372, 43.8262 ], [ 4.3363, 43.8259 ], [ 4.3363, 43.8258 ], [ 4.337, 43.8246 ], [ 4.3375, 43.8247 ], [ 4.3377, 43.8249 ], [ 4.3387, 43.8252 ], [ 4.3389, 43.8253 ], [ 4.3391, 43.8252 ], [ 4.3395, 43.8251 ], [ 4.3398, 43.8251 ], [ 4.3401, 43.8251 ], [ 4.3403, 43.8251 ], [ 4.3404, 43.8252 ], [ 4.3407, 43.8253 ], [ 4.3413, 43.8252 ], [ 4.3419, 43.8251 ], [ 4.342, 43.825 ], [ 4.3419, 43.8248 ], [ 4.3414, 43.8247 ], [ 4.3418, 43.8243 ], [ 4.3414, 43.8242 ], [ 4.3413, 43.8241 ], [ 4.341, 43.824 ], [ 4.3414, 43.8235 ], [ 4.341, 43.8234 ], [ 4.3406, 43.8233 ], [ 4.3402, 43.8232 ], [ 4.3404, 43.8229 ], [ 4.3407, 43.8225 ], [ 4.3408, 43.8221 ], [ 4.3411, 43.8217 ], [ 4.3413, 43.8214 ], [ 4.3417, 43.821 ], [ 4.3417, 43.8209 ], [ 4.3412, 43.8207 ], [ 4.3406, 43.8205 ], [ 4.3403, 43.8203 ], [ 4.34, 43.8202 ], [ 4.3394, 43.8199 ], [ 4.3388, 43.8196 ], [ 4.3385, 43.8195 ], [ 4.3382, 43.8193 ], [ 4.3379, 43.8191 ], [ 4.3375, 43.8189 ], [ 4.337, 43.8193 ], [ 4.3368, 43.8195 ], [ 4.3364, 43.8198 ], [ 4.3362, 43.82 ], [ 4.3361, 43.8202 ], [ 4.3359, 43.8203 ], [ 4.3356, 43.8202 ], [ 4.3353, 43.8202 ], [ 4.3347, 43.8202 ], [ 4.3342, 43.8203 ], [ 4.3327, 43.8205 ], [ 4.3322, 43.8206 ], [ 4.3316, 43.8208 ], [ 4.331, 43.821 ], [ 4.3306, 43.8211 ], [ 4.3303, 43.8212 ], [ 4.3299, 43.8215 ], [ 4.3295, 43.8218 ], [ 4.3289, 43.8223 ], [ 4.3285, 43.8228 ], [ 4.3282, 43.8233 ], [ 4.3283, 43.8235 ], [ 4.3284, 43.8236 ], [ 4.3289, 43.8238 ], [ 4.3295, 43.8241 ], [ 4.3305, 43.8248 ], [ 4.3313, 43.8255 ], [ 4.3321, 43.826 ], [ 4.3323, 43.8261 ], [ 4.3326, 43.8263 ], [ 4.3328, 43.8265 ], [ 4.333, 43.8267 ], [ 4.3332, 43.8268 ], [ 4.3336, 43.8271 ], [ 4.334, 43.8265 ], [ 4.3343, 43.8259 ], [ 4.3346, 43.826 ], [ 4.3347, 43.826 ], [ 4.3349, 43.8258 ], [ 4.335, 43.8257 ], [ 4.335, 43.8257 ], [ 4.3352, 43.8256 ], [ 4.3358, 43.8258 ], [ 4.3361, 43.8259 ], [ 4.3362, 43.826 ], [ 4.3362, 43.8261 ], [ 4.3358, 43.8268 ], [ 4.3356, 43.8267 ], [ 4.3355, 43.8268 ], [ 4.3357, 43.8269 ], [ 4.3358, 43.827 ], [ 4.3358, 43.8271 ], [ 4.3351, 43.8273 ], [ 4.3352, 43.8274 ], [ 4.3353, 43.8276 ], [ 4.3355, 43.8278 ], [ 4.3356, 43.828 ], [ 4.3356, 43.8282 ], [ 4.3352, 43.8283 ], [ 4.3349, 43.8281 ], [ 4.3347, 43.8279 ], [ 4.3335, 43.8272 ], [ 4.3337, 43.8276 ], [ 4.3338, 43.8278 ], [ 4.3339, 43.8278 ], [ 4.3339, 43.8279 ], [ 4.3339, 43.8279 ], [ 4.3338, 43.828 ], [ 4.3334, 43.8279 ], [ 4.3332, 43.8278 ], [ 4.3331, 43.8279 ], [ 4.333, 43.828 ], [ 4.3329, 43.828 ], [ 4.3331, 43.8282 ], [ 4.3329, 43.8283 ], [ 4.3327, 43.8282 ], [ 4.3325, 43.8281 ], [ 4.3321, 43.8279 ], [ 4.3319, 43.8286 ], [ 4.3317, 43.8289 ], [ 4.3316, 43.829 ], [ 4.3315, 43.8289 ], [ 4.3314, 43.8289 ], [ 4.3314, 43.829 ], [ 4.3313, 43.8292 ], [ 4.3313, 43.8292 ], [ 4.3313, 43.8293 ], [ 4.3312, 43.8293 ], [ 4.3312, 43.8293 ], [ 4.3311, 43.8293 ], [ 4.331, 43.8293 ], [ 4.3309, 43.8294 ], [ 4.3308, 43.8294 ], [ 4.3308, 43.8294 ], [ 4.3308, 43.8295 ], [ 4.3307, 43.8295 ], [ 4.3306, 43.8295 ], [ 4.3305, 43.8296 ], [ 4.3304, 43.8296 ], [ 4.3304, 43.8296 ], [ 4.3309, 43.8298 ], [ 4.3309, 43.8299 ], [ 4.3308, 43.83 ], [ 4.3307, 43.8301 ], [ 4.3307, 43.8304 ], [ 4.3306, 43.8306 ], [ 4.3304, 43.8308 ], [ 4.3304, 43.8309 ], [ 4.3303, 43.8309 ], [ 4.3292, 43.8305 ], [ 4.3293, 43.8303 ], [ 4.3287, 43.8291 ], [ 4.33, 43.8287 ], [ 4.3301, 43.8287 ], [ 4.3303, 43.8288 ], [ 4.3304, 43.8285 ], [ 4.3304, 43.8285 ], [ 4.3305, 43.8284 ], [ 4.3307, 43.8281 ], [ 4.3307, 43.828 ], [ 4.3307, 43.8278 ], [ 4.331, 43.8274 ], [ 4.3308, 43.8273 ], [ 4.3304, 43.8275 ], [ 4.3301, 43.8276 ], [ 4.3299, 43.8276 ], [ 4.3298, 43.8279 ], [ 4.3292, 43.8279 ], [ 4.3292, 43.8274 ], [ 4.3281, 43.827 ], [ 4.3277, 43.8276 ] ] ], "type": "Polygon" }, "id": "11", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030003", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Pissevin - Valdegour" }, "type": "Feature" }, { "bbox": [ 3.9824, 44.0535, 3.9873, 44.0594 ], "geometry": { "coordinates": [ [ [ 3.9824, 44.0536 ], [ 3.9825, 44.0537 ], [ 3.9828, 44.0539 ], [ 3.9829, 44.054 ], [ 3.983, 44.0541 ], [ 3.9831, 44.0543 ], [ 3.9833, 44.0544 ], [ 3.9833, 44.0544 ], [ 3.9833, 44.0545 ], [ 3.9834, 44.0545 ], [ 3.9836, 44.0548 ], [ 3.9835, 44.0548 ], [ 3.9836, 44.0549 ], [ 3.9834, 44.055 ], [ 3.9836, 44.0552 ], [ 3.9838, 44.0551 ], [ 3.9838, 44.0553 ], [ 3.9839, 44.0554 ], [ 3.9839, 44.0554 ], [ 3.9838, 44.0555 ], [ 3.9838, 44.0556 ], [ 3.9838, 44.0556 ], [ 3.9839, 44.0558 ], [ 3.984, 44.0558 ], [ 3.9841, 44.0559 ], [ 3.9843, 44.0559 ], [ 3.9843, 44.056 ], [ 3.9843, 44.056 ], [ 3.9842, 44.0561 ], [ 3.9844, 44.0562 ], [ 3.9845, 44.0564 ], [ 3.9846, 44.0565 ], [ 3.9846, 44.0566 ], [ 3.9846, 44.0567 ], [ 3.9846, 44.0568 ], [ 3.9847, 44.0569 ], [ 3.9847, 44.0569 ], [ 3.9849, 44.0568 ], [ 3.9849, 44.0568 ], [ 3.985, 44.0568 ], [ 3.985, 44.0569 ], [ 3.985, 44.0569 ], [ 3.985, 44.057 ], [ 3.9851, 44.057 ], [ 3.9851, 44.0571 ], [ 3.9852, 44.0572 ], [ 3.9852, 44.0573 ], [ 3.9853, 44.0574 ], [ 3.9853, 44.0574 ], [ 3.9853, 44.0575 ], [ 3.9853, 44.0575 ], [ 3.9848, 44.0575 ], [ 3.9848, 44.0576 ], [ 3.9848, 44.0577 ], [ 3.985, 44.0578 ], [ 3.9851, 44.0578 ], [ 3.9853, 44.0578 ], [ 3.9851, 44.0582 ], [ 3.985, 44.0583 ], [ 3.9849, 44.0584 ], [ 3.9849, 44.0585 ], [ 3.9848, 44.0585 ], [ 3.9847, 44.0587 ], [ 3.9845, 44.0589 ], [ 3.9845, 44.0593 ], [ 3.9847, 44.0594 ], [ 3.9851, 44.0591 ], [ 3.9852, 44.059 ], [ 3.9853, 44.0589 ], [ 3.9852, 44.0588 ], [ 3.9854, 44.0587 ], [ 3.9856, 44.0584 ], [ 3.9858, 44.0583 ], [ 3.9859, 44.0581 ], [ 3.986, 44.058 ], [ 3.9861, 44.0578 ], [ 3.9862, 44.0576 ], [ 3.9863, 44.0574 ], [ 3.9865, 44.057 ], [ 3.9867, 44.0564 ], [ 3.9868, 44.0562 ], [ 3.9869, 44.056 ], [ 3.9869, 44.0559 ], [ 3.987, 44.0557 ], [ 3.987, 44.0556 ], [ 3.987, 44.0554 ], [ 3.9872, 44.0554 ], [ 3.9872, 44.0551 ], [ 3.9871, 44.055 ], [ 3.9871, 44.0548 ], [ 3.9871, 44.0546 ], [ 3.9871, 44.0546 ], [ 3.9872, 44.0545 ], [ 3.9873, 44.0542 ], [ 3.9873, 44.054 ], [ 3.9873, 44.054 ], [ 3.987, 44.0538 ], [ 3.9863, 44.0536 ], [ 3.9859, 44.0535 ], [ 3.9861, 44.0536 ], [ 3.9859, 44.0536 ], [ 3.9856, 44.0536 ], [ 3.9854, 44.0536 ], [ 3.9853, 44.0536 ], [ 3.9851, 44.0536 ], [ 3.9849, 44.0537 ], [ 3.9848, 44.0537 ], [ 3.9847, 44.0536 ], [ 3.9846, 44.0535 ], [ 3.9846, 44.0535 ], [ 3.9845, 44.0535 ], [ 3.984, 44.0537 ], [ 3.9839, 44.0537 ], [ 3.9839, 44.0537 ], [ 3.9837, 44.0537 ], [ 3.983, 44.0537 ], [ 3.983, 44.0537 ], [ 3.9829, 44.0537 ], [ 3.9824, 44.0535 ], [ 3.9824, 44.0536 ] ] ], "type": "Polygon" }, "id": "12", "properties": { "code_commune": "30010", "code_departement": "30", "code_qp": "QP030002", "commune_qp": "Anduze", "nom_commune": "Anduze", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 4.1241, 43.6696, 4.1407, 43.6799 ], "geometry": { "coordinates": [ [ [ 4.1386, 43.6762 ], [ 4.1385, 43.676 ], [ 4.1383, 43.6759 ], [ 4.1382, 43.6759 ], [ 4.1379, 43.6755 ], [ 4.138, 43.6751 ], [ 4.138, 43.6749 ], [ 4.138, 43.6745 ], [ 4.1378, 43.6741 ], [ 4.1374, 43.6734 ], [ 4.1373, 43.6732 ], [ 4.1369, 43.6728 ], [ 4.1367, 43.6726 ], [ 4.1366, 43.6725 ], [ 4.1366, 43.6725 ], [ 4.1366, 43.6722 ], [ 4.1371, 43.6721 ], [ 4.1373, 43.6721 ], [ 4.1383, 43.6722 ], [ 4.1396, 43.6723 ], [ 4.1404, 43.6724 ], [ 4.1405, 43.6715 ], [ 4.1407, 43.6705 ], [ 4.1402, 43.6705 ], [ 4.1402, 43.6706 ], [ 4.1391, 43.6705 ], [ 4.1391, 43.6705 ], [ 4.1383, 43.6704 ], [ 4.1383, 43.6704 ], [ 4.1379, 43.6704 ], [ 4.1378, 43.6705 ], [ 4.1378, 43.6709 ], [ 4.1379, 43.6709 ], [ 4.1379, 43.6709 ], [ 4.1378, 43.671 ], [ 4.1377, 43.671 ], [ 4.1376, 43.6709 ], [ 4.1376, 43.6709 ], [ 4.1375, 43.6709 ], [ 4.1375, 43.6709 ], [ 4.1368, 43.6708 ], [ 4.1367, 43.671 ], [ 4.1367, 43.6711 ], [ 4.1367, 43.6713 ], [ 4.1367, 43.6715 ], [ 4.1367, 43.6716 ], [ 4.1367, 43.6717 ], [ 4.1367, 43.672 ], [ 4.1367, 43.6721 ], [ 4.1366, 43.6722 ], [ 4.1365, 43.6722 ], [ 4.1365, 43.6722 ], [ 4.1363, 43.6722 ], [ 4.1363, 43.6724 ], [ 4.1361, 43.6726 ], [ 4.136, 43.6726 ], [ 4.136, 43.6727 ], [ 4.136, 43.6728 ], [ 4.1359, 43.6737 ], [ 4.1356, 43.6737 ], [ 4.1356, 43.6736 ], [ 4.1356, 43.6736 ], [ 4.1356, 43.6736 ], [ 4.1354, 43.6734 ], [ 4.1347, 43.6734 ], [ 4.1342, 43.6734 ], [ 4.1342, 43.6734 ], [ 4.1342, 43.6732 ], [ 4.1339, 43.6732 ], [ 4.1337, 43.6732 ], [ 4.1334, 43.6732 ], [ 4.1334, 43.6732 ], [ 4.1332, 43.6733 ], [ 4.1332, 43.6732 ], [ 4.133, 43.6734 ], [ 4.1328, 43.6733 ], [ 4.133, 43.6728 ], [ 4.1327, 43.6727 ], [ 4.1325, 43.6731 ], [ 4.1323, 43.6732 ], [ 4.1322, 43.6732 ], [ 4.1322, 43.6733 ], [ 4.1321, 43.6735 ], [ 4.1321, 43.6736 ], [ 4.132, 43.6737 ], [ 4.132, 43.674 ], [ 4.1321, 43.674 ], [ 4.1321, 43.674 ], [ 4.1325, 43.674 ], [ 4.1325, 43.6741 ], [ 4.1325, 43.6743 ], [ 4.1324, 43.6744 ], [ 4.1324, 43.6745 ], [ 4.1324, 43.6746 ], [ 4.1323, 43.6747 ], [ 4.1323, 43.6748 ], [ 4.1321, 43.6748 ], [ 4.1318, 43.6747 ], [ 4.1315, 43.6747 ], [ 4.1314, 43.6746 ], [ 4.1312, 43.6746 ], [ 4.1313, 43.6742 ], [ 4.1299, 43.6743 ], [ 4.1298, 43.6743 ], [ 4.1298, 43.6744 ], [ 4.1299, 43.6744 ], [ 4.13, 43.6744 ], [ 4.1299, 43.6746 ], [ 4.1297, 43.6751 ], [ 4.1294, 43.6749 ], [ 4.1294, 43.6752 ], [ 4.1288, 43.6753 ], [ 4.1287, 43.6751 ], [ 4.1281, 43.6752 ], [ 4.1278, 43.6754 ], [ 4.1273, 43.675 ], [ 4.1273, 43.6749 ], [ 4.1278, 43.6745 ], [ 4.1281, 43.6743 ], [ 4.1282, 43.6743 ], [ 4.1282, 43.6742 ], [ 4.1284, 43.6739 ], [ 4.1282, 43.6738 ], [ 4.1284, 43.6738 ], [ 4.1285, 43.6737 ], [ 4.1288, 43.6733 ], [ 4.129, 43.6729 ], [ 4.1291, 43.6727 ], [ 4.1293, 43.6724 ], [ 4.1296, 43.672 ], [ 4.1295, 43.672 ], [ 4.1294, 43.672 ], [ 4.129, 43.6718 ], [ 4.1286, 43.6716 ], [ 4.1284, 43.6716 ], [ 4.1277, 43.6714 ], [ 4.1276, 43.6713 ], [ 4.1272, 43.6713 ], [ 4.127, 43.6712 ], [ 4.1271, 43.671 ], [ 4.1271, 43.6709 ], [ 4.1273, 43.6708 ], [ 4.1275, 43.6708 ], [ 4.1276, 43.6708 ], [ 4.1278, 43.6704 ], [ 4.1281, 43.6701 ], [ 4.1282, 43.67 ], [ 4.1272, 43.6698 ], [ 4.1258, 43.6696 ], [ 4.1254, 43.671 ], [ 4.1254, 43.6711 ], [ 4.1253, 43.6711 ], [ 4.1251, 43.6711 ], [ 4.1249, 43.6711 ], [ 4.1246, 43.6711 ], [ 4.1243, 43.671 ], [ 4.1243, 43.6712 ], [ 4.1242, 43.6715 ], [ 4.1242, 43.6719 ], [ 4.1243, 43.6721 ], [ 4.1244, 43.6721 ], [ 4.1244, 43.6721 ], [ 4.1251, 43.672 ], [ 4.1263, 43.6724 ], [ 4.1262, 43.6726 ], [ 4.1265, 43.6727 ], [ 4.1276, 43.673 ], [ 4.1281, 43.6731 ], [ 4.1279, 43.6736 ], [ 4.1278, 43.6739 ], [ 4.1276, 43.674 ], [ 4.1274, 43.674 ], [ 4.1271, 43.6739 ], [ 4.1269, 43.674 ], [ 4.1267, 43.6741 ], [ 4.1263, 43.6743 ], [ 4.1262, 43.6744 ], [ 4.1266, 43.6746 ], [ 4.1261, 43.675 ], [ 4.1256, 43.6754 ], [ 4.1252, 43.6757 ], [ 4.1252, 43.6758 ], [ 4.1247, 43.6756 ], [ 4.1244, 43.6754 ], [ 4.1241, 43.6755 ], [ 4.1243, 43.6757 ], [ 4.1241, 43.6758 ], [ 4.1244, 43.6761 ], [ 4.1246, 43.676 ], [ 4.1251, 43.6764 ], [ 4.1252, 43.6764 ], [ 4.1265, 43.6761 ], [ 4.1283, 43.6758 ], [ 4.1285, 43.6758 ], [ 4.1291, 43.6757 ], [ 4.1301, 43.6754 ], [ 4.1303, 43.6754 ], [ 4.1315, 43.6755 ], [ 4.1317, 43.6756 ], [ 4.1319, 43.6758 ], [ 4.1322, 43.676 ], [ 4.1324, 43.6762 ], [ 4.1329, 43.6764 ], [ 4.1333, 43.6766 ], [ 4.1337, 43.6769 ], [ 4.1335, 43.6772 ], [ 4.1333, 43.6774 ], [ 4.1332, 43.6776 ], [ 4.1331, 43.6779 ], [ 4.1342, 43.6781 ], [ 4.1342, 43.6781 ], [ 4.1344, 43.6781 ], [ 4.1342, 43.6784 ], [ 4.1341, 43.6787 ], [ 4.1339, 43.6786 ], [ 4.1338, 43.6787 ], [ 4.1337, 43.6787 ], [ 4.1336, 43.6789 ], [ 4.1335, 43.6788 ], [ 4.1332, 43.6791 ], [ 4.133, 43.6792 ], [ 4.1328, 43.6791 ], [ 4.1327, 43.6794 ], [ 4.1326, 43.6794 ], [ 4.1326, 43.6794 ], [ 4.1324, 43.6797 ], [ 4.1334, 43.6799 ], [ 4.1334, 43.6797 ], [ 4.1334, 43.6797 ], [ 4.1335, 43.6795 ], [ 4.1339, 43.6796 ], [ 4.134, 43.6794 ], [ 4.1341, 43.6791 ], [ 4.1343, 43.6792 ], [ 4.1344, 43.679 ], [ 4.1348, 43.6792 ], [ 4.1349, 43.6789 ], [ 4.1351, 43.679 ], [ 4.1354, 43.6782 ], [ 4.1355, 43.6778 ], [ 4.1365, 43.678 ], [ 4.1365, 43.6779 ], [ 4.1366, 43.6779 ], [ 4.1367, 43.6773 ], [ 4.1369, 43.6774 ], [ 4.1371, 43.6774 ], [ 4.1375, 43.6776 ], [ 4.1379, 43.6777 ], [ 4.1378, 43.6776 ], [ 4.1378, 43.6776 ], [ 4.1382, 43.677 ], [ 4.1382, 43.677 ], [ 4.1386, 43.6762 ] ] ], "type": "Polygon" }, "id": "13", "properties": { "code_commune": "34145", "code_departement": "34", "code_qp": "QP034021", "commune_qp": "Lunel", "nom_commune": "Lunel", "nom_qp": "Centre Et Périphérie" }, "type": "Feature" }, { "bbox": [ 4.6254, 43.8078, 4.6319, 43.8124 ], "geometry": { "coordinates": [ [ [ 4.6319, 43.8112 ], [ 4.6319, 43.8111 ], [ 4.6318, 43.8107 ], [ 4.6317, 43.8107 ], [ 4.6317, 43.8107 ], [ 4.6317, 43.8106 ], [ 4.6313, 43.8103 ], [ 4.6311, 43.8094 ], [ 4.6311, 43.8093 ], [ 4.6311, 43.8085 ], [ 4.6304, 43.8084 ], [ 4.6304, 43.8084 ], [ 4.6296, 43.8082 ], [ 4.6297, 43.8079 ], [ 4.6293, 43.8078 ], [ 4.6287, 43.8078 ], [ 4.6286, 43.8078 ], [ 4.6278, 43.8078 ], [ 4.6274, 43.8078 ], [ 4.6273, 43.8078 ], [ 4.6273, 43.8079 ], [ 4.6272, 43.8079 ], [ 4.6272, 43.808 ], [ 4.6271, 43.8081 ], [ 4.627, 43.8083 ], [ 4.6269, 43.8085 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8087 ], [ 4.6271, 43.8088 ], [ 4.6272, 43.8088 ], [ 4.6274, 43.8089 ], [ 4.6275, 43.809 ], [ 4.6278, 43.809 ], [ 4.6279, 43.8091 ], [ 4.628, 43.809 ], [ 4.6281, 43.8093 ], [ 4.6279, 43.8093 ], [ 4.6277, 43.8094 ], [ 4.6274, 43.8095 ], [ 4.6268, 43.8095 ], [ 4.6268, 43.8096 ], [ 4.6267, 43.8096 ], [ 4.6267, 43.8097 ], [ 4.6266, 43.8098 ], [ 4.6266, 43.8098 ], [ 4.6266, 43.8098 ], [ 4.6265, 43.8098 ], [ 4.6265, 43.8098 ], [ 4.6264, 43.8098 ], [ 4.6263, 43.8098 ], [ 4.6261, 43.8098 ], [ 4.6259, 43.8098 ], [ 4.6254, 43.8098 ], [ 4.6254, 43.8105 ], [ 4.6255, 43.811 ], [ 4.6255, 43.811 ], [ 4.6256, 43.811 ], [ 4.6266, 43.811 ], [ 4.6271, 43.811 ], [ 4.6275, 43.8109 ], [ 4.6275, 43.8111 ], [ 4.6276, 43.8116 ], [ 4.6276, 43.8119 ], [ 4.6283, 43.8118 ], [ 4.6286, 43.8118 ], [ 4.6288, 43.8119 ], [ 4.6289, 43.8124 ], [ 4.6295, 43.8122 ], [ 4.6294, 43.8122 ], [ 4.6298, 43.8121 ], [ 4.6305, 43.8119 ], [ 4.6318, 43.8116 ], [ 4.6318, 43.8116 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8112 ] ] ], "type": "Polygon" }, "id": "14", "properties": { "code_commune": "30032", "code_departement": "30", "code_qp": "QP030012", "commune_qp": "Beaucaire", "nom_commune": "Beaucaire", "nom_qp": "La Moulinelle" }, "type": "Feature" }, { "bbox": [ 2.7551, 43.1974, 2.7711, 43.2053 ], "geometry": { "coordinates": [ [ [ 2.7564, 43.2037 ], [ 2.7557, 43.2044 ], [ 2.7554, 43.2049 ], [ 2.7551, 43.2052 ], [ 2.7557, 43.2053 ], [ 2.7559, 43.2052 ], [ 2.7567, 43.2051 ], [ 2.7571, 43.205 ], [ 2.7586, 43.2044 ], [ 2.7599, 43.204 ], [ 2.7605, 43.2038 ], [ 2.7615, 43.2034 ], [ 2.7621, 43.2032 ], [ 2.7625, 43.2031 ], [ 2.7631, 43.203 ], [ 2.7638, 43.2029 ], [ 2.7642, 43.2029 ], [ 2.765, 43.2027 ], [ 2.7659, 43.2025 ], [ 2.7658, 43.2023 ], [ 2.7655, 43.2023 ], [ 2.7647, 43.2014 ], [ 2.7654, 43.201 ], [ 2.766, 43.2005 ], [ 2.7666, 43.2008 ], [ 2.7671, 43.2005 ], [ 2.7677, 43.201 ], [ 2.7681, 43.2008 ], [ 2.7683, 43.2009 ], [ 2.7685, 43.201 ], [ 2.7688, 43.2007 ], [ 2.7696, 43.2011 ], [ 2.7703, 43.2014 ], [ 2.7709, 43.2015 ], [ 2.7711, 43.2014 ], [ 2.7711, 43.2013 ], [ 2.7709, 43.2009 ], [ 2.7709, 43.2007 ], [ 2.77, 43.2005 ], [ 2.7689, 43.2002 ], [ 2.7686, 43.2001 ], [ 2.7687, 43.1999 ], [ 2.7681, 43.1997 ], [ 2.768, 43.1996 ], [ 2.767, 43.1994 ], [ 2.767, 43.1994 ], [ 2.7667, 43.1993 ], [ 2.7647, 43.199 ], [ 2.7634, 43.1987 ], [ 2.7632, 43.1986 ], [ 2.7609, 43.1981 ], [ 2.7604, 43.198 ], [ 2.7577, 43.1974 ], [ 2.758, 43.1982 ], [ 2.7581, 43.1983 ], [ 2.7586, 43.1994 ], [ 2.7578, 43.1997 ], [ 2.7569, 43.2001 ], [ 2.7566, 43.2002 ], [ 2.7558, 43.2006 ], [ 2.7558, 43.2005 ], [ 2.7556, 43.2006 ], [ 2.7555, 43.2006 ], [ 2.7552, 43.2008 ], [ 2.7551, 43.2009 ], [ 2.7553, 43.201 ], [ 2.7552, 43.2019 ], [ 2.7552, 43.202 ], [ 2.7552, 43.202 ], [ 2.7552, 43.2021 ], [ 2.7551, 43.2027 ], [ 2.7551, 43.2028 ], [ 2.7551, 43.2029 ], [ 2.7558, 43.2027 ], [ 2.7564, 43.2037 ] ] ], "type": "Polygon" }, "id": "15", "properties": { "code_commune": "11203", "code_departement": "11", "code_qp": "QP011010", "commune_qp": "Lézignan-Corbières", "nom_commune": "Lézignan-Corbières", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.2331, 43.3431, 3.2394, 43.3527 ], "geometry": { "coordinates": [ [ [ 3.2393, 43.3502 ], [ 3.2394, 43.3501 ], [ 3.2393, 43.3495 ], [ 3.239, 43.3494 ], [ 3.2389, 43.3493 ], [ 3.2379, 43.3491 ], [ 3.2377, 43.3492 ], [ 3.2374, 43.3494 ], [ 3.2372, 43.3497 ], [ 3.2371, 43.3497 ], [ 3.237, 43.3498 ], [ 3.2369, 43.3497 ], [ 3.2368, 43.3496 ], [ 3.2366, 43.3496 ], [ 3.2361, 43.3492 ], [ 3.2365, 43.3488 ], [ 3.2365, 43.3488 ], [ 3.2366, 43.3487 ], [ 3.2367, 43.3486 ], [ 3.2368, 43.3486 ], [ 3.237, 43.3483 ], [ 3.2372, 43.3481 ], [ 3.2367, 43.3479 ], [ 3.2366, 43.3478 ], [ 3.2369, 43.3476 ], [ 3.2371, 43.3474 ], [ 3.2367, 43.3471 ], [ 3.2365, 43.3471 ], [ 3.2363, 43.3473 ], [ 3.2363, 43.3472 ], [ 3.2361, 43.3471 ], [ 3.2362, 43.347 ], [ 3.2355, 43.3466 ], [ 3.2359, 43.3462 ], [ 3.2364, 43.3455 ], [ 3.2366, 43.3453 ], [ 3.2364, 43.3452 ], [ 3.2362, 43.3451 ], [ 3.2359, 43.3451 ], [ 3.2358, 43.345 ], [ 3.2359, 43.3448 ], [ 3.2363, 43.3443 ], [ 3.2365, 43.3444 ], [ 3.2366, 43.3444 ], [ 3.2367, 43.3441 ], [ 3.2368, 43.3439 ], [ 3.2368, 43.3436 ], [ 3.237, 43.3434 ], [ 3.2368, 43.3434 ], [ 3.2363, 43.3432 ], [ 3.2362, 43.3432 ], [ 3.2354, 43.3431 ], [ 3.2348, 43.3431 ], [ 3.2346, 43.3431 ], [ 3.2344, 43.3431 ], [ 3.2343, 43.3432 ], [ 3.234, 43.3433 ], [ 3.2338, 43.3433 ], [ 3.2337, 43.3434 ], [ 3.2338, 43.3435 ], [ 3.2338, 43.3436 ], [ 3.2339, 43.3438 ], [ 3.234, 43.3442 ], [ 3.2341, 43.3447 ], [ 3.2341, 43.3448 ], [ 3.234, 43.3454 ], [ 3.2339, 43.3456 ], [ 3.2339, 43.3457 ], [ 3.2338, 43.3459 ], [ 3.2338, 43.3461 ], [ 3.2335, 43.3465 ], [ 3.2331, 43.347 ], [ 3.2335, 43.3471 ], [ 3.2342, 43.3474 ], [ 3.2343, 43.3475 ], [ 3.2355, 43.348 ], [ 3.2354, 43.3481 ], [ 3.2352, 43.3483 ], [ 3.235, 43.3486 ], [ 3.2348, 43.349 ], [ 3.2344, 43.3497 ], [ 3.2341, 43.35 ], [ 3.2338, 43.3504 ], [ 3.2335, 43.3508 ], [ 3.2334, 43.351 ], [ 3.2335, 43.3511 ], [ 3.2333, 43.3514 ], [ 3.2333, 43.3514 ], [ 3.2333, 43.3515 ], [ 3.2333, 43.3515 ], [ 3.2337, 43.3517 ], [ 3.2338, 43.3517 ], [ 3.2339, 43.3517 ], [ 3.234, 43.3517 ], [ 3.2342, 43.3514 ], [ 3.2343, 43.3514 ], [ 3.235, 43.3517 ], [ 3.2351, 43.3517 ], [ 3.2352, 43.3518 ], [ 3.2353, 43.352 ], [ 3.2355, 43.3521 ], [ 3.2356, 43.3519 ], [ 3.2362, 43.3522 ], [ 3.237, 43.3525 ], [ 3.2374, 43.3527 ], [ 3.2374, 43.3527 ], [ 3.2375, 43.3526 ], [ 3.2377, 43.3523 ], [ 3.2379, 43.3521 ], [ 3.2378, 43.352 ], [ 3.2371, 43.3517 ], [ 3.2373, 43.3515 ], [ 3.2378, 43.3508 ], [ 3.2383, 43.3502 ], [ 3.2389, 43.3504 ], [ 3.239, 43.3504 ], [ 3.2392, 43.3504 ], [ 3.2392, 43.3504 ], [ 3.2393, 43.3502 ] ] ], "type": "Polygon" }, "id": "16", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034002", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Iranget Grangette" }, "type": "Feature" }, { "bbox": [ 4.6382, 43.8051, 4.6484, 43.8134 ], "geometry": { "coordinates": [ [ [ 4.6387, 43.8096 ], [ 4.6393, 43.8096 ], [ 4.6398, 43.8096 ], [ 4.64, 43.8096 ], [ 4.6401, 43.8096 ], [ 4.6403, 43.8096 ], [ 4.6404, 43.8097 ], [ 4.6407, 43.8097 ], [ 4.6413, 43.8097 ], [ 4.6415, 43.8097 ], [ 4.6424, 43.8097 ], [ 4.6429, 43.8097 ], [ 4.6431, 43.8097 ], [ 4.6432, 43.8102 ], [ 4.6432, 43.8103 ], [ 4.6433, 43.8105 ], [ 4.6426, 43.8105 ], [ 4.6421, 43.8104 ], [ 4.6418, 43.8104 ], [ 4.6417, 43.8104 ], [ 4.6416, 43.8105 ], [ 4.6414, 43.8107 ], [ 4.6411, 43.8108 ], [ 4.641, 43.8109 ], [ 4.6409, 43.8109 ], [ 4.6408, 43.8109 ], [ 4.6407, 43.8109 ], [ 4.6405, 43.8108 ], [ 4.6404, 43.8108 ], [ 4.6404, 43.8108 ], [ 4.6407, 43.8111 ], [ 4.6413, 43.8115 ], [ 4.6414, 43.8117 ], [ 4.6413, 43.8119 ], [ 4.6413, 43.8121 ], [ 4.6413, 43.8122 ], [ 4.6411, 43.8126 ], [ 4.6409, 43.8128 ], [ 4.6408, 43.8129 ], [ 4.6408, 43.813 ], [ 4.6408, 43.8131 ], [ 4.6411, 43.8132 ], [ 4.6411, 43.8132 ], [ 4.6412, 43.8132 ], [ 4.6413, 43.8132 ], [ 4.6414, 43.8132 ], [ 4.6414, 43.8133 ], [ 4.6414, 43.8133 ], [ 4.6415, 43.8133 ], [ 4.6417, 43.8134 ], [ 4.6418, 43.8134 ], [ 4.642, 43.8132 ], [ 4.642, 43.8128 ], [ 4.642, 43.8128 ], [ 4.6421, 43.8126 ], [ 4.6422, 43.8126 ], [ 4.6422, 43.8126 ], [ 4.6417, 43.8122 ], [ 4.6416, 43.8122 ], [ 4.6417, 43.8122 ], [ 4.6414, 43.8121 ], [ 4.6414, 43.8119 ], [ 4.6415, 43.8117 ], [ 4.6417, 43.812 ], [ 4.6418, 43.812 ], [ 4.6423, 43.8123 ], [ 4.6426, 43.8125 ], [ 4.6427, 43.8125 ], [ 4.6428, 43.8125 ], [ 4.6429, 43.8126 ], [ 4.644, 43.8115 ], [ 4.6442, 43.8113 ], [ 4.6444, 43.8112 ], [ 4.6456, 43.81 ], [ 4.6457, 43.8099 ], [ 4.6458, 43.8099 ], [ 4.6462, 43.8097 ], [ 4.6461, 43.8096 ], [ 4.6462, 43.8096 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8094 ], [ 4.6465, 43.8088 ], [ 4.6466, 43.8085 ], [ 4.6466, 43.8084 ], [ 4.6467, 43.8082 ], [ 4.6467, 43.8082 ], [ 4.6475, 43.8075 ], [ 4.6475, 43.8075 ], [ 4.6477, 43.8074 ], [ 4.6477, 43.8073 ], [ 4.6478, 43.8072 ], [ 4.6481, 43.8066 ], [ 4.6482, 43.8063 ], [ 4.6483, 43.806 ], [ 4.6484, 43.8056 ], [ 4.6483, 43.8051 ], [ 4.6472, 43.8052 ], [ 4.6469, 43.8053 ], [ 4.6468, 43.8053 ], [ 4.6467, 43.8052 ], [ 4.6465, 43.8053 ], [ 4.6461, 43.8053 ], [ 4.6453, 43.8055 ], [ 4.6445, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6422, 43.8059 ], [ 4.6419, 43.806 ], [ 4.6418, 43.806 ], [ 4.6417, 43.806 ], [ 4.6416, 43.806 ], [ 4.6415, 43.806 ], [ 4.641, 43.8061 ], [ 4.6403, 43.8062 ], [ 4.6395, 43.8063 ], [ 4.6388, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6386, 43.8064 ], [ 4.6385, 43.8065 ], [ 4.6385, 43.8065 ], [ 4.6384, 43.8066 ], [ 4.6384, 43.8066 ], [ 4.6384, 43.8067 ], [ 4.6383, 43.8068 ], [ 4.6383, 43.8068 ], [ 4.6383, 43.8069 ], [ 4.6382, 43.807 ], [ 4.6382, 43.8071 ], [ 4.6383, 43.8076 ], [ 4.6383, 43.8081 ], [ 4.6385, 43.809 ], [ 4.6386, 43.8094 ], [ 4.6386, 43.8096 ], [ 4.6387, 43.8096 ] ] ], "type": "Polygon" }, "id": "17", "properties": { "code_commune": "30032", "code_departement": "30", "code_qp": "QP030013", "commune_qp": "Beaucaire", "nom_commune": "Beaucaire", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 4.0674, 44.1171, 4.0918, 44.1538 ], "geometry": { "coordinates": [ [ [ 4.0918, 44.1425 ], [ 4.0916, 44.1424 ], [ 4.0914, 44.1423 ], [ 4.0912, 44.1421 ], [ 4.091, 44.142 ], [ 4.0908, 44.1419 ], [ 4.0907, 44.1418 ], [ 4.0906, 44.1417 ], [ 4.0903, 44.1414 ], [ 4.0898, 44.1409 ], [ 4.0895, 44.1406 ], [ 4.089, 44.1403 ], [ 4.0886, 44.14 ], [ 4.0886, 44.14 ], [ 4.0884, 44.1399 ], [ 4.0883, 44.1398 ], [ 4.088, 44.1397 ], [ 4.0879, 44.1396 ], [ 4.0869, 44.1391 ], [ 4.0864, 44.1389 ], [ 4.0856, 44.1384 ], [ 4.0854, 44.1382 ], [ 4.0851, 44.138 ], [ 4.0847, 44.1377 ], [ 4.0846, 44.1377 ], [ 4.0845, 44.1377 ], [ 4.0843, 44.1377 ], [ 4.084, 44.1375 ], [ 4.084, 44.1373 ], [ 4.084, 44.1372 ], [ 4.084, 44.1371 ], [ 4.0838, 44.1364 ], [ 4.0837, 44.1363 ], [ 4.0837, 44.1362 ], [ 4.0835, 44.1355 ], [ 4.0835, 44.1354 ], [ 4.0836, 44.1353 ], [ 4.0835, 44.1351 ], [ 4.0841, 44.1351 ], [ 4.084, 44.135 ], [ 4.0841, 44.135 ], [ 4.0841, 44.1349 ], [ 4.0842, 44.1348 ], [ 4.0843, 44.1347 ], [ 4.0844, 44.1347 ], [ 4.0845, 44.1346 ], [ 4.0846, 44.1346 ], [ 4.0849, 44.1345 ], [ 4.085, 44.1344 ], [ 4.0851, 44.1343 ], [ 4.0851, 44.1342 ], [ 4.0852, 44.1341 ], [ 4.0853, 44.1341 ], [ 4.0853, 44.1341 ], [ 4.0853, 44.134 ], [ 4.0854, 44.134 ], [ 4.0854, 44.134 ], [ 4.0854, 44.1339 ], [ 4.0855, 44.1339 ], [ 4.0856, 44.1338 ], [ 4.0856, 44.1337 ], [ 4.0858, 44.1335 ], [ 4.0856, 44.1335 ], [ 4.0858, 44.1333 ], [ 4.0856, 44.1331 ], [ 4.0856, 44.133 ], [ 4.0854, 44.1328 ], [ 4.0854, 44.1328 ], [ 4.0855, 44.1328 ], [ 4.0852, 44.1324 ], [ 4.0849, 44.1325 ], [ 4.0845, 44.1326 ], [ 4.0841, 44.1327 ], [ 4.084, 44.1327 ], [ 4.0839, 44.1327 ], [ 4.0837, 44.1327 ], [ 4.0831, 44.1326 ], [ 4.083, 44.1326 ], [ 4.083, 44.1325 ], [ 4.0829, 44.1324 ], [ 4.0829, 44.1323 ], [ 4.0828, 44.1323 ], [ 4.0826, 44.132 ], [ 4.0825, 44.1319 ], [ 4.0824, 44.1318 ], [ 4.0824, 44.1318 ], [ 4.0823, 44.1318 ], [ 4.0821, 44.1317 ], [ 4.0819, 44.1316 ], [ 4.0818, 44.1315 ], [ 4.0818, 44.1316 ], [ 4.0816, 44.1316 ], [ 4.0814, 44.1317 ], [ 4.0814, 44.1317 ], [ 4.0813, 44.1316 ], [ 4.0812, 44.1316 ], [ 4.0812, 44.1316 ], [ 4.0811, 44.1316 ], [ 4.081, 44.1314 ], [ 4.0808, 44.1313 ], [ 4.0807, 44.1312 ], [ 4.0807, 44.1311 ], [ 4.0806, 44.131 ], [ 4.0806, 44.1308 ], [ 4.0805, 44.1307 ], [ 4.0805, 44.1304 ], [ 4.0805, 44.1303 ], [ 4.0805, 44.1302 ], [ 4.0804, 44.1301 ], [ 4.0804, 44.13 ], [ 4.0802, 44.1299 ], [ 4.0803, 44.1298 ], [ 4.0803, 44.1296 ], [ 4.0804, 44.1295 ], [ 4.0804, 44.1294 ], [ 4.0804, 44.1294 ], [ 4.0802, 44.1295 ], [ 4.0802, 44.1295 ], [ 4.0798, 44.1292 ], [ 4.0797, 44.1291 ], [ 4.0796, 44.1291 ], [ 4.0796, 44.129 ], [ 4.0794, 44.1289 ], [ 4.0793, 44.1288 ], [ 4.0793, 44.1287 ], [ 4.0792, 44.1286 ], [ 4.0792, 44.1285 ], [ 4.0791, 44.1285 ], [ 4.0791, 44.1283 ], [ 4.079, 44.1281 ], [ 4.0791, 44.1279 ], [ 4.0792, 44.1274 ], [ 4.0792, 44.1274 ], [ 4.0792, 44.1273 ], [ 4.0795, 44.1269 ], [ 4.0797, 44.1267 ], [ 4.0797, 44.1266 ], [ 4.0798, 44.1265 ], [ 4.0799, 44.1263 ], [ 4.0799, 44.1262 ], [ 4.0801, 44.125 ], [ 4.0802, 44.1246 ], [ 4.0802, 44.1245 ], [ 4.0803, 44.124 ], [ 4.0804, 44.1239 ], [ 4.0805, 44.1238 ], [ 4.0806, 44.1237 ], [ 4.0816, 44.1236 ], [ 4.0819, 44.1236 ], [ 4.0821, 44.1236 ], [ 4.0822, 44.1236 ], [ 4.0823, 44.1236 ], [ 4.0825, 44.1236 ], [ 4.0828, 44.1236 ], [ 4.0829, 44.1236 ], [ 4.083, 44.1234 ], [ 4.0832, 44.1229 ], [ 4.0834, 44.1225 ], [ 4.0846, 44.1228 ], [ 4.0847, 44.1227 ], [ 4.0847, 44.1219 ], [ 4.0847, 44.1213 ], [ 4.0845, 44.1213 ], [ 4.0845, 44.1213 ], [ 4.0843, 44.1213 ], [ 4.0841, 44.1213 ], [ 4.0839, 44.1212 ], [ 4.0836, 44.1212 ], [ 4.0834, 44.1212 ], [ 4.0831, 44.1212 ], [ 4.0828, 44.1212 ], [ 4.0825, 44.1212 ], [ 4.0822, 44.1212 ], [ 4.0819, 44.1212 ], [ 4.0816, 44.1212 ], [ 4.0815, 44.1212 ], [ 4.0815, 44.1213 ], [ 4.0809, 44.1214 ], [ 4.0806, 44.1213 ], [ 4.0805, 44.1199 ], [ 4.0805, 44.1196 ], [ 4.0805, 44.1196 ], [ 4.0804, 44.1196 ], [ 4.0803, 44.1196 ], [ 4.0802, 44.1193 ], [ 4.0801, 44.1192 ], [ 4.0802, 44.1191 ], [ 4.0804, 44.1189 ], [ 4.0809, 44.1187 ], [ 4.0807, 44.1184 ], [ 4.0805, 44.1183 ], [ 4.0805, 44.1182 ], [ 4.0804, 44.1182 ], [ 4.0806, 44.1179 ], [ 4.0804, 44.1178 ], [ 4.0804, 44.1178 ], [ 4.0806, 44.1176 ], [ 4.0808, 44.1174 ], [ 4.0807, 44.1173 ], [ 4.0806, 44.1173 ], [ 4.0805, 44.1173 ], [ 4.0802, 44.1174 ], [ 4.0801, 44.1174 ], [ 4.0799, 44.1174 ], [ 4.0798, 44.1173 ], [ 4.0797, 44.1173 ], [ 4.0796, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.079, 44.1171 ], [ 4.0789, 44.1171 ], [ 4.0789, 44.1172 ], [ 4.0788, 44.1174 ], [ 4.0788, 44.1175 ], [ 4.0788, 44.1176 ], [ 4.0788, 44.1176 ], [ 4.0789, 44.1177 ], [ 4.0793, 44.118 ], [ 4.0794, 44.118 ], [ 4.0794, 44.1181 ], [ 4.0795, 44.1183 ], [ 4.0795, 44.1183 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0793, 44.1185 ], [ 4.0792, 44.1185 ], [ 4.0791, 44.1185 ], [ 4.079, 44.1185 ], [ 4.0788, 44.1186 ], [ 4.0787, 44.1186 ], [ 4.0784, 44.1187 ], [ 4.0782, 44.1187 ], [ 4.0782, 44.1189 ], [ 4.0781, 44.119 ], [ 4.0782, 44.1193 ], [ 4.0782, 44.1194 ], [ 4.0783, 44.1195 ], [ 4.0785, 44.1198 ], [ 4.0784, 44.1198 ], [ 4.0785, 44.12 ], [ 4.0782, 44.121 ], [ 4.078, 44.121 ], [ 4.0773, 44.121 ], [ 4.0768, 44.121 ], [ 4.0767, 44.121 ], [ 4.0765, 44.121 ], [ 4.0763, 44.1211 ], [ 4.076, 44.1212 ], [ 4.0756, 44.1214 ], [ 4.075, 44.1217 ], [ 4.0747, 44.1219 ], [ 4.0741, 44.1223 ], [ 4.0737, 44.1225 ], [ 4.0735, 44.1227 ], [ 4.0733, 44.1228 ], [ 4.0731, 44.123 ], [ 4.073, 44.1231 ], [ 4.0729, 44.1232 ], [ 4.0729, 44.1232 ], [ 4.0728, 44.1234 ], [ 4.0713, 44.1232 ], [ 4.0712, 44.123 ], [ 4.071, 44.1231 ], [ 4.0708, 44.1231 ], [ 4.0708, 44.1232 ], [ 4.0702, 44.1232 ], [ 4.07, 44.1232 ], [ 4.0699, 44.1232 ], [ 4.0699, 44.1232 ], [ 4.0698, 44.1233 ], [ 4.0698, 44.1233 ], [ 4.0697, 44.1233 ], [ 4.0696, 44.1233 ], [ 4.0694, 44.1233 ], [ 4.0693, 44.1233 ], [ 4.0693, 44.1234 ], [ 4.0692, 44.1235 ], [ 4.0692, 44.1236 ], [ 4.0692, 44.1237 ], [ 4.0692, 44.1237 ], [ 4.0692, 44.1238 ], [ 4.0692, 44.1239 ], [ 4.0692, 44.1239 ], [ 4.0692, 44.124 ], [ 4.0692, 44.1241 ], [ 4.0692, 44.1241 ], [ 4.0689, 44.1246 ], [ 4.0688, 44.1246 ], [ 4.0685, 44.1245 ], [ 4.0685, 44.1245 ], [ 4.0684, 44.1245 ], [ 4.0683, 44.1247 ], [ 4.0682, 44.1247 ], [ 4.0681, 44.1248 ], [ 4.068, 44.1248 ], [ 4.068, 44.1248 ], [ 4.068, 44.1249 ], [ 4.0679, 44.1249 ], [ 4.0679, 44.1251 ], [ 4.0679, 44.1251 ], [ 4.0679, 44.1252 ], [ 4.0678, 44.1252 ], [ 4.0677, 44.1253 ], [ 4.0676, 44.1253 ], [ 4.0679, 44.1256 ], [ 4.068, 44.1256 ], [ 4.0683, 44.1259 ], [ 4.0683, 44.1259 ], [ 4.0684, 44.1258 ], [ 4.0683, 44.1259 ], [ 4.0682, 44.126 ], [ 4.0682, 44.126 ], [ 4.0681, 44.1261 ], [ 4.0684, 44.1263 ], [ 4.0684, 44.1263 ], [ 4.0683, 44.1264 ], [ 4.0686, 44.1266 ], [ 4.0688, 44.1265 ], [ 4.069, 44.1264 ], [ 4.0693, 44.1261 ], [ 4.0695, 44.1259 ], [ 4.0698, 44.1256 ], [ 4.0699, 44.1256 ], [ 4.0702, 44.1258 ], [ 4.0703, 44.1258 ], [ 4.0703, 44.1259 ], [ 4.0703, 44.126 ], [ 4.0703, 44.126 ], [ 4.0703, 44.1261 ], [ 4.0703, 44.1262 ], [ 4.0703, 44.1262 ], [ 4.0702, 44.1263 ], [ 4.0702, 44.1264 ], [ 4.0703, 44.1265 ], [ 4.0703, 44.1266 ], [ 4.0703, 44.1266 ], [ 4.0702, 44.1266 ], [ 4.0702, 44.1268 ], [ 4.0701, 44.127 ], [ 4.0701, 44.1271 ], [ 4.0701, 44.1272 ], [ 4.0701, 44.1272 ], [ 4.0701, 44.1272 ], [ 4.0702, 44.1273 ], [ 4.0703, 44.1274 ], [ 4.0703, 44.1275 ], [ 4.0703, 44.1276 ], [ 4.0703, 44.1276 ], [ 4.0704, 44.1279 ], [ 4.0703, 44.1279 ], [ 4.0702, 44.128 ], [ 4.0702, 44.1281 ], [ 4.0704, 44.1282 ], [ 4.0704, 44.1282 ], [ 4.0703, 44.1283 ], [ 4.0703, 44.1284 ], [ 4.0702, 44.1284 ], [ 4.0701, 44.1286 ], [ 4.0701, 44.1285 ], [ 4.07, 44.1287 ], [ 4.0701, 44.1288 ], [ 4.0702, 44.1288 ], [ 4.0702, 44.1289 ], [ 4.0701, 44.1289 ], [ 4.07, 44.1292 ], [ 4.0699, 44.1294 ], [ 4.0698, 44.1293 ], [ 4.0695, 44.1294 ], [ 4.0694, 44.1295 ], [ 4.0693, 44.1295 ], [ 4.0691, 44.1295 ], [ 4.069, 44.1296 ], [ 4.069, 44.1296 ], [ 4.0686, 44.1296 ], [ 4.0684, 44.1297 ], [ 4.0682, 44.1297 ], [ 4.068, 44.1297 ], [ 4.0676, 44.1298 ], [ 4.0676, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.13 ], [ 4.0674, 44.1303 ], [ 4.0674, 44.1304 ], [ 4.0674, 44.1304 ], [ 4.0675, 44.1305 ], [ 4.0676, 44.1305 ], [ 4.0676, 44.1305 ], [ 4.0677, 44.1304 ], [ 4.0679, 44.1303 ], [ 4.068, 44.1303 ], [ 4.0683, 44.1303 ], [ 4.069, 44.1304 ], [ 4.0689, 44.1304 ], [ 4.0689, 44.1305 ], [ 4.0689, 44.1306 ], [ 4.069, 44.1307 ], [ 4.069, 44.1309 ], [ 4.069, 44.1313 ], [ 4.069, 44.1318 ], [ 4.0697, 44.1318 ], [ 4.0699, 44.1318 ], [ 4.0699, 44.1318 ], [ 4.0699, 44.1329 ], [ 4.0704, 44.1329 ], [ 4.0707, 44.133 ], [ 4.0707, 44.133 ], [ 4.0707, 44.1331 ], [ 4.0708, 44.1331 ], [ 4.0708, 44.1331 ], [ 4.0708, 44.1332 ], [ 4.0709, 44.1332 ], [ 4.0712, 44.1332 ], [ 4.0713, 44.1332 ], [ 4.0715, 44.1333 ], [ 4.0717, 44.1334 ], [ 4.0719, 44.1335 ], [ 4.0717, 44.1337 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1342 ], [ 4.0716, 44.1344 ], [ 4.0717, 44.1344 ], [ 4.0717, 44.1345 ], [ 4.0716, 44.1345 ], [ 4.0716, 44.1346 ], [ 4.0715, 44.1346 ], [ 4.0714, 44.1346 ], [ 4.0711, 44.1345 ], [ 4.071, 44.1345 ], [ 4.0709, 44.1345 ], [ 4.071, 44.1347 ], [ 4.0711, 44.1348 ], [ 4.0712, 44.135 ], [ 4.0715, 44.1354 ], [ 4.0715, 44.1356 ], [ 4.0716, 44.1357 ], [ 4.0716, 44.1358 ], [ 4.0716, 44.1359 ], [ 4.0717, 44.136 ], [ 4.0718, 44.1362 ], [ 4.0719, 44.1363 ], [ 4.0721, 44.1362 ], [ 4.0723, 44.136 ], [ 4.0725, 44.1359 ], [ 4.0726, 44.1357 ], [ 4.0727, 44.1356 ], [ 4.0729, 44.1356 ], [ 4.073, 44.1353 ], [ 4.0732, 44.1352 ], [ 4.0733, 44.1352 ], [ 4.0736, 44.135 ], [ 4.0737, 44.135 ], [ 4.0737, 44.1351 ], [ 4.0737, 44.1351 ], [ 4.0737, 44.1351 ], [ 4.0738, 44.1352 ], [ 4.0738, 44.1352 ], [ 4.0742, 44.1355 ], [ 4.0743, 44.1356 ], [ 4.0745, 44.1358 ], [ 4.0745, 44.1358 ], [ 4.0747, 44.1359 ], [ 4.0744, 44.1361 ], [ 4.0742, 44.1365 ], [ 4.0741, 44.1369 ], [ 4.074, 44.1372 ], [ 4.0739, 44.1375 ], [ 4.0739, 44.1377 ], [ 4.0739, 44.1381 ], [ 4.074, 44.1385 ], [ 4.0741, 44.1394 ], [ 4.0743, 44.1401 ], [ 4.0744, 44.1407 ], [ 4.0744, 44.1409 ], [ 4.0744, 44.141 ], [ 4.0744, 44.1412 ], [ 4.0745, 44.1414 ], [ 4.0746, 44.1418 ], [ 4.0749, 44.1422 ], [ 4.0749, 44.1424 ], [ 4.0749, 44.1425 ], [ 4.0749, 44.1425 ], [ 4.0747, 44.143 ], [ 4.0744, 44.1437 ], [ 4.0743, 44.1439 ], [ 4.0742, 44.144 ], [ 4.0741, 44.1441 ], [ 4.074, 44.1442 ], [ 4.0739, 44.1443 ], [ 4.0738, 44.1444 ], [ 4.0735, 44.1445 ], [ 4.0732, 44.1447 ], [ 4.073, 44.1449 ], [ 4.0728, 44.1449 ], [ 4.0727, 44.145 ], [ 4.0725, 44.145 ], [ 4.0721, 44.145 ], [ 4.0721, 44.1451 ], [ 4.0723, 44.1451 ], [ 4.0726, 44.1451 ], [ 4.0727, 44.1451 ], [ 4.0728, 44.1451 ], [ 4.0729, 44.1451 ], [ 4.0729, 44.1451 ], [ 4.073, 44.145 ], [ 4.0731, 44.145 ], [ 4.0732, 44.145 ], [ 4.0734, 44.145 ], [ 4.0737, 44.1449 ], [ 4.0739, 44.1448 ], [ 4.0741, 44.1447 ], [ 4.0742, 44.1446 ], [ 4.0743, 44.1447 ], [ 4.0745, 44.1445 ], [ 4.0747, 44.1444 ], [ 4.0747, 44.1444 ], [ 4.0756, 44.1438 ], [ 4.0758, 44.1437 ], [ 4.076, 44.1435 ], [ 4.0762, 44.1433 ], [ 4.0763, 44.1432 ], [ 4.0766, 44.1428 ], [ 4.0769, 44.1423 ], [ 4.0771, 44.1419 ], [ 4.078, 44.1398 ], [ 4.0782, 44.1394 ], [ 4.0779, 44.1395 ], [ 4.0776, 44.1395 ], [ 4.0775, 44.1394 ], [ 4.0775, 44.1393 ], [ 4.0778, 44.1388 ], [ 4.0774, 44.1388 ], [ 4.0774, 44.1385 ], [ 4.0769, 44.1383 ], [ 4.0771, 44.138 ], [ 4.0772, 44.1377 ], [ 4.0773, 44.1375 ], [ 4.0773, 44.1373 ], [ 4.0774, 44.1369 ], [ 4.0773, 44.1365 ], [ 4.0771, 44.1364 ], [ 4.0766, 44.1362 ], [ 4.0764, 44.1362 ], [ 4.0761, 44.136 ], [ 4.0753, 44.1354 ], [ 4.0755, 44.1351 ], [ 4.0758, 44.1349 ], [ 4.0762, 44.1347 ], [ 4.0764, 44.1346 ], [ 4.077, 44.1343 ], [ 4.0783, 44.1337 ], [ 4.0786, 44.134 ], [ 4.0786, 44.1341 ], [ 4.0788, 44.1344 ], [ 4.0792, 44.135 ], [ 4.0795, 44.1355 ], [ 4.0797, 44.1357 ], [ 4.0798, 44.136 ], [ 4.08, 44.1371 ], [ 4.08, 44.1375 ], [ 4.08, 44.1383 ], [ 4.0799, 44.1385 ], [ 4.0798, 44.1389 ], [ 4.0798, 44.1391 ], [ 4.0804, 44.1392 ], [ 4.0808, 44.1396 ], [ 4.0811, 44.1395 ], [ 4.0813, 44.1393 ], [ 4.0813, 44.1393 ], [ 4.0814, 44.1393 ], [ 4.082, 44.1394 ], [ 4.0822, 44.1395 ], [ 4.0825, 44.1397 ], [ 4.0828, 44.1398 ], [ 4.0832, 44.1399 ], [ 4.0835, 44.1401 ], [ 4.0835, 44.1402 ], [ 4.0835, 44.1403 ], [ 4.0837, 44.1403 ], [ 4.084, 44.1405 ], [ 4.0842, 44.1406 ], [ 4.0847, 44.1406 ], [ 4.0847, 44.1407 ], [ 4.0846, 44.1409 ], [ 4.0841, 44.1416 ], [ 4.0838, 44.1418 ], [ 4.0837, 44.1419 ], [ 4.0836, 44.1421 ], [ 4.0833, 44.1429 ], [ 4.0833, 44.143 ], [ 4.0833, 44.1431 ], [ 4.0833, 44.1435 ], [ 4.0833, 44.1436 ], [ 4.0832, 44.1437 ], [ 4.0831, 44.1438 ], [ 4.0829, 44.1441 ], [ 4.0825, 44.1445 ], [ 4.0824, 44.1448 ], [ 4.0823, 44.1449 ], [ 4.0823, 44.1449 ], [ 4.0822, 44.1453 ], [ 4.0822, 44.1454 ], [ 4.0822, 44.1454 ], [ 4.0822, 44.1455 ], [ 4.0822, 44.1455 ], [ 4.082, 44.1458 ], [ 4.0819, 44.1459 ], [ 4.0818, 44.1459 ], [ 4.0811, 44.1462 ], [ 4.0809, 44.1463 ], [ 4.0809, 44.1464 ], [ 4.0807, 44.1471 ], [ 4.0807, 44.1473 ], [ 4.0806, 44.1477 ], [ 4.0807, 44.1477 ], [ 4.0806, 44.148 ], [ 4.0808, 44.148 ], [ 4.0807, 44.1484 ], [ 4.0802, 44.1484 ], [ 4.0801, 44.1489 ], [ 4.0799, 44.1489 ], [ 4.0794, 44.149 ], [ 4.0794, 44.1491 ], [ 4.0795, 44.1492 ], [ 4.0796, 44.1494 ], [ 4.0798, 44.1497 ], [ 4.0803, 44.1496 ], [ 4.0804, 44.1499 ], [ 4.0804, 44.15 ], [ 4.0806, 44.1504 ], [ 4.0809, 44.1504 ], [ 4.0809, 44.1504 ], [ 4.0809, 44.1506 ], [ 4.0809, 44.1509 ], [ 4.0809, 44.1509 ], [ 4.0809, 44.1511 ], [ 4.081, 44.1514 ], [ 4.081, 44.1515 ], [ 4.0813, 44.1514 ], [ 4.0816, 44.1513 ], [ 4.0817, 44.1512 ], [ 4.0817, 44.1513 ], [ 4.0821, 44.1517 ], [ 4.0826, 44.152 ], [ 4.0826, 44.1521 ], [ 4.083, 44.1524 ], [ 4.0831, 44.1524 ], [ 4.0836, 44.1532 ], [ 4.0834, 44.1533 ], [ 4.0836, 44.1537 ], [ 4.0837, 44.1538 ], [ 4.0839, 44.1536 ], [ 4.0841, 44.1535 ], [ 4.0843, 44.1534 ], [ 4.0845, 44.1532 ], [ 4.0848, 44.1531 ], [ 4.0849, 44.153 ], [ 4.0849, 44.153 ], [ 4.085, 44.1529 ], [ 4.0849, 44.1528 ], [ 4.0849, 44.1527 ], [ 4.0848, 44.1527 ], [ 4.0847, 44.1525 ], [ 4.084, 44.1521 ], [ 4.0841, 44.1516 ], [ 4.0838, 44.1515 ], [ 4.0839, 44.151 ], [ 4.0838, 44.1507 ], [ 4.0838, 44.1504 ], [ 4.0836, 44.1502 ], [ 4.0836, 44.1502 ], [ 4.0835, 44.1502 ], [ 4.0835, 44.1502 ], [ 4.0834, 44.1502 ], [ 4.0833, 44.1502 ], [ 4.0832, 44.1498 ], [ 4.0831, 44.1495 ], [ 4.0831, 44.1494 ], [ 4.083, 44.1492 ], [ 4.083, 44.1492 ], [ 4.0829, 44.1492 ], [ 4.0829, 44.1491 ], [ 4.0829, 44.1491 ], [ 4.0828, 44.149 ], [ 4.0823, 44.149 ], [ 4.0821, 44.1491 ], [ 4.0821, 44.149 ], [ 4.0822, 44.1489 ], [ 4.0818, 44.1488 ], [ 4.0816, 44.1488 ], [ 4.0817, 44.1486 ], [ 4.0819, 44.148 ], [ 4.082, 44.1479 ], [ 4.0821, 44.148 ], [ 4.0822, 44.148 ], [ 4.0824, 44.148 ], [ 4.0824, 44.1479 ], [ 4.0825, 44.1475 ], [ 4.0825, 44.1475 ], [ 4.0827, 44.1475 ], [ 4.0828, 44.1475 ], [ 4.0833, 44.1475 ], [ 4.0833, 44.1474 ], [ 4.0833, 44.1474 ], [ 4.0834, 44.1473 ], [ 4.0835, 44.1472 ], [ 4.0837, 44.147 ], [ 4.084, 44.1467 ], [ 4.0843, 44.1465 ], [ 4.0838, 44.1463 ], [ 4.0839, 44.1462 ], [ 4.0839, 44.1462 ], [ 4.0843, 44.1459 ], [ 4.0844, 44.1459 ], [ 4.0845, 44.1458 ], [ 4.0845, 44.1457 ], [ 4.0845, 44.1455 ], [ 4.0851, 44.1455 ], [ 4.0851, 44.1454 ], [ 4.085, 44.1452 ], [ 4.0851, 44.1452 ], [ 4.0851, 44.145 ], [ 4.0851, 44.1446 ], [ 4.0858, 44.1443 ], [ 4.0861, 44.1439 ], [ 4.0865, 44.1439 ], [ 4.087, 44.1439 ], [ 4.0877, 44.1439 ], [ 4.0883, 44.1439 ], [ 4.0886, 44.1439 ], [ 4.0887, 44.1439 ], [ 4.0887, 44.1441 ], [ 4.0887, 44.1445 ], [ 4.0891, 44.1445 ], [ 4.0894, 44.1443 ], [ 4.0894, 44.1442 ], [ 4.0897, 44.1441 ], [ 4.0898, 44.144 ], [ 4.0899, 44.144 ], [ 4.0901, 44.144 ], [ 4.0905, 44.1437 ], [ 4.0905, 44.1437 ], [ 4.0906, 44.1437 ], [ 4.0907, 44.1437 ], [ 4.0909, 44.1436 ], [ 4.091, 44.1436 ], [ 4.091, 44.1436 ], [ 4.0911, 44.1436 ], [ 4.0911, 44.1435 ], [ 4.0912, 44.1435 ], [ 4.0912, 44.1434 ], [ 4.0913, 44.1433 ], [ 4.0913, 44.1433 ], [ 4.0915, 44.143 ], [ 4.0917, 44.1428 ], [ 4.0918, 44.1426 ], [ 4.0918, 44.1425 ] ] ], "type": "Polygon" }, "id": "18", "properties": { "code_commune": "30007", "code_departement": "30", "code_qp": "QP030001", "commune_qp": "Alès", "nom_commune": "Alès", "nom_qp": "Près Saint Jean - Cévennes - Tamaris - Cauvel-la Royale - Rochebelle - Centre ville" }, "type": "Feature" }, { "bbox": [ 4.3733, 43.8361, 4.3789, 43.8394 ], "geometry": { "coordinates": [ [ [ 4.3741, 43.8372 ], [ 4.3741, 43.8372 ], [ 4.374, 43.8372 ], [ 4.3739, 43.8373 ], [ 4.3738, 43.8375 ], [ 4.3737, 43.8377 ], [ 4.3733, 43.8383 ], [ 4.3745, 43.8382 ], [ 4.3752, 43.8381 ], [ 4.3753, 43.838 ], [ 4.3752, 43.8381 ], [ 4.3748, 43.8384 ], [ 4.3745, 43.8387 ], [ 4.3741, 43.839 ], [ 4.3746, 43.8391 ], [ 4.375, 43.8391 ], [ 4.3756, 43.8386 ], [ 4.3757, 43.8386 ], [ 4.3756, 43.838 ], [ 4.376, 43.838 ], [ 4.3762, 43.8376 ], [ 4.3765, 43.8374 ], [ 4.3768, 43.8375 ], [ 4.3767, 43.838 ], [ 4.3768, 43.838 ], [ 4.377, 43.8385 ], [ 4.377, 43.8388 ], [ 4.3771, 43.8394 ], [ 4.3773, 43.8394 ], [ 4.3777, 43.8394 ], [ 4.3777, 43.8391 ], [ 4.3781, 43.839 ], [ 4.3777, 43.8383 ], [ 4.378, 43.8382 ], [ 4.3778, 43.8379 ], [ 4.3779, 43.8379 ], [ 4.3789, 43.8378 ], [ 4.3788, 43.8367 ], [ 4.3784, 43.8369 ], [ 4.3781, 43.8371 ], [ 4.3776, 43.8366 ], [ 4.3774, 43.8363 ], [ 4.3768, 43.8369 ], [ 4.3764, 43.8372 ], [ 4.3759, 43.837 ], [ 4.376, 43.8369 ], [ 4.3761, 43.8368 ], [ 4.3764, 43.8365 ], [ 4.3762, 43.8364 ], [ 4.3758, 43.8361 ], [ 4.3739, 43.8369 ], [ 4.3741, 43.8372 ] ] ], "type": "Polygon" }, "id": "19", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030007", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Route De Beaucaire" }, "type": "Feature" }, { "bbox": [ 1.3974, 43.592, 1.4081, 43.5977 ], "geometry": { "coordinates": [ [ [ 1.4005, 43.5923 ], [ 1.3994, 43.592 ], [ 1.3994, 43.592 ], [ 1.3993, 43.5921 ], [ 1.3992, 43.5922 ], [ 1.3991, 43.5923 ], [ 1.3989, 43.5928 ], [ 1.3984, 43.5935 ], [ 1.3983, 43.5938 ], [ 1.3982, 43.5945 ], [ 1.398, 43.5944 ], [ 1.3979, 43.5947 ], [ 1.3978, 43.5948 ], [ 1.3977, 43.5953 ], [ 1.3977, 43.5954 ], [ 1.3976, 43.5959 ], [ 1.3975, 43.596 ], [ 1.3976, 43.596 ], [ 1.3976, 43.5962 ], [ 1.3976, 43.5963 ], [ 1.3975, 43.5967 ], [ 1.3974, 43.5972 ], [ 1.3974, 43.5977 ], [ 1.3975, 43.5975 ], [ 1.3976, 43.5975 ], [ 1.3977, 43.5974 ], [ 1.3977, 43.5974 ], [ 1.3982, 43.5971 ], [ 1.3987, 43.5969 ], [ 1.3991, 43.5967 ], [ 1.3992, 43.5967 ], [ 1.3993, 43.5967 ], [ 1.4, 43.5968 ], [ 1.4002, 43.5969 ], [ 1.4002, 43.5969 ], [ 1.4004, 43.5966 ], [ 1.4005, 43.5962 ], [ 1.4006, 43.5962 ], [ 1.4006, 43.5962 ], [ 1.4007, 43.5961 ], [ 1.4011, 43.5961 ], [ 1.4012, 43.5961 ], [ 1.4013, 43.5961 ], [ 1.4023, 43.5961 ], [ 1.4025, 43.5961 ], [ 1.403, 43.5965 ], [ 1.4038, 43.5965 ], [ 1.4039, 43.5959 ], [ 1.404, 43.5954 ], [ 1.4042, 43.5954 ], [ 1.4043, 43.5952 ], [ 1.4045, 43.5951 ], [ 1.4047, 43.5949 ], [ 1.4054, 43.5945 ], [ 1.4058, 43.5944 ], [ 1.4058, 43.5944 ], [ 1.4069, 43.5939 ], [ 1.4077, 43.5938 ], [ 1.4078, 43.5937 ], [ 1.4078, 43.5937 ], [ 1.4081, 43.5936 ], [ 1.4079, 43.5936 ], [ 1.407, 43.5934 ], [ 1.4043, 43.5929 ], [ 1.402, 43.5925 ], [ 1.4019, 43.5925 ], [ 1.4016, 43.5925 ], [ 1.4005, 43.5923 ] ] ], "type": "Polygon" }, "id": "20", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031012", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Cépière Beauregard" }, "type": "Feature" }, { "bbox": [ 4.3709, 43.825, 4.3853, 43.834 ], "geometry": { "coordinates": [ [ [ 4.3811, 43.8269 ], [ 4.3805, 43.8276 ], [ 4.3816, 43.8281 ], [ 4.3818, 43.8282 ], [ 4.3826, 43.8285 ], [ 4.3822, 43.8289 ], [ 4.3813, 43.8285 ], [ 4.3809, 43.829 ], [ 4.3805, 43.8294 ], [ 4.3802, 43.8298 ], [ 4.3798, 43.8297 ], [ 4.3795, 43.8295 ], [ 4.3793, 43.8293 ], [ 4.379, 43.8292 ], [ 4.3785, 43.8288 ], [ 4.3783, 43.8286 ], [ 4.378, 43.8288 ], [ 4.3776, 43.8287 ], [ 4.3772, 43.8285 ], [ 4.3771, 43.8285 ], [ 4.3771, 43.8284 ], [ 4.3773, 43.8283 ], [ 4.3776, 43.8279 ], [ 4.3768, 43.8273 ], [ 4.3771, 43.8271 ], [ 4.3768, 43.8267 ], [ 4.3766, 43.8268 ], [ 4.3765, 43.8266 ], [ 4.3764, 43.8267 ], [ 4.3763, 43.8267 ], [ 4.3761, 43.8265 ], [ 4.376, 43.8266 ], [ 4.3752, 43.827 ], [ 4.375, 43.8273 ], [ 4.3745, 43.8273 ], [ 4.3743, 43.8272 ], [ 4.3741, 43.827 ], [ 4.3735, 43.8266 ], [ 4.3745, 43.8257 ], [ 4.3734, 43.8251 ], [ 4.3733, 43.8251 ], [ 4.3732, 43.8251 ], [ 4.3731, 43.8253 ], [ 4.3722, 43.826 ], [ 4.3721, 43.826 ], [ 4.3719, 43.8261 ], [ 4.3717, 43.8264 ], [ 4.3717, 43.8265 ], [ 4.3718, 43.8266 ], [ 4.3718, 43.8267 ], [ 4.3717, 43.8268 ], [ 4.3717, 43.8268 ], [ 4.3717, 43.8268 ], [ 4.3719, 43.8269 ], [ 4.372, 43.827 ], [ 4.3719, 43.8271 ], [ 4.3719, 43.8272 ], [ 4.3718, 43.8273 ], [ 4.3716, 43.8274 ], [ 4.3716, 43.8274 ], [ 4.3713, 43.8275 ], [ 4.3711, 43.8276 ], [ 4.3709, 43.8277 ], [ 4.3712, 43.8279 ], [ 4.3715, 43.8277 ], [ 4.3717, 43.8278 ], [ 4.3719, 43.8278 ], [ 4.3721, 43.8276 ], [ 4.3724, 43.8278 ], [ 4.3732, 43.8283 ], [ 4.3742, 43.8277 ], [ 4.3743, 43.8276 ], [ 4.3743, 43.8275 ], [ 4.3744, 43.8275 ], [ 4.3748, 43.8275 ], [ 4.3752, 43.8275 ], [ 4.3756, 43.8277 ], [ 4.376, 43.828 ], [ 4.3787, 43.8296 ], [ 4.3793, 43.8299 ], [ 4.3801, 43.8304 ], [ 4.3796, 43.8309 ], [ 4.379, 43.8306 ], [ 4.3783, 43.8312 ], [ 4.3803, 43.8323 ], [ 4.3802, 43.8325 ], [ 4.3801, 43.8326 ], [ 4.3799, 43.833 ], [ 4.3798, 43.8331 ], [ 4.3809, 43.8337 ], [ 4.3815, 43.834 ], [ 4.3828, 43.8331 ], [ 4.3837, 43.8336 ], [ 4.384, 43.8332 ], [ 4.3834, 43.8328 ], [ 4.3823, 43.8321 ], [ 4.3825, 43.8319 ], [ 4.3818, 43.8316 ], [ 4.3812, 43.8313 ], [ 4.3811, 43.8312 ], [ 4.3817, 43.8308 ], [ 4.3819, 43.8306 ], [ 4.3825, 43.8299 ], [ 4.3827, 43.8297 ], [ 4.3819, 43.8294 ], [ 4.382, 43.8293 ], [ 4.382, 43.8293 ], [ 4.3826, 43.8291 ], [ 4.3831, 43.8288 ], [ 4.3832, 43.8287 ], [ 4.3836, 43.8284 ], [ 4.384, 43.8279 ], [ 4.3844, 43.8273 ], [ 4.3849, 43.8268 ], [ 4.3853, 43.8264 ], [ 4.385, 43.8264 ], [ 4.3848, 43.8264 ], [ 4.3845, 43.8263 ], [ 4.384, 43.8261 ], [ 4.3835, 43.8259 ], [ 4.3827, 43.8255 ], [ 4.3818, 43.8251 ], [ 4.3816, 43.825 ], [ 4.3814, 43.825 ], [ 4.3813, 43.8251 ], [ 4.3813, 43.8253 ], [ 4.3814, 43.8253 ], [ 4.3821, 43.8257 ], [ 4.382, 43.8258 ], [ 4.3816, 43.8264 ], [ 4.3811, 43.8269 ] ] ], "type": "Polygon" }, "id": "21", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030008", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Némausus-Jonquilles - Haute Magaille - Oliviers" }, "type": "Feature" }, { "bbox": [ 2.3249, 43.2066, 2.3357, 43.2114 ], "geometry": { "coordinates": [ [ [ 2.3351, 43.21 ], [ 2.335, 43.2098 ], [ 2.335, 43.2095 ], [ 2.3357, 43.2094 ], [ 2.3357, 43.2092 ], [ 2.3356, 43.2089 ], [ 2.3351, 43.2089 ], [ 2.335, 43.2089 ], [ 2.335, 43.2088 ], [ 2.335, 43.2087 ], [ 2.335, 43.2085 ], [ 2.335, 43.2081 ], [ 2.3349, 43.208 ], [ 2.3339, 43.2081 ], [ 2.3332, 43.2083 ], [ 2.3324, 43.2084 ], [ 2.3321, 43.2085 ], [ 2.3321, 43.2081 ], [ 2.3317, 43.2082 ], [ 2.3305, 43.2082 ], [ 2.3303, 43.2082 ], [ 2.3302, 43.2082 ], [ 2.3296, 43.2083 ], [ 2.3289, 43.2083 ], [ 2.3289, 43.2081 ], [ 2.3287, 43.208 ], [ 2.3285, 43.208 ], [ 2.3283, 43.2079 ], [ 2.3279, 43.2076 ], [ 2.3279, 43.2075 ], [ 2.3277, 43.2075 ], [ 2.3276, 43.2075 ], [ 2.3276, 43.2074 ], [ 2.3275, 43.2074 ], [ 2.3272, 43.2072 ], [ 2.327, 43.2071 ], [ 2.3269, 43.207 ], [ 2.3268, 43.2069 ], [ 2.3268, 43.2066 ], [ 2.3264, 43.2066 ], [ 2.3265, 43.2069 ], [ 2.3265, 43.207 ], [ 2.3265, 43.2071 ], [ 2.3265, 43.2073 ], [ 2.3258, 43.2073 ], [ 2.3249, 43.2073 ], [ 2.3251, 43.2074 ], [ 2.3252, 43.2076 ], [ 2.3255, 43.2078 ], [ 2.3258, 43.208 ], [ 2.3262, 43.2083 ], [ 2.3263, 43.2084 ], [ 2.3266, 43.2087 ], [ 2.3272, 43.2092 ], [ 2.3275, 43.2094 ], [ 2.3278, 43.2096 ], [ 2.3281, 43.2099 ], [ 2.3286, 43.2104 ], [ 2.3287, 43.2104 ], [ 2.3293, 43.2109 ], [ 2.3297, 43.2112 ], [ 2.3299, 43.2114 ], [ 2.3304, 43.2113 ], [ 2.3304, 43.2113 ], [ 2.3305, 43.2113 ], [ 2.3305, 43.211 ], [ 2.3304, 43.2095 ], [ 2.3305, 43.2095 ], [ 2.3313, 43.2094 ], [ 2.332, 43.2094 ], [ 2.3324, 43.2094 ], [ 2.3324, 43.21 ], [ 2.3333, 43.2099 ], [ 2.3333, 43.2101 ], [ 2.3338, 43.2101 ], [ 2.3351, 43.21 ] ] ], "type": "Polygon" }, "id": "22", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011003", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Le Viguier - Saint-Jacques" }, "type": "Feature" }, { "bbox": [ 1.3251, 43.6093, 1.3344, 43.6178 ], "geometry": { "coordinates": [ [ [ 1.3338, 43.6133 ], [ 1.3339, 43.6133 ], [ 1.3339, 43.6132 ], [ 1.3338, 43.6131 ], [ 1.3338, 43.613 ], [ 1.3339, 43.6129 ], [ 1.3344, 43.6128 ], [ 1.3342, 43.6123 ], [ 1.3341, 43.6122 ], [ 1.334, 43.6121 ], [ 1.3338, 43.6116 ], [ 1.3337, 43.6115 ], [ 1.3336, 43.6115 ], [ 1.3333, 43.6116 ], [ 1.3333, 43.6117 ], [ 1.3328, 43.6118 ], [ 1.3326, 43.6117 ], [ 1.3324, 43.6117 ], [ 1.3319, 43.6118 ], [ 1.3319, 43.6119 ], [ 1.332, 43.6122 ], [ 1.3319, 43.6123 ], [ 1.3319, 43.6123 ], [ 1.3317, 43.6123 ], [ 1.3315, 43.6123 ], [ 1.3316, 43.6124 ], [ 1.3311, 43.6125 ], [ 1.331, 43.6125 ], [ 1.331, 43.6124 ], [ 1.3309, 43.6123 ], [ 1.3308, 43.6121 ], [ 1.3306, 43.6119 ], [ 1.3293, 43.6109 ], [ 1.3274, 43.6094 ], [ 1.3273, 43.6093 ], [ 1.3272, 43.6093 ], [ 1.3271, 43.6093 ], [ 1.3269, 43.6094 ], [ 1.3267, 43.6094 ], [ 1.3265, 43.6093 ], [ 1.3263, 43.6093 ], [ 1.3262, 43.6093 ], [ 1.3257, 43.6096 ], [ 1.3256, 43.6097 ], [ 1.3256, 43.6099 ], [ 1.3253, 43.6099 ], [ 1.3251, 43.61 ], [ 1.3254, 43.6105 ], [ 1.3256, 43.6107 ], [ 1.3254, 43.6108 ], [ 1.3256, 43.6111 ], [ 1.3256, 43.6111 ], [ 1.3258, 43.611 ], [ 1.3262, 43.6108 ], [ 1.3264, 43.6111 ], [ 1.3265, 43.6114 ], [ 1.3266, 43.6119 ], [ 1.3266, 43.6121 ], [ 1.3267, 43.6122 ], [ 1.3268, 43.6122 ], [ 1.327, 43.6129 ], [ 1.3273, 43.6129 ], [ 1.3272, 43.613 ], [ 1.3275, 43.6132 ], [ 1.3274, 43.6133 ], [ 1.3273, 43.6134 ], [ 1.3268, 43.6136 ], [ 1.3269, 43.6138 ], [ 1.3271, 43.614 ], [ 1.3272, 43.6141 ], [ 1.3274, 43.6142 ], [ 1.328, 43.6143 ], [ 1.3283, 43.6144 ], [ 1.3281, 43.6145 ], [ 1.3279, 43.6146 ], [ 1.3282, 43.615 ], [ 1.3264, 43.6158 ], [ 1.3263, 43.6159 ], [ 1.3262, 43.616 ], [ 1.3266, 43.6163 ], [ 1.3272, 43.6167 ], [ 1.3273, 43.6169 ], [ 1.3274, 43.6172 ], [ 1.3274, 43.6174 ], [ 1.3272, 43.6176 ], [ 1.3272, 43.6178 ], [ 1.3281, 43.6177 ], [ 1.3288, 43.6175 ], [ 1.3294, 43.6173 ], [ 1.3293, 43.6172 ], [ 1.3292, 43.6169 ], [ 1.3291, 43.6165 ], [ 1.3288, 43.6154 ], [ 1.3287, 43.6151 ], [ 1.3287, 43.615 ], [ 1.3285, 43.6149 ], [ 1.3288, 43.6148 ], [ 1.3309, 43.6145 ], [ 1.3315, 43.6144 ], [ 1.3314, 43.6143 ], [ 1.3312, 43.6139 ], [ 1.3311, 43.6134 ], [ 1.3314, 43.6132 ], [ 1.3316, 43.6132 ], [ 1.3318, 43.6129 ], [ 1.3319, 43.6128 ], [ 1.3321, 43.6131 ], [ 1.3323, 43.6137 ], [ 1.3323, 43.6137 ], [ 1.3327, 43.6136 ], [ 1.333, 43.6136 ], [ 1.3333, 43.6135 ], [ 1.3338, 43.6133 ] ] ], "type": "Polygon" }, "id": "23", "properties": { "code_commune": "31149", "code_departement": "31", "code_qp": "QP031005", "commune_qp": "Colomiers", "nom_commune": "Colomiers", "nom_qp": "Val D'Aran - Poitou - Pyrénées" }, "type": "Feature" }, { "bbox": [ 1.0964, 44.098, 1.1024, 44.1054 ], "geometry": { "coordinates": [ [ [ 1.1, 44.1052 ], [ 1.0996, 44.1045 ], [ 1.1001, 44.1044 ], [ 1.1, 44.1041 ], [ 1.1, 44.1041 ], [ 1.0999, 44.104 ], [ 1.1004, 44.104 ], [ 1.1016, 44.1039 ], [ 1.1017, 44.1032 ], [ 1.1017, 44.103 ], [ 1.1021, 44.1007 ], [ 1.1022, 44.1 ], [ 1.1022, 44.1 ], [ 1.1024, 44.0988 ], [ 1.1019, 44.0987 ], [ 1.1017, 44.0989 ], [ 1.1014, 44.0991 ], [ 1.1017, 44.0993 ], [ 1.1013, 44.0997 ], [ 1.1006, 44.0991 ], [ 1.1006, 44.099 ], [ 1.101, 44.0988 ], [ 1.1, 44.098 ], [ 1.0997, 44.0981 ], [ 1.0996, 44.0981 ], [ 1.0995, 44.0982 ], [ 1.0995, 44.0982 ], [ 1.0995, 44.0983 ], [ 1.1015, 44.0999 ], [ 1.1016, 44.1001 ], [ 1.1011, 44.1001 ], [ 1.1002, 44.1004 ], [ 1.0999, 44.1004 ], [ 1.0998, 44.1005 ], [ 1.0994, 44.1006 ], [ 1.0994, 44.1008 ], [ 1.0996, 44.1012 ], [ 1.099, 44.1013 ], [ 1.0986, 44.1014 ], [ 1.0984, 44.1014 ], [ 1.0983, 44.1012 ], [ 1.0983, 44.1011 ], [ 1.0978, 44.1013 ], [ 1.0977, 44.1013 ], [ 1.0967, 44.1017 ], [ 1.0969, 44.102 ], [ 1.098, 44.1018 ], [ 1.0984, 44.1027 ], [ 1.0979, 44.1028 ], [ 1.0978, 44.1029 ], [ 1.0975, 44.1036 ], [ 1.0974, 44.1036 ], [ 1.0974, 44.103 ], [ 1.0974, 44.1029 ], [ 1.0966, 44.1031 ], [ 1.0964, 44.1031 ], [ 1.0965, 44.1045 ], [ 1.0975, 44.1043 ], [ 1.0979, 44.1042 ], [ 1.0982, 44.1042 ], [ 1.0986, 44.1042 ], [ 1.0986, 44.1042 ], [ 1.0986, 44.1044 ], [ 1.0987, 44.1045 ], [ 1.0988, 44.1045 ], [ 1.0989, 44.1046 ], [ 1.099, 44.1047 ], [ 1.0992, 44.1047 ], [ 1.0993, 44.1048 ], [ 1.0994, 44.105 ], [ 1.0995, 44.1052 ], [ 1.0996, 44.1054 ], [ 1.1, 44.1052 ] ] ], "type": "Polygon" }, "id": "24", "properties": { "code_commune": "82112", "code_departement": "82", "code_qp": "QP082004", "commune_qp": "Moissac", "nom_commune": "Moissac", "nom_qp": "Sarlac" }, "type": "Feature" }, { "bbox": [ 1.4363, 43.5742, 1.4452, 43.584 ], "geometry": { "coordinates": [ [ [ 1.4389, 43.5821 ], [ 1.4392, 43.5824 ], [ 1.4394, 43.5832 ], [ 1.4396, 43.584 ], [ 1.4415, 43.5839 ], [ 1.4437, 43.5838 ], [ 1.4441, 43.5839 ], [ 1.4444, 43.5839 ], [ 1.4444, 43.5833 ], [ 1.4445, 43.5833 ], [ 1.4445, 43.5832 ], [ 1.4445, 43.5832 ], [ 1.4445, 43.5831 ], [ 1.4445, 43.5829 ], [ 1.4444, 43.5829 ], [ 1.4444, 43.5828 ], [ 1.4445, 43.5828 ], [ 1.4444, 43.5827 ], [ 1.4444, 43.5826 ], [ 1.4443, 43.5826 ], [ 1.4443, 43.5824 ], [ 1.4446, 43.5825 ], [ 1.4446, 43.5824 ], [ 1.4443, 43.5824 ], [ 1.4443, 43.5822 ], [ 1.4444, 43.5822 ], [ 1.4444, 43.5821 ], [ 1.4445, 43.5821 ], [ 1.4446, 43.5819 ], [ 1.4446, 43.5816 ], [ 1.4447, 43.5814 ], [ 1.4448, 43.5813 ], [ 1.4443, 43.5812 ], [ 1.4448, 43.5807 ], [ 1.4452, 43.5803 ], [ 1.4449, 43.5803 ], [ 1.4446, 43.5802 ], [ 1.4445, 43.5803 ], [ 1.4443, 43.5803 ], [ 1.4443, 43.5806 ], [ 1.444, 43.5806 ], [ 1.4436, 43.5806 ], [ 1.4435, 43.58 ], [ 1.4434, 43.5796 ], [ 1.4432, 43.5787 ], [ 1.4432, 43.5784 ], [ 1.4429, 43.578 ], [ 1.4431, 43.5778 ], [ 1.4435, 43.5777 ], [ 1.4441, 43.5771 ], [ 1.4446, 43.5765 ], [ 1.444, 43.576 ], [ 1.4439, 43.576 ], [ 1.443, 43.5761 ], [ 1.443, 43.5761 ], [ 1.4429, 43.5763 ], [ 1.4428, 43.5774 ], [ 1.4426, 43.5774 ], [ 1.4408, 43.5777 ], [ 1.4408, 43.5772 ], [ 1.4418, 43.5769 ], [ 1.4416, 43.5766 ], [ 1.4415, 43.5766 ], [ 1.4414, 43.5764 ], [ 1.4411, 43.5762 ], [ 1.4413, 43.5761 ], [ 1.4407, 43.5756 ], [ 1.4406, 43.5754 ], [ 1.4402, 43.5751 ], [ 1.4387, 43.5742 ], [ 1.438, 43.5744 ], [ 1.4374, 43.5746 ], [ 1.4377, 43.575 ], [ 1.4363, 43.5755 ], [ 1.4363, 43.5771 ], [ 1.4366, 43.5785 ], [ 1.4369, 43.5792 ], [ 1.4376, 43.5802 ], [ 1.4385, 43.5813 ], [ 1.4389, 43.5821 ] ] ], "type": "Polygon" }, "id": "25", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031010", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Empalot" }, "type": "Feature" }, { "bbox": [ 2.8651, 42.6886, 2.8724, 42.6985 ], "geometry": { "coordinates": [ [ [ 2.8724, 42.6973 ], [ 2.8723, 42.6972 ], [ 2.8721, 42.6972 ], [ 2.8718, 42.6972 ], [ 2.8716, 42.6972 ], [ 2.8714, 42.6972 ], [ 2.8712, 42.6971 ], [ 2.871, 42.6971 ], [ 2.871, 42.6971 ], [ 2.8709, 42.697 ], [ 2.8709, 42.6967 ], [ 2.8709, 42.6966 ], [ 2.8709, 42.6964 ], [ 2.8709, 42.6962 ], [ 2.8709, 42.696 ], [ 2.8709, 42.696 ], [ 2.8705, 42.696 ], [ 2.8705, 42.6959 ], [ 2.8704, 42.6958 ], [ 2.8704, 42.6956 ], [ 2.8704, 42.6955 ], [ 2.8703, 42.6953 ], [ 2.8703, 42.6952 ], [ 2.8702, 42.6949 ], [ 2.8703, 42.6948 ], [ 2.8703, 42.6946 ], [ 2.8703, 42.6945 ], [ 2.8704, 42.6945 ], [ 2.8705, 42.6944 ], [ 2.8706, 42.6944 ], [ 2.8707, 42.6944 ], [ 2.8707, 42.6943 ], [ 2.8708, 42.6943 ], [ 2.8709, 42.6942 ], [ 2.8709, 42.6942 ], [ 2.8709, 42.6941 ], [ 2.8708, 42.694 ], [ 2.8708, 42.694 ], [ 2.8707, 42.6938 ], [ 2.8705, 42.6935 ], [ 2.8704, 42.6933 ], [ 2.8703, 42.6932 ], [ 2.8703, 42.6932 ], [ 2.8703, 42.6932 ], [ 2.8702, 42.693 ], [ 2.8703, 42.6926 ], [ 2.8702, 42.6924 ], [ 2.8702, 42.692 ], [ 2.8703, 42.6921 ], [ 2.8706, 42.6918 ], [ 2.8705, 42.6918 ], [ 2.8697, 42.6914 ], [ 2.8693, 42.6912 ], [ 2.8695, 42.6908 ], [ 2.8698, 42.6904 ], [ 2.8702, 42.6901 ], [ 2.8702, 42.69 ], [ 2.8701, 42.69 ], [ 2.8701, 42.6899 ], [ 2.8698, 42.6897 ], [ 2.8693, 42.6894 ], [ 2.8681, 42.6889 ], [ 2.8665, 42.6886 ], [ 2.8659, 42.6892 ], [ 2.8657, 42.6891 ], [ 2.8651, 42.6897 ], [ 2.8661, 42.6902 ], [ 2.8663, 42.6902 ], [ 2.8665, 42.69 ], [ 2.8673, 42.6904 ], [ 2.8671, 42.6906 ], [ 2.867, 42.6907 ], [ 2.8667, 42.6908 ], [ 2.8664, 42.6908 ], [ 2.8669, 42.6917 ], [ 2.8668, 42.6917 ], [ 2.867, 42.6919 ], [ 2.867, 42.692 ], [ 2.8675, 42.692 ], [ 2.8676, 42.6922 ], [ 2.8677, 42.6923 ], [ 2.8679, 42.693 ], [ 2.8679, 42.693 ], [ 2.868, 42.693 ], [ 2.8681, 42.693 ], [ 2.8683, 42.6933 ], [ 2.8685, 42.6938 ], [ 2.8685, 42.6939 ], [ 2.8687, 42.6943 ], [ 2.8687, 42.6944 ], [ 2.8688, 42.6944 ], [ 2.8688, 42.6945 ], [ 2.869, 42.6944 ], [ 2.8692, 42.6949 ], [ 2.8693, 42.6951 ], [ 2.869, 42.6952 ], [ 2.8691, 42.6955 ], [ 2.8691, 42.6955 ], [ 2.8691, 42.6958 ], [ 2.869, 42.6958 ], [ 2.869, 42.696 ], [ 2.869, 42.696 ], [ 2.8684, 42.6961 ], [ 2.8685, 42.6963 ], [ 2.8685, 42.6963 ], [ 2.8685, 42.6967 ], [ 2.8685, 42.697 ], [ 2.8686, 42.6972 ], [ 2.8686, 42.6972 ], [ 2.8687, 42.6973 ], [ 2.8687, 42.6974 ], [ 2.8691, 42.6975 ], [ 2.8693, 42.6976 ], [ 2.8696, 42.6976 ], [ 2.8704, 42.6978 ], [ 2.8704, 42.6978 ], [ 2.8702, 42.6983 ], [ 2.8708, 42.6984 ], [ 2.8714, 42.6984 ], [ 2.8717, 42.6985 ], [ 2.8719, 42.6985 ], [ 2.872, 42.6982 ], [ 2.8723, 42.698 ], [ 2.8724, 42.6973 ] ] ], "type": "Polygon" }, "id": "26", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066002", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Saint Assiscle" }, "type": "Feature" }, { "bbox": [ 1.4277, 43.6221, 1.4323, 43.6243 ], "geometry": { "coordinates": [ [ [ 1.4277, 43.6222 ], [ 1.4277, 43.6225 ], [ 1.4278, 43.6233 ], [ 1.4277, 43.6235 ], [ 1.4277, 43.6236 ], [ 1.4277, 43.6237 ], [ 1.4277, 43.6238 ], [ 1.4282, 43.624 ], [ 1.4285, 43.6237 ], [ 1.4294, 43.624 ], [ 1.4295, 43.6235 ], [ 1.4305, 43.6238 ], [ 1.4305, 43.624 ], [ 1.4304, 43.6242 ], [ 1.4309, 43.6243 ], [ 1.431, 43.6242 ], [ 1.4311, 43.624 ], [ 1.4318, 43.6241 ], [ 1.432, 43.6237 ], [ 1.4322, 43.6233 ], [ 1.4323, 43.6232 ], [ 1.431, 43.6229 ], [ 1.4311, 43.6228 ], [ 1.4313, 43.6224 ], [ 1.4312, 43.6223 ], [ 1.4307, 43.6221 ], [ 1.4304, 43.6223 ], [ 1.4303, 43.6223 ], [ 1.4301, 43.6223 ], [ 1.43, 43.6223 ], [ 1.4298, 43.6223 ], [ 1.4298, 43.6223 ], [ 1.4288, 43.6223 ], [ 1.4277, 43.6222 ] ] ], "type": "Polygon" }, "id": "27", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031009", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Bourbaki" }, "type": "Feature" }, { "bbox": [ 2.8755, 42.7021, 2.8828, 42.7073 ], "geometry": { "coordinates": [ [ [ 2.8763, 42.7073 ], [ 2.8766, 42.7073 ], [ 2.8774, 42.7072 ], [ 2.8781, 42.7068 ], [ 2.8783, 42.7067 ], [ 2.8788, 42.7065 ], [ 2.879, 42.7064 ], [ 2.8803, 42.7064 ], [ 2.8804, 42.7064 ], [ 2.8803, 42.7065 ], [ 2.8803, 42.7066 ], [ 2.8814, 42.707 ], [ 2.8815, 42.7069 ], [ 2.8815, 42.7069 ], [ 2.8816, 42.7068 ], [ 2.8817, 42.7067 ], [ 2.8818, 42.7066 ], [ 2.8819, 42.7065 ], [ 2.882, 42.7064 ], [ 2.882, 42.7062 ], [ 2.8821, 42.7062 ], [ 2.8822, 42.7062 ], [ 2.8824, 42.7055 ], [ 2.8824, 42.7053 ], [ 2.8828, 42.7053 ], [ 2.8828, 42.7052 ], [ 2.8828, 42.7051 ], [ 2.8827, 42.7051 ], [ 2.8826, 42.705 ], [ 2.8825, 42.7049 ], [ 2.8825, 42.7044 ], [ 2.8823, 42.7043 ], [ 2.8822, 42.7043 ], [ 2.8821, 42.7043 ], [ 2.8821, 42.7042 ], [ 2.8819, 42.7042 ], [ 2.8816, 42.7041 ], [ 2.8815, 42.7041 ], [ 2.8813, 42.7044 ], [ 2.8812, 42.7044 ], [ 2.881, 42.7044 ], [ 2.8804, 42.7044 ], [ 2.8803, 42.7045 ], [ 2.8802, 42.7045 ], [ 2.8802, 42.7044 ], [ 2.8802, 42.7042 ], [ 2.8802, 42.7039 ], [ 2.8802, 42.7029 ], [ 2.8802, 42.7026 ], [ 2.8803, 42.7023 ], [ 2.8803, 42.7021 ], [ 2.88, 42.7021 ], [ 2.8796, 42.7022 ], [ 2.8795, 42.7022 ], [ 2.8794, 42.7023 ], [ 2.8792, 42.7024 ], [ 2.8789, 42.7026 ], [ 2.8786, 42.7027 ], [ 2.8784, 42.7028 ], [ 2.8783, 42.703 ], [ 2.8783, 42.7031 ], [ 2.8781, 42.7041 ], [ 2.8781, 42.7043 ], [ 2.8781, 42.7044 ], [ 2.8781, 42.7046 ], [ 2.8781, 42.7048 ], [ 2.878, 42.7049 ], [ 2.878, 42.7051 ], [ 2.8779, 42.7052 ], [ 2.8778, 42.7054 ], [ 2.8777, 42.7055 ], [ 2.8776, 42.7055 ], [ 2.8775, 42.7055 ], [ 2.8774, 42.7055 ], [ 2.8767, 42.7053 ], [ 2.8764, 42.7053 ], [ 2.8761, 42.7054 ], [ 2.8759, 42.7056 ], [ 2.8758, 42.7056 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7058 ], [ 2.8756, 42.7059 ], [ 2.8755, 42.7062 ], [ 2.8755, 42.7063 ], [ 2.8756, 42.7063 ], [ 2.876, 42.7069 ], [ 2.8763, 42.7073 ], [ 2.8763, 42.7073 ], [ 2.8763, 42.7073 ] ] ], "type": "Polygon" }, "id": "28", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066004", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Bas-Vernet Ancien Zus" }, "type": "Feature" }, { "bbox": [ 3.1999, 43.3319, 3.2299, 43.3509 ], "geometry": { "coordinates": [ [ [ 3.2251, 43.3387 ], [ 3.2251, 43.3386 ], [ 3.2253, 43.3386 ], [ 3.2257, 43.3386 ], [ 3.2259, 43.3385 ], [ 3.2261, 43.3384 ], [ 3.2264, 43.3383 ], [ 3.2264, 43.3382 ], [ 3.2262, 43.3378 ], [ 3.2262, 43.3377 ], [ 3.2262, 43.3377 ], [ 3.2262, 43.3377 ], [ 3.2265, 43.3375 ], [ 3.2265, 43.3375 ], [ 3.2264, 43.3373 ], [ 3.2272, 43.3368 ], [ 3.2273, 43.3368 ], [ 3.2279, 43.3364 ], [ 3.2282, 43.3366 ], [ 3.2287, 43.337 ], [ 3.2294, 43.3365 ], [ 3.2296, 43.3364 ], [ 3.2298, 43.3362 ], [ 3.2299, 43.3361 ], [ 3.2299, 43.3361 ], [ 3.2298, 43.3358 ], [ 3.2295, 43.3352 ], [ 3.2294, 43.3349 ], [ 3.2288, 43.3345 ], [ 3.2272, 43.3355 ], [ 3.227, 43.3355 ], [ 3.2269, 43.3356 ], [ 3.2265, 43.3358 ], [ 3.2264, 43.3359 ], [ 3.2262, 43.336 ], [ 3.2257, 43.3363 ], [ 3.2254, 43.3365 ], [ 3.2249, 43.3368 ], [ 3.2247, 43.3368 ], [ 3.223, 43.3378 ], [ 3.2228, 43.3379 ], [ 3.2219, 43.3384 ], [ 3.2214, 43.3387 ], [ 3.2212, 43.3389 ], [ 3.2206, 43.3392 ], [ 3.2203, 43.3394 ], [ 3.2203, 43.3393 ], [ 3.2202, 43.3391 ], [ 3.2202, 43.3391 ], [ 3.2197, 43.3391 ], [ 3.2196, 43.3391 ], [ 3.2195, 43.3392 ], [ 3.2195, 43.3392 ], [ 3.2195, 43.3392 ], [ 3.2189, 43.339 ], [ 3.2184, 43.3389 ], [ 3.2184, 43.3388 ], [ 3.2188, 43.3384 ], [ 3.2191, 43.338 ], [ 3.2191, 43.338 ], [ 3.2191, 43.3379 ], [ 3.2191, 43.3376 ], [ 3.219, 43.3374 ], [ 3.219, 43.3371 ], [ 3.2189, 43.337 ], [ 3.2189, 43.3352 ], [ 3.2219, 43.3348 ], [ 3.2221, 43.3346 ], [ 3.2222, 43.3344 ], [ 3.2228, 43.3339 ], [ 3.2235, 43.3334 ], [ 3.224, 43.3331 ], [ 3.2239, 43.3331 ], [ 3.2226, 43.3332 ], [ 3.2215, 43.3332 ], [ 3.2191, 43.3327 ], [ 3.2177, 43.3322 ], [ 3.2161, 43.3329 ], [ 3.2158, 43.333 ], [ 3.2153, 43.3335 ], [ 3.2134, 43.3351 ], [ 3.2128, 43.3355 ], [ 3.2117, 43.3349 ], [ 3.2116, 43.3348 ], [ 3.2114, 43.3347 ], [ 3.2113, 43.3346 ], [ 3.211, 43.3345 ], [ 3.2107, 43.3344 ], [ 3.2106, 43.3344 ], [ 3.2105, 43.3345 ], [ 3.2104, 43.3345 ], [ 3.2101, 43.3347 ], [ 3.2101, 43.3346 ], [ 3.2099, 43.3345 ], [ 3.2095, 43.3342 ], [ 3.2092, 43.3345 ], [ 3.2088, 43.3347 ], [ 3.2087, 43.3348 ], [ 3.2081, 43.3349 ], [ 3.2075, 43.3351 ], [ 3.2074, 43.335 ], [ 3.207, 43.3347 ], [ 3.2068, 43.3345 ], [ 3.2064, 43.3342 ], [ 3.2055, 43.3335 ], [ 3.2051, 43.3332 ], [ 3.2047, 43.333 ], [ 3.2039, 43.3325 ], [ 3.2034, 43.3322 ], [ 3.2029, 43.332 ], [ 3.2027, 43.3319 ], [ 3.2026, 43.332 ], [ 3.2027, 43.3321 ], [ 3.2027, 43.3321 ], [ 3.203, 43.3325 ], [ 3.2037, 43.3333 ], [ 3.2036, 43.3333 ], [ 3.2014, 43.3342 ], [ 3.2014, 43.3342 ], [ 3.2012, 43.3343 ], [ 3.2012, 43.3343 ], [ 3.2012, 43.3344 ], [ 3.2011, 43.3345 ], [ 3.2009, 43.3347 ], [ 3.2008, 43.3348 ], [ 3.2004, 43.3351 ], [ 3.2002, 43.3354 ], [ 3.1999, 43.3356 ], [ 3.2007, 43.336 ], [ 3.2008, 43.336 ], [ 3.201, 43.3361 ], [ 3.2023, 43.3367 ], [ 3.2025, 43.3368 ], [ 3.2023, 43.337 ], [ 3.2022, 43.3371 ], [ 3.2019, 43.3374 ], [ 3.2019, 43.3375 ], [ 3.2019, 43.3376 ], [ 3.2018, 43.3376 ], [ 3.2019, 43.3377 ], [ 3.2019, 43.3377 ], [ 3.2019, 43.3377 ], [ 3.202, 43.3378 ], [ 3.2023, 43.3378 ], [ 3.2031, 43.3378 ], [ 3.2034, 43.338 ], [ 3.2035, 43.3382 ], [ 3.2037, 43.3385 ], [ 3.2043, 43.3384 ], [ 3.2044, 43.3384 ], [ 3.2046, 43.3386 ], [ 3.2047, 43.3387 ], [ 3.2052, 43.339 ], [ 3.2053, 43.3391 ], [ 3.2053, 43.3391 ], [ 3.2056, 43.3388 ], [ 3.2058, 43.3386 ], [ 3.2059, 43.3386 ], [ 3.2061, 43.3386 ], [ 3.2063, 43.3387 ], [ 3.2072, 43.3389 ], [ 3.2074, 43.339 ], [ 3.2088, 43.3395 ], [ 3.2088, 43.3396 ], [ 3.2087, 43.3397 ], [ 3.2086, 43.3399 ], [ 3.2086, 43.34 ], [ 3.2085, 43.3401 ], [ 3.2084, 43.3403 ], [ 3.2083, 43.3405 ], [ 3.2081, 43.3408 ], [ 3.208, 43.3411 ], [ 3.2079, 43.3419 ], [ 3.2078, 43.3426 ], [ 3.2082, 43.3426 ], [ 3.2081, 43.343 ], [ 3.2081, 43.3431 ], [ 3.2081, 43.3432 ], [ 3.2082, 43.3434 ], [ 3.2084, 43.3437 ], [ 3.2092, 43.3436 ], [ 3.2092, 43.3438 ], [ 3.2092, 43.344 ], [ 3.2093, 43.3443 ], [ 3.2094, 43.3443 ], [ 3.2096, 43.3443 ], [ 3.2096, 43.3445 ], [ 3.2095, 43.3446 ], [ 3.2096, 43.3447 ], [ 3.2096, 43.3448 ], [ 3.2092, 43.345 ], [ 3.2093, 43.3451 ], [ 3.2096, 43.3454 ], [ 3.2091, 43.3458 ], [ 3.2086, 43.3462 ], [ 3.2083, 43.3464 ], [ 3.2083, 43.3464 ], [ 3.2083, 43.3465 ], [ 3.2083, 43.3466 ], [ 3.2083, 43.3467 ], [ 3.2082, 43.3468 ], [ 3.208, 43.347 ], [ 3.2079, 43.347 ], [ 3.2078, 43.3471 ], [ 3.2082, 43.3475 ], [ 3.2084, 43.3477 ], [ 3.2085, 43.3478 ], [ 3.2086, 43.3479 ], [ 3.2081, 43.348 ], [ 3.208, 43.348 ], [ 3.2077, 43.3481 ], [ 3.2078, 43.3484 ], [ 3.2079, 43.3488 ], [ 3.2079, 43.3491 ], [ 3.2079, 43.3491 ], [ 3.2078, 43.3492 ], [ 3.2077, 43.3492 ], [ 3.2076, 43.3492 ], [ 3.2076, 43.3496 ], [ 3.2076, 43.3497 ], [ 3.2076, 43.35 ], [ 3.2076, 43.3501 ], [ 3.208, 43.35 ], [ 3.2083, 43.35 ], [ 3.2083, 43.3503 ], [ 3.2084, 43.3504 ], [ 3.2084, 43.3506 ], [ 3.2084, 43.3508 ], [ 3.2087, 43.3507 ], [ 3.209, 43.3506 ], [ 3.2093, 43.3506 ], [ 3.2094, 43.3506 ], [ 3.2095, 43.3505 ], [ 3.2096, 43.3505 ], [ 3.2096, 43.3503 ], [ 3.2096, 43.3502 ], [ 3.2096, 43.35 ], [ 3.2096, 43.3498 ], [ 3.2096, 43.3497 ], [ 3.2096, 43.3497 ], [ 3.2096, 43.3494 ], [ 3.2096, 43.3493 ], [ 3.2095, 43.3493 ], [ 3.2093, 43.3493 ], [ 3.209, 43.3492 ], [ 3.209, 43.3489 ], [ 3.2089, 43.3485 ], [ 3.2092, 43.3485 ], [ 3.2094, 43.3485 ], [ 3.2096, 43.3484 ], [ 3.2096, 43.3484 ], [ 3.2096, 43.3483 ], [ 3.2096, 43.3482 ], [ 3.2096, 43.3481 ], [ 3.2096, 43.3479 ], [ 3.2095, 43.3477 ], [ 3.2095, 43.3476 ], [ 3.2098, 43.3472 ], [ 3.2098, 43.3471 ], [ 3.2105, 43.3468 ], [ 3.2107, 43.3467 ], [ 3.2107, 43.3467 ], [ 3.2111, 43.3471 ], [ 3.2113, 43.347 ], [ 3.2115, 43.347 ], [ 3.2115, 43.3471 ], [ 3.2117, 43.347 ], [ 3.2117, 43.347 ], [ 3.2118, 43.3471 ], [ 3.2119, 43.347 ], [ 3.212, 43.3469 ], [ 3.212, 43.3469 ], [ 3.2121, 43.347 ], [ 3.2123, 43.347 ], [ 3.2126, 43.3472 ], [ 3.2127, 43.3472 ], [ 3.2128, 43.3473 ], [ 3.2129, 43.3472 ], [ 3.2133, 43.3471 ], [ 3.2133, 43.3471 ], [ 3.2133, 43.3473 ], [ 3.2134, 43.3472 ], [ 3.2135, 43.3473 ], [ 3.2135, 43.3474 ], [ 3.2136, 43.3474 ], [ 3.2138, 43.3474 ], [ 3.2137, 43.3475 ], [ 3.2139, 43.3475 ], [ 3.214, 43.3476 ], [ 3.214, 43.3476 ], [ 3.214, 43.3477 ], [ 3.2141, 43.3478 ], [ 3.2142, 43.3484 ], [ 3.2148, 43.3483 ], [ 3.2149, 43.3486 ], [ 3.2149, 43.3486 ], [ 3.2149, 43.349 ], [ 3.2151, 43.3489 ], [ 3.2151, 43.349 ], [ 3.2152, 43.349 ], [ 3.2153, 43.349 ], [ 3.2162, 43.3488 ], [ 3.2163, 43.3487 ], [ 3.2163, 43.3488 ], [ 3.2165, 43.3491 ], [ 3.2166, 43.3493 ], [ 3.2167, 43.3495 ], [ 3.2168, 43.3496 ], [ 3.217, 43.3499 ], [ 3.2171, 43.3501 ], [ 3.2173, 43.3502 ], [ 3.2173, 43.3503 ], [ 3.2174, 43.3503 ], [ 3.2174, 43.3504 ], [ 3.2176, 43.3505 ], [ 3.2177, 43.3505 ], [ 3.2185, 43.3507 ], [ 3.219, 43.3509 ], [ 3.2191, 43.3508 ], [ 3.219, 43.3506 ], [ 3.219, 43.3506 ], [ 3.2187, 43.3503 ], [ 3.2189, 43.3502 ], [ 3.2193, 43.3499 ], [ 3.2197, 43.3496 ], [ 3.2198, 43.3495 ], [ 3.22, 43.3493 ], [ 3.2203, 43.3491 ], [ 3.2206, 43.3489 ], [ 3.2207, 43.3489 ], [ 3.2206, 43.3488 ], [ 3.2209, 43.3485 ], [ 3.2212, 43.3483 ], [ 3.2213, 43.3482 ], [ 3.2218, 43.3484 ], [ 3.2218, 43.3485 ], [ 3.222, 43.3485 ], [ 3.2221, 43.3485 ], [ 3.2223, 43.3487 ], [ 3.2227, 43.3489 ], [ 3.2228, 43.3489 ], [ 3.2228, 43.3489 ], [ 3.2229, 43.3488 ], [ 3.2232, 43.3487 ], [ 3.2232, 43.3486 ], [ 3.2231, 43.3486 ], [ 3.223, 43.3485 ], [ 3.2229, 43.3484 ], [ 3.2219, 43.3479 ], [ 3.2215, 43.3477 ], [ 3.221, 43.3475 ], [ 3.2205, 43.3472 ], [ 3.2203, 43.3471 ], [ 3.22, 43.3469 ], [ 3.2197, 43.3468 ], [ 3.2195, 43.3467 ], [ 3.2194, 43.3466 ], [ 3.2191, 43.3465 ], [ 3.219, 43.3464 ], [ 3.219, 43.3463 ], [ 3.2192, 43.346 ], [ 3.2194, 43.3456 ], [ 3.2199, 43.3448 ], [ 3.2201, 43.3444 ], [ 3.2204, 43.344 ], [ 3.2207, 43.3435 ], [ 3.2212, 43.3425 ], [ 3.2213, 43.3424 ], [ 3.2215, 43.3421 ], [ 3.2218, 43.3416 ], [ 3.2219, 43.3414 ], [ 3.2221, 43.3414 ], [ 3.2225, 43.3415 ], [ 3.2225, 43.3415 ], [ 3.2231, 43.3417 ], [ 3.2236, 43.3418 ], [ 3.2237, 43.3418 ], [ 3.2238, 43.3417 ], [ 3.2248, 43.3419 ], [ 3.2248, 43.3418 ], [ 3.2244, 43.3415 ], [ 3.2241, 43.3413 ], [ 3.2243, 43.341 ], [ 3.2244, 43.3407 ], [ 3.224, 43.3404 ], [ 3.2246, 43.3399 ], [ 3.2245, 43.3399 ], [ 3.2242, 43.3397 ], [ 3.2241, 43.3396 ], [ 3.224, 43.3395 ], [ 3.2246, 43.3392 ], [ 3.2247, 43.3391 ], [ 3.2247, 43.339 ], [ 3.225, 43.3388 ], [ 3.2251, 43.3387 ] ] ], "type": "Polygon" }, "id": "29", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034001", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.8106, 43.6198, 3.8251, 43.6441 ], "geometry": { "coordinates": [ [ [ 3.8116, 43.6234 ], [ 3.8115, 43.6235 ], [ 3.8114, 43.6237 ], [ 3.8114, 43.6238 ], [ 3.8114, 43.6239 ], [ 3.8121, 43.6247 ], [ 3.8129, 43.6257 ], [ 3.8137, 43.6265 ], [ 3.8138, 43.6266 ], [ 3.8139, 43.6268 ], [ 3.814, 43.6268 ], [ 3.8143, 43.6269 ], [ 3.8156, 43.627 ], [ 3.8162, 43.627 ], [ 3.8168, 43.627 ], [ 3.8175, 43.627 ], [ 3.8176, 43.6283 ], [ 3.8176, 43.629 ], [ 3.8176, 43.6291 ], [ 3.8177, 43.6292 ], [ 3.8185, 43.6301 ], [ 3.8161, 43.6303 ], [ 3.8163, 43.6307 ], [ 3.8163, 43.6308 ], [ 3.8163, 43.6308 ], [ 3.8164, 43.631 ], [ 3.8164, 43.6313 ], [ 3.8163, 43.6314 ], [ 3.8162, 43.6316 ], [ 3.8159, 43.6318 ], [ 3.8152, 43.6323 ], [ 3.8148, 43.6326 ], [ 3.8144, 43.6329 ], [ 3.8141, 43.633 ], [ 3.8138, 43.6334 ], [ 3.8138, 43.6335 ], [ 3.8136, 43.6337 ], [ 3.8136, 43.6338 ], [ 3.8136, 43.6338 ], [ 3.8134, 43.634 ], [ 3.8131, 43.6342 ], [ 3.813, 43.6343 ], [ 3.8129, 43.6344 ], [ 3.8129, 43.635 ], [ 3.8128, 43.635 ], [ 3.8124, 43.6351 ], [ 3.8122, 43.6351 ], [ 3.8121, 43.6352 ], [ 3.812, 43.6352 ], [ 3.8122, 43.6352 ], [ 3.8124, 43.6352 ], [ 3.8127, 43.6352 ], [ 3.8131, 43.6352 ], [ 3.8133, 43.6352 ], [ 3.8134, 43.6353 ], [ 3.8136, 43.6354 ], [ 3.8137, 43.6355 ], [ 3.8138, 43.6356 ], [ 3.8138, 43.6358 ], [ 3.8139, 43.6364 ], [ 3.8139, 43.6364 ], [ 3.814, 43.6365 ], [ 3.8141, 43.6367 ], [ 3.8143, 43.6373 ], [ 3.8148, 43.6378 ], [ 3.8149, 43.6381 ], [ 3.8145, 43.6384 ], [ 3.8144, 43.6385 ], [ 3.8141, 43.6385 ], [ 3.8138, 43.6386 ], [ 3.8137, 43.6387 ], [ 3.8136, 43.6388 ], [ 3.8135, 43.6389 ], [ 3.8135, 43.639 ], [ 3.8117, 43.639 ], [ 3.8117, 43.6393 ], [ 3.8117, 43.6394 ], [ 3.8115, 43.6394 ], [ 3.8115, 43.6393 ], [ 3.8106, 43.6393 ], [ 3.8106, 43.6396 ], [ 3.8106, 43.6398 ], [ 3.8107, 43.64 ], [ 3.8107, 43.64 ], [ 3.8108, 43.6401 ], [ 3.8109, 43.6403 ], [ 3.8114, 43.6407 ], [ 3.812, 43.6413 ], [ 3.8123, 43.6415 ], [ 3.8129, 43.6418 ], [ 3.8137, 43.6421 ], [ 3.8157, 43.6428 ], [ 3.8156, 43.6429 ], [ 3.8158, 43.643 ], [ 3.8183, 43.644 ], [ 3.8189, 43.6441 ], [ 3.8208, 43.6433 ], [ 3.8215, 43.6433 ], [ 3.8216, 43.6432 ], [ 3.8206, 43.6429 ], [ 3.8205, 43.6429 ], [ 3.8205, 43.6428 ], [ 3.8202, 43.6427 ], [ 3.8201, 43.6427 ], [ 3.8201, 43.6426 ], [ 3.8201, 43.6424 ], [ 3.82, 43.6423 ], [ 3.8199, 43.6422 ], [ 3.8198, 43.6421 ], [ 3.8195, 43.6419 ], [ 3.8192, 43.6421 ], [ 3.8192, 43.6408 ], [ 3.8203, 43.6408 ], [ 3.8203, 43.6387 ], [ 3.8199, 43.6382 ], [ 3.8199, 43.6373 ], [ 3.8197, 43.6373 ], [ 3.8195, 43.6371 ], [ 3.8195, 43.6371 ], [ 3.8192, 43.6368 ], [ 3.8187, 43.6364 ], [ 3.8184, 43.6361 ], [ 3.8183, 43.6361 ], [ 3.8182, 43.6359 ], [ 3.8179, 43.6358 ], [ 3.8177, 43.6358 ], [ 3.8176, 43.6358 ], [ 3.8172, 43.636 ], [ 3.817, 43.6361 ], [ 3.8168, 43.6358 ], [ 3.8167, 43.6357 ], [ 3.8164, 43.6355 ], [ 3.8164, 43.6354 ], [ 3.8163, 43.6353 ], [ 3.8162, 43.6351 ], [ 3.8162, 43.6348 ], [ 3.8163, 43.6347 ], [ 3.8165, 43.6345 ], [ 3.8166, 43.6344 ], [ 3.8168, 43.6343 ], [ 3.8172, 43.6343 ], [ 3.8176, 43.6342 ], [ 3.8192, 43.6342 ], [ 3.8199, 43.6342 ], [ 3.8226, 43.6344 ], [ 3.8232, 43.6344 ], [ 3.8236, 43.6343 ], [ 3.8238, 43.6342 ], [ 3.8243, 43.6339 ], [ 3.8246, 43.6338 ], [ 3.8247, 43.6336 ], [ 3.8247, 43.6334 ], [ 3.8245, 43.6319 ], [ 3.8251, 43.6317 ], [ 3.8251, 43.6305 ], [ 3.8224, 43.6305 ], [ 3.8224, 43.6298 ], [ 3.8221, 43.6284 ], [ 3.8221, 43.6282 ], [ 3.822, 43.6282 ], [ 3.8219, 43.6276 ], [ 3.8217, 43.6269 ], [ 3.8216, 43.6262 ], [ 3.8216, 43.6262 ], [ 3.8214, 43.6259 ], [ 3.8214, 43.6258 ], [ 3.8213, 43.6255 ], [ 3.8203, 43.6239 ], [ 3.8193, 43.6224 ], [ 3.8189, 43.6218 ], [ 3.8186, 43.6215 ], [ 3.8177, 43.6198 ], [ 3.8172, 43.6201 ], [ 3.8154, 43.6212 ], [ 3.8148, 43.6215 ], [ 3.8148, 43.6215 ], [ 3.8131, 43.6226 ], [ 3.8116, 43.6234 ] ] ], "type": "Polygon" }, "id": "30", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034005", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Mosson" }, "type": "Feature" }, { "bbox": [ 3.8217, 43.6117, 3.8279, 43.6151 ], "geometry": { "coordinates": [ [ [ 3.8258, 43.6149 ], [ 3.8259, 43.6149 ], [ 3.8259, 43.6144 ], [ 3.8266, 43.614 ], [ 3.8267, 43.614 ], [ 3.8265, 43.6137 ], [ 3.8267, 43.6136 ], [ 3.8271, 43.6135 ], [ 3.8272, 43.6135 ], [ 3.8273, 43.6135 ], [ 3.8278, 43.6133 ], [ 3.8277, 43.613 ], [ 3.8274, 43.6127 ], [ 3.8272, 43.6125 ], [ 3.8274, 43.6125 ], [ 3.8278, 43.6124 ], [ 3.8279, 43.6124 ], [ 3.8278, 43.6123 ], [ 3.8278, 43.6123 ], [ 3.8277, 43.6122 ], [ 3.8276, 43.6121 ], [ 3.8275, 43.6122 ], [ 3.8274, 43.6121 ], [ 3.8271, 43.6122 ], [ 3.827, 43.6121 ], [ 3.8268, 43.6122 ], [ 3.8266, 43.6124 ], [ 3.8261, 43.6117 ], [ 3.8256, 43.6118 ], [ 3.8252, 43.6118 ], [ 3.8248, 43.6119 ], [ 3.8244, 43.612 ], [ 3.8242, 43.6121 ], [ 3.8238, 43.6123 ], [ 3.8237, 43.6124 ], [ 3.8233, 43.6125 ], [ 3.823, 43.6128 ], [ 3.8228, 43.6129 ], [ 3.8225, 43.6132 ], [ 3.8225, 43.6134 ], [ 3.8222, 43.6138 ], [ 3.8218, 43.6146 ], [ 3.8217, 43.6147 ], [ 3.8217, 43.6148 ], [ 3.8218, 43.6149 ], [ 3.8219, 43.615 ], [ 3.822, 43.6151 ], [ 3.8221, 43.6151 ], [ 3.8222, 43.6151 ], [ 3.8229, 43.615 ], [ 3.8236, 43.615 ], [ 3.8239, 43.6149 ], [ 3.8244, 43.6149 ], [ 3.8246, 43.6148 ], [ 3.8249, 43.6148 ], [ 3.8257, 43.6148 ], [ 3.8258, 43.6149 ] ] ], "type": "Polygon" }, "id": "31", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034004", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Celleneuve" }, "type": "Feature" }, { "bbox": [ 3.8326, 43.6122, 3.841, 43.6202 ], "geometry": { "coordinates": [ [ [ 3.8373, 43.6202 ], [ 3.8374, 43.6201 ], [ 3.8375, 43.62 ], [ 3.8377, 43.6197 ], [ 3.8381, 43.6193 ], [ 3.8382, 43.6192 ], [ 3.8392, 43.6179 ], [ 3.8394, 43.6179 ], [ 3.8399, 43.6172 ], [ 3.8402, 43.6168 ], [ 3.8408, 43.6163 ], [ 3.841, 43.6162 ], [ 3.8404, 43.6158 ], [ 3.8402, 43.6156 ], [ 3.84, 43.6155 ], [ 3.8399, 43.6154 ], [ 3.8398, 43.6152 ], [ 3.8395, 43.6146 ], [ 3.839, 43.6138 ], [ 3.839, 43.6137 ], [ 3.8389, 43.6136 ], [ 3.8388, 43.6128 ], [ 3.8387, 43.6126 ], [ 3.8384, 43.6124 ], [ 3.838, 43.6122 ], [ 3.8354, 43.6137 ], [ 3.8353, 43.6134 ], [ 3.8338, 43.6135 ], [ 3.8337, 43.6135 ], [ 3.8328, 43.6135 ], [ 3.8326, 43.6134 ], [ 3.8327, 43.614 ], [ 3.8327, 43.6147 ], [ 3.8344, 43.6146 ], [ 3.8348, 43.6158 ], [ 3.8348, 43.6159 ], [ 3.8348, 43.6159 ], [ 3.8347, 43.616 ], [ 3.8346, 43.616 ], [ 3.8345, 43.6161 ], [ 3.8342, 43.6165 ], [ 3.8347, 43.6167 ], [ 3.835, 43.6169 ], [ 3.8347, 43.6172 ], [ 3.8347, 43.6173 ], [ 3.8346, 43.6173 ], [ 3.8345, 43.6173 ], [ 3.8345, 43.6173 ], [ 3.8343, 43.6172 ], [ 3.8341, 43.6174 ], [ 3.8342, 43.6175 ], [ 3.8343, 43.6175 ], [ 3.8348, 43.6178 ], [ 3.8343, 43.618 ], [ 3.8355, 43.6188 ], [ 3.8355, 43.6189 ], [ 3.8357, 43.619 ], [ 3.8356, 43.619 ], [ 3.8373, 43.6202 ] ] ], "type": "Polygon" }, "id": "32", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034006", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Petit Bard Pergola" }, "type": "Feature" }, { "bbox": [ 1.3266, 43.4645, 1.3373, 43.4715 ], "geometry": { "coordinates": [ [ [ 1.3327, 43.4714 ], [ 1.3323, 43.4708 ], [ 1.3324, 43.4707 ], [ 1.3324, 43.4707 ], [ 1.335, 43.4698 ], [ 1.3351, 43.4698 ], [ 1.3352, 43.4698 ], [ 1.3356, 43.4705 ], [ 1.3358, 43.4707 ], [ 1.336, 43.4708 ], [ 1.3361, 43.4709 ], [ 1.3365, 43.471 ], [ 1.337, 43.4711 ], [ 1.3373, 43.4711 ], [ 1.337, 43.4704 ], [ 1.3369, 43.4703 ], [ 1.3369, 43.4703 ], [ 1.3363, 43.4689 ], [ 1.3361, 43.4685 ], [ 1.3354, 43.4687 ], [ 1.3351, 43.4682 ], [ 1.335, 43.4681 ], [ 1.3345, 43.4683 ], [ 1.3339, 43.4684 ], [ 1.3337, 43.4686 ], [ 1.3325, 43.469 ], [ 1.3323, 43.4687 ], [ 1.3322, 43.4687 ], [ 1.3318, 43.4686 ], [ 1.332, 43.4679 ], [ 1.332, 43.4678 ], [ 1.3321, 43.4678 ], [ 1.3321, 43.4677 ], [ 1.3321, 43.4677 ], [ 1.3321, 43.4676 ], [ 1.3319, 43.4675 ], [ 1.3319, 43.4673 ], [ 1.3316, 43.4673 ], [ 1.3315, 43.4673 ], [ 1.3313, 43.4671 ], [ 1.3314, 43.467 ], [ 1.3315, 43.4668 ], [ 1.3317, 43.4662 ], [ 1.3317, 43.466 ], [ 1.3318, 43.4657 ], [ 1.3305, 43.4655 ], [ 1.3301, 43.4655 ], [ 1.3299, 43.4654 ], [ 1.3295, 43.4653 ], [ 1.3291, 43.4652 ], [ 1.3303, 43.4649 ], [ 1.3304, 43.4648 ], [ 1.3303, 43.4647 ], [ 1.3303, 43.4647 ], [ 1.3302, 43.4645 ], [ 1.3301, 43.4645 ], [ 1.3293, 43.4647 ], [ 1.3289, 43.4648 ], [ 1.3288, 43.4648 ], [ 1.3286, 43.4646 ], [ 1.3284, 43.4645 ], [ 1.3267, 43.465 ], [ 1.3266, 43.4651 ], [ 1.3266, 43.4652 ], [ 1.3269, 43.4656 ], [ 1.3275, 43.4654 ], [ 1.3288, 43.4651 ], [ 1.3292, 43.4653 ], [ 1.3297, 43.4654 ], [ 1.3299, 43.4656 ], [ 1.33, 43.4658 ], [ 1.3298, 43.4659 ], [ 1.3301, 43.4666 ], [ 1.3303, 43.4671 ], [ 1.3303, 43.4672 ], [ 1.3304, 43.4673 ], [ 1.3304, 43.4673 ], [ 1.3308, 43.4674 ], [ 1.3308, 43.4674 ], [ 1.3306, 43.4682 ], [ 1.3306, 43.4682 ], [ 1.3309, 43.4683 ], [ 1.3308, 43.4688 ], [ 1.3308, 43.469 ], [ 1.3307, 43.4694 ], [ 1.3295, 43.4696 ], [ 1.3294, 43.4697 ], [ 1.3288, 43.4699 ], [ 1.3278, 43.4701 ], [ 1.3278, 43.4702 ], [ 1.3282, 43.4711 ], [ 1.3283, 43.4711 ], [ 1.3288, 43.471 ], [ 1.3298, 43.4708 ], [ 1.33, 43.4707 ], [ 1.33, 43.4706 ], [ 1.3302, 43.4707 ], [ 1.3303, 43.4706 ], [ 1.3304, 43.4708 ], [ 1.3304, 43.4709 ], [ 1.3305, 43.4708 ], [ 1.3306, 43.4707 ], [ 1.3307, 43.4709 ], [ 1.3308, 43.4709 ], [ 1.3311, 43.4715 ], [ 1.3312, 43.4715 ], [ 1.3316, 43.4713 ], [ 1.3317, 43.4713 ], [ 1.3321, 43.4712 ], [ 1.3323, 43.4715 ], [ 1.3327, 43.4714 ] ] ], "type": "Polygon" }, "id": "33", "properties": { "code_commune": "31395", "code_departement": "31", "code_qp": "QP031001", "commune_qp": "Muret", "nom_commune": "Muret", "nom_qp": "Saint Jean" }, "type": "Feature" }, { "bbox": [ 2.2268, 43.5938, 2.234, 43.5983 ], "geometry": { "coordinates": [ [ [ 2.2322, 43.5969 ], [ 2.2331, 43.5963 ], [ 2.2333, 43.5964 ], [ 2.234, 43.5958 ], [ 2.2338, 43.5955 ], [ 2.2337, 43.5955 ], [ 2.2331, 43.5949 ], [ 2.2328, 43.5951 ], [ 2.232, 43.5955 ], [ 2.2306, 43.5962 ], [ 2.2304, 43.5959 ], [ 2.2303, 43.5958 ], [ 2.2306, 43.5956 ], [ 2.2307, 43.5957 ], [ 2.2314, 43.5953 ], [ 2.2313, 43.5952 ], [ 2.2324, 43.5947 ], [ 2.2316, 43.5938 ], [ 2.2305, 43.5944 ], [ 2.2304, 43.5944 ], [ 2.2295, 43.5949 ], [ 2.2278, 43.5958 ], [ 2.2274, 43.5954 ], [ 2.2273, 43.5955 ], [ 2.2276, 43.5958 ], [ 2.2276, 43.5958 ], [ 2.2269, 43.5962 ], [ 2.2268, 43.5963 ], [ 2.2268, 43.5963 ], [ 2.227, 43.5964 ], [ 2.2279, 43.5968 ], [ 2.2282, 43.597 ], [ 2.2285, 43.5971 ], [ 2.2287, 43.5972 ], [ 2.2288, 43.5972 ], [ 2.2291, 43.5975 ], [ 2.2306, 43.5983 ], [ 2.231, 43.5979 ], [ 2.2312, 43.5979 ], [ 2.2312, 43.5978 ], [ 2.2318, 43.5973 ], [ 2.2322, 43.5969 ], [ 2.2322, 43.5969 ] ] ], "type": "Polygon" }, "id": "34", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081002", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Laden Petit Train" }, "type": "Feature" }, { "bbox": [ 2.3542, 43.2246, 2.3595, 43.2285 ], "geometry": { "coordinates": [ [ [ 2.3586, 43.2264 ], [ 2.3582, 43.226 ], [ 2.3575, 43.2254 ], [ 2.3572, 43.2252 ], [ 2.3571, 43.2251 ], [ 2.3565, 43.2255 ], [ 2.3564, 43.2254 ], [ 2.3563, 43.2254 ], [ 2.3561, 43.2252 ], [ 2.3558, 43.225 ], [ 2.3557, 43.2249 ], [ 2.3561, 43.2247 ], [ 2.3557, 43.2246 ], [ 2.3557, 43.2246 ], [ 2.3554, 43.2246 ], [ 2.3554, 43.2246 ], [ 2.3552, 43.2246 ], [ 2.3551, 43.2246 ], [ 2.355, 43.2247 ], [ 2.3546, 43.2246 ], [ 2.3544, 43.2247 ], [ 2.3547, 43.225 ], [ 2.355, 43.2253 ], [ 2.3546, 43.2256 ], [ 2.3544, 43.2258 ], [ 2.3542, 43.226 ], [ 2.3544, 43.2261 ], [ 2.3543, 43.2262 ], [ 2.3542, 43.2263 ], [ 2.3545, 43.2265 ], [ 2.3546, 43.2265 ], [ 2.3545, 43.2268 ], [ 2.3548, 43.2268 ], [ 2.3548, 43.2271 ], [ 2.3547, 43.2275 ], [ 2.3547, 43.2276 ], [ 2.3549, 43.2277 ], [ 2.3552, 43.2277 ], [ 2.3554, 43.2277 ], [ 2.3559, 43.2277 ], [ 2.3568, 43.2278 ], [ 2.3569, 43.2279 ], [ 2.357, 43.2279 ], [ 2.3571, 43.2279 ], [ 2.3579, 43.2284 ], [ 2.358, 43.2284 ], [ 2.3581, 43.2284 ], [ 2.3582, 43.2285 ], [ 2.3583, 43.2285 ], [ 2.3584, 43.2285 ], [ 2.3585, 43.2285 ], [ 2.3585, 43.2285 ], [ 2.3586, 43.2285 ], [ 2.3587, 43.2285 ], [ 2.3588, 43.2285 ], [ 2.359, 43.2285 ], [ 2.3595, 43.2283 ], [ 2.3592, 43.2277 ], [ 2.3589, 43.2271 ], [ 2.3588, 43.2269 ], [ 2.3586, 43.2267 ], [ 2.3586, 43.2265 ], [ 2.3586, 43.2264 ] ] ], "type": "Polygon" }, "id": "35", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011006", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Grazailles" }, "type": "Feature" }, { "bbox": [ 3.8767, 43.6256, 3.8824, 43.6304 ], "geometry": { "coordinates": [ [ [ 3.8817, 43.6275 ], [ 3.8818, 43.6273 ], [ 3.8819, 43.6269 ], [ 3.8821, 43.6265 ], [ 3.8824, 43.626 ], [ 3.8814, 43.6258 ], [ 3.8803, 43.6257 ], [ 3.8795, 43.6256 ], [ 3.8791, 43.6256 ], [ 3.879, 43.6256 ], [ 3.8792, 43.6261 ], [ 3.8792, 43.6262 ], [ 3.8794, 43.6267 ], [ 3.8794, 43.6268 ], [ 3.8795, 43.627 ], [ 3.8795, 43.6271 ], [ 3.8797, 43.6274 ], [ 3.8798, 43.6275 ], [ 3.8799, 43.6275 ], [ 3.8799, 43.6276 ], [ 3.8799, 43.6276 ], [ 3.8797, 43.6277 ], [ 3.8792, 43.6279 ], [ 3.879, 43.628 ], [ 3.8789, 43.628 ], [ 3.8789, 43.6281 ], [ 3.8788, 43.6282 ], [ 3.8787, 43.6282 ], [ 3.8781, 43.6282 ], [ 3.8781, 43.6284 ], [ 3.8781, 43.6285 ], [ 3.878, 43.6285 ], [ 3.8774, 43.6287 ], [ 3.8767, 43.6289 ], [ 3.8768, 43.629 ], [ 3.8771, 43.6296 ], [ 3.8775, 43.6295 ], [ 3.8775, 43.6295 ], [ 3.8776, 43.6295 ], [ 3.8776, 43.6295 ], [ 3.8777, 43.6296 ], [ 3.8779, 43.6295 ], [ 3.878, 43.6299 ], [ 3.8781, 43.63 ], [ 3.8782, 43.6301 ], [ 3.8783, 43.6302 ], [ 3.8785, 43.6303 ], [ 3.8787, 43.6304 ], [ 3.8788, 43.6304 ], [ 3.8789, 43.6303 ], [ 3.8789, 43.6303 ], [ 3.879, 43.6303 ], [ 3.8792, 43.6301 ], [ 3.8794, 43.6299 ], [ 3.8797, 43.6297 ], [ 3.8801, 43.6293 ], [ 3.8802, 43.6292 ], [ 3.8807, 43.6289 ], [ 3.8811, 43.6286 ], [ 3.8812, 43.6285 ], [ 3.8813, 43.6284 ], [ 3.8814, 43.6283 ], [ 3.8815, 43.6282 ], [ 3.8816, 43.6279 ], [ 3.8816, 43.6277 ], [ 3.8817, 43.6275 ] ] ], "type": "Polygon" }, "id": "36", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034014", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Aiguelongue" }, "type": "Feature" }, { "bbox": [ 1.3822, 43.5783, 1.3906, 43.5831 ], "geometry": { "coordinates": [ [ [ 1.3896, 43.5828 ], [ 1.3896, 43.5827 ], [ 1.3895, 43.5826 ], [ 1.3893, 43.5824 ], [ 1.3894, 43.5824 ], [ 1.3906, 43.5819 ], [ 1.3903, 43.5815 ], [ 1.3902, 43.5814 ], [ 1.3898, 43.5808 ], [ 1.3895, 43.5802 ], [ 1.3886, 43.5804 ], [ 1.3885, 43.5805 ], [ 1.3884, 43.5804 ], [ 1.3881, 43.58 ], [ 1.3883, 43.5793 ], [ 1.3884, 43.5792 ], [ 1.3885, 43.5792 ], [ 1.3888, 43.5791 ], [ 1.3889, 43.5791 ], [ 1.3889, 43.579 ], [ 1.3885, 43.5783 ], [ 1.387, 43.5787 ], [ 1.3871, 43.579 ], [ 1.387, 43.579 ], [ 1.3867, 43.5791 ], [ 1.3861, 43.5792 ], [ 1.386, 43.5792 ], [ 1.3859, 43.5792 ], [ 1.3855, 43.5791 ], [ 1.3855, 43.5791 ], [ 1.3854, 43.5791 ], [ 1.3853, 43.5791 ], [ 1.3852, 43.5792 ], [ 1.3851, 43.5794 ], [ 1.3848, 43.5793 ], [ 1.3847, 43.5792 ], [ 1.3847, 43.5792 ], [ 1.3841, 43.579 ], [ 1.3838, 43.5791 ], [ 1.3837, 43.5788 ], [ 1.3834, 43.5787 ], [ 1.3822, 43.579 ], [ 1.3822, 43.5791 ], [ 1.3822, 43.5791 ], [ 1.3823, 43.5792 ], [ 1.3824, 43.5793 ], [ 1.3825, 43.5795 ], [ 1.3826, 43.5796 ], [ 1.3826, 43.5798 ], [ 1.3827, 43.5799 ], [ 1.3828, 43.5799 ], [ 1.3833, 43.5801 ], [ 1.3833, 43.5801 ], [ 1.3835, 43.5801 ], [ 1.3836, 43.5802 ], [ 1.3839, 43.5803 ], [ 1.384, 43.5803 ], [ 1.3841, 43.5804 ], [ 1.3842, 43.5806 ], [ 1.3844, 43.5807 ], [ 1.3846, 43.5808 ], [ 1.3848, 43.5808 ], [ 1.3855, 43.5811 ], [ 1.3857, 43.5811 ], [ 1.3859, 43.5812 ], [ 1.3858, 43.5813 ], [ 1.3858, 43.5814 ], [ 1.3858, 43.5815 ], [ 1.386, 43.5822 ], [ 1.3861, 43.5831 ], [ 1.3896, 43.5828 ] ] ], "type": "Polygon" }, "id": "37", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031006", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Pradettes" }, "type": "Feature" }, { "bbox": [ 1.3909, 43.5583, 1.4183, 43.5864 ], "geometry": { "coordinates": [ [ [ 1.4183, 43.5824 ], [ 1.4174, 43.5806 ], [ 1.4168, 43.5804 ], [ 1.4165, 43.5798 ], [ 1.4173, 43.5796 ], [ 1.4169, 43.5789 ], [ 1.4167, 43.5784 ], [ 1.4171, 43.5783 ], [ 1.4164, 43.5766 ], [ 1.416, 43.5767 ], [ 1.4159, 43.5764 ], [ 1.4158, 43.5764 ], [ 1.4154, 43.5757 ], [ 1.4152, 43.5757 ], [ 1.415, 43.5758 ], [ 1.4147, 43.5753 ], [ 1.4137, 43.5736 ], [ 1.4123, 43.574 ], [ 1.4122, 43.5737 ], [ 1.4116, 43.5725 ], [ 1.4142, 43.5718 ], [ 1.4134, 43.5704 ], [ 1.4155, 43.5698 ], [ 1.4165, 43.5706 ], [ 1.4171, 43.571 ], [ 1.4175, 43.5713 ], [ 1.4176, 43.5714 ], [ 1.4179, 43.5718 ], [ 1.4181, 43.5718 ], [ 1.4182, 43.5717 ], [ 1.418, 43.5712 ], [ 1.4174, 43.5699 ], [ 1.4162, 43.5692 ], [ 1.4158, 43.5691 ], [ 1.4151, 43.5691 ], [ 1.4147, 43.569 ], [ 1.4137, 43.5685 ], [ 1.4122, 43.5674 ], [ 1.4115, 43.5665 ], [ 1.4107, 43.5666 ], [ 1.4107, 43.5668 ], [ 1.4103, 43.5668 ], [ 1.4102, 43.5669 ], [ 1.4075, 43.5674 ], [ 1.4062, 43.5674 ], [ 1.4026, 43.5674 ], [ 1.4026, 43.5666 ], [ 1.4025, 43.5665 ], [ 1.4024, 43.5662 ], [ 1.4021, 43.5662 ], [ 1.4021, 43.5662 ], [ 1.4018, 43.5662 ], [ 1.4018, 43.5656 ], [ 1.4016, 43.5656 ], [ 1.4016, 43.5652 ], [ 1.4026, 43.5652 ], [ 1.4026, 43.5646 ], [ 1.4036, 43.5646 ], [ 1.403, 43.5638 ], [ 1.4027, 43.5635 ], [ 1.4018, 43.5623 ], [ 1.4018, 43.5612 ], [ 1.4017, 43.561 ], [ 1.4027, 43.5606 ], [ 1.4018, 43.5593 ], [ 1.4016, 43.5589 ], [ 1.4011, 43.5583 ], [ 1.4005, 43.5584 ], [ 1.3985, 43.5589 ], [ 1.3961, 43.5594 ], [ 1.3952, 43.5597 ], [ 1.393, 43.5607 ], [ 1.3909, 43.5619 ], [ 1.3937, 43.5658 ], [ 1.3965, 43.5659 ], [ 1.3966, 43.5661 ], [ 1.3971, 43.5668 ], [ 1.3973, 43.5675 ], [ 1.3971, 43.5679 ], [ 1.397, 43.5684 ], [ 1.3963, 43.5684 ], [ 1.3962, 43.5693 ], [ 1.3962, 43.5704 ], [ 1.3959, 43.5704 ], [ 1.3959, 43.5711 ], [ 1.3954, 43.5711 ], [ 1.3954, 43.5712 ], [ 1.3952, 43.5714 ], [ 1.3949, 43.5713 ], [ 1.3949, 43.5717 ], [ 1.3951, 43.5718 ], [ 1.3951, 43.5722 ], [ 1.395, 43.5722 ], [ 1.395, 43.5722 ], [ 1.3949, 43.5722 ], [ 1.3946, 43.5722 ], [ 1.3945, 43.5722 ], [ 1.3944, 43.5722 ], [ 1.3944, 43.5723 ], [ 1.3944, 43.5724 ], [ 1.3943, 43.5726 ], [ 1.3943, 43.573 ], [ 1.3958, 43.5743 ], [ 1.3957, 43.5744 ], [ 1.3957, 43.5746 ], [ 1.3959, 43.5747 ], [ 1.3947, 43.5779 ], [ 1.3947, 43.5787 ], [ 1.3966, 43.5812 ], [ 1.3978, 43.5827 ], [ 1.3992, 43.5838 ], [ 1.3994, 43.5838 ], [ 1.4001, 43.5838 ], [ 1.4004, 43.5837 ], [ 1.4004, 43.583 ], [ 1.4003, 43.5823 ], [ 1.4007, 43.5822 ], [ 1.4012, 43.5818 ], [ 1.401, 43.5813 ], [ 1.3999, 43.5797 ], [ 1.3994, 43.5797 ], [ 1.3997, 43.5803 ], [ 1.3996, 43.5803 ], [ 1.3995, 43.5805 ], [ 1.3992, 43.5804 ], [ 1.399, 43.5803 ], [ 1.3988, 43.5803 ], [ 1.3978, 43.5804 ], [ 1.3975, 43.5804 ], [ 1.3971, 43.5802 ], [ 1.3967, 43.58 ], [ 1.3966, 43.58 ], [ 1.3966, 43.5799 ], [ 1.3965, 43.5798 ], [ 1.3965, 43.5788 ], [ 1.3965, 43.5787 ], [ 1.3964, 43.5786 ], [ 1.3965, 43.5785 ], [ 1.3967, 43.5785 ], [ 1.3976, 43.5785 ], [ 1.397, 43.5765 ], [ 1.3971, 43.5757 ], [ 1.3966, 43.5757 ], [ 1.3959, 43.5754 ], [ 1.3959, 43.5752 ], [ 1.3962, 43.575 ], [ 1.3964, 43.5749 ], [ 1.3966, 43.5748 ], [ 1.397, 43.5747 ], [ 1.399, 43.5746 ], [ 1.401, 43.5745 ], [ 1.4011, 43.5748 ], [ 1.401, 43.5753 ], [ 1.401, 43.5756 ], [ 1.4012, 43.5756 ], [ 1.4012, 43.5761 ], [ 1.402, 43.5761 ], [ 1.402, 43.5761 ], [ 1.4025, 43.5761 ], [ 1.4025, 43.5753 ], [ 1.402, 43.5753 ], [ 1.4021, 43.575 ], [ 1.4021, 43.5749 ], [ 1.4022, 43.5748 ], [ 1.4025, 43.5746 ], [ 1.4026, 43.5745 ], [ 1.4028, 43.5743 ], [ 1.4053, 43.5742 ], [ 1.4058, 43.5738 ], [ 1.4082, 43.5717 ], [ 1.4084, 43.5714 ], [ 1.4086, 43.5713 ], [ 1.4087, 43.5709 ], [ 1.4091, 43.5709 ], [ 1.4093, 43.5708 ], [ 1.4098, 43.5707 ], [ 1.41, 43.5706 ], [ 1.4108, 43.5705 ], [ 1.4111, 43.5712 ], [ 1.4113, 43.5716 ], [ 1.4096, 43.5743 ], [ 1.4092, 43.5749 ], [ 1.4079, 43.5772 ], [ 1.4059, 43.58 ], [ 1.4037, 43.5836 ], [ 1.4052, 43.5836 ], [ 1.4061, 43.5842 ], [ 1.4055, 43.5851 ], [ 1.4062, 43.5853 ], [ 1.4067, 43.5844 ], [ 1.4067, 43.5843 ], [ 1.4067, 43.5843 ], [ 1.4062, 43.5841 ], [ 1.4063, 43.5839 ], [ 1.4067, 43.5835 ], [ 1.4074, 43.5838 ], [ 1.4074, 43.584 ], [ 1.4081, 43.5845 ], [ 1.4084, 43.5846 ], [ 1.409, 43.5848 ], [ 1.41, 43.585 ], [ 1.4097, 43.5857 ], [ 1.4097, 43.5857 ], [ 1.4097, 43.5858 ], [ 1.4099, 43.5858 ], [ 1.4114, 43.5864 ], [ 1.4115, 43.5864 ], [ 1.4116, 43.5864 ], [ 1.412, 43.5854 ], [ 1.4128, 43.5855 ], [ 1.4135, 43.5858 ], [ 1.4145, 43.5862 ], [ 1.4162, 43.5851 ], [ 1.4155, 43.5843 ], [ 1.4149, 43.5834 ], [ 1.4154, 43.5833 ], [ 1.4164, 43.583 ], [ 1.4171, 43.5827 ], [ 1.4179, 43.5825 ], [ 1.4183, 43.5824 ] ] ], "type": "Polygon" }, "id": "38", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031007", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Grand Mirail" }, "type": "Feature" }, { "bbox": [ 2.1293, 43.9124, 2.1414, 43.919 ], "geometry": { "coordinates": [ [ [ 2.1316, 43.917 ], [ 2.1331, 43.9166 ], [ 2.1328, 43.9157 ], [ 2.1332, 43.9156 ], [ 2.1333, 43.9155 ], [ 2.1337, 43.9154 ], [ 2.1338, 43.9153 ], [ 2.1339, 43.9153 ], [ 2.1349, 43.915 ], [ 2.135, 43.915 ], [ 2.1358, 43.9147 ], [ 2.1357, 43.9146 ], [ 2.1355, 43.9138 ], [ 2.1354, 43.9137 ], [ 2.1361, 43.9137 ], [ 2.1369, 43.9152 ], [ 2.137, 43.9152 ], [ 2.1372, 43.9154 ], [ 2.1377, 43.9151 ], [ 2.1383, 43.9154 ], [ 2.1377, 43.9158 ], [ 2.1383, 43.9162 ], [ 2.1387, 43.916 ], [ 2.1389, 43.9159 ], [ 2.1387, 43.9157 ], [ 2.1398, 43.9152 ], [ 2.1389, 43.9145 ], [ 2.1387, 43.9144 ], [ 2.1386, 43.9142 ], [ 2.1385, 43.9141 ], [ 2.1397, 43.9139 ], [ 2.1397, 43.9137 ], [ 2.1401, 43.9137 ], [ 2.1406, 43.9136 ], [ 2.1414, 43.9136 ], [ 2.1414, 43.9133 ], [ 2.1414, 43.9131 ], [ 2.1413, 43.9131 ], [ 2.1413, 43.913 ], [ 2.1391, 43.9124 ], [ 2.139, 43.9126 ], [ 2.139, 43.9127 ], [ 2.139, 43.9128 ], [ 2.1391, 43.9128 ], [ 2.1386, 43.9129 ], [ 2.1383, 43.913 ], [ 2.1382, 43.913 ], [ 2.1383, 43.9132 ], [ 2.138, 43.9133 ], [ 2.1379, 43.9132 ], [ 2.1378, 43.9133 ], [ 2.1378, 43.9131 ], [ 2.1373, 43.9132 ], [ 2.1373, 43.9131 ], [ 2.137, 43.9131 ], [ 2.137, 43.913 ], [ 2.1365, 43.9131 ], [ 2.1365, 43.9129 ], [ 2.1362, 43.9129 ], [ 2.1362, 43.913 ], [ 2.136, 43.9131 ], [ 2.1353, 43.9132 ], [ 2.135, 43.9128 ], [ 2.1333, 43.9135 ], [ 2.1332, 43.9136 ], [ 2.1332, 43.9137 ], [ 2.133, 43.9138 ], [ 2.1332, 43.9143 ], [ 2.1332, 43.9143 ], [ 2.1327, 43.9144 ], [ 2.1326, 43.9145 ], [ 2.1326, 43.9145 ], [ 2.1325, 43.9146 ], [ 2.1323, 43.9148 ], [ 2.1324, 43.9148 ], [ 2.1323, 43.9149 ], [ 2.1319, 43.9154 ], [ 2.1316, 43.9157 ], [ 2.1316, 43.916 ], [ 2.1316, 43.916 ], [ 2.1316, 43.9161 ], [ 2.1315, 43.9161 ], [ 2.1313, 43.9161 ], [ 2.1313, 43.916 ], [ 2.1312, 43.916 ], [ 2.131, 43.9159 ], [ 2.1298, 43.9159 ], [ 2.1298, 43.9159 ], [ 2.1296, 43.9159 ], [ 2.1296, 43.9162 ], [ 2.1295, 43.9162 ], [ 2.1293, 43.9167 ], [ 2.1293, 43.9172 ], [ 2.1293, 43.9176 ], [ 2.1294, 43.918 ], [ 2.1296, 43.9184 ], [ 2.1299, 43.9188 ], [ 2.1301, 43.9189 ], [ 2.1302, 43.919 ], [ 2.1307, 43.919 ], [ 2.1307, 43.9187 ], [ 2.1307, 43.9186 ], [ 2.1307, 43.9184 ], [ 2.1308, 43.9183 ], [ 2.1309, 43.9182 ], [ 2.1312, 43.918 ], [ 2.1313, 43.918 ], [ 2.1314, 43.9179 ], [ 2.1315, 43.9178 ], [ 2.1316, 43.9177 ], [ 2.1316, 43.9176 ], [ 2.1316, 43.9174 ], [ 2.1316, 43.9173 ], [ 2.1316, 43.9171 ], [ 2.1315, 43.9171 ], [ 2.1316, 43.917 ] ] ], "type": "Polygon" }, "id": "39", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081007", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Veyrières Rayssac" }, "type": "Feature" }, { "bbox": [ 2.2374, 43.6027, 2.2451, 43.6086 ], "geometry": { "coordinates": [ [ [ 2.2376, 43.6086 ], [ 2.2378, 43.6086 ], [ 2.2378, 43.6086 ], [ 2.2381, 43.6085 ], [ 2.2383, 43.6085 ], [ 2.2382, 43.6081 ], [ 2.2382, 43.608 ], [ 2.2389, 43.6079 ], [ 2.2389, 43.6078 ], [ 2.2388, 43.6076 ], [ 2.2391, 43.6075 ], [ 2.2391, 43.6076 ], [ 2.2393, 43.608 ], [ 2.2394, 43.6083 ], [ 2.2409, 43.6079 ], [ 2.2418, 43.6076 ], [ 2.2417, 43.6074 ], [ 2.2422, 43.6073 ], [ 2.2424, 43.6067 ], [ 2.2425, 43.6065 ], [ 2.2425, 43.6064 ], [ 2.2425, 43.6059 ], [ 2.2424, 43.6056 ], [ 2.2426, 43.6056 ], [ 2.2426, 43.6052 ], [ 2.2425, 43.6048 ], [ 2.2429, 43.6048 ], [ 2.2429, 43.6052 ], [ 2.243, 43.6054 ], [ 2.243, 43.6058 ], [ 2.243, 43.606 ], [ 2.243, 43.6061 ], [ 2.2431, 43.6061 ], [ 2.2431, 43.6063 ], [ 2.2431, 43.6065 ], [ 2.2431, 43.6064 ], [ 2.2433, 43.6064 ], [ 2.2439, 43.6062 ], [ 2.2446, 43.6059 ], [ 2.2449, 43.6058 ], [ 2.2451, 43.6057 ], [ 2.2451, 43.6056 ], [ 2.2451, 43.6055 ], [ 2.2449, 43.6054 ], [ 2.2446, 43.6043 ], [ 2.2447, 43.6043 ], [ 2.2443, 43.6039 ], [ 2.2436, 43.6033 ], [ 2.2435, 43.6032 ], [ 2.2431, 43.603 ], [ 2.2431, 43.6027 ], [ 2.2429, 43.6027 ], [ 2.243, 43.603 ], [ 2.2428, 43.603 ], [ 2.2428, 43.6032 ], [ 2.2429, 43.6033 ], [ 2.2429, 43.6035 ], [ 2.2429, 43.6047 ], [ 2.2425, 43.6047 ], [ 2.2424, 43.604 ], [ 2.2423, 43.604 ], [ 2.2422, 43.604 ], [ 2.242, 43.604 ], [ 2.2419, 43.604 ], [ 2.2414, 43.604 ], [ 2.2407, 43.6042 ], [ 2.2407, 43.6043 ], [ 2.2408, 43.6048 ], [ 2.2409, 43.6051 ], [ 2.2409, 43.6053 ], [ 2.2408, 43.6053 ], [ 2.2405, 43.6055 ], [ 2.2403, 43.6056 ], [ 2.2401, 43.6058 ], [ 2.2393, 43.6059 ], [ 2.2387, 43.6061 ], [ 2.2384, 43.6062 ], [ 2.2388, 43.607 ], [ 2.2389, 43.6073 ], [ 2.2383, 43.6074 ], [ 2.2379, 43.6075 ], [ 2.2374, 43.6077 ], [ 2.2376, 43.6086 ] ] ], "type": "Polygon" }, "id": "40", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081005", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.8545, 43.6049, 3.8625, 43.6078 ], "geometry": { "coordinates": [ [ [ 3.8551, 43.6078 ], [ 3.8559, 43.6075 ], [ 3.8564, 43.6073 ], [ 3.8565, 43.6072 ], [ 3.8568, 43.6071 ], [ 3.8573, 43.6068 ], [ 3.8568, 43.6064 ], [ 3.857, 43.6063 ], [ 3.8574, 43.606 ], [ 3.8576, 43.6059 ], [ 3.8577, 43.6058 ], [ 3.8578, 43.6058 ], [ 3.8579, 43.6058 ], [ 3.8581, 43.6059 ], [ 3.8582, 43.606 ], [ 3.8587, 43.6062 ], [ 3.8596, 43.6067 ], [ 3.8595, 43.6067 ], [ 3.8596, 43.6068 ], [ 3.8598, 43.6068 ], [ 3.8603, 43.6064 ], [ 3.8609, 43.6069 ], [ 3.8612, 43.6071 ], [ 3.8613, 43.6072 ], [ 3.8614, 43.6073 ], [ 3.8616, 43.6071 ], [ 3.8618, 43.6069 ], [ 3.8619, 43.6067 ], [ 3.8619, 43.6066 ], [ 3.8621, 43.6063 ], [ 3.8622, 43.6064 ], [ 3.8625, 43.6059 ], [ 3.8623, 43.6058 ], [ 3.8619, 43.6057 ], [ 3.8615, 43.6056 ], [ 3.8608, 43.6054 ], [ 3.8604, 43.6053 ], [ 3.8601, 43.6052 ], [ 3.8598, 43.6051 ], [ 3.8596, 43.6051 ], [ 3.8592, 43.605 ], [ 3.859, 43.605 ], [ 3.8588, 43.605 ], [ 3.8586, 43.605 ], [ 3.8585, 43.605 ], [ 3.8584, 43.605 ], [ 3.8581, 43.605 ], [ 3.8576, 43.6049 ], [ 3.8573, 43.6049 ], [ 3.8569, 43.6049 ], [ 3.8564, 43.6049 ], [ 3.8561, 43.6049 ], [ 3.8562, 43.6057 ], [ 3.8551, 43.6062 ], [ 3.855, 43.606 ], [ 3.8545, 43.6062 ], [ 3.8554, 43.6073 ], [ 3.855, 43.6075 ], [ 3.8549, 43.6076 ], [ 3.8551, 43.6078 ] ] ], "type": "Polygon" }, "id": "41", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034009", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Gély" }, "type": "Feature" }, { "bbox": [ 4.194, 44.2582, 4.203, 44.2626 ], "geometry": { "coordinates": [ [ [ 4.197, 44.2616 ], [ 4.1971, 44.2617 ], [ 4.197, 44.2617 ], [ 4.1972, 44.2617 ], [ 4.1972, 44.2617 ], [ 4.1969, 44.2619 ], [ 4.1969, 44.2619 ], [ 4.1968, 44.262 ], [ 4.1966, 44.2619 ], [ 4.1965, 44.2618 ], [ 4.1962, 44.2617 ], [ 4.1961, 44.2617 ], [ 4.1959, 44.2616 ], [ 4.1958, 44.2615 ], [ 4.1957, 44.2615 ], [ 4.1957, 44.2614 ], [ 4.1957, 44.2612 ], [ 4.1956, 44.2613 ], [ 4.1956, 44.2613 ], [ 4.1956, 44.2617 ], [ 4.1956, 44.2617 ], [ 4.1956, 44.2618 ], [ 4.1957, 44.262 ], [ 4.196, 44.2619 ], [ 4.1963, 44.2618 ], [ 4.1964, 44.2619 ], [ 4.1968, 44.2625 ], [ 4.197, 44.2626 ], [ 4.1974, 44.2624 ], [ 4.1972, 44.2623 ], [ 4.1974, 44.2622 ], [ 4.1975, 44.262 ], [ 4.1976, 44.262 ], [ 4.1977, 44.2621 ], [ 4.1978, 44.2621 ], [ 4.198, 44.2622 ], [ 4.1983, 44.2622 ], [ 4.1984, 44.2622 ], [ 4.1984, 44.2622 ], [ 4.1985, 44.2621 ], [ 4.1985, 44.262 ], [ 4.1987, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1989, 44.262 ], [ 4.199, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2622 ], [ 4.1992, 44.2623 ], [ 4.1992, 44.2622 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1995, 44.2623 ], [ 4.1995, 44.2623 ], [ 4.1996, 44.2623 ], [ 4.1997, 44.2623 ], [ 4.2, 44.2624 ], [ 4.2001, 44.2624 ], [ 4.2001, 44.2624 ], [ 4.2002, 44.2624 ], [ 4.2002, 44.2624 ], [ 4.2004, 44.2624 ], [ 4.2004, 44.2624 ], [ 4.2006, 44.2625 ], [ 4.2006, 44.2624 ], [ 4.2007, 44.2624 ], [ 4.2007, 44.2625 ], [ 4.2008, 44.2625 ], [ 4.201, 44.2624 ], [ 4.201, 44.2624 ], [ 4.2011, 44.2624 ], [ 4.2012, 44.2623 ], [ 4.2012, 44.2623 ], [ 4.2013, 44.2623 ], [ 4.2017, 44.2623 ], [ 4.2015, 44.2619 ], [ 4.2012, 44.262 ], [ 4.2011, 44.262 ], [ 4.2011, 44.262 ], [ 4.2011, 44.262 ], [ 4.201, 44.2619 ], [ 4.201, 44.2618 ], [ 4.201, 44.2617 ], [ 4.201, 44.2617 ], [ 4.2013, 44.2613 ], [ 4.2013, 44.2613 ], [ 4.2012, 44.2613 ], [ 4.201, 44.2613 ], [ 4.2004, 44.2612 ], [ 4.2001, 44.2612 ], [ 4.2001, 44.2611 ], [ 4.2002, 44.261 ], [ 4.2004, 44.2606 ], [ 4.1999, 44.2605 ], [ 4.2, 44.2603 ], [ 4.2, 44.2602 ], [ 4.2001, 44.2602 ], [ 4.2006, 44.2603 ], [ 4.2007, 44.2601 ], [ 4.2008, 44.2599 ], [ 4.2009, 44.2599 ], [ 4.2016, 44.2594 ], [ 4.2017, 44.2591 ], [ 4.2017, 44.259 ], [ 4.203, 44.2584 ], [ 4.2029, 44.2582 ], [ 4.2026, 44.2582 ], [ 4.202, 44.2582 ], [ 4.202, 44.2584 ], [ 4.2022, 44.2585 ], [ 4.2021, 44.2585 ], [ 4.202, 44.2585 ], [ 4.202, 44.2585 ], [ 4.2019, 44.2585 ], [ 4.2019, 44.2586 ], [ 4.2019, 44.2586 ], [ 4.202, 44.2586 ], [ 4.202, 44.2587 ], [ 4.2014, 44.2587 ], [ 4.2014, 44.2588 ], [ 4.2011, 44.2588 ], [ 4.2011, 44.2587 ], [ 4.201, 44.2586 ], [ 4.2005, 44.2587 ], [ 4.2004, 44.2584 ], [ 4.2, 44.2584 ], [ 4.1996, 44.2584 ], [ 4.1994, 44.2584 ], [ 4.1994, 44.2584 ], [ 4.1993, 44.2584 ], [ 4.1993, 44.2584 ], [ 4.1992, 44.2584 ], [ 4.199, 44.2584 ], [ 4.1988, 44.2584 ], [ 4.1985, 44.2586 ], [ 4.1984, 44.2586 ], [ 4.1985, 44.259 ], [ 4.1984, 44.2591 ], [ 4.1983, 44.2595 ], [ 4.1975, 44.2593 ], [ 4.1968, 44.2592 ], [ 4.1966, 44.2595 ], [ 4.1965, 44.2595 ], [ 4.1965, 44.2595 ], [ 4.1949, 44.2592 ], [ 4.1946, 44.259 ], [ 4.1944, 44.2592 ], [ 4.1943, 44.2593 ], [ 4.1944, 44.2594 ], [ 4.1943, 44.2595 ], [ 4.194, 44.2599 ], [ 4.1943, 44.26 ], [ 4.1943, 44.26 ], [ 4.1944, 44.2603 ], [ 4.1944, 44.2604 ], [ 4.1947, 44.2604 ], [ 4.1947, 44.2604 ], [ 4.1948, 44.2604 ], [ 4.1949, 44.2605 ], [ 4.1948, 44.2606 ], [ 4.1948, 44.2606 ], [ 4.1947, 44.2607 ], [ 4.1945, 44.2608 ], [ 4.1944, 44.2609 ], [ 4.1944, 44.2609 ], [ 4.1944, 44.261 ], [ 4.1946, 44.2612 ], [ 4.1947, 44.2613 ], [ 4.1952, 44.2611 ], [ 4.1952, 44.2611 ], [ 4.1957, 44.2611 ], [ 4.1957, 44.261 ], [ 4.1956, 44.2609 ], [ 4.1957, 44.2608 ], [ 4.1958, 44.2609 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.196, 44.2607 ], [ 4.1961, 44.2607 ], [ 4.196, 44.2607 ], [ 4.1962, 44.2608 ], [ 4.1963, 44.2607 ], [ 4.1963, 44.2607 ], [ 4.1964, 44.2607 ], [ 4.1965, 44.2607 ], [ 4.1966, 44.2607 ], [ 4.1966, 44.2607 ], [ 4.1966, 44.2608 ], [ 4.1967, 44.2608 ], [ 4.1966, 44.2608 ], [ 4.1967, 44.2609 ], [ 4.1968, 44.261 ], [ 4.1968, 44.2611 ], [ 4.1969, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1969, 44.2612 ], [ 4.1969, 44.2613 ], [ 4.1968, 44.2616 ], [ 4.1969, 44.2616 ], [ 4.1968, 44.2617 ], [ 4.1969, 44.2617 ], [ 4.1969, 44.2616 ], [ 4.197, 44.2616 ], [ 4.197, 44.2616 ] ] ], "type": "Polygon" }, "id": "42", "properties": { "code_commune": "30227", "code_departement": "30", "code_qp": "QP030014", "commune_qp": "Saint-Ambroix", "nom_commune": "Saint-Ambroix", "nom_qp": "L'Ecusson" }, "type": "Feature" }, { "bbox": [ 1.3507, 44.0158, 1.3577, 44.0229 ], "geometry": { "coordinates": [ [ [ 1.3511, 44.0207 ], [ 1.3513, 44.0209 ], [ 1.3508, 44.0212 ], [ 1.3511, 44.0214 ], [ 1.3519, 44.021 ], [ 1.3522, 44.0213 ], [ 1.3526, 44.0217 ], [ 1.3529, 44.022 ], [ 1.3531, 44.0223 ], [ 1.3532, 44.0229 ], [ 1.354, 44.0228 ], [ 1.354, 44.0225 ], [ 1.3543, 44.0226 ], [ 1.3543, 44.0224 ], [ 1.3547, 44.0224 ], [ 1.3548, 44.0227 ], [ 1.3555, 44.0225 ], [ 1.3555, 44.0225 ], [ 1.3555, 44.0223 ], [ 1.3572, 44.0224 ], [ 1.3573, 44.0217 ], [ 1.3566, 44.0217 ], [ 1.356, 44.0218 ], [ 1.356, 44.0215 ], [ 1.3561, 44.0215 ], [ 1.3561, 44.0214 ], [ 1.3561, 44.0212 ], [ 1.3561, 44.021 ], [ 1.3559, 44.0206 ], [ 1.3558, 44.0204 ], [ 1.356, 44.0204 ], [ 1.3558, 44.02 ], [ 1.3559, 44.0199 ], [ 1.3558, 44.0198 ], [ 1.3558, 44.0197 ], [ 1.3559, 44.0195 ], [ 1.3561, 44.0194 ], [ 1.3562, 44.0193 ], [ 1.3562, 44.0193 ], [ 1.3565, 44.019 ], [ 1.357, 44.0194 ], [ 1.3577, 44.0189 ], [ 1.3575, 44.0189 ], [ 1.3571, 44.0192 ], [ 1.3568, 44.0189 ], [ 1.3566, 44.019 ], [ 1.3564, 44.019 ], [ 1.3562, 44.0188 ], [ 1.3561, 44.0188 ], [ 1.356, 44.0188 ], [ 1.3559, 44.0186 ], [ 1.3558, 44.0185 ], [ 1.3557, 44.0184 ], [ 1.3561, 44.0183 ], [ 1.3565, 44.0183 ], [ 1.357, 44.018 ], [ 1.3569, 44.0179 ], [ 1.3569, 44.0178 ], [ 1.3568, 44.0172 ], [ 1.3566, 44.0172 ], [ 1.3565, 44.0166 ], [ 1.3563, 44.0159 ], [ 1.3562, 44.0158 ], [ 1.3557, 44.016 ], [ 1.355, 44.0162 ], [ 1.3537, 44.0168 ], [ 1.3529, 44.0173 ], [ 1.3524, 44.0175 ], [ 1.3521, 44.0173 ], [ 1.3518, 44.0171 ], [ 1.3515, 44.0174 ], [ 1.3514, 44.0174 ], [ 1.3513, 44.0175 ], [ 1.3513, 44.0177 ], [ 1.3512, 44.0179 ], [ 1.3515, 44.0181 ], [ 1.3514, 44.0182 ], [ 1.3511, 44.0185 ], [ 1.3511, 44.0186 ], [ 1.351, 44.0187 ], [ 1.3509, 44.0189 ], [ 1.3507, 44.0191 ], [ 1.351, 44.0193 ], [ 1.3514, 44.0195 ], [ 1.3513, 44.0197 ], [ 1.3519, 44.0202 ], [ 1.3516, 44.0204 ], [ 1.3511, 44.0207 ] ] ], "type": "Polygon" }, "id": "43", "properties": { "code_commune": "82121", "code_departement": "82", "code_qp": "QP082001", "commune_qp": "Montauban", "nom_commune": "Montauban", "nom_qp": "Cœur de Ville" }, "type": "Feature" }, { "bbox": [ 1.6033, 42.9636, 1.6111, 42.9686 ], "geometry": { "coordinates": [ [ [ 1.6046, 42.9644 ], [ 1.6043, 42.9644 ], [ 1.6043, 42.9645 ], [ 1.6042, 42.9645 ], [ 1.604, 42.9647 ], [ 1.6039, 42.9649 ], [ 1.6038, 42.965 ], [ 1.6039, 42.965 ], [ 1.6039, 42.965 ], [ 1.604, 42.9651 ], [ 1.6041, 42.9651 ], [ 1.6042, 42.9651 ], [ 1.6042, 42.9651 ], [ 1.6042, 42.965 ], [ 1.6042, 42.965 ], [ 1.6043, 42.9649 ], [ 1.6043, 42.9649 ], [ 1.6044, 42.9648 ], [ 1.6044, 42.9649 ], [ 1.6044, 42.9648 ], [ 1.6044, 42.9649 ], [ 1.6045, 42.9649 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6047, 42.9651 ], [ 1.6047, 42.9651 ], [ 1.6047, 42.9651 ], [ 1.6048, 42.9651 ], [ 1.6048, 42.9651 ], [ 1.6049, 42.9652 ], [ 1.6049, 42.9652 ], [ 1.6049, 42.9653 ], [ 1.605, 42.9653 ], [ 1.605, 42.9653 ], [ 1.6051, 42.9653 ], [ 1.605, 42.9654 ], [ 1.6051, 42.9655 ], [ 1.6051, 42.9656 ], [ 1.6052, 42.9656 ], [ 1.6052, 42.9656 ], [ 1.6052, 42.9657 ], [ 1.6051, 42.9659 ], [ 1.6052, 42.9659 ], [ 1.6052, 42.966 ], [ 1.6052, 42.9662 ], [ 1.6051, 42.9663 ], [ 1.6051, 42.9663 ], [ 1.6051, 42.9664 ], [ 1.6051, 42.9665 ], [ 1.6051, 42.9666 ], [ 1.6051, 42.9666 ], [ 1.605, 42.9666 ], [ 1.6049, 42.9667 ], [ 1.6049, 42.9667 ], [ 1.6049, 42.9667 ], [ 1.6047, 42.9668 ], [ 1.6047, 42.9668 ], [ 1.6047, 42.9668 ], [ 1.6046, 42.9668 ], [ 1.6046, 42.9668 ], [ 1.6045, 42.967 ], [ 1.6044, 42.967 ], [ 1.6043, 42.9669 ], [ 1.6042, 42.9668 ], [ 1.604, 42.9667 ], [ 1.6038, 42.9667 ], [ 1.6035, 42.9668 ], [ 1.6034, 42.9668 ], [ 1.6033, 42.9669 ], [ 1.6035, 42.9671 ], [ 1.6036, 42.9672 ], [ 1.6039, 42.9673 ], [ 1.604, 42.9673 ], [ 1.604, 42.9674 ], [ 1.6041, 42.9674 ], [ 1.6042, 42.9674 ], [ 1.6042, 42.9674 ], [ 1.6043, 42.9674 ], [ 1.6044, 42.9674 ], [ 1.6045, 42.9674 ], [ 1.6044, 42.9671 ], [ 1.6045, 42.967 ], [ 1.6046, 42.9671 ], [ 1.6047, 42.9671 ], [ 1.6049, 42.9672 ], [ 1.6051, 42.9672 ], [ 1.6052, 42.9672 ], [ 1.6052, 42.9671 ], [ 1.6053, 42.9671 ], [ 1.6055, 42.9672 ], [ 1.6056, 42.9671 ], [ 1.6056, 42.967 ], [ 1.6058, 42.9671 ], [ 1.6058, 42.9671 ], [ 1.606, 42.9669 ], [ 1.6061, 42.9667 ], [ 1.6062, 42.9667 ], [ 1.6063, 42.9667 ], [ 1.6069, 42.9667 ], [ 1.6073, 42.9668 ], [ 1.6072, 42.9669 ], [ 1.6073, 42.967 ], [ 1.6075, 42.9669 ], [ 1.6076, 42.9669 ], [ 1.6076, 42.9669 ], [ 1.6078, 42.9668 ], [ 1.6079, 42.9667 ], [ 1.6079, 42.9667 ], [ 1.6081, 42.9666 ], [ 1.6081, 42.9666 ], [ 1.6081, 42.9666 ], [ 1.6082, 42.9665 ], [ 1.6084, 42.9664 ], [ 1.6084, 42.9663 ], [ 1.6085, 42.9664 ], [ 1.6087, 42.9661 ], [ 1.6092, 42.9664 ], [ 1.6092, 42.9664 ], [ 1.6091, 42.9666 ], [ 1.6088, 42.9669 ], [ 1.6086, 42.9671 ], [ 1.6086, 42.9673 ], [ 1.6084, 42.9672 ], [ 1.6083, 42.9672 ], [ 1.6081, 42.9673 ], [ 1.608, 42.9675 ], [ 1.6077, 42.9677 ], [ 1.6077, 42.9677 ], [ 1.6079, 42.9678 ], [ 1.6079, 42.9678 ], [ 1.6081, 42.9679 ], [ 1.6082, 42.9679 ], [ 1.6082, 42.968 ], [ 1.6082, 42.9686 ], [ 1.6084, 42.9686 ], [ 1.6084, 42.9686 ], [ 1.6086, 42.9686 ], [ 1.6086, 42.9682 ], [ 1.6086, 42.968 ], [ 1.6085, 42.9679 ], [ 1.6086, 42.9678 ], [ 1.6086, 42.9678 ], [ 1.6086, 42.9677 ], [ 1.6087, 42.9676 ], [ 1.6094, 42.9668 ], [ 1.6095, 42.9668 ], [ 1.6095, 42.9668 ], [ 1.6097, 42.9665 ], [ 1.6098, 42.9665 ], [ 1.6098, 42.9664 ], [ 1.6098, 42.9664 ], [ 1.6098, 42.9663 ], [ 1.61, 42.9662 ], [ 1.61, 42.9662 ], [ 1.61, 42.9661 ], [ 1.61, 42.9661 ], [ 1.6101, 42.966 ], [ 1.6102, 42.9659 ], [ 1.6104, 42.9658 ], [ 1.6104, 42.9657 ], [ 1.6105, 42.9656 ], [ 1.6106, 42.9655 ], [ 1.6107, 42.9654 ], [ 1.6107, 42.9654 ], [ 1.611, 42.965 ], [ 1.6109, 42.965 ], [ 1.611, 42.9649 ], [ 1.6111, 42.9647 ], [ 1.6109, 42.9646 ], [ 1.6107, 42.9649 ], [ 1.6104, 42.9651 ], [ 1.6102, 42.9653 ], [ 1.61, 42.9655 ], [ 1.6098, 42.9657 ], [ 1.6096, 42.9661 ], [ 1.6095, 42.9662 ], [ 1.6093, 42.9664 ], [ 1.6092, 42.9663 ], [ 1.6088, 42.9661 ], [ 1.6092, 42.9658 ], [ 1.6093, 42.9656 ], [ 1.6095, 42.9654 ], [ 1.6097, 42.9652 ], [ 1.6094, 42.965 ], [ 1.6094, 42.9651 ], [ 1.609, 42.9653 ], [ 1.609, 42.9653 ], [ 1.6089, 42.9651 ], [ 1.6089, 42.9649 ], [ 1.6089, 42.9648 ], [ 1.6089, 42.9648 ], [ 1.6089, 42.9647 ], [ 1.6089, 42.9645 ], [ 1.6089, 42.9643 ], [ 1.6089, 42.9643 ], [ 1.6086, 42.9642 ], [ 1.6086, 42.9641 ], [ 1.6085, 42.964 ], [ 1.6083, 42.964 ], [ 1.6081, 42.964 ], [ 1.6074, 42.9639 ], [ 1.6072, 42.9639 ], [ 1.6068, 42.9638 ], [ 1.6066, 42.9638 ], [ 1.6064, 42.9638 ], [ 1.6058, 42.9637 ], [ 1.6054, 42.9636 ], [ 1.6046, 42.9636 ], [ 1.6046, 42.9641 ], [ 1.6046, 42.9644 ] ] ], "type": "Polygon" }, "id": "44", "properties": { "code_commune": "09122", "code_departement": "09", "code_qp": "QP009002", "commune_qp": "Foix", "nom_commune": "Foix", "nom_qp": "Centre Ancien" }, "type": "Feature" }, { "bbox": [ 2.244, 43.5904, 2.2551, 43.5952 ], "geometry": { "coordinates": [ [ [ 2.244, 43.593 ], [ 2.2441, 43.5931 ], [ 2.2442, 43.5932 ], [ 2.2446, 43.593 ], [ 2.2452, 43.5927 ], [ 2.2458, 43.5925 ], [ 2.2464, 43.5924 ], [ 2.2467, 43.5924 ], [ 2.2471, 43.5924 ], [ 2.2475, 43.5925 ], [ 2.2481, 43.5927 ], [ 2.2483, 43.5927 ], [ 2.2484, 43.5927 ], [ 2.249, 43.5927 ], [ 2.249, 43.5926 ], [ 2.2491, 43.5925 ], [ 2.2496, 43.5925 ], [ 2.2497, 43.5926 ], [ 2.2497, 43.5929 ], [ 2.2499, 43.5931 ], [ 2.2503, 43.5929 ], [ 2.2503, 43.5928 ], [ 2.2505, 43.5927 ], [ 2.2505, 43.5926 ], [ 2.2506, 43.5925 ], [ 2.2501, 43.5921 ], [ 2.2501, 43.592 ], [ 2.2502, 43.5919 ], [ 2.2516, 43.5919 ], [ 2.2517, 43.5919 ], [ 2.2519, 43.5921 ], [ 2.252, 43.5928 ], [ 2.2525, 43.5933 ], [ 2.2523, 43.5934 ], [ 2.2528, 43.5938 ], [ 2.2529, 43.5937 ], [ 2.253, 43.5937 ], [ 2.2533, 43.594 ], [ 2.2536, 43.5943 ], [ 2.2532, 43.5946 ], [ 2.2531, 43.5946 ], [ 2.2531, 43.5947 ], [ 2.2531, 43.5952 ], [ 2.2537, 43.5951 ], [ 2.2539, 43.5951 ], [ 2.2543, 43.5949 ], [ 2.2544, 43.5948 ], [ 2.2546, 43.5947 ], [ 2.2546, 43.5945 ], [ 2.2548, 43.5941 ], [ 2.2551, 43.5934 ], [ 2.2545, 43.5928 ], [ 2.2542, 43.5929 ], [ 2.2542, 43.5928 ], [ 2.2542, 43.5928 ], [ 2.254, 43.5926 ], [ 2.2536, 43.5928 ], [ 2.2533, 43.5926 ], [ 2.2535, 43.5925 ], [ 2.2532, 43.5922 ], [ 2.2528, 43.5924 ], [ 2.2527, 43.5923 ], [ 2.2527, 43.5923 ], [ 2.253, 43.5921 ], [ 2.2531, 43.592 ], [ 2.2533, 43.5919 ], [ 2.2537, 43.5916 ], [ 2.254, 43.5915 ], [ 2.2542, 43.5913 ], [ 2.2542, 43.5913 ], [ 2.2542, 43.5912 ], [ 2.2542, 43.5911 ], [ 2.2534, 43.5907 ], [ 2.2528, 43.5905 ], [ 2.2524, 43.5904 ], [ 2.2521, 43.5906 ], [ 2.2523, 43.5909 ], [ 2.2522, 43.591 ], [ 2.2521, 43.5911 ], [ 2.2518, 43.5908 ], [ 2.2517, 43.5907 ], [ 2.2517, 43.5906 ], [ 2.2509, 43.5907 ], [ 2.2508, 43.5905 ], [ 2.2497, 43.5906 ], [ 2.2497, 43.5907 ], [ 2.2494, 43.5908 ], [ 2.2488, 43.591 ], [ 2.2485, 43.5912 ], [ 2.2483, 43.5913 ], [ 2.2483, 43.5913 ], [ 2.2482, 43.5914 ], [ 2.2482, 43.5916 ], [ 2.248, 43.5916 ], [ 2.2477, 43.5916 ], [ 2.2472, 43.5916 ], [ 2.247, 43.5916 ], [ 2.247, 43.5915 ], [ 2.2468, 43.5913 ], [ 2.2464, 43.5914 ], [ 2.2464, 43.5914 ], [ 2.2457, 43.5916 ], [ 2.2458, 43.5917 ], [ 2.2452, 43.5918 ], [ 2.2448, 43.5919 ], [ 2.2447, 43.5919 ], [ 2.2446, 43.5918 ], [ 2.2443, 43.5919 ], [ 2.2442, 43.592 ], [ 2.2441, 43.5921 ], [ 2.244, 43.5923 ], [ 2.244, 43.5924 ], [ 2.244, 43.5927 ], [ 2.244, 43.593 ] ] ], "type": "Polygon" }, "id": "45", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081003", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Lameilhé" }, "type": "Feature" }, { "bbox": [ 1.4792, 43.5738, 1.4848, 43.5778 ], "geometry": { "coordinates": [ [ [ 1.4801, 43.5777 ], [ 1.4802, 43.5778 ], [ 1.4804, 43.5778 ], [ 1.4815, 43.5772 ], [ 1.4816, 43.5772 ], [ 1.4818, 43.5772 ], [ 1.4818, 43.5772 ], [ 1.482, 43.5771 ], [ 1.482, 43.5771 ], [ 1.4821, 43.5769 ], [ 1.4822, 43.5769 ], [ 1.4822, 43.5768 ], [ 1.4827, 43.5765 ], [ 1.483, 43.5764 ], [ 1.4833, 43.5764 ], [ 1.4834, 43.5764 ], [ 1.4838, 43.5761 ], [ 1.484, 43.576 ], [ 1.4842, 43.5758 ], [ 1.4844, 43.5757 ], [ 1.4845, 43.5756 ], [ 1.4846, 43.5754 ], [ 1.4846, 43.5754 ], [ 1.4847, 43.5753 ], [ 1.4848, 43.5753 ], [ 1.4848, 43.5753 ], [ 1.4845, 43.5751 ], [ 1.4843, 43.575 ], [ 1.4841, 43.5749 ], [ 1.4843, 43.5748 ], [ 1.4836, 43.5747 ], [ 1.4837, 43.5744 ], [ 1.4837, 43.5744 ], [ 1.4838, 43.574 ], [ 1.4838, 43.5739 ], [ 1.4839, 43.5738 ], [ 1.4837, 43.5738 ], [ 1.4835, 43.5738 ], [ 1.4835, 43.5738 ], [ 1.4833, 43.5738 ], [ 1.4819, 43.5747 ], [ 1.4818, 43.5748 ], [ 1.4817, 43.5749 ], [ 1.4816, 43.5749 ], [ 1.4814, 43.575 ], [ 1.4812, 43.5751 ], [ 1.4802, 43.5756 ], [ 1.4794, 43.576 ], [ 1.4793, 43.5761 ], [ 1.4792, 43.5763 ], [ 1.4792, 43.5763 ], [ 1.4792, 43.5764 ], [ 1.4793, 43.5768 ], [ 1.4794, 43.5772 ], [ 1.4798, 43.5778 ], [ 1.4798, 43.5778 ], [ 1.4801, 43.5777 ] ] ], "type": "Polygon" }, "id": "46", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031013", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Saint Exupéry" }, "type": "Feature" }, { "bbox": [ 1.073, 44.0999, 1.0904, 44.1069 ], "geometry": { "coordinates": [ [ [ 1.0777, 44.102 ], [ 1.0779, 44.1021 ], [ 1.078, 44.1022 ], [ 1.0784, 44.1024 ], [ 1.0787, 44.1025 ], [ 1.0796, 44.1028 ], [ 1.0807, 44.1032 ], [ 1.0818, 44.1036 ], [ 1.0818, 44.1037 ], [ 1.0819, 44.1037 ], [ 1.082, 44.1038 ], [ 1.0821, 44.1037 ], [ 1.0826, 44.1039 ], [ 1.0832, 44.1043 ], [ 1.0837, 44.1045 ], [ 1.0838, 44.1047 ], [ 1.0838, 44.1047 ], [ 1.0838, 44.1051 ], [ 1.0838, 44.1054 ], [ 1.0839, 44.1062 ], [ 1.084, 44.1065 ], [ 1.0844, 44.1065 ], [ 1.0844, 44.1066 ], [ 1.0844, 44.1067 ], [ 1.0846, 44.1068 ], [ 1.0847, 44.1068 ], [ 1.0849, 44.1068 ], [ 1.0851, 44.1068 ], [ 1.0853, 44.1068 ], [ 1.0854, 44.1068 ], [ 1.0858, 44.1069 ], [ 1.086, 44.1068 ], [ 1.0862, 44.1068 ], [ 1.0871, 44.1068 ], [ 1.0871, 44.1067 ], [ 1.0871, 44.1065 ], [ 1.0871, 44.1063 ], [ 1.0874, 44.1063 ], [ 1.0874, 44.1063 ], [ 1.0901, 44.1063 ], [ 1.0901, 44.1061 ], [ 1.0902, 44.106 ], [ 1.0901, 44.106 ], [ 1.0901, 44.1059 ], [ 1.0902, 44.106 ], [ 1.0902, 44.1059 ], [ 1.0902, 44.1059 ], [ 1.0902, 44.1058 ], [ 1.0903, 44.1057 ], [ 1.0902, 44.1057 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1055 ], [ 1.0902, 44.1055 ], [ 1.0902, 44.1055 ], [ 1.0904, 44.1055 ], [ 1.0904, 44.1054 ], [ 1.0903, 44.1052 ], [ 1.0902, 44.1053 ], [ 1.0899, 44.1053 ], [ 1.0893, 44.1054 ], [ 1.0895, 44.1053 ], [ 1.0897, 44.105 ], [ 1.0888, 44.1045 ], [ 1.0884, 44.1044 ], [ 1.0885, 44.1042 ], [ 1.0887, 44.1041 ], [ 1.0886, 44.1041 ], [ 1.0883, 44.1039 ], [ 1.088, 44.1039 ], [ 1.0879, 44.1039 ], [ 1.0879, 44.1039 ], [ 1.0878, 44.1037 ], [ 1.0877, 44.1036 ], [ 1.0875, 44.1035 ], [ 1.0879, 44.1034 ], [ 1.0878, 44.1029 ], [ 1.0872, 44.1031 ], [ 1.0871, 44.1032 ], [ 1.0869, 44.1029 ], [ 1.0868, 44.1028 ], [ 1.0867, 44.1026 ], [ 1.0865, 44.1024 ], [ 1.0864, 44.1023 ], [ 1.0863, 44.1022 ], [ 1.086, 44.1021 ], [ 1.0855, 44.102 ], [ 1.0853, 44.102 ], [ 1.0852, 44.1018 ], [ 1.0851, 44.1016 ], [ 1.085, 44.1015 ], [ 1.0847, 44.1009 ], [ 1.0844, 44.1004 ], [ 1.0844, 44.1003 ], [ 1.0841, 44.1 ], [ 1.084, 44.1 ], [ 1.0838, 44.1 ], [ 1.0837, 44.1 ], [ 1.0835, 44.1 ], [ 1.0835, 44.1 ], [ 1.0833, 44.1 ], [ 1.083, 44.0999 ], [ 1.0823, 44.1 ], [ 1.0818, 44.1 ], [ 1.0817, 44.1 ], [ 1.0814, 44.1001 ], [ 1.0811, 44.1002 ], [ 1.0799, 44.1004 ], [ 1.0788, 44.1006 ], [ 1.0786, 44.1006 ], [ 1.0782, 44.1006 ], [ 1.0781, 44.1007 ], [ 1.078, 44.1005 ], [ 1.0778, 44.0999 ], [ 1.0771, 44.1 ], [ 1.0751, 44.1 ], [ 1.0747, 44.1001 ], [ 1.0738, 44.1002 ], [ 1.0731, 44.1001 ], [ 1.0732, 44.1005 ], [ 1.0731, 44.1008 ], [ 1.073, 44.1014 ], [ 1.0742, 44.1016 ], [ 1.0745, 44.1015 ], [ 1.0746, 44.1015 ], [ 1.0747, 44.1015 ], [ 1.0747, 44.1014 ], [ 1.0751, 44.1014 ], [ 1.0754, 44.1014 ], [ 1.0757, 44.1014 ], [ 1.0766, 44.1013 ], [ 1.0769, 44.1013 ], [ 1.0771, 44.1013 ], [ 1.0774, 44.1014 ], [ 1.0775, 44.1015 ], [ 1.0776, 44.1019 ], [ 1.0777, 44.102 ] ] ], "type": "Polygon" }, "id": "47", "properties": { "code_commune": "82112", "code_departement": "82", "code_qp": "QP082003", "commune_qp": "Moissac", "nom_commune": "Moissac", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.4487, 44.4585, 1.4596, 44.4672 ], "geometry": { "coordinates": [ [ [ 1.4509, 44.4638 ], [ 1.4503, 44.4641 ], [ 1.4506, 44.4645 ], [ 1.4512, 44.4652 ], [ 1.452, 44.4648 ], [ 1.4514, 44.4643 ], [ 1.4521, 44.464 ], [ 1.4524, 44.4639 ], [ 1.4525, 44.4638 ], [ 1.4529, 44.4637 ], [ 1.4537, 44.4633 ], [ 1.4543, 44.4639 ], [ 1.4545, 44.4638 ], [ 1.4553, 44.4633 ], [ 1.4554, 44.4633 ], [ 1.4555, 44.4632 ], [ 1.4558, 44.4632 ], [ 1.4559, 44.4633 ], [ 1.4559, 44.4634 ], [ 1.456, 44.4635 ], [ 1.456, 44.4635 ], [ 1.4559, 44.4635 ], [ 1.4558, 44.4635 ], [ 1.4556, 44.4635 ], [ 1.4562, 44.464 ], [ 1.4565, 44.4642 ], [ 1.4568, 44.4645 ], [ 1.4567, 44.4646 ], [ 1.4565, 44.4647 ], [ 1.4566, 44.4648 ], [ 1.4566, 44.4651 ], [ 1.4568, 44.4653 ], [ 1.457, 44.4654 ], [ 1.4576, 44.4654 ], [ 1.4578, 44.4653 ], [ 1.458, 44.4658 ], [ 1.458, 44.4661 ], [ 1.4581, 44.4663 ], [ 1.4583, 44.4665 ], [ 1.4577, 44.4668 ], [ 1.458, 44.467 ], [ 1.4581, 44.4672 ], [ 1.4589, 44.4671 ], [ 1.459, 44.4671 ], [ 1.4589, 44.4667 ], [ 1.4589, 44.4667 ], [ 1.4591, 44.4667 ], [ 1.4592, 44.4667 ], [ 1.4593, 44.4666 ], [ 1.4593, 44.4666 ], [ 1.4594, 44.4666 ], [ 1.4596, 44.4666 ], [ 1.4596, 44.4664 ], [ 1.4596, 44.4662 ], [ 1.4595, 44.466 ], [ 1.4594, 44.4654 ], [ 1.4594, 44.4653 ], [ 1.459, 44.4653 ], [ 1.4589, 44.4651 ], [ 1.4589, 44.4651 ], [ 1.4585, 44.4651 ], [ 1.4584, 44.4648 ], [ 1.4584, 44.4646 ], [ 1.4584, 44.4644 ], [ 1.4584, 44.4642 ], [ 1.4584, 44.464 ], [ 1.4585, 44.4639 ], [ 1.4585, 44.4638 ], [ 1.4586, 44.4637 ], [ 1.4586, 44.4636 ], [ 1.4583, 44.4633 ], [ 1.457, 44.4622 ], [ 1.4559, 44.4614 ], [ 1.4552, 44.4608 ], [ 1.4547, 44.4604 ], [ 1.4541, 44.4607 ], [ 1.4537, 44.4608 ], [ 1.4535, 44.461 ], [ 1.4531, 44.4611 ], [ 1.4529, 44.4612 ], [ 1.4529, 44.4612 ], [ 1.4521, 44.4613 ], [ 1.4521, 44.4614 ], [ 1.452, 44.4614 ], [ 1.4519, 44.4611 ], [ 1.4518, 44.461 ], [ 1.4518, 44.4609 ], [ 1.4517, 44.4609 ], [ 1.4522, 44.4607 ], [ 1.4526, 44.4606 ], [ 1.4533, 44.4603 ], [ 1.4531, 44.46 ], [ 1.4518, 44.4605 ], [ 1.4515, 44.4607 ], [ 1.4514, 44.4607 ], [ 1.4512, 44.4608 ], [ 1.4509, 44.4609 ], [ 1.4507, 44.4605 ], [ 1.4505, 44.4601 ], [ 1.4503, 44.46 ], [ 1.4501, 44.4597 ], [ 1.4497, 44.4593 ], [ 1.4491, 44.4586 ], [ 1.4489, 44.4585 ], [ 1.4488, 44.4587 ], [ 1.4487, 44.4588 ], [ 1.4487, 44.4589 ], [ 1.4488, 44.459 ], [ 1.4489, 44.4595 ], [ 1.449, 44.4595 ], [ 1.4494, 44.46 ], [ 1.4489, 44.4601 ], [ 1.4491, 44.4603 ], [ 1.4493, 44.4607 ], [ 1.4496, 44.4611 ], [ 1.4498, 44.4615 ], [ 1.4499, 44.4619 ], [ 1.4502, 44.4628 ], [ 1.4502, 44.463 ], [ 1.4503, 44.4631 ], [ 1.4508, 44.4637 ], [ 1.4509, 44.4638 ] ] ], "type": "Polygon" }, "id": "48", "properties": { "code_commune": "46042", "code_departement": "46", "code_qp": "QP046001", "commune_qp": "Cahors", "nom_commune": "Cahors", "nom_qp": "Terre Rouge" }, "type": "Feature" }, { "bbox": [ 2.3371, 43.2234, 2.3456, 43.2272 ], "geometry": { "coordinates": [ [ [ 2.3455, 43.2244 ], [ 2.3456, 43.2242 ], [ 2.3456, 43.2241 ], [ 2.3455, 43.224 ], [ 2.3454, 43.224 ], [ 2.3452, 43.224 ], [ 2.3451, 43.224 ], [ 2.3447, 43.224 ], [ 2.3447, 43.224 ], [ 2.3448, 43.2238 ], [ 2.3441, 43.2236 ], [ 2.3439, 43.2235 ], [ 2.3437, 43.2235 ], [ 2.3432, 43.2234 ], [ 2.3432, 43.2236 ], [ 2.344, 43.2239 ], [ 2.3443, 43.224 ], [ 2.3443, 43.2243 ], [ 2.3443, 43.2243 ], [ 2.3442, 43.2247 ], [ 2.3441, 43.2247 ], [ 2.3439, 43.2253 ], [ 2.3438, 43.2253 ], [ 2.3428, 43.2252 ], [ 2.3428, 43.2252 ], [ 2.3428, 43.2251 ], [ 2.3427, 43.2251 ], [ 2.3425, 43.2251 ], [ 2.3424, 43.2251 ], [ 2.3419, 43.225 ], [ 2.3419, 43.225 ], [ 2.3418, 43.225 ], [ 2.3416, 43.225 ], [ 2.3411, 43.2249 ], [ 2.3409, 43.2248 ], [ 2.3405, 43.2247 ], [ 2.3399, 43.2246 ], [ 2.3398, 43.2246 ], [ 2.3396, 43.2245 ], [ 2.3394, 43.2246 ], [ 2.3391, 43.2245 ], [ 2.3391, 43.2246 ], [ 2.339, 43.2248 ], [ 2.339, 43.2251 ], [ 2.3389, 43.2252 ], [ 2.3389, 43.2252 ], [ 2.3388, 43.2253 ], [ 2.3388, 43.2253 ], [ 2.3385, 43.2257 ], [ 2.3384, 43.2258 ], [ 2.3381, 43.2261 ], [ 2.338, 43.2261 ], [ 2.3376, 43.2265 ], [ 2.3374, 43.2266 ], [ 2.3372, 43.2269 ], [ 2.3371, 43.2271 ], [ 2.3372, 43.2271 ], [ 2.3382, 43.2272 ], [ 2.3383, 43.2269 ], [ 2.3393, 43.2269 ], [ 2.3396, 43.2269 ], [ 2.3401, 43.2269 ], [ 2.3403, 43.2269 ], [ 2.3407, 43.2269 ], [ 2.3411, 43.2268 ], [ 2.3419, 43.2266 ], [ 2.3425, 43.2265 ], [ 2.3429, 43.2264 ], [ 2.3433, 43.2263 ], [ 2.3438, 43.2262 ], [ 2.344, 43.2262 ], [ 2.3449, 43.2263 ], [ 2.345, 43.2263 ], [ 2.345, 43.2258 ], [ 2.345, 43.2255 ], [ 2.3451, 43.2251 ], [ 2.3451, 43.225 ], [ 2.3452, 43.2249 ], [ 2.3455, 43.2244 ] ] ], "type": "Polygon" }, "id": "49", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011005", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Fleming La Reille" }, "type": "Feature" }, { "bbox": [ 2.0317, 44.3495, 2.0405, 44.3571 ], "geometry": { "coordinates": [ [ [ 2.0348, 44.3523 ], [ 2.0343, 44.3523 ], [ 2.0345, 44.3527 ], [ 2.0347, 44.3531 ], [ 2.0346, 44.3532 ], [ 2.0349, 44.3534 ], [ 2.035, 44.3534 ], [ 2.0352, 44.3535 ], [ 2.0354, 44.3536 ], [ 2.0357, 44.3537 ], [ 2.0363, 44.3538 ], [ 2.0368, 44.3539 ], [ 2.0368, 44.3539 ], [ 2.0374, 44.354 ], [ 2.0377, 44.354 ], [ 2.0379, 44.3541 ], [ 2.0378, 44.3542 ], [ 2.0374, 44.3542 ], [ 2.0372, 44.3543 ], [ 2.037, 44.3546 ], [ 2.0368, 44.3548 ], [ 2.0367, 44.355 ], [ 2.0365, 44.3552 ], [ 2.0364, 44.3555 ], [ 2.0361, 44.3554 ], [ 2.036, 44.3554 ], [ 2.0357, 44.3554 ], [ 2.0352, 44.3556 ], [ 2.0348, 44.355 ], [ 2.0337, 44.3554 ], [ 2.0331, 44.3555 ], [ 2.0329, 44.3556 ], [ 2.0323, 44.3555 ], [ 2.0321, 44.3559 ], [ 2.0319, 44.3561 ], [ 2.0319, 44.3561 ], [ 2.032, 44.3562 ], [ 2.0318, 44.3564 ], [ 2.0317, 44.3566 ], [ 2.0319, 44.3568 ], [ 2.0326, 44.3566 ], [ 2.0327, 44.3565 ], [ 2.0327, 44.3566 ], [ 2.0329, 44.3571 ], [ 2.0331, 44.3571 ], [ 2.0332, 44.3569 ], [ 2.0334, 44.3569 ], [ 2.0336, 44.357 ], [ 2.0337, 44.3568 ], [ 2.0338, 44.3566 ], [ 2.0341, 44.3566 ], [ 2.0339, 44.3563 ], [ 2.034, 44.3562 ], [ 2.0346, 44.356 ], [ 2.0348, 44.3558 ], [ 2.0351, 44.3558 ], [ 2.0352, 44.3558 ], [ 2.0357, 44.356 ], [ 2.036, 44.3557 ], [ 2.0362, 44.3558 ], [ 2.0365, 44.356 ], [ 2.0364, 44.3561 ], [ 2.0363, 44.3564 ], [ 2.0373, 44.3567 ], [ 2.0375, 44.3563 ], [ 2.0373, 44.3557 ], [ 2.038, 44.3555 ], [ 2.0379, 44.3554 ], [ 2.0377, 44.3551 ], [ 2.0375, 44.355 ], [ 2.038, 44.3548 ], [ 2.0379, 44.3545 ], [ 2.038, 44.3545 ], [ 2.0379, 44.3544 ], [ 2.0381, 44.3543 ], [ 2.0382, 44.3544 ], [ 2.0385, 44.3544 ], [ 2.0387, 44.3544 ], [ 2.0387, 44.3544 ], [ 2.0387, 44.354 ], [ 2.0387, 44.3539 ], [ 2.0388, 44.3536 ], [ 2.0391, 44.353 ], [ 2.0394, 44.3526 ], [ 2.0396, 44.3522 ], [ 2.04, 44.3517 ], [ 2.0404, 44.3513 ], [ 2.0404, 44.3512 ], [ 2.0405, 44.3509 ], [ 2.0404, 44.3508 ], [ 2.0401, 44.3507 ], [ 2.0397, 44.3503 ], [ 2.0395, 44.3501 ], [ 2.0394, 44.35 ], [ 2.0385, 44.3498 ], [ 2.0381, 44.3497 ], [ 2.0378, 44.3497 ], [ 2.0371, 44.3495 ], [ 2.0365, 44.3495 ], [ 2.0362, 44.35 ], [ 2.0361, 44.35 ], [ 2.0365, 44.35 ], [ 2.0366, 44.3501 ], [ 2.0367, 44.3502 ], [ 2.0367, 44.3505 ], [ 2.0367, 44.3506 ], [ 2.0368, 44.3509 ], [ 2.0369, 44.3511 ], [ 2.0363, 44.3513 ], [ 2.0351, 44.3519 ], [ 2.0348, 44.3521 ], [ 2.0348, 44.3521 ], [ 2.0348, 44.3522 ], [ 2.0348, 44.3523 ] ] ], "type": "Polygon" }, "id": "50", "properties": { "code_commune": "12300", "code_departement": "12", "code_qp": "QP012002", "commune_qp": "Villefranche-de-Rouergue", "nom_commune": "Villefranche-de-Rouergue", "nom_qp": "La Bastide" }, "type": "Feature" }, { "bbox": [ 1.3795, 43.6375, 1.3879, 43.6403 ], "geometry": { "coordinates": [ [ [ 1.3819, 43.6376 ], [ 1.3815, 43.6377 ], [ 1.381, 43.6379 ], [ 1.3807, 43.638 ], [ 1.3804, 43.6381 ], [ 1.3801, 43.6382 ], [ 1.38, 43.6383 ], [ 1.3795, 43.6385 ], [ 1.3801, 43.6394 ], [ 1.3801, 43.6394 ], [ 1.3799, 43.6394 ], [ 1.38, 43.6395 ], [ 1.3804, 43.6396 ], [ 1.3805, 43.6396 ], [ 1.3806, 43.6393 ], [ 1.3807, 43.6393 ], [ 1.3808, 43.6395 ], [ 1.381, 43.6399 ], [ 1.3815, 43.6399 ], [ 1.3815, 43.6398 ], [ 1.3816, 43.6397 ], [ 1.3819, 43.6398 ], [ 1.3819, 43.6398 ], [ 1.3826, 43.6397 ], [ 1.3828, 43.6398 ], [ 1.3829, 43.6395 ], [ 1.3853, 43.6397 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6402 ], [ 1.3853, 43.6402 ], [ 1.3859, 43.6403 ], [ 1.3862, 43.6403 ], [ 1.3863, 43.6403 ], [ 1.3865, 43.6401 ], [ 1.3867, 43.6399 ], [ 1.387, 43.6397 ], [ 1.387, 43.6397 ], [ 1.3872, 43.6398 ], [ 1.3879, 43.6392 ], [ 1.3866, 43.639 ], [ 1.3857, 43.6389 ], [ 1.3856, 43.6389 ], [ 1.3856, 43.6389 ], [ 1.3856, 43.639 ], [ 1.3855, 43.639 ], [ 1.3854, 43.6391 ], [ 1.3853, 43.639 ], [ 1.3831, 43.6389 ], [ 1.3836, 43.6376 ], [ 1.3835, 43.6375 ], [ 1.3833, 43.6375 ], [ 1.383, 43.6375 ], [ 1.3824, 43.6376 ], [ 1.3819, 43.6376 ] ] ], "type": "Polygon" }, "id": "51", "properties": { "code_commune": "31069", "code_departement": "31", "code_qp": "QP031004", "commune_qp": "Blagnac", "nom_commune": "Blagnac", "nom_qp": "Barradels" }, "type": "Feature" }, { "bbox": [ 1.4736, 43.608, 1.4801, 43.6149 ], "geometry": { "coordinates": [ [ [ 1.4736, 43.6126 ], [ 1.4753, 43.6133 ], [ 1.4758, 43.6136 ], [ 1.4761, 43.6138 ], [ 1.4764, 43.6135 ], [ 1.478, 43.6143 ], [ 1.4792, 43.6149 ], [ 1.4799, 43.6142 ], [ 1.48, 43.6142 ], [ 1.4801, 43.614 ], [ 1.4785, 43.6132 ], [ 1.478, 43.6129 ], [ 1.4774, 43.6126 ], [ 1.4773, 43.6123 ], [ 1.4772, 43.612 ], [ 1.4776, 43.6116 ], [ 1.4786, 43.6106 ], [ 1.4791, 43.6101 ], [ 1.4779, 43.6096 ], [ 1.4774, 43.6093 ], [ 1.4781, 43.6086 ], [ 1.4767, 43.608 ], [ 1.4762, 43.6086 ], [ 1.476, 43.6087 ], [ 1.4759, 43.6088 ], [ 1.4753, 43.6095 ], [ 1.4753, 43.6095 ], [ 1.4753, 43.6096 ], [ 1.4753, 43.6096 ], [ 1.4755, 43.6097 ], [ 1.4769, 43.6104 ], [ 1.4762, 43.6112 ], [ 1.4767, 43.6114 ], [ 1.4774, 43.6117 ], [ 1.4771, 43.612 ], [ 1.4772, 43.6125 ], [ 1.4771, 43.6125 ], [ 1.4767, 43.6123 ], [ 1.476, 43.6119 ], [ 1.4756, 43.6117 ], [ 1.4754, 43.6116 ], [ 1.4748, 43.6122 ], [ 1.4742, 43.6119 ], [ 1.4736, 43.6126 ] ] ], "type": "Polygon" }, "id": "52", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031014", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Soupetard" }, "type": "Feature" }, { "bbox": [ 2.8921, 42.6847, 2.8956, 42.6892 ], "geometry": { "coordinates": [ [ [ 2.8956, 42.6868 ], [ 2.8955, 42.6868 ], [ 2.8954, 42.6866 ], [ 2.8955, 42.6867 ], [ 2.8948, 42.6861 ], [ 2.8946, 42.6859 ], [ 2.8945, 42.6858 ], [ 2.8945, 42.6857 ], [ 2.8944, 42.6857 ], [ 2.8944, 42.6855 ], [ 2.8943, 42.6852 ], [ 2.8947, 42.6852 ], [ 2.8946, 42.6852 ], [ 2.8945, 42.685 ], [ 2.8943, 42.6847 ], [ 2.8939, 42.6848 ], [ 2.8935, 42.685 ], [ 2.8933, 42.6851 ], [ 2.8933, 42.6853 ], [ 2.8933, 42.6854 ], [ 2.8934, 42.6858 ], [ 2.8929, 42.6858 ], [ 2.8928, 42.6858 ], [ 2.8923, 42.6858 ], [ 2.8921, 42.6859 ], [ 2.8922, 42.686 ], [ 2.8922, 42.6867 ], [ 2.8923, 42.6867 ], [ 2.8923, 42.6868 ], [ 2.8923, 42.6871 ], [ 2.8924, 42.6873 ], [ 2.8925, 42.6876 ], [ 2.8927, 42.6881 ], [ 2.8928, 42.688 ], [ 2.8928, 42.688 ], [ 2.8928, 42.6881 ], [ 2.8928, 42.6883 ], [ 2.893, 42.6886 ], [ 2.893, 42.6887 ], [ 2.8931, 42.6889 ], [ 2.8931, 42.6889 ], [ 2.8932, 42.6891 ], [ 2.8932, 42.6892 ], [ 2.8935, 42.689 ], [ 2.8936, 42.6889 ], [ 2.8937, 42.6889 ], [ 2.8937, 42.6888 ], [ 2.8937, 42.6888 ], [ 2.8947, 42.6881 ], [ 2.895, 42.6878 ], [ 2.8951, 42.6878 ], [ 2.8954, 42.6873 ], [ 2.8956, 42.6869 ], [ 2.8956, 42.6868 ] ] ], "type": "Polygon" }, "id": "53", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066006", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Rois De Majorque" }, "type": "Feature" }, { "bbox": [ 2.892, 42.7241, 2.9024, 42.729 ], "geometry": { "coordinates": [ [ [ 2.8942, 42.7246 ], [ 2.8936, 42.7241 ], [ 2.8931, 42.7245 ], [ 2.8923, 42.7251 ], [ 2.8923, 42.7251 ], [ 2.892, 42.7253 ], [ 2.8932, 42.7264 ], [ 2.8945, 42.7275 ], [ 2.8949, 42.7278 ], [ 2.8952, 42.728 ], [ 2.896, 42.7285 ], [ 2.8964, 42.7288 ], [ 2.897, 42.7283 ], [ 2.897, 42.7284 ], [ 2.8975, 42.7287 ], [ 2.8977, 42.7289 ], [ 2.8979, 42.729 ], [ 2.8991, 42.7281 ], [ 2.8993, 42.728 ], [ 2.8994, 42.7281 ], [ 2.8996, 42.7279 ], [ 2.8999, 42.7278 ], [ 2.9001, 42.7276 ], [ 2.9003, 42.7279 ], [ 2.9004, 42.7279 ], [ 2.9007, 42.7282 ], [ 2.9007, 42.7282 ], [ 2.9011, 42.7286 ], [ 2.9018, 42.7281 ], [ 2.9019, 42.728 ], [ 2.9021, 42.7278 ], [ 2.9022, 42.7277 ], [ 2.9023, 42.7274 ], [ 2.9024, 42.7273 ], [ 2.9008, 42.7271 ], [ 2.9007, 42.7271 ], [ 2.9, 42.727 ], [ 2.8999, 42.7269 ], [ 2.8997, 42.7269 ], [ 2.8983, 42.7267 ], [ 2.8983, 42.7266 ], [ 2.8988, 42.7262 ], [ 2.8985, 42.726 ], [ 2.8982, 42.7258 ], [ 2.8981, 42.7257 ], [ 2.8979, 42.7256 ], [ 2.8979, 42.7255 ], [ 2.8978, 42.7255 ], [ 2.8977, 42.7255 ], [ 2.8977, 42.7255 ], [ 2.8975, 42.7255 ], [ 2.8974, 42.7254 ], [ 2.8974, 42.7254 ], [ 2.8972, 42.7253 ], [ 2.8971, 42.7253 ], [ 2.897, 42.7254 ], [ 2.8969, 42.7255 ], [ 2.8965, 42.7257 ], [ 2.8963, 42.7259 ], [ 2.8962, 42.7258 ], [ 2.896, 42.726 ], [ 2.8953, 42.7255 ], [ 2.8953, 42.7255 ], [ 2.8942, 42.7246 ] ] ], "type": "Polygon" }, "id": "54", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066009", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Nouveau Logis" }, "type": "Feature" }, { "bbox": [ 3.8654, 43.6347, 3.8703, 43.6395 ], "geometry": { "coordinates": [ [ [ 3.8667, 43.635 ], [ 3.8668, 43.635 ], [ 3.8666, 43.6353 ], [ 3.8659, 43.6351 ], [ 3.8657, 43.6357 ], [ 3.8663, 43.6358 ], [ 3.8664, 43.6359 ], [ 3.8659, 43.6363 ], [ 3.8654, 43.6367 ], [ 3.8659, 43.6369 ], [ 3.8662, 43.637 ], [ 3.8667, 43.6373 ], [ 3.8665, 43.6375 ], [ 3.8671, 43.6378 ], [ 3.8673, 43.6383 ], [ 3.8686, 43.6389 ], [ 3.8691, 43.6391 ], [ 3.87, 43.6395 ], [ 3.8695, 43.6389 ], [ 3.869, 43.6384 ], [ 3.869, 43.6383 ], [ 3.8693, 43.6381 ], [ 3.8694, 43.6379 ], [ 3.8697, 43.638 ], [ 3.8699, 43.6381 ], [ 3.8699, 43.6381 ], [ 3.8699, 43.6379 ], [ 3.8697, 43.6378 ], [ 3.8701, 43.6377 ], [ 3.8703, 43.6376 ], [ 3.8703, 43.6372 ], [ 3.8696, 43.6364 ], [ 3.8687, 43.6364 ], [ 3.8684, 43.6358 ], [ 3.8683, 43.6357 ], [ 3.8682, 43.6355 ], [ 3.8682, 43.6352 ], [ 3.8682, 43.6349 ], [ 3.8681, 43.6348 ], [ 3.8679, 43.6347 ], [ 3.8676, 43.6347 ], [ 3.867, 43.6347 ], [ 3.8668, 43.6347 ], [ 3.8667, 43.6349 ], [ 3.8667, 43.6349 ], [ 3.8667, 43.635 ] ] ], "type": "Polygon" }, "id": "55", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034015", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Vert-Bois" }, "type": "Feature" }, { "bbox": [ 1.3685, 44.0085, 1.3867, 44.0176 ], "geometry": { "coordinates": [ [ [ 1.3867, 44.0146 ], [ 1.3866, 44.0144 ], [ 1.3861, 44.0143 ], [ 1.3849, 44.0141 ], [ 1.3845, 44.014 ], [ 1.3838, 44.0139 ], [ 1.3848, 44.0127 ], [ 1.3842, 44.0122 ], [ 1.3836, 44.0117 ], [ 1.3827, 44.011 ], [ 1.3832, 44.0107 ], [ 1.384, 44.0103 ], [ 1.3841, 44.0102 ], [ 1.3841, 44.0102 ], [ 1.3839, 44.0101 ], [ 1.3836, 44.0099 ], [ 1.3833, 44.0096 ], [ 1.383, 44.0093 ], [ 1.3827, 44.009 ], [ 1.3825, 44.0088 ], [ 1.3824, 44.0088 ], [ 1.3821, 44.0088 ], [ 1.3818, 44.0091 ], [ 1.3807, 44.0098 ], [ 1.3813, 44.0103 ], [ 1.3809, 44.0105 ], [ 1.3806, 44.0106 ], [ 1.3804, 44.0108 ], [ 1.3803, 44.0108 ], [ 1.3802, 44.0108 ], [ 1.3802, 44.0108 ], [ 1.3793, 44.0111 ], [ 1.3792, 44.0109 ], [ 1.3789, 44.011 ], [ 1.3789, 44.0111 ], [ 1.3786, 44.0111 ], [ 1.3786, 44.0114 ], [ 1.3782, 44.0114 ], [ 1.3779, 44.0105 ], [ 1.3779, 44.0103 ], [ 1.3786, 44.01 ], [ 1.3787, 44.01 ], [ 1.379, 44.0098 ], [ 1.3797, 44.0097 ], [ 1.3796, 44.0094 ], [ 1.3788, 44.0095 ], [ 1.3787, 44.0085 ], [ 1.3781, 44.0085 ], [ 1.3777, 44.0086 ], [ 1.3774, 44.0086 ], [ 1.3774, 44.0086 ], [ 1.3771, 44.0087 ], [ 1.3764, 44.0087 ], [ 1.3762, 44.0088 ], [ 1.376, 44.0089 ], [ 1.3757, 44.009 ], [ 1.3756, 44.0092 ], [ 1.3747, 44.0099 ], [ 1.3737, 44.011 ], [ 1.3735, 44.0104 ], [ 1.3734, 44.0102 ], [ 1.3734, 44.0102 ], [ 1.3733, 44.0101 ], [ 1.3732, 44.01 ], [ 1.3733, 44.0099 ], [ 1.3732, 44.0097 ], [ 1.3724, 44.0098 ], [ 1.3723, 44.0098 ], [ 1.3721, 44.0098 ], [ 1.3721, 44.0099 ], [ 1.3713, 44.0101 ], [ 1.3716, 44.0107 ], [ 1.3718, 44.0109 ], [ 1.3713, 44.0111 ], [ 1.3711, 44.0112 ], [ 1.3708, 44.0107 ], [ 1.3703, 44.0108 ], [ 1.3704, 44.0109 ], [ 1.3698, 44.0111 ], [ 1.3697, 44.0112 ], [ 1.3699, 44.0116 ], [ 1.3693, 44.0116 ], [ 1.3688, 44.0117 ], [ 1.3685, 44.012 ], [ 1.3698, 44.0128 ], [ 1.3701, 44.0127 ], [ 1.3704, 44.0128 ], [ 1.371, 44.0132 ], [ 1.3718, 44.0138 ], [ 1.3719, 44.0138 ], [ 1.3729, 44.015 ], [ 1.3735, 44.0157 ], [ 1.3742, 44.0153 ], [ 1.3751, 44.0161 ], [ 1.3759, 44.0168 ], [ 1.3761, 44.017 ], [ 1.3766, 44.0172 ], [ 1.3773, 44.0166 ], [ 1.378, 44.016 ], [ 1.3779, 44.0159 ], [ 1.3774, 44.0156 ], [ 1.377, 44.0153 ], [ 1.3769, 44.0155 ], [ 1.3764, 44.0152 ], [ 1.3763, 44.0153 ], [ 1.3754, 44.0145 ], [ 1.3758, 44.0142 ], [ 1.3763, 44.014 ], [ 1.3754, 44.0129 ], [ 1.3754, 44.0128 ], [ 1.375, 44.0122 ], [ 1.3751, 44.0122 ], [ 1.3744, 44.0121 ], [ 1.374, 44.012 ], [ 1.3739, 44.0121 ], [ 1.3737, 44.0112 ], [ 1.3739, 44.0109 ], [ 1.3751, 44.0108 ], [ 1.3754, 44.0108 ], [ 1.3756, 44.0106 ], [ 1.3764, 44.0105 ], [ 1.3766, 44.0105 ], [ 1.3767, 44.0107 ], [ 1.3766, 44.0107 ], [ 1.3765, 44.0107 ], [ 1.3762, 44.0108 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.011 ], [ 1.3763, 44.0112 ], [ 1.3762, 44.0112 ], [ 1.3761, 44.0112 ], [ 1.3757, 44.0112 ], [ 1.3757, 44.0113 ], [ 1.3757, 44.0113 ], [ 1.3758, 44.0118 ], [ 1.3758, 44.0118 ], [ 1.3758, 44.012 ], [ 1.3757, 44.0122 ], [ 1.3765, 44.0122 ], [ 1.3769, 44.0122 ], [ 1.3771, 44.0122 ], [ 1.3773, 44.0123 ], [ 1.3784, 44.0124 ], [ 1.3786, 44.0125 ], [ 1.3788, 44.0124 ], [ 1.3789, 44.0124 ], [ 1.3792, 44.0124 ], [ 1.3793, 44.0125 ], [ 1.3794, 44.0126 ], [ 1.3804, 44.0128 ], [ 1.3806, 44.0128 ], [ 1.3809, 44.0129 ], [ 1.3812, 44.0131 ], [ 1.3814, 44.0132 ], [ 1.3814, 44.0133 ], [ 1.381, 44.0138 ], [ 1.3825, 44.0143 ], [ 1.3821, 44.0149 ], [ 1.3819, 44.0151 ], [ 1.3813, 44.0158 ], [ 1.3817, 44.0159 ], [ 1.3822, 44.0161 ], [ 1.3829, 44.0164 ], [ 1.3836, 44.0167 ], [ 1.3839, 44.0168 ], [ 1.3841, 44.0168 ], [ 1.3837, 44.0176 ], [ 1.384, 44.0176 ], [ 1.3843, 44.0176 ], [ 1.3847, 44.0169 ], [ 1.3848, 44.017 ], [ 1.3855, 44.0166 ], [ 1.3855, 44.0166 ], [ 1.3858, 44.0164 ], [ 1.3857, 44.016 ], [ 1.3864, 44.0156 ], [ 1.3863, 44.015 ], [ 1.3863, 44.0149 ], [ 1.3864, 44.0148 ], [ 1.3866, 44.0147 ], [ 1.3867, 44.0146 ], [ 1.3867, 44.0146 ] ] ], "type": "Polygon" }, "id": "56", "properties": { "code_commune": "82121", "code_departement": "82", "code_qp": "QP082002", "commune_qp": "Montauban", "nom_commune": "Montauban", "nom_qp": "Médiathèque - Chambord" }, "type": "Feature" }, { "bbox": [ 2.1581, 43.9249, 2.1666, 43.9301 ], "geometry": { "coordinates": [ [ [ 2.1634, 43.9298 ], [ 2.1645, 43.9293 ], [ 2.1646, 43.9292 ], [ 2.1644, 43.9291 ], [ 2.1648, 43.9287 ], [ 2.165, 43.9286 ], [ 2.1651, 43.9284 ], [ 2.1653, 43.9282 ], [ 2.1652, 43.9279 ], [ 2.1653, 43.9279 ], [ 2.1662, 43.9278 ], [ 2.1661, 43.9278 ], [ 2.1666, 43.9276 ], [ 2.1665, 43.9272 ], [ 2.166, 43.9272 ], [ 2.166, 43.9273 ], [ 2.1659, 43.9274 ], [ 2.1651, 43.9275 ], [ 2.165, 43.9274 ], [ 2.1646, 43.9274 ], [ 2.1646, 43.9273 ], [ 2.1644, 43.9274 ], [ 2.1643, 43.9271 ], [ 2.164, 43.9271 ], [ 2.1639, 43.9267 ], [ 2.1638, 43.9266 ], [ 2.1633, 43.9266 ], [ 2.1632, 43.9261 ], [ 2.1632, 43.9261 ], [ 2.1631, 43.926 ], [ 2.1629, 43.9257 ], [ 2.1623, 43.9257 ], [ 2.1622, 43.9253 ], [ 2.162, 43.9252 ], [ 2.1614, 43.9254 ], [ 2.1613, 43.925 ], [ 2.1607, 43.9252 ], [ 2.1596, 43.9255 ], [ 2.1596, 43.9254 ], [ 2.1592, 43.9249 ], [ 2.159, 43.9249 ], [ 2.1587, 43.925 ], [ 2.1584, 43.9252 ], [ 2.1581, 43.9253 ], [ 2.1587, 43.9267 ], [ 2.1598, 43.9265 ], [ 2.1597, 43.9259 ], [ 2.1603, 43.9259 ], [ 2.1606, 43.9259 ], [ 2.161, 43.9258 ], [ 2.1612, 43.9262 ], [ 2.1612, 43.9264 ], [ 2.1615, 43.9264 ], [ 2.1616, 43.9267 ], [ 2.1615, 43.9267 ], [ 2.1617, 43.9273 ], [ 2.1618, 43.9273 ], [ 2.1618, 43.9273 ], [ 2.1619, 43.9276 ], [ 2.1619, 43.9278 ], [ 2.162, 43.9283 ], [ 2.1616, 43.9284 ], [ 2.1611, 43.9283 ], [ 2.1611, 43.9287 ], [ 2.1611, 43.9288 ], [ 2.1621, 43.9287 ], [ 2.1622, 43.929 ], [ 2.1632, 43.9288 ], [ 2.1633, 43.9293 ], [ 2.1629, 43.9294 ], [ 2.1627, 43.9297 ], [ 2.1628, 43.9297 ], [ 2.1626, 43.9299 ], [ 2.1631, 43.9301 ], [ 2.1632, 43.9301 ], [ 2.1634, 43.9298 ] ] ], "type": "Polygon" }, "id": "57", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081008", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Lapanouse" }, "type": "Feature" }, { "bbox": [ 1.4619, 43.565, 1.4697, 43.5738 ], "geometry": { "coordinates": [ [ [ 1.4636, 43.5734 ], [ 1.4637, 43.5734 ], [ 1.4626, 43.5724 ], [ 1.4639, 43.5722 ], [ 1.4628, 43.5712 ], [ 1.464, 43.5705 ], [ 1.4639, 43.5705 ], [ 1.4641, 43.5704 ], [ 1.4642, 43.5704 ], [ 1.4645, 43.5702 ], [ 1.4647, 43.57 ], [ 1.4648, 43.5693 ], [ 1.4654, 43.5693 ], [ 1.4658, 43.5689 ], [ 1.4664, 43.5692 ], [ 1.4679, 43.5699 ], [ 1.4685, 43.5693 ], [ 1.4692, 43.5686 ], [ 1.4697, 43.5681 ], [ 1.4658, 43.5661 ], [ 1.4652, 43.5657 ], [ 1.4645, 43.565 ], [ 1.464, 43.5656 ], [ 1.4635, 43.5658 ], [ 1.4637, 43.566 ], [ 1.4633, 43.5663 ], [ 1.4634, 43.5677 ], [ 1.4643, 43.5676 ], [ 1.464, 43.569 ], [ 1.4634, 43.5691 ], [ 1.4633, 43.5702 ], [ 1.4619, 43.5705 ], [ 1.4626, 43.5713 ], [ 1.4623, 43.5715 ], [ 1.4627, 43.5719 ], [ 1.462, 43.5725 ], [ 1.4627, 43.5731 ], [ 1.4624, 43.5732 ], [ 1.463, 43.5738 ], [ 1.463, 43.5738 ], [ 1.4636, 43.5734 ] ] ], "type": "Polygon" }, "id": "58", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031015", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Rangueil" }, "type": "Feature" }, { "bbox": [ 2.9733, 43.1814, 2.9962, 43.19 ], "geometry": { "coordinates": [ [ [ 2.9837, 43.1842 ], [ 2.9837, 43.1836 ], [ 2.9812, 43.1837 ], [ 2.9808, 43.1838 ], [ 2.9807, 43.1827 ], [ 2.9807, 43.1827 ], [ 2.981, 43.1827 ], [ 2.9809, 43.1816 ], [ 2.98, 43.1815 ], [ 2.9786, 43.1815 ], [ 2.9779, 43.1814 ], [ 2.9779, 43.1819 ], [ 2.978, 43.1826 ], [ 2.978, 43.1827 ], [ 2.978, 43.1834 ], [ 2.978, 43.1834 ], [ 2.9778, 43.1834 ], [ 2.9776, 43.1834 ], [ 2.9768, 43.1833 ], [ 2.9762, 43.1833 ], [ 2.9761, 43.1833 ], [ 2.976, 43.1833 ], [ 2.9759, 43.1832 ], [ 2.9761, 43.1826 ], [ 2.9761, 43.1826 ], [ 2.9755, 43.1825 ], [ 2.9752, 43.1825 ], [ 2.9751, 43.1825 ], [ 2.975, 43.1825 ], [ 2.9749, 43.1825 ], [ 2.9749, 43.182 ], [ 2.9743, 43.1819 ], [ 2.9743, 43.1821 ], [ 2.9739, 43.1821 ], [ 2.9739, 43.182 ], [ 2.9739, 43.182 ], [ 2.9734, 43.182 ], [ 2.9734, 43.1827 ], [ 2.9733, 43.1831 ], [ 2.9735, 43.1831 ], [ 2.974, 43.1833 ], [ 2.9755, 43.1838 ], [ 2.9757, 43.1839 ], [ 2.9758, 43.1839 ], [ 2.9763, 43.1842 ], [ 2.9764, 43.1842 ], [ 2.9765, 43.1843 ], [ 2.9768, 43.1848 ], [ 2.9768, 43.1849 ], [ 2.9768, 43.1852 ], [ 2.9762, 43.1851 ], [ 2.9762, 43.1858 ], [ 2.9763, 43.1861 ], [ 2.9763, 43.1863 ], [ 2.9765, 43.1864 ], [ 2.9765, 43.1866 ], [ 2.9768, 43.1866 ], [ 2.9769, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9775, 43.1865 ], [ 2.9775, 43.1864 ], [ 2.9778, 43.1864 ], [ 2.9778, 43.1863 ], [ 2.9782, 43.1864 ], [ 2.9782, 43.1864 ], [ 2.9783, 43.1865 ], [ 2.9783, 43.1865 ], [ 2.9786, 43.1865 ], [ 2.9786, 43.1867 ], [ 2.9785, 43.1868 ], [ 2.9786, 43.1868 ], [ 2.9786, 43.1868 ], [ 2.979, 43.1868 ], [ 2.979, 43.1867 ], [ 2.9789, 43.1866 ], [ 2.9789, 43.1865 ], [ 2.9789, 43.1864 ], [ 2.9789, 43.1861 ], [ 2.9793, 43.1861 ], [ 2.9793, 43.1859 ], [ 2.9786, 43.1859 ], [ 2.9786, 43.1858 ], [ 2.9786, 43.1849 ], [ 2.9786, 43.1846 ], [ 2.979, 43.1847 ], [ 2.9791, 43.1847 ], [ 2.9794, 43.1847 ], [ 2.9798, 43.1847 ], [ 2.981, 43.185 ], [ 2.9811, 43.1847 ], [ 2.981, 43.1846 ], [ 2.981, 43.1841 ], [ 2.9817, 43.1841 ], [ 2.9822, 43.1842 ], [ 2.9824, 43.1841 ], [ 2.9825, 43.1841 ], [ 2.9832, 43.1841 ], [ 2.9832, 43.1841 ], [ 2.9833, 43.1842 ], [ 2.9833, 43.1843 ], [ 2.9836, 43.1855 ], [ 2.9837, 43.1856 ], [ 2.9839, 43.1864 ], [ 2.984, 43.1871 ], [ 2.9836, 43.1871 ], [ 2.984, 43.1877 ], [ 2.9842, 43.188 ], [ 2.9843, 43.1881 ], [ 2.9844, 43.1881 ], [ 2.9847, 43.1882 ], [ 2.9848, 43.1882 ], [ 2.985, 43.1885 ], [ 2.9852, 43.189 ], [ 2.9854, 43.1891 ], [ 2.9854, 43.1891 ], [ 2.9863, 43.1886 ], [ 2.9864, 43.1886 ], [ 2.9864, 43.1887 ], [ 2.9865, 43.1887 ], [ 2.9866, 43.1888 ], [ 2.9867, 43.1888 ], [ 2.9876, 43.1884 ], [ 2.9878, 43.1888 ], [ 2.9881, 43.1891 ], [ 2.9882, 43.1893 ], [ 2.9881, 43.1894 ], [ 2.9885, 43.1898 ], [ 2.9898, 43.189 ], [ 2.9901, 43.1888 ], [ 2.9903, 43.1886 ], [ 2.991, 43.1882 ], [ 2.9913, 43.1886 ], [ 2.9917, 43.1889 ], [ 2.9923, 43.189 ], [ 2.9929, 43.1887 ], [ 2.9933, 43.189 ], [ 2.9936, 43.1892 ], [ 2.9936, 43.1892 ], [ 2.9935, 43.1894 ], [ 2.9935, 43.1895 ], [ 2.9935, 43.1896 ], [ 2.9941, 43.1898 ], [ 2.9947, 43.19 ], [ 2.9949, 43.19 ], [ 2.9951, 43.1898 ], [ 2.9958, 43.1889 ], [ 2.9961, 43.1886 ], [ 2.9962, 43.1884 ], [ 2.9955, 43.1887 ], [ 2.9941, 43.1891 ], [ 2.9934, 43.1885 ], [ 2.993, 43.1881 ], [ 2.9928, 43.1879 ], [ 2.9928, 43.1877 ], [ 2.9929, 43.1877 ], [ 2.9932, 43.1877 ], [ 2.9934, 43.1877 ], [ 2.9939, 43.1878 ], [ 2.9942, 43.1878 ], [ 2.9942, 43.1878 ], [ 2.9943, 43.1877 ], [ 2.995, 43.1877 ], [ 2.9954, 43.1877 ], [ 2.9958, 43.1877 ], [ 2.9961, 43.1876 ], [ 2.9953, 43.1866 ], [ 2.995, 43.1867 ], [ 2.9945, 43.1869 ], [ 2.9946, 43.1871 ], [ 2.9944, 43.1872 ], [ 2.9944, 43.1872 ], [ 2.994, 43.1874 ], [ 2.9939, 43.1874 ], [ 2.9937, 43.1871 ], [ 2.9934, 43.1873 ], [ 2.9931, 43.1874 ], [ 2.9923, 43.1876 ], [ 2.9921, 43.1871 ], [ 2.9919, 43.1871 ], [ 2.992, 43.1871 ], [ 2.9916, 43.1873 ], [ 2.9916, 43.1874 ], [ 2.9915, 43.1874 ], [ 2.9909, 43.1877 ], [ 2.9908, 43.1873 ], [ 2.9907, 43.1871 ], [ 2.9906, 43.187 ], [ 2.9905, 43.187 ], [ 2.9895, 43.1871 ], [ 2.9888, 43.1872 ], [ 2.9877, 43.1872 ], [ 2.9871, 43.1873 ], [ 2.9866, 43.1873 ], [ 2.986, 43.1873 ], [ 2.9858, 43.1871 ], [ 2.9855, 43.187 ], [ 2.9853, 43.187 ], [ 2.9848, 43.187 ], [ 2.9848, 43.1866 ], [ 2.9849, 43.1865 ], [ 2.9848, 43.1859 ], [ 2.9843, 43.1859 ], [ 2.9843, 43.1856 ], [ 2.9843, 43.1855 ], [ 2.985, 43.1855 ], [ 2.9848, 43.1842 ], [ 2.9841, 43.1842 ], [ 2.9837, 43.1842 ] ] ], "type": "Polygon" }, "id": "59", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011007", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Ouest" }, "type": "Feature" }, { "bbox": [ 4.0105, 44.2164, 4.0202, 44.2295 ], "geometry": { "coordinates": [ [ [ 4.0202, 44.2165 ], [ 4.02, 44.2164 ], [ 4.0198, 44.2166 ], [ 4.0197, 44.2168 ], [ 4.0196, 44.2169 ], [ 4.0194, 44.2171 ], [ 4.0192, 44.2172 ], [ 4.0189, 44.2174 ], [ 4.0188, 44.2175 ], [ 4.0187, 44.2176 ], [ 4.0182, 44.2178 ], [ 4.0177, 44.2181 ], [ 4.0169, 44.2185 ], [ 4.0163, 44.2188 ], [ 4.016, 44.2191 ], [ 4.0151, 44.2198 ], [ 4.0147, 44.22 ], [ 4.0144, 44.2203 ], [ 4.0142, 44.2205 ], [ 4.014, 44.2206 ], [ 4.0139, 44.2207 ], [ 4.0139, 44.2208 ], [ 4.0139, 44.2208 ], [ 4.0137, 44.2208 ], [ 4.0136, 44.2208 ], [ 4.0134, 44.221 ], [ 4.0133, 44.2214 ], [ 4.0132, 44.2217 ], [ 4.0132, 44.2218 ], [ 4.0132, 44.2219 ], [ 4.0132, 44.222 ], [ 4.0137, 44.2222 ], [ 4.014, 44.2224 ], [ 4.0138, 44.2226 ], [ 4.0137, 44.2228 ], [ 4.0136, 44.223 ], [ 4.0135, 44.2232 ], [ 4.0134, 44.2234 ], [ 4.0134, 44.2236 ], [ 4.0133, 44.2236 ], [ 4.0132, 44.2239 ], [ 4.0132, 44.224 ], [ 4.0132, 44.2241 ], [ 4.0132, 44.2242 ], [ 4.0131, 44.2246 ], [ 4.0131, 44.2246 ], [ 4.0131, 44.2248 ], [ 4.013, 44.2252 ], [ 4.0129, 44.2255 ], [ 4.0128, 44.2256 ], [ 4.0128, 44.2258 ], [ 4.0127, 44.2259 ], [ 4.0126, 44.2261 ], [ 4.0125, 44.2263 ], [ 4.0124, 44.2265 ], [ 4.0123, 44.2266 ], [ 4.0121, 44.227 ], [ 4.0121, 44.227 ], [ 4.012, 44.227 ], [ 4.0118, 44.2274 ], [ 4.0117, 44.2276 ], [ 4.0116, 44.2277 ], [ 4.0114, 44.2279 ], [ 4.0112, 44.2281 ], [ 4.011, 44.2283 ], [ 4.0108, 44.2284 ], [ 4.0108, 44.2284 ], [ 4.0108, 44.2285 ], [ 4.0108, 44.2285 ], [ 4.0106, 44.2286 ], [ 4.0105, 44.2287 ], [ 4.0106, 44.2289 ], [ 4.0107, 44.2289 ], [ 4.0108, 44.2289 ], [ 4.0108, 44.2289 ], [ 4.011, 44.229 ], [ 4.011, 44.229 ], [ 4.0114, 44.2291 ], [ 4.0112, 44.2294 ], [ 4.0112, 44.2295 ], [ 4.0113, 44.2295 ], [ 4.0114, 44.2295 ], [ 4.0116, 44.2295 ], [ 4.0119, 44.2295 ], [ 4.0121, 44.2295 ], [ 4.0121, 44.2295 ], [ 4.0121, 44.2294 ], [ 4.0122, 44.2293 ], [ 4.0123, 44.2293 ], [ 4.0124, 44.2292 ], [ 4.0128, 44.2292 ], [ 4.0129, 44.229 ], [ 4.0128, 44.229 ], [ 4.0127, 44.229 ], [ 4.0127, 44.229 ], [ 4.0126, 44.229 ], [ 4.0125, 44.2289 ], [ 4.0126, 44.2289 ], [ 4.0125, 44.2289 ], [ 4.0127, 44.2287 ], [ 4.0127, 44.2287 ], [ 4.0127, 44.2287 ], [ 4.0124, 44.2285 ], [ 4.0122, 44.2285 ], [ 4.012, 44.2284 ], [ 4.0118, 44.2283 ], [ 4.0117, 44.2283 ], [ 4.0118, 44.2282 ], [ 4.0118, 44.2282 ], [ 4.0119, 44.2281 ], [ 4.012, 44.2281 ], [ 4.0119, 44.2281 ], [ 4.0119, 44.228 ], [ 4.012, 44.228 ], [ 4.0121, 44.228 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.228 ], [ 4.0125, 44.228 ], [ 4.0127, 44.2279 ], [ 4.013, 44.2277 ], [ 4.0131, 44.2277 ], [ 4.0131, 44.2276 ], [ 4.0131, 44.2275 ], [ 4.0131, 44.2274 ], [ 4.0131, 44.2273 ], [ 4.0131, 44.2272 ], [ 4.0131, 44.2272 ], [ 4.0136, 44.2272 ], [ 4.0141, 44.2272 ], [ 4.0141, 44.2272 ], [ 4.0142, 44.2272 ], [ 4.0144, 44.2272 ], [ 4.0144, 44.2273 ], [ 4.0144, 44.2274 ], [ 4.0146, 44.2275 ], [ 4.0147, 44.2275 ], [ 4.0147, 44.2275 ], [ 4.0148, 44.2275 ], [ 4.0149, 44.2276 ], [ 4.015, 44.2276 ], [ 4.015, 44.2276 ], [ 4.0151, 44.2277 ], [ 4.0151, 44.2277 ], [ 4.0151, 44.2278 ], [ 4.0152, 44.2278 ], [ 4.0153, 44.2278 ], [ 4.0153, 44.2279 ], [ 4.0154, 44.2279 ], [ 4.0155, 44.228 ], [ 4.0156, 44.2279 ], [ 4.0157, 44.2279 ], [ 4.0157, 44.2279 ], [ 4.0156, 44.2276 ], [ 4.0155, 44.2275 ], [ 4.0155, 44.2274 ], [ 4.0155, 44.2273 ], [ 4.0155, 44.2272 ], [ 4.0155, 44.2271 ], [ 4.0155, 44.2271 ], [ 4.0156, 44.227 ], [ 4.0156, 44.2269 ], [ 4.0157, 44.2268 ], [ 4.0161, 44.2265 ], [ 4.0157, 44.2258 ], [ 4.0152, 44.225 ], [ 4.0152, 44.2245 ], [ 4.0152, 44.2245 ], [ 4.0151, 44.2244 ], [ 4.0151, 44.2243 ], [ 4.015, 44.2242 ], [ 4.015, 44.2242 ], [ 4.0149, 44.224 ], [ 4.0149, 44.2239 ], [ 4.0151, 44.2238 ], [ 4.0154, 44.2236 ], [ 4.0156, 44.2235 ], [ 4.016, 44.2233 ], [ 4.0162, 44.2232 ], [ 4.0163, 44.2232 ], [ 4.0164, 44.2232 ], [ 4.0164, 44.2232 ], [ 4.0166, 44.2235 ], [ 4.0169, 44.224 ], [ 4.0171, 44.2239 ], [ 4.0173, 44.2239 ], [ 4.0174, 44.2238 ], [ 4.018, 44.2237 ], [ 4.018, 44.2237 ], [ 4.018, 44.2238 ], [ 4.0181, 44.224 ], [ 4.0185, 44.2239 ], [ 4.0188, 44.2237 ], [ 4.0187, 44.2236 ], [ 4.0188, 44.2234 ], [ 4.0187, 44.2233 ], [ 4.0187, 44.2231 ], [ 4.0186, 44.2229 ], [ 4.0187, 44.2229 ], [ 4.0185, 44.2228 ], [ 4.0184, 44.2228 ], [ 4.0183, 44.2228 ], [ 4.0182, 44.2227 ], [ 4.0182, 44.2225 ], [ 4.0183, 44.2224 ], [ 4.0186, 44.2223 ], [ 4.0186, 44.2223 ], [ 4.0188, 44.2222 ], [ 4.0188, 44.2222 ], [ 4.019, 44.2221 ], [ 4.0191, 44.2219 ], [ 4.0192, 44.2218 ], [ 4.0194, 44.2218 ], [ 4.0195, 44.2218 ], [ 4.0195, 44.2217 ], [ 4.0192, 44.2216 ], [ 4.0192, 44.2216 ], [ 4.019, 44.2215 ], [ 4.0191, 44.2214 ], [ 4.0189, 44.2213 ], [ 4.0189, 44.2212 ], [ 4.0189, 44.221 ], [ 4.019, 44.221 ], [ 4.019, 44.2209 ], [ 4.019, 44.2208 ], [ 4.019, 44.2208 ], [ 4.0191, 44.2207 ], [ 4.0191, 44.2207 ], [ 4.0191, 44.2206 ], [ 4.0192, 44.2205 ], [ 4.0193, 44.2205 ], [ 4.0196, 44.2202 ], [ 4.0197, 44.2201 ], [ 4.0197, 44.2199 ], [ 4.0202, 44.2196 ], [ 4.02, 44.2195 ], [ 4.0198, 44.2195 ], [ 4.0194, 44.2193 ], [ 4.0194, 44.2192 ], [ 4.0194, 44.2191 ], [ 4.0193, 44.219 ], [ 4.0196, 44.2187 ], [ 4.0197, 44.2186 ], [ 4.0196, 44.2185 ], [ 4.0196, 44.2185 ], [ 4.0196, 44.2184 ], [ 4.0196, 44.2183 ], [ 4.0196, 44.2181 ], [ 4.019, 44.218 ], [ 4.0193, 44.2176 ], [ 4.0193, 44.2175 ], [ 4.0195, 44.2173 ], [ 4.0196, 44.2171 ], [ 4.0199, 44.2167 ], [ 4.0202, 44.2165 ] ] ], "type": "Polygon" }, "id": "60", "properties": { "code_commune": "30132", "code_departement": "30", "code_qp": "QP030017", "commune_qp": "La Grand-Combe", "nom_commune": "La Grand-Combe", "nom_qp": "Trescol - La Levade" }, "type": "Feature" }, { "bbox": [ 3.8707, 43.5912, 3.874, 43.594 ], "geometry": { "coordinates": [ [ [ 3.8721, 43.594 ], [ 3.8726, 43.5937 ], [ 3.8729, 43.5936 ], [ 3.8733, 43.5934 ], [ 3.8734, 43.5933 ], [ 3.8737, 43.5932 ], [ 3.8738, 43.5931 ], [ 3.874, 43.593 ], [ 3.8732, 43.5921 ], [ 3.873, 43.5921 ], [ 3.8729, 43.5921 ], [ 3.8727, 43.5922 ], [ 3.8725, 43.5923 ], [ 3.8723, 43.5921 ], [ 3.8728, 43.5919 ], [ 3.8733, 43.5917 ], [ 3.8727, 43.5912 ], [ 3.8719, 43.5916 ], [ 3.8715, 43.5913 ], [ 3.8707, 43.5917 ], [ 3.8713, 43.5923 ], [ 3.8716, 43.5927 ], [ 3.8712, 43.5929 ], [ 3.8717, 43.5935 ], [ 3.8717, 43.5936 ], [ 3.8721, 43.594 ] ] ], "type": "Polygon" }, "id": "61", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034011", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Lemasson" }, "type": "Feature" }, { "bbox": [ 3.8982, 43.6178, 3.9038, 43.6215 ], "geometry": { "coordinates": [ [ [ 3.9006, 43.6185 ], [ 3.9002, 43.6184 ], [ 3.8991, 43.6183 ], [ 3.8988, 43.6183 ], [ 3.8986, 43.6183 ], [ 3.8982, 43.6184 ], [ 3.8983, 43.6185 ], [ 3.8986, 43.6188 ], [ 3.8988, 43.6189 ], [ 3.899, 43.619 ], [ 3.8994, 43.6192 ], [ 3.8996, 43.6193 ], [ 3.8997, 43.6193 ], [ 3.8999, 43.6194 ], [ 3.9002, 43.6194 ], [ 3.9005, 43.6194 ], [ 3.9007, 43.6195 ], [ 3.9008, 43.6196 ], [ 3.901, 43.6197 ], [ 3.901, 43.6198 ], [ 3.9011, 43.6199 ], [ 3.9011, 43.62 ], [ 3.9015, 43.6203 ], [ 3.9016, 43.6204 ], [ 3.9017, 43.6205 ], [ 3.9017, 43.6206 ], [ 3.9016, 43.621 ], [ 3.9016, 43.621 ], [ 3.9017, 43.6212 ], [ 3.9018, 43.6213 ], [ 3.9019, 43.6213 ], [ 3.9021, 43.6214 ], [ 3.9026, 43.6214 ], [ 3.9029, 43.6214 ], [ 3.9031, 43.6215 ], [ 3.9033, 43.6215 ], [ 3.9034, 43.6215 ], [ 3.9036, 43.6214 ], [ 3.9036, 43.6213 ], [ 3.9037, 43.6213 ], [ 3.9037, 43.6212 ], [ 3.9038, 43.6209 ], [ 3.9038, 43.6208 ], [ 3.9037, 43.6208 ], [ 3.9036, 43.6207 ], [ 3.9034, 43.6206 ], [ 3.9033, 43.6205 ], [ 3.9033, 43.6204 ], [ 3.9034, 43.6201 ], [ 3.9034, 43.62 ], [ 3.9037, 43.6198 ], [ 3.9038, 43.6197 ], [ 3.9033, 43.6195 ], [ 3.9032, 43.6195 ], [ 3.9033, 43.6191 ], [ 3.903, 43.6191 ], [ 3.9027, 43.6191 ], [ 3.9023, 43.6191 ], [ 3.9019, 43.6192 ], [ 3.9015, 43.6193 ], [ 3.9009, 43.6194 ], [ 3.9011, 43.6189 ], [ 3.9012, 43.6185 ], [ 3.9014, 43.618 ], [ 3.9014, 43.6179 ], [ 3.9012, 43.6178 ], [ 3.9011, 43.6178 ], [ 3.9009, 43.6178 ], [ 3.9008, 43.6178 ], [ 3.9007, 43.6178 ], [ 3.9007, 43.6179 ], [ 3.9006, 43.6185 ] ] ], "type": "Polygon" }, "id": "62", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034013", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Pompignane" }, "type": "Feature" }, { "bbox": [ 1.1403, 42.9816, 1.1485, 42.9867 ], "geometry": { "coordinates": [ [ [ 1.1438, 42.9863 ], [ 1.1441, 42.9864 ], [ 1.1443, 42.9865 ], [ 1.1445, 42.9866 ], [ 1.1447, 42.9867 ], [ 1.145, 42.9864 ], [ 1.145, 42.9863 ], [ 1.145, 42.9863 ], [ 1.1452, 42.9862 ], [ 1.1453, 42.9863 ], [ 1.1454, 42.9863 ], [ 1.1455, 42.9863 ], [ 1.1454, 42.9862 ], [ 1.1455, 42.9862 ], [ 1.1456, 42.9862 ], [ 1.1456, 42.9862 ], [ 1.1455, 42.9862 ], [ 1.1455, 42.9861 ], [ 1.1455, 42.9861 ], [ 1.1456, 42.9861 ], [ 1.1456, 42.986 ], [ 1.1455, 42.986 ], [ 1.1455, 42.9859 ], [ 1.146, 42.9858 ], [ 1.1465, 42.9857 ], [ 1.1467, 42.9856 ], [ 1.1468, 42.9856 ], [ 1.147, 42.9855 ], [ 1.1472, 42.9853 ], [ 1.1473, 42.9851 ], [ 1.1475, 42.9847 ], [ 1.1485, 42.9829 ], [ 1.1481, 42.9828 ], [ 1.1478, 42.9827 ], [ 1.1474, 42.9828 ], [ 1.1472, 42.9828 ], [ 1.147, 42.9827 ], [ 1.146, 42.9823 ], [ 1.1449, 42.9834 ], [ 1.1448, 42.9835 ], [ 1.1447, 42.9834 ], [ 1.1446, 42.9835 ], [ 1.1445, 42.9836 ], [ 1.1442, 42.9839 ], [ 1.1441, 42.9841 ], [ 1.144, 42.9842 ], [ 1.1435, 42.9844 ], [ 1.1432, 42.9846 ], [ 1.1433, 42.9848 ], [ 1.1427, 42.9857 ], [ 1.1421, 42.9855 ], [ 1.1422, 42.9853 ], [ 1.1429, 42.9842 ], [ 1.1432, 42.984 ], [ 1.1437, 42.9836 ], [ 1.1442, 42.9831 ], [ 1.1442, 42.9832 ], [ 1.1443, 42.9831 ], [ 1.1443, 42.9831 ], [ 1.1443, 42.983 ], [ 1.1442, 42.983 ], [ 1.1444, 42.9829 ], [ 1.1445, 42.9828 ], [ 1.1446, 42.9827 ], [ 1.1449, 42.9825 ], [ 1.1452, 42.9823 ], [ 1.1455, 42.9819 ], [ 1.1454, 42.9819 ], [ 1.1451, 42.9818 ], [ 1.1451, 42.9817 ], [ 1.1449, 42.9816 ], [ 1.1448, 42.9817 ], [ 1.1446, 42.9816 ], [ 1.1446, 42.9817 ], [ 1.1443, 42.9816 ], [ 1.1441, 42.9817 ], [ 1.1443, 42.9818 ], [ 1.1442, 42.9818 ], [ 1.1441, 42.9819 ], [ 1.144, 42.982 ], [ 1.1439, 42.982 ], [ 1.1438, 42.9821 ], [ 1.1439, 42.9821 ], [ 1.1436, 42.9825 ], [ 1.1435, 42.9824 ], [ 1.1434, 42.9824 ], [ 1.1433, 42.9825 ], [ 1.1432, 42.983 ], [ 1.1432, 42.9832 ], [ 1.1431, 42.9833 ], [ 1.1427, 42.9838 ], [ 1.1425, 42.984 ], [ 1.1413, 42.9852 ], [ 1.1412, 42.9851 ], [ 1.1406, 42.9849 ], [ 1.1403, 42.9854 ], [ 1.1412, 42.9858 ], [ 1.1413, 42.9859 ], [ 1.1415, 42.986 ], [ 1.1414, 42.9862 ], [ 1.1416, 42.9862 ], [ 1.142, 42.9857 ], [ 1.1426, 42.9859 ], [ 1.1438, 42.9863 ] ] ], "type": "Polygon" }, "id": "63", "properties": { "code_commune": "09261", "code_departement": "09", "code_qp": "QP009001", "commune_qp": "Saint-Girons", "nom_commune": "Saint-Girons", "nom_qp": "Coeur De Ville" }, "type": "Feature" }, { "bbox": [ 2.9697, 42.5983, 2.9755, 42.6013 ], "geometry": { "coordinates": [ [ [ 2.9716, 42.6011 ], [ 2.9718, 42.601 ], [ 2.972, 42.601 ], [ 2.9723, 42.601 ], [ 2.9725, 42.6009 ], [ 2.9727, 42.6009 ], [ 2.9733, 42.601 ], [ 2.9737, 42.6011 ], [ 2.9743, 42.6012 ], [ 2.9744, 42.6012 ], [ 2.9745, 42.6012 ], [ 2.9746, 42.6011 ], [ 2.975, 42.601 ], [ 2.975, 42.6009 ], [ 2.9751, 42.6008 ], [ 2.9751, 42.6006 ], [ 2.9751, 42.6006 ], [ 2.9755, 42.5995 ], [ 2.9755, 42.5993 ], [ 2.9755, 42.5992 ], [ 2.9753, 42.599 ], [ 2.9751, 42.5989 ], [ 2.9749, 42.5988 ], [ 2.9735, 42.5985 ], [ 2.9735, 42.5984 ], [ 2.9734, 42.5983 ], [ 2.9732, 42.5985 ], [ 2.9732, 42.5985 ], [ 2.9731, 42.5985 ], [ 2.9732, 42.5985 ], [ 2.9731, 42.5986 ], [ 2.973, 42.5987 ], [ 2.9728, 42.5987 ], [ 2.9728, 42.5987 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5987 ], [ 2.9726, 42.5986 ], [ 2.9724, 42.5986 ], [ 2.9722, 42.5987 ], [ 2.9722, 42.5987 ], [ 2.9722, 42.5988 ], [ 2.9723, 42.5989 ], [ 2.9724, 42.599 ], [ 2.9725, 42.5991 ], [ 2.9725, 42.5992 ], [ 2.9725, 42.5993 ], [ 2.9724, 42.5993 ], [ 2.9723, 42.5994 ], [ 2.9721, 42.5995 ], [ 2.9721, 42.5995 ], [ 2.972, 42.5995 ], [ 2.9719, 42.5994 ], [ 2.9718, 42.5994 ], [ 2.9716, 42.5994 ], [ 2.9716, 42.5995 ], [ 2.9715, 42.5996 ], [ 2.9715, 42.5996 ], [ 2.9714, 42.5996 ], [ 2.9711, 42.5995 ], [ 2.9711, 42.5995 ], [ 2.971, 42.5995 ], [ 2.9709, 42.5994 ], [ 2.9709, 42.5993 ], [ 2.9706, 42.5993 ], [ 2.9701, 42.5993 ], [ 2.9699, 42.5994 ], [ 2.9698, 42.5993 ], [ 2.9697, 42.5993 ], [ 2.9697, 42.5994 ], [ 2.9698, 42.5996 ], [ 2.9698, 42.5997 ], [ 2.9699, 42.5998 ], [ 2.97, 42.6 ], [ 2.97, 42.6001 ], [ 2.9701, 42.6003 ], [ 2.9702, 42.6004 ], [ 2.9702, 42.6005 ], [ 2.9703, 42.6006 ], [ 2.9704, 42.6006 ], [ 2.9704, 42.6006 ], [ 2.9703, 42.6009 ], [ 2.9703, 42.601 ], [ 2.9705, 42.601 ], [ 2.9709, 42.6011 ], [ 2.971, 42.6011 ], [ 2.971, 42.6012 ], [ 2.971, 42.6013 ], [ 2.9711, 42.6013 ], [ 2.9712, 42.6012 ], [ 2.9716, 42.6011 ] ] ], "type": "Polygon" }, "id": "64", "properties": { "code_commune": "66065", "code_departement": "66", "code_qp": "QP066001", "commune_qp": "Elne", "nom_commune": "Elne", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 2.8899, 42.6937, 2.9034, 42.7007 ], "geometry": { "coordinates": [ [ [ 2.9033, 42.6991 ], [ 2.9034, 42.6991 ], [ 2.9033, 42.699 ], [ 2.903, 42.6988 ], [ 2.9026, 42.6991 ], [ 2.9026, 42.6991 ], [ 2.9025, 42.699 ], [ 2.9023, 42.699 ], [ 2.9022, 42.6989 ], [ 2.9023, 42.6989 ], [ 2.9022, 42.6988 ], [ 2.9018, 42.6985 ], [ 2.902, 42.6984 ], [ 2.9021, 42.6983 ], [ 2.9023, 42.6982 ], [ 2.9021, 42.698 ], [ 2.9023, 42.6979 ], [ 2.9024, 42.6979 ], [ 2.9026, 42.6978 ], [ 2.9025, 42.6977 ], [ 2.9024, 42.6976 ], [ 2.9024, 42.6975 ], [ 2.9024, 42.6975 ], [ 2.9023, 42.6974 ], [ 2.9022, 42.6973 ], [ 2.9022, 42.6973 ], [ 2.9021, 42.6972 ], [ 2.9021, 42.6972 ], [ 2.902, 42.6971 ], [ 2.902, 42.697 ], [ 2.9019, 42.6969 ], [ 2.9018, 42.6966 ], [ 2.9018, 42.6965 ], [ 2.9017, 42.6964 ], [ 2.9017, 42.6962 ], [ 2.9017, 42.696 ], [ 2.9017, 42.6959 ], [ 2.9017, 42.6959 ], [ 2.9014, 42.6957 ], [ 2.9011, 42.6956 ], [ 2.901, 42.6955 ], [ 2.9006, 42.6952 ], [ 2.9002, 42.6955 ], [ 2.8995, 42.6961 ], [ 2.8992, 42.6962 ], [ 2.8989, 42.6964 ], [ 2.8988, 42.6963 ], [ 2.8988, 42.6961 ], [ 2.8988, 42.6961 ], [ 2.8983, 42.6961 ], [ 2.8982, 42.696 ], [ 2.8976, 42.6957 ], [ 2.8973, 42.6955 ], [ 2.8972, 42.6955 ], [ 2.8972, 42.6955 ], [ 2.8971, 42.6956 ], [ 2.8971, 42.6956 ], [ 2.8966, 42.6952 ], [ 2.8964, 42.6952 ], [ 2.8963, 42.6952 ], [ 2.896, 42.6953 ], [ 2.8956, 42.6951 ], [ 2.8954, 42.695 ], [ 2.8954, 42.6949 ], [ 2.8953, 42.6949 ], [ 2.895, 42.6948 ], [ 2.8947, 42.6948 ], [ 2.8946, 42.6948 ], [ 2.8936, 42.6948 ], [ 2.8929, 42.6947 ], [ 2.8928, 42.6951 ], [ 2.8927, 42.6951 ], [ 2.8926, 42.695 ], [ 2.8925, 42.6949 ], [ 2.8924, 42.6948 ], [ 2.8923, 42.6946 ], [ 2.8922, 42.6945 ], [ 2.8921, 42.6944 ], [ 2.8921, 42.6943 ], [ 2.892, 42.6942 ], [ 2.8916, 42.6939 ], [ 2.8915, 42.6939 ], [ 2.8913, 42.6937 ], [ 2.8903, 42.6944 ], [ 2.8906, 42.6946 ], [ 2.8908, 42.6947 ], [ 2.8906, 42.6949 ], [ 2.8904, 42.6951 ], [ 2.8901, 42.6952 ], [ 2.8899, 42.6954 ], [ 2.89, 42.6955 ], [ 2.8901, 42.6956 ], [ 2.8903, 42.6957 ], [ 2.8904, 42.6958 ], [ 2.8908, 42.696 ], [ 2.8913, 42.6964 ], [ 2.8911, 42.6966 ], [ 2.8913, 42.6968 ], [ 2.8917, 42.6971 ], [ 2.892, 42.6973 ], [ 2.8922, 42.6975 ], [ 2.8923, 42.6976 ], [ 2.8922, 42.6977 ], [ 2.892, 42.698 ], [ 2.8922, 42.6981 ], [ 2.8923, 42.6981 ], [ 2.8923, 42.6982 ], [ 2.8925, 42.6984 ], [ 2.8925, 42.6986 ], [ 2.8925, 42.6986 ], [ 2.8925, 42.6987 ], [ 2.8923, 42.6987 ], [ 2.8924, 42.6989 ], [ 2.8925, 42.6991 ], [ 2.8929, 42.6995 ], [ 2.8931, 42.6997 ], [ 2.8933, 42.7 ], [ 2.8935, 42.7002 ], [ 2.8936, 42.7003 ], [ 2.8937, 42.7003 ], [ 2.8938, 42.7001 ], [ 2.8941, 42.7003 ], [ 2.8941, 42.7003 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8943, 42.7004 ], [ 2.8945, 42.7004 ], [ 2.8948, 42.7005 ], [ 2.895, 42.7006 ], [ 2.8951, 42.7005 ], [ 2.8953, 42.7003 ], [ 2.8953, 42.7003 ], [ 2.8954, 42.7004 ], [ 2.8954, 42.7003 ], [ 2.8957, 42.7 ], [ 2.8958, 42.7 ], [ 2.8959, 42.6999 ], [ 2.8959, 42.6999 ], [ 2.896, 42.6998 ], [ 2.8961, 42.6997 ], [ 2.8963, 42.6996 ], [ 2.8963, 42.6996 ], [ 2.8964, 42.6995 ], [ 2.8965, 42.6995 ], [ 2.8965, 42.6995 ], [ 2.8966, 42.6994 ], [ 2.8966, 42.6994 ], [ 2.8967, 42.6995 ], [ 2.8967, 42.6995 ], [ 2.8969, 42.6995 ], [ 2.8969, 42.6995 ], [ 2.897, 42.6995 ], [ 2.8972, 42.6996 ], [ 2.8973, 42.6996 ], [ 2.8974, 42.6996 ], [ 2.8974, 42.6996 ], [ 2.8975, 42.6996 ], [ 2.8977, 42.6997 ], [ 2.8978, 42.6997 ], [ 2.8979, 42.6997 ], [ 2.8981, 42.6997 ], [ 2.8982, 42.6997 ], [ 2.8983, 42.6995 ], [ 2.8986, 42.6996 ], [ 2.8988, 42.6996 ], [ 2.8997, 42.6992 ], [ 2.8999, 42.6994 ], [ 2.9004, 42.6999 ], [ 2.9006, 42.7002 ], [ 2.9005, 42.7003 ], [ 2.9007, 42.7004 ], [ 2.9008, 42.7005 ], [ 2.9011, 42.7007 ], [ 2.9018, 42.7001 ], [ 2.9025, 42.6995 ], [ 2.9028, 42.6997 ], [ 2.9033, 42.6992 ], [ 2.9032, 42.6992 ], [ 2.9033, 42.6991 ] ] ], "type": "Polygon" }, "id": "65", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066008", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Centre Ancien" }, "type": "Feature" }, { "bbox": [ 1.4331, 43.6327, 1.4456, 43.6435 ], "geometry": { "coordinates": [ [ [ 1.4331, 43.6346 ], [ 1.4331, 43.635 ], [ 1.4331, 43.6353 ], [ 1.4333, 43.636 ], [ 1.4349, 43.6358 ], [ 1.435, 43.6359 ], [ 1.4366, 43.6357 ], [ 1.4368, 43.6362 ], [ 1.4376, 43.6361 ], [ 1.4373, 43.6364 ], [ 1.4382, 43.6367 ], [ 1.439, 43.6366 ], [ 1.4391, 43.6369 ], [ 1.4391, 43.6375 ], [ 1.4392, 43.6382 ], [ 1.4399, 43.6382 ], [ 1.4418, 43.6384 ], [ 1.4418, 43.6385 ], [ 1.4419, 43.6388 ], [ 1.4419, 43.6389 ], [ 1.4418, 43.6393 ], [ 1.4417, 43.64 ], [ 1.4416, 43.6404 ], [ 1.4392, 43.6403 ], [ 1.4391, 43.6418 ], [ 1.4391, 43.6429 ], [ 1.4406, 43.6431 ], [ 1.4413, 43.6432 ], [ 1.4419, 43.6432 ], [ 1.4422, 43.6435 ], [ 1.4434, 43.6431 ], [ 1.4445, 43.6429 ], [ 1.4444, 43.6423 ], [ 1.4444, 43.6409 ], [ 1.4444, 43.6401 ], [ 1.4451, 43.6401 ], [ 1.4451, 43.6395 ], [ 1.4453, 43.6395 ], [ 1.4452, 43.639 ], [ 1.4454, 43.6389 ], [ 1.4453, 43.6379 ], [ 1.4456, 43.6379 ], [ 1.4455, 43.6376 ], [ 1.4454, 43.6373 ], [ 1.4448, 43.6374 ], [ 1.4447, 43.6372 ], [ 1.4447, 43.6369 ], [ 1.4447, 43.6364 ], [ 1.4446, 43.636 ], [ 1.4442, 43.6361 ], [ 1.4441, 43.6356 ], [ 1.4439, 43.6356 ], [ 1.4439, 43.6354 ], [ 1.4434, 43.6356 ], [ 1.4426, 43.635 ], [ 1.4419, 43.6344 ], [ 1.4417, 43.6341 ], [ 1.4413, 43.6332 ], [ 1.4411, 43.6328 ], [ 1.441, 43.6327 ], [ 1.44, 43.6346 ], [ 1.4392, 43.6344 ], [ 1.4391, 43.6346 ], [ 1.4389, 43.6346 ], [ 1.4383, 43.6348 ], [ 1.4379, 43.6348 ], [ 1.4378, 43.6346 ], [ 1.4377, 43.6345 ], [ 1.4368, 43.6345 ], [ 1.4368, 43.6345 ], [ 1.4369, 43.6346 ], [ 1.4369, 43.6347 ], [ 1.4367, 43.6347 ], [ 1.4365, 43.6347 ], [ 1.4364, 43.6348 ], [ 1.4364, 43.6349 ], [ 1.4363, 43.6349 ], [ 1.436, 43.635 ], [ 1.4356, 43.635 ], [ 1.4356, 43.6346 ], [ 1.4356, 43.6343 ], [ 1.4342, 43.6344 ], [ 1.4342, 43.6346 ], [ 1.4341, 43.6346 ], [ 1.4335, 43.6346 ], [ 1.4331, 43.6346 ] ] ], "type": "Polygon" }, "id": "66", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031011", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Les Izards - La Vache" }, "type": "Feature" }, { "bbox": [ 0.0491, 43.2277, 0.0564, 43.2315 ], "geometry": { "coordinates": [ [ [ 0.0497, 43.2288 ], [ 0.05, 43.229 ], [ 0.0503, 43.2292 ], [ 0.0507, 43.2293 ], [ 0.0513, 43.2294 ], [ 0.0518, 43.2293 ], [ 0.0523, 43.2293 ], [ 0.0528, 43.2293 ], [ 0.0535, 43.2293 ], [ 0.0543, 43.2294 ], [ 0.0546, 43.2295 ], [ 0.0546, 43.2296 ], [ 0.0546, 43.23 ], [ 0.054, 43.23 ], [ 0.054, 43.2301 ], [ 0.054, 43.2302 ], [ 0.0539, 43.2315 ], [ 0.0546, 43.2315 ], [ 0.0546, 43.2313 ], [ 0.0547, 43.2311 ], [ 0.0548, 43.2309 ], [ 0.0549, 43.231 ], [ 0.0556, 43.231 ], [ 0.0558, 43.231 ], [ 0.0558, 43.2309 ], [ 0.0564, 43.2309 ], [ 0.0564, 43.2303 ], [ 0.0564, 43.2296 ], [ 0.0559, 43.2296 ], [ 0.0557, 43.2296 ], [ 0.0555, 43.2295 ], [ 0.0556, 43.2293 ], [ 0.0548, 43.2293 ], [ 0.0547, 43.2293 ], [ 0.0543, 43.2293 ], [ 0.0543, 43.228 ], [ 0.0539, 43.2281 ], [ 0.0534, 43.2281 ], [ 0.0534, 43.2277 ], [ 0.052, 43.2278 ], [ 0.0504, 43.2278 ], [ 0.0497, 43.2278 ], [ 0.0497, 43.2279 ], [ 0.0496, 43.2279 ], [ 0.0493, 43.2279 ], [ 0.0493, 43.228 ], [ 0.0493, 43.228 ], [ 0.0492, 43.2281 ], [ 0.0492, 43.2281 ], [ 0.0491, 43.2281 ], [ 0.0491, 43.2282 ], [ 0.0495, 43.2285 ], [ 0.0497, 43.2288 ], [ 0.0497, 43.2288 ] ] ], "type": "Polygon" }, "id": "67", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065001", "commune_qp": "Tarbes", "nom_commune": "Tarbes", "nom_qp": "Tarbes Ouest" }, "type": "Feature" }, { "bbox": [ 3.8367, 43.5925, 3.8495, 43.6013 ], "geometry": { "coordinates": [ [ [ 3.8479, 43.5999 ], [ 3.8475, 43.5997 ], [ 3.8472, 43.5994 ], [ 3.8466, 43.5987 ], [ 3.8464, 43.5985 ], [ 3.8469, 43.5984 ], [ 3.8467, 43.5979 ], [ 3.8464, 43.5974 ], [ 3.8459, 43.5977 ], [ 3.8455, 43.5972 ], [ 3.8457, 43.5971 ], [ 3.846, 43.597 ], [ 3.8458, 43.5968 ], [ 3.8463, 43.5965 ], [ 3.846, 43.5962 ], [ 3.845, 43.5966 ], [ 3.8436, 43.5972 ], [ 3.8428, 43.5976 ], [ 3.8418, 43.5966 ], [ 3.8422, 43.5965 ], [ 3.8421, 43.5964 ], [ 3.8418, 43.5961 ], [ 3.8415, 43.5959 ], [ 3.8413, 43.5956 ], [ 3.841, 43.5956 ], [ 3.8409, 43.5955 ], [ 3.8407, 43.5954 ], [ 3.8404, 43.5952 ], [ 3.8401, 43.595 ], [ 3.8398, 43.5947 ], [ 3.8401, 43.5944 ], [ 3.8404, 43.5946 ], [ 3.8405, 43.5945 ], [ 3.8408, 43.5946 ], [ 3.841, 43.5944 ], [ 3.8412, 43.5942 ], [ 3.8414, 43.5943 ], [ 3.8414, 43.5943 ], [ 3.8415, 43.5943 ], [ 3.8416, 43.5943 ], [ 3.8418, 43.5943 ], [ 3.8424, 43.5946 ], [ 3.8425, 43.5946 ], [ 3.8425, 43.5946 ], [ 3.8426, 43.5946 ], [ 3.8431, 43.5935 ], [ 3.8431, 43.5934 ], [ 3.843, 43.5934 ], [ 3.8425, 43.5935 ], [ 3.8422, 43.5929 ], [ 3.8417, 43.5926 ], [ 3.8416, 43.5925 ], [ 3.8415, 43.5925 ], [ 3.8407, 43.5932 ], [ 3.8406, 43.5932 ], [ 3.8405, 43.5933 ], [ 3.8399, 43.5931 ], [ 3.8396, 43.593 ], [ 3.8388, 43.5942 ], [ 3.8386, 43.5942 ], [ 3.8385, 43.5943 ], [ 3.8388, 43.5946 ], [ 3.8385, 43.5948 ], [ 3.8382, 43.5946 ], [ 3.8378, 43.5948 ], [ 3.8376, 43.5947 ], [ 3.8374, 43.5949 ], [ 3.8372, 43.595 ], [ 3.8369, 43.5949 ], [ 3.8367, 43.5952 ], [ 3.8369, 43.5953 ], [ 3.837, 43.5955 ], [ 3.8369, 43.5956 ], [ 3.8368, 43.5957 ], [ 3.8368, 43.5958 ], [ 3.8368, 43.5959 ], [ 3.8368, 43.5961 ], [ 3.8369, 43.5961 ], [ 3.8372, 43.5963 ], [ 3.8375, 43.5965 ], [ 3.8378, 43.5966 ], [ 3.8385, 43.5968 ], [ 3.839, 43.5963 ], [ 3.8388, 43.5961 ], [ 3.8391, 43.5958 ], [ 3.8393, 43.5956 ], [ 3.8394, 43.5956 ], [ 3.8395, 43.5957 ], [ 3.8396, 43.5957 ], [ 3.8399, 43.5961 ], [ 3.84, 43.5962 ], [ 3.8401, 43.5964 ], [ 3.8405, 43.5966 ], [ 3.8412, 43.5969 ], [ 3.8415, 43.5971 ], [ 3.8418, 43.5984 ], [ 3.8431, 43.5996 ], [ 3.8454, 43.6008 ], [ 3.8461, 43.6011 ], [ 3.8466, 43.6012 ], [ 3.8484, 43.6013 ], [ 3.8494, 43.601 ], [ 3.8495, 43.6008 ], [ 3.8484, 43.6003 ], [ 3.8479, 43.5999 ] ] ], "type": "Polygon" }, "id": "68", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034007", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Pas Du Loup - Val De Croze" }, "type": "Feature" }, { "bbox": [ 2.5906, 44.3632, 2.6018, 44.3674 ], "geometry": { "coordinates": [ [ [ 2.5926, 44.3671 ], [ 2.5927, 44.3672 ], [ 2.5929, 44.3674 ], [ 2.5933, 44.3672 ], [ 2.594, 44.367 ], [ 2.5947, 44.3668 ], [ 2.5949, 44.3667 ], [ 2.5954, 44.3666 ], [ 2.5956, 44.3665 ], [ 2.5965, 44.3661 ], [ 2.5972, 44.3656 ], [ 2.5977, 44.3652 ], [ 2.598, 44.365 ], [ 2.5988, 44.3655 ], [ 2.5996, 44.3653 ], [ 2.5998, 44.3653 ], [ 2.6001, 44.3652 ], [ 2.6005, 44.3647 ], [ 2.6006, 44.3646 ], [ 2.6006, 44.3646 ], [ 2.6009, 44.3646 ], [ 2.6013, 44.3645 ], [ 2.6014, 44.3645 ], [ 2.6016, 44.3645 ], [ 2.6017, 44.3644 ], [ 2.6018, 44.3643 ], [ 2.6016, 44.3643 ], [ 2.6015, 44.3642 ], [ 2.6013, 44.3641 ], [ 2.6011, 44.3641 ], [ 2.6016, 44.3638 ], [ 2.6018, 44.3634 ], [ 2.6015, 44.3632 ], [ 2.6011, 44.3634 ], [ 2.6009, 44.3635 ], [ 2.6003, 44.3639 ], [ 2.5994, 44.3637 ], [ 2.5991, 44.3636 ], [ 2.5974, 44.3635 ], [ 2.597, 44.3636 ], [ 2.5969, 44.3637 ], [ 2.5967, 44.3638 ], [ 2.5963, 44.3641 ], [ 2.5959, 44.3642 ], [ 2.5955, 44.3643 ], [ 2.5947, 44.3645 ], [ 2.5945, 44.3645 ], [ 2.5942, 44.3645 ], [ 2.5941, 44.3643 ], [ 2.594, 44.3641 ], [ 2.5927, 44.3642 ], [ 2.5924, 44.3642 ], [ 2.5922, 44.3642 ], [ 2.592, 44.3642 ], [ 2.5919, 44.3643 ], [ 2.5918, 44.3644 ], [ 2.5919, 44.3647 ], [ 2.5921, 44.3646 ], [ 2.5921, 44.3648 ], [ 2.5921, 44.3649 ], [ 2.5921, 44.3651 ], [ 2.592, 44.3651 ], [ 2.5919, 44.3652 ], [ 2.5919, 44.3652 ], [ 2.5919, 44.3653 ], [ 2.5919, 44.3653 ], [ 2.5919, 44.3654 ], [ 2.592, 44.3654 ], [ 2.592, 44.3655 ], [ 2.5918, 44.3656 ], [ 2.5918, 44.3657 ], [ 2.5911, 44.3657 ], [ 2.5912, 44.3658 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.366 ], [ 2.5906, 44.3661 ], [ 2.5907, 44.3663 ], [ 2.5908, 44.3663 ], [ 2.5909, 44.3663 ], [ 2.5911, 44.3662 ], [ 2.5913, 44.3664 ], [ 2.592, 44.3664 ], [ 2.5921, 44.3664 ], [ 2.5926, 44.3671 ] ] ], "type": "Polygon" }, "id": "69", "properties": { "code_commune": "12176", "code_departement": "12", "code_qp": "QP012001", "commune_qp": "Onet-le-Château", "nom_commune": "Onet-le-Château", "nom_qp": "Quatre Saisons" }, "type": "Feature" }, { "bbox": [ -0.0437, 43.0836, -0.0404, 43.0895 ], "geometry": { "coordinates": [ [ [ -0.0418, 43.0892 ], [ -0.0417, 43.0895 ], [ -0.0408, 43.0893 ], [ -0.0404, 43.0888 ], [ -0.0405, 43.0885 ], [ -0.0406, 43.0883 ], [ -0.0407, 43.088 ], [ -0.0408, 43.0879 ], [ -0.0408, 43.0878 ], [ -0.0409, 43.0877 ], [ -0.0407, 43.0872 ], [ -0.0407, 43.0869 ], [ -0.0407, 43.0868 ], [ -0.0407, 43.0867 ], [ -0.0412, 43.0865 ], [ -0.0419, 43.0865 ], [ -0.0421, 43.0865 ], [ -0.0421, 43.086 ], [ -0.0421, 43.0851 ], [ -0.0414, 43.0845 ], [ -0.0414, 43.0843 ], [ -0.0414, 43.0841 ], [ -0.0414, 43.0838 ], [ -0.0415, 43.0838 ], [ -0.0416, 43.0837 ], [ -0.0417, 43.0837 ], [ -0.0421, 43.0837 ], [ -0.0429, 43.0836 ], [ -0.0433, 43.0836 ], [ -0.0437, 43.0836 ], [ -0.0437, 43.0837 ], [ -0.0435, 43.0838 ], [ -0.0434, 43.0851 ], [ -0.0433, 43.0851 ], [ -0.0433, 43.0856 ], [ -0.0433, 43.0861 ], [ -0.0433, 43.0861 ], [ -0.0432, 43.0865 ], [ -0.0432, 43.0867 ], [ -0.0431, 43.0867 ], [ -0.043, 43.0875 ], [ -0.0429, 43.0881 ], [ -0.0427, 43.0891 ], [ -0.0427, 43.0893 ], [ -0.0418, 43.0892 ] ] ], "type": "Polygon" }, "id": "70", "properties": { "code_commune": "65286", "code_departement": "65", "code_qp": "QP065004", "commune_qp": "Lourdes", "nom_commune": "Lourdes", "nom_qp": "Ophite" }, "type": "Feature" }, { "bbox": [ 4.3577, 43.8386, 4.3726, 43.8447 ], "geometry": { "coordinates": [ [ [ 4.3726, 43.8407 ], [ 4.3721, 43.8405 ], [ 4.3712, 43.8403 ], [ 4.3707, 43.8402 ], [ 4.3701, 43.8397 ], [ 4.3695, 43.8393 ], [ 4.3691, 43.839 ], [ 4.3688, 43.8388 ], [ 4.3665, 43.8391 ], [ 4.3657, 43.8391 ], [ 4.3645, 43.8392 ], [ 4.3643, 43.8393 ], [ 4.3641, 43.8392 ], [ 4.3637, 43.839 ], [ 4.3634, 43.8392 ], [ 4.3635, 43.8396 ], [ 4.3635, 43.8398 ], [ 4.3635, 43.8398 ], [ 4.363, 43.84 ], [ 4.3629, 43.84 ], [ 4.3626, 43.8393 ], [ 4.3626, 43.8391 ], [ 4.3626, 43.8391 ], [ 4.3626, 43.839 ], [ 4.3625, 43.8389 ], [ 4.3624, 43.8388 ], [ 4.3622, 43.8387 ], [ 4.3621, 43.8387 ], [ 4.362, 43.8386 ], [ 4.3617, 43.8386 ], [ 4.3616, 43.8386 ], [ 4.3615, 43.8387 ], [ 4.3612, 43.8388 ], [ 4.3606, 43.8391 ], [ 4.3605, 43.8391 ], [ 4.3604, 43.8391 ], [ 4.3599, 43.839 ], [ 4.3599, 43.8393 ], [ 4.3599, 43.8395 ], [ 4.3602, 43.84 ], [ 4.3603, 43.8403 ], [ 4.3603, 43.8404 ], [ 4.36, 43.8404 ], [ 4.3598, 43.8405 ], [ 4.3596, 43.8405 ], [ 4.3591, 43.8405 ], [ 4.3589, 43.8405 ], [ 4.3581, 43.8404 ], [ 4.358, 43.8408 ], [ 4.3579, 43.8413 ], [ 4.3579, 43.8415 ], [ 4.3577, 43.8419 ], [ 4.3582, 43.842 ], [ 4.3583, 43.8421 ], [ 4.3582, 43.8423 ], [ 4.3579, 43.8429 ], [ 4.3577, 43.8433 ], [ 4.3582, 43.8433 ], [ 4.3582, 43.8434 ], [ 4.3587, 43.8435 ], [ 4.3587, 43.8435 ], [ 4.3595, 43.8436 ], [ 4.3597, 43.8436 ], [ 4.3602, 43.8436 ], [ 4.3607, 43.8437 ], [ 4.3607, 43.8437 ], [ 4.3615, 43.8438 ], [ 4.3623, 43.8438 ], [ 4.3624, 43.8436 ], [ 4.3625, 43.8434 ], [ 4.3626, 43.8433 ], [ 4.3625, 43.8423 ], [ 4.3624, 43.8416 ], [ 4.3623, 43.841 ], [ 4.3622, 43.8403 ], [ 4.3629, 43.8402 ], [ 4.3649, 43.8401 ], [ 4.3652, 43.8402 ], [ 4.3656, 43.8404 ], [ 4.3663, 43.841 ], [ 4.3672, 43.8417 ], [ 4.3672, 43.8417 ], [ 4.3675, 43.8426 ], [ 4.3676, 43.8428 ], [ 4.3677, 43.8435 ], [ 4.3677, 43.8437 ], [ 4.3677, 43.8442 ], [ 4.3677, 43.8447 ], [ 4.3686, 43.844 ], [ 4.3692, 43.8433 ], [ 4.3696, 43.8429 ], [ 4.3698, 43.8427 ], [ 4.3704, 43.8423 ], [ 4.3704, 43.8423 ], [ 4.3716, 43.8425 ], [ 4.3718, 43.8419 ], [ 4.372, 43.8415 ], [ 4.372, 43.8415 ], [ 4.372, 43.8415 ], [ 4.3722, 43.8415 ], [ 4.3726, 43.8407 ] ] ], "type": "Polygon" }, "id": "71", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030004", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Gambetta-Richelieu" }, "type": "Feature" }, { "bbox": [ 3.8427, 43.617, 3.8555, 43.6246 ], "geometry": { "coordinates": [ [ [ 3.8548, 43.6206 ], [ 3.8549, 43.6201 ], [ 3.8543, 43.6201 ], [ 3.8533, 43.6201 ], [ 3.8521, 43.62 ], [ 3.8505, 43.62 ], [ 3.8482, 43.6213 ], [ 3.8475, 43.6212 ], [ 3.8475, 43.6212 ], [ 3.8474, 43.6212 ], [ 3.847, 43.6213 ], [ 3.8465, 43.621 ], [ 3.8465, 43.621 ], [ 3.8465, 43.6209 ], [ 3.8465, 43.6208 ], [ 3.8459, 43.6207 ], [ 3.8459, 43.6207 ], [ 3.8458, 43.6207 ], [ 3.8458, 43.6205 ], [ 3.8459, 43.6202 ], [ 3.8461, 43.6199 ], [ 3.8462, 43.6198 ], [ 3.8462, 43.6198 ], [ 3.8462, 43.6197 ], [ 3.8463, 43.6196 ], [ 3.8464, 43.6195 ], [ 3.8464, 43.6194 ], [ 3.8465, 43.6192 ], [ 3.8466, 43.6191 ], [ 3.8466, 43.619 ], [ 3.8466, 43.6189 ], [ 3.8466, 43.6187 ], [ 3.8462, 43.6186 ], [ 3.8463, 43.6184 ], [ 3.8469, 43.6179 ], [ 3.8474, 43.618 ], [ 3.8477, 43.6174 ], [ 3.8471, 43.6174 ], [ 3.8465, 43.6175 ], [ 3.8464, 43.6175 ], [ 3.8459, 43.617 ], [ 3.8459, 43.6171 ], [ 3.8458, 43.6171 ], [ 3.8452, 43.6171 ], [ 3.8451, 43.6171 ], [ 3.8439, 43.618 ], [ 3.8442, 43.6181 ], [ 3.8435, 43.6189 ], [ 3.8427, 43.6194 ], [ 3.8436, 43.6198 ], [ 3.8432, 43.6203 ], [ 3.8437, 43.6206 ], [ 3.8435, 43.6209 ], [ 3.8432, 43.6213 ], [ 3.8434, 43.6214 ], [ 3.8435, 43.6215 ], [ 3.8437, 43.6215 ], [ 3.8438, 43.6215 ], [ 3.8443, 43.6215 ], [ 3.8444, 43.6217 ], [ 3.8444, 43.6219 ], [ 3.8446, 43.6219 ], [ 3.8447, 43.622 ], [ 3.844, 43.6225 ], [ 3.8444, 43.623 ], [ 3.8452, 43.6225 ], [ 3.8459, 43.6221 ], [ 3.8468, 43.6218 ], [ 3.8473, 43.6217 ], [ 3.8477, 43.6216 ], [ 3.8478, 43.6217 ], [ 3.8479, 43.6217 ], [ 3.8481, 43.6218 ], [ 3.8481, 43.6218 ], [ 3.8483, 43.6224 ], [ 3.8491, 43.6222 ], [ 3.8492, 43.6222 ], [ 3.8498, 43.6224 ], [ 3.8499, 43.6224 ], [ 3.85, 43.6224 ], [ 3.8504, 43.623 ], [ 3.8495, 43.6234 ], [ 3.8492, 43.6237 ], [ 3.8492, 43.6238 ], [ 3.8492, 43.6238 ], [ 3.8493, 43.6241 ], [ 3.8493, 43.6243 ], [ 3.8494, 43.6243 ], [ 3.8498, 43.6245 ], [ 3.85, 43.6246 ], [ 3.8501, 43.6245 ], [ 3.8504, 43.6244 ], [ 3.8509, 43.624 ], [ 3.8513, 43.6235 ], [ 3.8516, 43.6233 ], [ 3.8519, 43.6231 ], [ 3.852, 43.6231 ], [ 3.8525, 43.6235 ], [ 3.8529, 43.6237 ], [ 3.8537, 43.6231 ], [ 3.8536, 43.623 ], [ 3.8535, 43.6227 ], [ 3.8538, 43.6226 ], [ 3.8542, 43.6226 ], [ 3.8545, 43.6226 ], [ 3.8547, 43.6224 ], [ 3.8555, 43.6219 ], [ 3.855, 43.6217 ], [ 3.855, 43.6217 ], [ 3.8545, 43.6216 ], [ 3.8544, 43.6215 ], [ 3.855, 43.6212 ], [ 3.8551, 43.6211 ], [ 3.8552, 43.6209 ], [ 3.8549, 43.6206 ], [ 3.8548, 43.6206 ] ] ], "type": "Polygon" }, "id": "72", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034008", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Cévennes" }, "type": "Feature" }, { "bbox": [ 4.3816, 43.8369, 4.396, 43.8472 ], "geometry": { "coordinates": [ [ [ 4.3863, 43.8422 ], [ 4.3821, 43.8428 ], [ 4.3817, 43.8429 ], [ 4.3816, 43.843 ], [ 4.3816, 43.8432 ], [ 4.3829, 43.8443 ], [ 4.3826, 43.8444 ], [ 4.3825, 43.8446 ], [ 4.3824, 43.8447 ], [ 4.3821, 43.8448 ], [ 4.3822, 43.8454 ], [ 4.3849, 43.8461 ], [ 4.385, 43.846 ], [ 4.3839, 43.8451 ], [ 4.3843, 43.8449 ], [ 4.3846, 43.8447 ], [ 4.3852, 43.8444 ], [ 4.3856, 43.8445 ], [ 4.3863, 43.8449 ], [ 4.3866, 43.8451 ], [ 4.3871, 43.8453 ], [ 4.3874, 43.8454 ], [ 4.3879, 43.8456 ], [ 4.3884, 43.8458 ], [ 4.3888, 43.846 ], [ 4.3892, 43.8463 ], [ 4.3896, 43.8465 ], [ 4.3898, 43.8466 ], [ 4.39, 43.8466 ], [ 4.3901, 43.8467 ], [ 4.3903, 43.8467 ], [ 4.3905, 43.8468 ], [ 4.3907, 43.8468 ], [ 4.3916, 43.8469 ], [ 4.3929, 43.8469 ], [ 4.3942, 43.8471 ], [ 4.3949, 43.8472 ], [ 4.3959, 43.8471 ], [ 4.396, 43.8469 ], [ 4.3955, 43.8466 ], [ 4.3952, 43.8463 ], [ 4.3949, 43.8461 ], [ 4.3947, 43.8459 ], [ 4.3942, 43.8454 ], [ 4.3935, 43.8448 ], [ 4.3925, 43.8441 ], [ 4.3916, 43.8433 ], [ 4.3913, 43.8431 ], [ 4.3905, 43.8423 ], [ 4.3904, 43.8422 ], [ 4.3903, 43.8421 ], [ 4.39, 43.8418 ], [ 4.3897, 43.8415 ], [ 4.3897, 43.8412 ], [ 4.3895, 43.841 ], [ 4.389, 43.8401 ], [ 4.3885, 43.8389 ], [ 4.3881, 43.8372 ], [ 4.388, 43.837 ], [ 4.3875, 43.8369 ], [ 4.3871, 43.8369 ], [ 4.3869, 43.8375 ], [ 4.3867, 43.8383 ], [ 4.3866, 43.8388 ], [ 4.3866, 43.8389 ], [ 4.3868, 43.839 ], [ 4.3873, 43.8392 ], [ 4.3873, 43.8393 ], [ 4.3872, 43.8396 ], [ 4.3869, 43.8402 ], [ 4.3882, 43.8405 ], [ 4.388, 43.8409 ], [ 4.3885, 43.8411 ], [ 4.3886, 43.8411 ], [ 4.3885, 43.8414 ], [ 4.3874, 43.8412 ], [ 4.3873, 43.8412 ], [ 4.3872, 43.8417 ], [ 4.3867, 43.8416 ], [ 4.3865, 43.8416 ], [ 4.3862, 43.8421 ], [ 4.3863, 43.8422 ] ] ], "type": "Polygon" }, "id": "73", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030005", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Chemin-Bas D'Avignon - Clos D'Orville" }, "type": "Feature" }, { "bbox": [ 4.3932, 43.8528, 4.4027, 43.8608 ], "geometry": { "coordinates": [ [ [ 4.3977, 43.8531 ], [ 4.3975, 43.8528 ], [ 4.3972, 43.8529 ], [ 4.3973, 43.8531 ], [ 4.3969, 43.8532 ], [ 4.397, 43.8534 ], [ 4.3969, 43.8538 ], [ 4.3968, 43.8543 ], [ 4.3966, 43.8546 ], [ 4.3967, 43.8546 ], [ 4.3965, 43.8548 ], [ 4.3963, 43.8552 ], [ 4.3962, 43.8554 ], [ 4.3962, 43.8554 ], [ 4.3957, 43.8553 ], [ 4.3956, 43.8553 ], [ 4.3954, 43.8552 ], [ 4.3953, 43.8552 ], [ 4.395, 43.8556 ], [ 4.3947, 43.856 ], [ 4.3946, 43.8559 ], [ 4.3944, 43.8561 ], [ 4.3944, 43.8561 ], [ 4.3944, 43.8562 ], [ 4.3943, 43.8562 ], [ 4.3942, 43.8562 ], [ 4.3941, 43.8563 ], [ 4.394, 43.8563 ], [ 4.3936, 43.8563 ], [ 4.3934, 43.8567 ], [ 4.3935, 43.8567 ], [ 4.3933, 43.857 ], [ 4.3932, 43.857 ], [ 4.3932, 43.8571 ], [ 4.3935, 43.8573 ], [ 4.3938, 43.8575 ], [ 4.394, 43.8576 ], [ 4.3942, 43.8577 ], [ 4.3945, 43.8578 ], [ 4.3945, 43.8578 ], [ 4.3944, 43.8579 ], [ 4.3944, 43.8581 ], [ 4.3943, 43.8582 ], [ 4.3943, 43.8583 ], [ 4.3943, 43.8585 ], [ 4.3944, 43.8586 ], [ 4.3946, 43.8586 ], [ 4.3949, 43.8586 ], [ 4.395, 43.8587 ], [ 4.3949, 43.8592 ], [ 4.395, 43.8593 ], [ 4.3957, 43.8595 ], [ 4.3959, 43.8596 ], [ 4.396, 43.8596 ], [ 4.3962, 43.8596 ], [ 4.3964, 43.8593 ], [ 4.3964, 43.8589 ], [ 4.3961, 43.8589 ], [ 4.3961, 43.8589 ], [ 4.3958, 43.8588 ], [ 4.3957, 43.8586 ], [ 4.3957, 43.8584 ], [ 4.3957, 43.8583 ], [ 4.3957, 43.8582 ], [ 4.3961, 43.8582 ], [ 4.3963, 43.8583 ], [ 4.3963, 43.8582 ], [ 4.3964, 43.8582 ], [ 4.3965, 43.8583 ], [ 4.3966, 43.8583 ], [ 4.3966, 43.8585 ], [ 4.3965, 43.8586 ], [ 4.3964, 43.8589 ], [ 4.397, 43.8589 ], [ 4.3973, 43.8589 ], [ 4.3975, 43.8588 ], [ 4.3974, 43.8587 ], [ 4.3973, 43.8585 ], [ 4.3972, 43.8583 ], [ 4.3972, 43.8583 ], [ 4.3971, 43.8582 ], [ 4.3971, 43.8581 ], [ 4.3971, 43.8579 ], [ 4.3971, 43.8577 ], [ 4.3972, 43.8575 ], [ 4.3977, 43.8575 ], [ 4.3976, 43.8577 ], [ 4.3977, 43.8577 ], [ 4.3981, 43.8579 ], [ 4.3983, 43.858 ], [ 4.3984, 43.858 ], [ 4.3986, 43.8582 ], [ 4.3984, 43.8584 ], [ 4.3983, 43.8583 ], [ 4.3983, 43.8584 ], [ 4.3982, 43.8584 ], [ 4.3981, 43.8585 ], [ 4.398, 43.8586 ], [ 4.398, 43.8586 ], [ 4.3981, 43.8586 ], [ 4.3983, 43.8586 ], [ 4.3986, 43.8586 ], [ 4.3988, 43.8588 ], [ 4.399, 43.8589 ], [ 4.3993, 43.8592 ], [ 4.3987, 43.8597 ], [ 4.3989, 43.8599 ], [ 4.3997, 43.8592 ], [ 4.3998, 43.8593 ], [ 4.3998, 43.8594 ], [ 4.4, 43.8595 ], [ 4.4001, 43.8597 ], [ 4.4002, 43.8597 ], [ 4.4003, 43.8597 ], [ 4.4007, 43.8599 ], [ 4.4011, 43.8603 ], [ 4.401, 43.8603 ], [ 4.4015, 43.8608 ], [ 4.4018, 43.8607 ], [ 4.4017, 43.8606 ], [ 4.402, 43.8604 ], [ 4.4022, 43.8605 ], [ 4.4023, 43.8605 ], [ 4.4024, 43.8605 ], [ 4.4025, 43.8605 ], [ 4.4026, 43.8603 ], [ 4.4027, 43.8603 ], [ 4.4027, 43.8602 ], [ 4.4027, 43.8602 ], [ 4.4027, 43.86 ], [ 4.4024, 43.8593 ], [ 4.4023, 43.8591 ], [ 4.4021, 43.8587 ], [ 4.402, 43.8583 ], [ 4.4013, 43.8572 ], [ 4.4003, 43.8576 ], [ 4.4002, 43.8578 ], [ 4.4001, 43.8579 ], [ 4.4001, 43.8579 ], [ 4.4002, 43.8579 ], [ 4.4, 43.8582 ], [ 4.3999, 43.8581 ], [ 4.3997, 43.8581 ], [ 4.3996, 43.8581 ], [ 4.3995, 43.858 ], [ 4.3997, 43.8579 ], [ 4.3998, 43.8575 ], [ 4.3998, 43.8575 ], [ 4.3997, 43.8572 ], [ 4.3997, 43.8571 ], [ 4.3999, 43.8566 ], [ 4.4, 43.8564 ], [ 4.4001, 43.8563 ], [ 4.4001, 43.8563 ], [ 4.4002, 43.8562 ], [ 4.4004, 43.8561 ], [ 4.4005, 43.856 ], [ 4.4006, 43.8559 ], [ 4.4005, 43.8558 ], [ 4.4003, 43.8556 ], [ 4.4, 43.8554 ], [ 4.3995, 43.8551 ], [ 4.3991, 43.8548 ], [ 4.3989, 43.8546 ], [ 4.3986, 43.8544 ], [ 4.3982, 43.854 ], [ 4.3981, 43.8538 ], [ 4.398, 43.8538 ], [ 4.3979, 43.8534 ], [ 4.3979, 43.8533 ], [ 4.3977, 43.8531 ] ] ], "type": "Polygon" }, "id": "74", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030006", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Mas De Mingue" }, "type": "Feature" }, { "bbox": [ 3.8752, 43.58, 3.8901, 43.5942 ], "geometry": { "coordinates": [ [ [ 3.8763, 43.5812 ], [ 3.8766, 43.5814 ], [ 3.8762, 43.5818 ], [ 3.8766, 43.5821 ], [ 3.8769, 43.5822 ], [ 3.8773, 43.5822 ], [ 3.8776, 43.5822 ], [ 3.8779, 43.5821 ], [ 3.8782, 43.582 ], [ 3.8784, 43.5819 ], [ 3.8786, 43.5817 ], [ 3.8797, 43.5822 ], [ 3.8805, 43.5829 ], [ 3.8829, 43.5865 ], [ 3.884, 43.588 ], [ 3.8827, 43.5884 ], [ 3.8838, 43.5894 ], [ 3.8836, 43.5894 ], [ 3.8844, 43.5906 ], [ 3.8832, 43.5911 ], [ 3.8822, 43.5915 ], [ 3.883, 43.5927 ], [ 3.8824, 43.5929 ], [ 3.8826, 43.5932 ], [ 3.8839, 43.5927 ], [ 3.8845, 43.5935 ], [ 3.8848, 43.5938 ], [ 3.8852, 43.5942 ], [ 3.8854, 43.5941 ], [ 3.8856, 43.5939 ], [ 3.8859, 43.5937 ], [ 3.8861, 43.5935 ], [ 3.8863, 43.5933 ], [ 3.8861, 43.5931 ], [ 3.8861, 43.593 ], [ 3.8862, 43.5929 ], [ 3.8867, 43.5924 ], [ 3.8854, 43.5907 ], [ 3.8857, 43.5905 ], [ 3.8856, 43.5902 ], [ 3.886, 43.5901 ], [ 3.8876, 43.5896 ], [ 3.8879, 43.5895 ], [ 3.8886, 43.5894 ], [ 3.8894, 43.5894 ], [ 3.8896, 43.5894 ], [ 3.8895, 43.5891 ], [ 3.8897, 43.5889 ], [ 3.89, 43.5887 ], [ 3.8901, 43.5882 ], [ 3.89, 43.5879 ], [ 3.8895, 43.5872 ], [ 3.8892, 43.5868 ], [ 3.8887, 43.5857 ], [ 3.8883, 43.5853 ], [ 3.8882, 43.5846 ], [ 3.8881, 43.5843 ], [ 3.888, 43.5843 ], [ 3.8875, 43.5835 ], [ 3.8871, 43.5831 ], [ 3.886, 43.5821 ], [ 3.8856, 43.5819 ], [ 3.8837, 43.5812 ], [ 3.8824, 43.5808 ], [ 3.8821, 43.5807 ], [ 3.8819, 43.5808 ], [ 3.8813, 43.5811 ], [ 3.8812, 43.5813 ], [ 3.8809, 43.5815 ], [ 3.8804, 43.5818 ], [ 3.8789, 43.5815 ], [ 3.879, 43.5813 ], [ 3.879, 43.5812 ], [ 3.879, 43.581 ], [ 3.8788, 43.581 ], [ 3.8787, 43.581 ], [ 3.8786, 43.5808 ], [ 3.8784, 43.5806 ], [ 3.8782, 43.5804 ], [ 3.8778, 43.5802 ], [ 3.8776, 43.5802 ], [ 3.8775, 43.5802 ], [ 3.8771, 43.5802 ], [ 3.8767, 43.5803 ], [ 3.8765, 43.58 ], [ 3.8761, 43.5802 ], [ 3.8759, 43.58 ], [ 3.8752, 43.5804 ], [ 3.8762, 43.5806 ], [ 3.8763, 43.5807 ], [ 3.8764, 43.581 ], [ 3.8764, 43.5811 ], [ 3.8764, 43.5811 ], [ 3.8763, 43.5812 ] ] ], "type": "Polygon" }, "id": "75", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034012", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Près D'Arènes" }, "type": "Feature" }, { "bbox": [ 0.7183, 43.1062, 0.7301, 43.1123 ], "geometry": { "coordinates": [ [ [ 0.7224, 43.1089 ], [ 0.7222, 43.1095 ], [ 0.7222, 43.1098 ], [ 0.7217, 43.1097 ], [ 0.7215, 43.11 ], [ 0.7214, 43.11 ], [ 0.7213, 43.1101 ], [ 0.723, 43.1103 ], [ 0.7229, 43.1106 ], [ 0.7229, 43.1107 ], [ 0.7227, 43.111 ], [ 0.7228, 43.111 ], [ 0.7234, 43.1111 ], [ 0.7241, 43.1112 ], [ 0.7242, 43.1113 ], [ 0.7242, 43.1116 ], [ 0.7242, 43.1117 ], [ 0.7245, 43.1117 ], [ 0.7245, 43.1123 ], [ 0.7257, 43.1122 ], [ 0.7259, 43.1121 ], [ 0.7263, 43.1121 ], [ 0.7264, 43.1118 ], [ 0.7263, 43.1117 ], [ 0.7263, 43.1114 ], [ 0.7263, 43.1112 ], [ 0.7271, 43.1112 ], [ 0.7271, 43.1109 ], [ 0.7276, 43.1109 ], [ 0.7279, 43.1109 ], [ 0.7279, 43.1109 ], [ 0.728, 43.1102 ], [ 0.7283, 43.1103 ], [ 0.729, 43.1103 ], [ 0.729, 43.1105 ], [ 0.7292, 43.1105 ], [ 0.7294, 43.1105 ], [ 0.7295, 43.1106 ], [ 0.7297, 43.1106 ], [ 0.7298, 43.1107 ], [ 0.7299, 43.1107 ], [ 0.73, 43.1105 ], [ 0.7301, 43.1103 ], [ 0.7296, 43.1101 ], [ 0.729, 43.1096 ], [ 0.7286, 43.1095 ], [ 0.7286, 43.1093 ], [ 0.7286, 43.1091 ], [ 0.7298, 43.1065 ], [ 0.7295, 43.1065 ], [ 0.7292, 43.1066 ], [ 0.7286, 43.1067 ], [ 0.7283, 43.1067 ], [ 0.7278, 43.1069 ], [ 0.7277, 43.1069 ], [ 0.7276, 43.107 ], [ 0.7274, 43.1073 ], [ 0.7273, 43.1073 ], [ 0.7272, 43.1073 ], [ 0.7268, 43.1073 ], [ 0.7267, 43.1075 ], [ 0.7265, 43.1076 ], [ 0.7266, 43.1079 ], [ 0.7263, 43.1078 ], [ 0.7262, 43.1078 ], [ 0.7261, 43.1077 ], [ 0.7261, 43.1075 ], [ 0.726, 43.1075 ], [ 0.7259, 43.1074 ], [ 0.7253, 43.1071 ], [ 0.7252, 43.1071 ], [ 0.725, 43.1071 ], [ 0.7249, 43.1071 ], [ 0.7247, 43.107 ], [ 0.7238, 43.1068 ], [ 0.7229, 43.1065 ], [ 0.7221, 43.1063 ], [ 0.7217, 43.1062 ], [ 0.7215, 43.1062 ], [ 0.7215, 43.1062 ], [ 0.7212, 43.1063 ], [ 0.721, 43.1063 ], [ 0.7209, 43.1064 ], [ 0.7208, 43.1066 ], [ 0.7208, 43.1067 ], [ 0.7207, 43.1068 ], [ 0.7204, 43.1067 ], [ 0.72, 43.1066 ], [ 0.7191, 43.1063 ], [ 0.719, 43.1066 ], [ 0.7189, 43.1066 ], [ 0.7187, 43.1069 ], [ 0.7186, 43.1071 ], [ 0.7186, 43.1071 ], [ 0.7186, 43.1072 ], [ 0.7183, 43.1071 ], [ 0.7184, 43.1074 ], [ 0.7186, 43.1074 ], [ 0.7187, 43.1078 ], [ 0.7189, 43.1078 ], [ 0.719, 43.1079 ], [ 0.7191, 43.1079 ], [ 0.7191, 43.1082 ], [ 0.7191, 43.1083 ], [ 0.7191, 43.1088 ], [ 0.7189, 43.1088 ], [ 0.7191, 43.1091 ], [ 0.7201, 43.1086 ], [ 0.7202, 43.1086 ], [ 0.7207, 43.1084 ], [ 0.7208, 43.1084 ], [ 0.7209, 43.1085 ], [ 0.7209, 43.1085 ], [ 0.7217, 43.1087 ], [ 0.7224, 43.1089 ] ] ], "type": "Polygon" }, "id": "76", "properties": { "code_commune": "31483", "code_departement": "31", "code_qp": "QP031003", "commune_qp": "Saint-Gaudens", "nom_commune": "Saint-Gaudens", "nom_qp": "Coeur De Ville" }, "type": "Feature" }, { "bbox": [ 3.7479, 43.4489, 3.7537, 43.4538 ], "geometry": { "coordinates": [ [ [ 3.7501, 43.4538 ], [ 3.7503, 43.4535 ], [ 3.7504, 43.4534 ], [ 3.7506, 43.4532 ], [ 3.7509, 43.4529 ], [ 3.7509, 43.4528 ], [ 3.751, 43.4528 ], [ 3.7513, 43.4526 ], [ 3.7514, 43.4525 ], [ 3.7516, 43.4524 ], [ 3.7516, 43.4524 ], [ 3.7518, 43.4521 ], [ 3.7523, 43.4516 ], [ 3.7524, 43.4516 ], [ 3.7527, 43.4513 ], [ 3.7533, 43.451 ], [ 3.7534, 43.4509 ], [ 3.7537, 43.4505 ], [ 3.7534, 43.4503 ], [ 3.7529, 43.45 ], [ 3.7518, 43.4493 ], [ 3.7515, 43.4491 ], [ 3.7512, 43.4489 ], [ 3.7511, 43.4489 ], [ 3.7511, 43.449 ], [ 3.751, 43.4491 ], [ 3.7507, 43.4492 ], [ 3.7513, 43.4497 ], [ 3.7517, 43.45 ], [ 3.7519, 43.4502 ], [ 3.7521, 43.4503 ], [ 3.7524, 43.4504 ], [ 3.7518, 43.4508 ], [ 3.7517, 43.4508 ], [ 3.7514, 43.451 ], [ 3.7513, 43.4511 ], [ 3.7512, 43.4513 ], [ 3.751, 43.4512 ], [ 3.7507, 43.4514 ], [ 3.751, 43.4516 ], [ 3.7507, 43.4518 ], [ 3.7507, 43.4518 ], [ 3.7503, 43.4521 ], [ 3.7504, 43.4522 ], [ 3.7505, 43.4523 ], [ 3.7502, 43.4526 ], [ 3.7501, 43.4525 ], [ 3.7492, 43.4518 ], [ 3.7491, 43.4519 ], [ 3.7487, 43.4521 ], [ 3.7486, 43.4522 ], [ 3.7485, 43.4523 ], [ 3.7483, 43.4523 ], [ 3.7481, 43.4524 ], [ 3.748, 43.4525 ], [ 3.748, 43.4526 ], [ 3.7479, 43.4527 ], [ 3.7479, 43.4527 ], [ 3.748, 43.4528 ], [ 3.7481, 43.4531 ], [ 3.7483, 43.4533 ], [ 3.7484, 43.4534 ], [ 3.7485, 43.4535 ], [ 3.749, 43.4533 ], [ 3.7491, 43.4532 ], [ 3.7492, 43.4532 ], [ 3.7493, 43.4533 ], [ 3.7494, 43.4533 ], [ 3.7495, 43.4534 ], [ 3.7495, 43.4534 ], [ 3.7497, 43.4535 ], [ 3.7498, 43.4536 ], [ 3.7498, 43.4536 ], [ 3.7498, 43.4537 ], [ 3.7501, 43.4538 ] ] ], "type": "Polygon" }, "id": "77", "properties": { "code_commune": "34108", "code_departement": "34", "code_qp": "QP034016", "commune_qp": "Frontignan", "nom_commune": "Frontignan", "nom_qp": "Les Deux Pins" }, "type": "Feature" }, { "bbox": [ 3.6911, 43.3997, 3.701, 43.4078 ], "geometry": { "coordinates": [ [ [ 3.6965, 43.4013 ], [ 3.6964, 43.4009 ], [ 3.6962, 43.4002 ], [ 3.6961, 43.3998 ], [ 3.6951, 43.3998 ], [ 3.695, 43.3998 ], [ 3.695, 43.3997 ], [ 3.6946, 43.3997 ], [ 3.6943, 43.3997 ], [ 3.6941, 43.3997 ], [ 3.694, 43.3998 ], [ 3.694, 43.4 ], [ 3.6938, 43.4 ], [ 3.6935, 43.4 ], [ 3.6931, 43.3997 ], [ 3.6929, 43.4001 ], [ 3.6928, 43.4001 ], [ 3.6927, 43.4004 ], [ 3.6927, 43.4005 ], [ 3.6926, 43.4008 ], [ 3.6926, 43.4008 ], [ 3.6925, 43.4013 ], [ 3.6925, 43.4015 ], [ 3.6927, 43.4015 ], [ 3.6928, 43.4014 ], [ 3.6928, 43.4016 ], [ 3.6929, 43.4016 ], [ 3.6929, 43.4016 ], [ 3.693, 43.4016 ], [ 3.693, 43.4016 ], [ 3.6931, 43.4016 ], [ 3.6933, 43.4016 ], [ 3.6933, 43.4017 ], [ 3.6933, 43.4017 ], [ 3.6936, 43.4017 ], [ 3.6936, 43.4018 ], [ 3.6939, 43.4018 ], [ 3.6939, 43.4019 ], [ 3.6942, 43.4019 ], [ 3.6941, 43.4022 ], [ 3.6941, 43.4022 ], [ 3.6941, 43.4023 ], [ 3.6938, 43.4023 ], [ 3.6938, 43.4024 ], [ 3.6939, 43.4024 ], [ 3.6939, 43.4025 ], [ 3.6938, 43.4025 ], [ 3.6934, 43.4025 ], [ 3.6931, 43.4025 ], [ 3.6927, 43.4024 ], [ 3.6923, 43.4024 ], [ 3.6927, 43.4031 ], [ 3.6928, 43.4033 ], [ 3.6937, 43.4034 ], [ 3.6937, 43.4037 ], [ 3.6935, 43.4037 ], [ 3.6934, 43.4039 ], [ 3.6931, 43.4039 ], [ 3.6931, 43.4039 ], [ 3.693, 43.404 ], [ 3.6929, 43.4041 ], [ 3.6928, 43.4041 ], [ 3.6927, 43.4042 ], [ 3.6925, 43.4042 ], [ 3.6915, 43.4041 ], [ 3.6914, 43.4043 ], [ 3.6914, 43.4044 ], [ 3.6914, 43.4046 ], [ 3.6914, 43.4048 ], [ 3.6912, 43.4058 ], [ 3.6911, 43.4065 ], [ 3.6915, 43.4066 ], [ 3.692, 43.4066 ], [ 3.6919, 43.4067 ], [ 3.6925, 43.4067 ], [ 3.6925, 43.4068 ], [ 3.6928, 43.4068 ], [ 3.6927, 43.407 ], [ 3.693, 43.407 ], [ 3.693, 43.4067 ], [ 3.693, 43.4066 ], [ 3.6933, 43.4066 ], [ 3.6932, 43.4078 ], [ 3.6935, 43.4076 ], [ 3.6939, 43.4072 ], [ 3.6941, 43.4066 ], [ 3.6933, 43.4065 ], [ 3.6934, 43.406 ], [ 3.6935, 43.4055 ], [ 3.6935, 43.4053 ], [ 3.6935, 43.405 ], [ 3.6939, 43.4051 ], [ 3.6943, 43.4051 ], [ 3.6944, 43.404 ], [ 3.6945, 43.4037 ], [ 3.6945, 43.4036 ], [ 3.6943, 43.4036 ], [ 3.6944, 43.4033 ], [ 3.6943, 43.4033 ], [ 3.6943, 43.4033 ], [ 3.6944, 43.4032 ], [ 3.6944, 43.4032 ], [ 3.6945, 43.4032 ], [ 3.6946, 43.4029 ], [ 3.6945, 43.4029 ], [ 3.6945, 43.4027 ], [ 3.6945, 43.4026 ], [ 3.6946, 43.4026 ], [ 3.6946, 43.4025 ], [ 3.6945, 43.4024 ], [ 3.6945, 43.4019 ], [ 3.6947, 43.4019 ], [ 3.6951, 43.402 ], [ 3.6956, 43.402 ], [ 3.6956, 43.4016 ], [ 3.6959, 43.4016 ], [ 3.6959, 43.4018 ], [ 3.6959, 43.4018 ], [ 3.6958, 43.4018 ], [ 3.6958, 43.4018 ], [ 3.6959, 43.4018 ], [ 3.6959, 43.4019 ], [ 3.6958, 43.4019 ], [ 3.6958, 43.402 ], [ 3.6966, 43.402 ], [ 3.6967, 43.402 ], [ 3.6967, 43.4019 ], [ 3.697, 43.4018 ], [ 3.6977, 43.4018 ], [ 3.6977, 43.4025 ], [ 3.6981, 43.4025 ], [ 3.6981, 43.4028 ], [ 3.6984, 43.4028 ], [ 3.6986, 43.4028 ], [ 3.6986, 43.4027 ], [ 3.6987, 43.4027 ], [ 3.6991, 43.403 ], [ 3.699, 43.4031 ], [ 3.699, 43.4031 ], [ 3.6994, 43.4033 ], [ 3.6993, 43.404 ], [ 3.6994, 43.4045 ], [ 3.6994, 43.4045 ], [ 3.6993, 43.4048 ], [ 3.6993, 43.4049 ], [ 3.6992, 43.4049 ], [ 3.6992, 43.4049 ], [ 3.6991, 43.4051 ], [ 3.6991, 43.4052 ], [ 3.6991, 43.4052 ], [ 3.6991, 43.4052 ], [ 3.699, 43.4052 ], [ 3.699, 43.4054 ], [ 3.6993, 43.4054 ], [ 3.6993, 43.4055 ], [ 3.6993, 43.4055 ], [ 3.6993, 43.4056 ], [ 3.6989, 43.4055 ], [ 3.6989, 43.4056 ], [ 3.6992, 43.4056 ], [ 3.699, 43.4059 ], [ 3.6992, 43.406 ], [ 3.6995, 43.4057 ], [ 3.6996, 43.4056 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4059 ], [ 3.6999, 43.4059 ], [ 3.6999, 43.4061 ], [ 3.7001, 43.4061 ], [ 3.7001, 43.4062 ], [ 3.7002, 43.4062 ], [ 3.7004, 43.4062 ], [ 3.7004, 43.4064 ], [ 3.7003, 43.4066 ], [ 3.7001, 43.4067 ], [ 3.7003, 43.4068 ], [ 3.7006, 43.4066 ], [ 3.7005, 43.4065 ], [ 3.7006, 43.4065 ], [ 3.7007, 43.4065 ], [ 3.7007, 43.4064 ], [ 3.7006, 43.4064 ], [ 3.7006, 43.4063 ], [ 3.7008, 43.4063 ], [ 3.7008, 43.4062 ], [ 3.7006, 43.4063 ], [ 3.7006, 43.4062 ], [ 3.7006, 43.4062 ], [ 3.7008, 43.4061 ], [ 3.7007, 43.4061 ], [ 3.7005, 43.4061 ], [ 3.7005, 43.406 ], [ 3.7005, 43.4059 ], [ 3.7004, 43.4059 ], [ 3.7002, 43.4059 ], [ 3.7001, 43.4055 ], [ 3.7, 43.4054 ], [ 3.7007, 43.4054 ], [ 3.7007, 43.4053 ], [ 3.7003, 43.4052 ], [ 3.7004, 43.4052 ], [ 3.7002, 43.405 ], [ 3.7001, 43.4049 ], [ 3.7, 43.4048 ], [ 3.7001, 43.4046 ], [ 3.6998, 43.4046 ], [ 3.7, 43.4042 ], [ 3.7002, 43.4041 ], [ 3.7004, 43.4041 ], [ 3.7005, 43.4041 ], [ 3.7006, 43.4042 ], [ 3.7009, 43.404 ], [ 3.701, 43.4041 ], [ 3.701, 43.4036 ], [ 3.7004, 43.4033 ], [ 3.7005, 43.4032 ], [ 3.7004, 43.4031 ], [ 3.7003, 43.4033 ], [ 3.7002, 43.4033 ], [ 3.7003, 43.4031 ], [ 3.7001, 43.4031 ], [ 3.7001, 43.4032 ], [ 3.7, 43.4032 ], [ 3.7, 43.4031 ], [ 3.7, 43.4031 ], [ 3.6999, 43.4031 ], [ 3.6999, 43.4029 ], [ 3.6997, 43.4029 ], [ 3.6997, 43.4028 ], [ 3.6994, 43.4028 ], [ 3.6995, 43.4025 ], [ 3.6986, 43.4025 ], [ 3.6986, 43.4024 ], [ 3.6981, 43.4024 ], [ 3.6981, 43.4022 ], [ 3.6983, 43.4022 ], [ 3.6983, 43.4021 ], [ 3.6979, 43.4021 ], [ 3.698, 43.402 ], [ 3.698, 43.402 ], [ 3.698, 43.4019 ], [ 3.698, 43.4019 ], [ 3.698, 43.4019 ], [ 3.698, 43.4017 ], [ 3.6977, 43.4017 ], [ 3.697, 43.4015 ], [ 3.6966, 43.4016 ], [ 3.6965, 43.4013 ] ] ], "type": "Polygon" }, "id": "78", "properties": { "code_commune": "34301", "code_departement": "34", "code_qp": "QP034018", "commune_qp": "Sète", "nom_commune": "Sète", "nom_qp": "Centre Ville - Ile Sud" }, "type": "Feature" }, { "bbox": [ 4.6479, 44.2542, 4.6525, 44.2583 ], "geometry": { "coordinates": [ [ [ 4.6485, 44.2583 ], [ 4.6488, 44.2582 ], [ 4.649, 44.2582 ], [ 4.6492, 44.2581 ], [ 4.6493, 44.2581 ], [ 4.6498, 44.2581 ], [ 4.6499, 44.258 ], [ 4.65, 44.258 ], [ 4.65, 44.2579 ], [ 4.6501, 44.2579 ], [ 4.6501, 44.258 ], [ 4.6501, 44.2583 ], [ 4.6505, 44.2583 ], [ 4.6509, 44.2578 ], [ 4.6511, 44.2576 ], [ 4.6514, 44.2572 ], [ 4.6517, 44.2568 ], [ 4.6518, 44.2566 ], [ 4.6519, 44.2563 ], [ 4.652, 44.2561 ], [ 4.6523, 44.2554 ], [ 4.6524, 44.2551 ], [ 4.6524, 44.2551 ], [ 4.6524, 44.2547 ], [ 4.6525, 44.2543 ], [ 4.652, 44.2544 ], [ 4.6519, 44.2543 ], [ 4.6517, 44.2543 ], [ 4.6512, 44.2542 ], [ 4.6511, 44.2544 ], [ 4.6511, 44.2545 ], [ 4.6508, 44.2546 ], [ 4.6507, 44.2546 ], [ 4.6505, 44.2546 ], [ 4.6505, 44.2546 ], [ 4.6505, 44.2547 ], [ 4.6504, 44.2546 ], [ 4.6503, 44.2547 ], [ 4.6502, 44.2547 ], [ 4.6502, 44.2547 ], [ 4.6501, 44.2546 ], [ 4.6501, 44.2546 ], [ 4.65, 44.2546 ], [ 4.65, 44.2546 ], [ 4.6499, 44.2546 ], [ 4.6497, 44.2546 ], [ 4.6497, 44.2546 ], [ 4.6496, 44.2546 ], [ 4.6496, 44.2547 ], [ 4.6495, 44.2547 ], [ 4.6496, 44.2547 ], [ 4.6495, 44.2546 ], [ 4.6494, 44.2546 ], [ 4.6493, 44.2546 ], [ 4.6493, 44.2548 ], [ 4.6491, 44.2548 ], [ 4.649, 44.2548 ], [ 4.6485, 44.2549 ], [ 4.6483, 44.2548 ], [ 4.6482, 44.255 ], [ 4.6482, 44.2551 ], [ 4.6483, 44.2552 ], [ 4.6484, 44.2555 ], [ 4.6481, 44.2555 ], [ 4.648, 44.2555 ], [ 4.648, 44.2556 ], [ 4.6479, 44.2557 ], [ 4.6481, 44.2557 ], [ 4.6481, 44.2558 ], [ 4.6481, 44.2558 ], [ 4.6482, 44.2559 ], [ 4.6481, 44.2559 ], [ 4.6481, 44.256 ], [ 4.648, 44.256 ], [ 4.648, 44.2561 ], [ 4.6481, 44.2561 ], [ 4.6481, 44.2562 ], [ 4.648, 44.2562 ], [ 4.648, 44.2563 ], [ 4.648, 44.2563 ], [ 4.648, 44.2564 ], [ 4.648, 44.2565 ], [ 4.6479, 44.2565 ], [ 4.6479, 44.2566 ], [ 4.6479, 44.2566 ], [ 4.6479, 44.2568 ], [ 4.648, 44.2568 ], [ 4.648, 44.2568 ], [ 4.648, 44.2568 ], [ 4.6481, 44.2569 ], [ 4.6481, 44.257 ], [ 4.6481, 44.257 ], [ 4.6481, 44.2571 ], [ 4.6481, 44.2571 ], [ 4.6481, 44.2571 ], [ 4.6482, 44.2571 ], [ 4.6482, 44.2572 ], [ 4.6483, 44.2572 ], [ 4.6483, 44.2572 ], [ 4.6481, 44.2572 ], [ 4.6481, 44.2573 ], [ 4.6482, 44.2573 ], [ 4.6481, 44.2573 ], [ 4.6481, 44.2573 ], [ 4.6481, 44.2574 ], [ 4.6482, 44.2574 ], [ 4.6482, 44.2574 ], [ 4.6481, 44.2574 ], [ 4.6481, 44.2574 ], [ 4.6482, 44.2575 ], [ 4.6482, 44.2575 ], [ 4.6483, 44.2576 ], [ 4.6483, 44.2576 ], [ 4.6482, 44.2576 ], [ 4.6482, 44.2577 ], [ 4.6481, 44.2577 ], [ 4.6481, 44.2578 ], [ 4.6482, 44.258 ], [ 4.6482, 44.2581 ], [ 4.6482, 44.2582 ], [ 4.6483, 44.2582 ], [ 4.6484, 44.2583 ], [ 4.6485, 44.2583 ] ] ], "type": "Polygon" }, "id": "79", "properties": { "code_commune": "30202", "code_departement": "30", "code_qp": "QP030011", "commune_qp": "Pont-Saint-Esprit", "nom_commune": "Pont-Saint-Esprit", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.9763, 43.76, 2.0026, 43.7681 ], "geometry": { "coordinates": [ [ [ 2.0023, 43.7645 ], [ 2.0025, 43.7645 ], [ 2.0026, 43.7642 ], [ 2.0026, 43.764 ], [ 2.0025, 43.7639 ], [ 2.0017, 43.7639 ], [ 2.0013, 43.7624 ], [ 2.0012, 43.7624 ], [ 1.9999, 43.7624 ], [ 1.9988, 43.7624 ], [ 1.9977, 43.7625 ], [ 1.9977, 43.7625 ], [ 1.997, 43.7625 ], [ 1.9969, 43.7627 ], [ 1.9966, 43.7629 ], [ 1.9965, 43.763 ], [ 1.9964, 43.7631 ], [ 1.9963, 43.7631 ], [ 1.9963, 43.763 ], [ 1.996, 43.7627 ], [ 1.9959, 43.7626 ], [ 1.9958, 43.7626 ], [ 1.9957, 43.7625 ], [ 1.9954, 43.7626 ], [ 1.9919, 43.7628 ], [ 1.9914, 43.7629 ], [ 1.9907, 43.7629 ], [ 1.9905, 43.7628 ], [ 1.9903, 43.7625 ], [ 1.9912, 43.7623 ], [ 1.9915, 43.7621 ], [ 1.9931, 43.7615 ], [ 1.9944, 43.7611 ], [ 1.9948, 43.7611 ], [ 1.9943, 43.7602 ], [ 1.9939, 43.7601 ], [ 1.9929, 43.76 ], [ 1.9889, 43.76 ], [ 1.9878, 43.7601 ], [ 1.9876, 43.7602 ], [ 1.9873, 43.7604 ], [ 1.9869, 43.7607 ], [ 1.9867, 43.7608 ], [ 1.9866, 43.7608 ], [ 1.9851, 43.7608 ], [ 1.9851, 43.7622 ], [ 1.985, 43.7622 ], [ 1.9832, 43.7622 ], [ 1.982, 43.7622 ], [ 1.9813, 43.7622 ], [ 1.981, 43.7621 ], [ 1.9792, 43.7614 ], [ 1.979, 43.7615 ], [ 1.9784, 43.7615 ], [ 1.9781, 43.7618 ], [ 1.9763, 43.7618 ], [ 1.9766, 43.7636 ], [ 1.977, 43.7641 ], [ 1.9779, 43.7645 ], [ 1.9778, 43.7643 ], [ 1.9785, 43.764 ], [ 1.9794, 43.7636 ], [ 1.9796, 43.7636 ], [ 1.9806, 43.7634 ], [ 1.9815, 43.7647 ], [ 1.9824, 43.7643 ], [ 1.983, 43.764 ], [ 1.9838, 43.7637 ], [ 1.9843, 43.7635 ], [ 1.9853, 43.7633 ], [ 1.9855, 43.7642 ], [ 1.9875, 43.764 ], [ 1.9874, 43.7638 ], [ 1.988, 43.7637 ], [ 1.988, 43.7638 ], [ 1.9884, 43.7637 ], [ 1.9884, 43.7637 ], [ 1.9889, 43.7636 ], [ 1.989, 43.7638 ], [ 1.9892, 43.7639 ], [ 1.9894, 43.7634 ], [ 1.9898, 43.7628 ], [ 1.9903, 43.763 ], [ 1.9902, 43.7631 ], [ 1.99, 43.7635 ], [ 1.99, 43.7636 ], [ 1.9903, 43.7637 ], [ 1.9903, 43.7636 ], [ 1.9904, 43.7635 ], [ 1.9907, 43.7635 ], [ 1.9909, 43.7637 ], [ 1.991, 43.7638 ], [ 1.9913, 43.7642 ], [ 1.9916, 43.7646 ], [ 1.9917, 43.7647 ], [ 1.9919, 43.7648 ], [ 1.9923, 43.7649 ], [ 1.9931, 43.7652 ], [ 1.9932, 43.7652 ], [ 1.9947, 43.7649 ], [ 1.9971, 43.7646 ], [ 1.9974, 43.7645 ], [ 1.9979, 43.7661 ], [ 1.9967, 43.7663 ], [ 1.9968, 43.7667 ], [ 1.9989, 43.768 ], [ 1.999, 43.7679 ], [ 1.9991, 43.7681 ], [ 2.0003, 43.7679 ], [ 2.0004, 43.7679 ], [ 2.0005, 43.7679 ], [ 2.0012, 43.7662 ], [ 2.0017, 43.7648 ], [ 2.0019, 43.7645 ], [ 2.0023, 43.7645 ] ] ], "type": "Polygon" }, "id": "80", "properties": { "code_commune": "81105", "code_departement": "81", "code_qp": "QP081011", "commune_qp": "Graulhet", "nom_commune": "Graulhet", "nom_qp": "Crins - En Gach" }, "type": "Feature" }, { "bbox": [ 2.1471, 44.0485, 2.1615, 44.0577 ], "geometry": { "coordinates": [ [ [ 2.1605, 44.0528 ], [ 2.1608, 44.0525 ], [ 2.1609, 44.0522 ], [ 2.161, 44.0514 ], [ 2.1609, 44.0513 ], [ 2.1608, 44.0511 ], [ 2.161, 44.0511 ], [ 2.1614, 44.0509 ], [ 2.1612, 44.0505 ], [ 2.1615, 44.0504 ], [ 2.1615, 44.0502 ], [ 2.1612, 44.0499 ], [ 2.1609, 44.0498 ], [ 2.1606, 44.0497 ], [ 2.1603, 44.0498 ], [ 2.1592, 44.05 ], [ 2.1584, 44.0499 ], [ 2.1584, 44.0497 ], [ 2.1583, 44.0496 ], [ 2.158, 44.0497 ], [ 2.1581, 44.0507 ], [ 2.1582, 44.0517 ], [ 2.1582, 44.0518 ], [ 2.1579, 44.0519 ], [ 2.1564, 44.0525 ], [ 2.1558, 44.0518 ], [ 2.1539, 44.0519 ], [ 2.1538, 44.0508 ], [ 2.1537, 44.0504 ], [ 2.1537, 44.0498 ], [ 2.1533, 44.0499 ], [ 2.1532, 44.0497 ], [ 2.1532, 44.0495 ], [ 2.1533, 44.0492 ], [ 2.1535, 44.0491 ], [ 2.1536, 44.0491 ], [ 2.1537, 44.049 ], [ 2.1534, 44.0488 ], [ 2.1536, 44.0486 ], [ 2.1533, 44.0485 ], [ 2.1529, 44.0489 ], [ 2.1527, 44.049 ], [ 2.1525, 44.049 ], [ 2.1521, 44.0491 ], [ 2.1519, 44.0491 ], [ 2.1513, 44.0498 ], [ 2.151, 44.05 ], [ 2.1509, 44.05 ], [ 2.1494, 44.0501 ], [ 2.1492, 44.0501 ], [ 2.1492, 44.0501 ], [ 2.1471, 44.0502 ], [ 2.1473, 44.0507 ], [ 2.1475, 44.051 ], [ 2.1477, 44.0512 ], [ 2.1482, 44.0514 ], [ 2.1483, 44.0515 ], [ 2.1486, 44.0515 ], [ 2.1488, 44.0515 ], [ 2.1508, 44.0519 ], [ 2.1516, 44.0521 ], [ 2.1522, 44.0521 ], [ 2.1534, 44.052 ], [ 2.1535, 44.052 ], [ 2.1535, 44.0521 ], [ 2.1539, 44.0526 ], [ 2.1539, 44.0526 ], [ 2.154, 44.0528 ], [ 2.1541, 44.0528 ], [ 2.154, 44.0529 ], [ 2.1541, 44.053 ], [ 2.1542, 44.0531 ], [ 2.1542, 44.0531 ], [ 2.1543, 44.0532 ], [ 2.1544, 44.0533 ], [ 2.154, 44.0534 ], [ 2.1549, 44.054 ], [ 2.155, 44.0539 ], [ 2.1567, 44.0531 ], [ 2.1571, 44.0529 ], [ 2.1576, 44.0535 ], [ 2.1573, 44.0536 ], [ 2.1572, 44.0536 ], [ 2.157, 44.0536 ], [ 2.1563, 44.0538 ], [ 2.1562, 44.0538 ], [ 2.1559, 44.054 ], [ 2.1558, 44.054 ], [ 2.1555, 44.054 ], [ 2.155, 44.054 ], [ 2.1547, 44.0543 ], [ 2.1546, 44.0545 ], [ 2.1547, 44.0547 ], [ 2.1547, 44.0548 ], [ 2.1541, 44.0548 ], [ 2.1535, 44.0544 ], [ 2.1535, 44.0544 ], [ 2.1533, 44.0544 ], [ 2.1526, 44.0545 ], [ 2.1524, 44.0546 ], [ 2.1522, 44.0543 ], [ 2.1519, 44.0544 ], [ 2.151, 44.0535 ], [ 2.1502, 44.054 ], [ 2.1501, 44.0542 ], [ 2.1502, 44.0543 ], [ 2.1503, 44.0545 ], [ 2.1504, 44.0546 ], [ 2.1501, 44.0551 ], [ 2.15, 44.0552 ], [ 2.1501, 44.0554 ], [ 2.1498, 44.0555 ], [ 2.1482, 44.056 ], [ 2.1487, 44.0561 ], [ 2.1492, 44.0561 ], [ 2.1492, 44.0571 ], [ 2.15, 44.057 ], [ 2.151, 44.0571 ], [ 2.1513, 44.0572 ], [ 2.1515, 44.0572 ], [ 2.1518, 44.0574 ], [ 2.1522, 44.0575 ], [ 2.1525, 44.0576 ], [ 2.1527, 44.0577 ], [ 2.153, 44.0576 ], [ 2.1532, 44.0576 ], [ 2.154, 44.0573 ], [ 2.1546, 44.0571 ], [ 2.1549, 44.0571 ], [ 2.1552, 44.057 ], [ 2.1555, 44.0568 ], [ 2.1558, 44.0564 ], [ 2.156, 44.0562 ], [ 2.1561, 44.0562 ], [ 2.1564, 44.0559 ], [ 2.1573, 44.0552 ], [ 2.1578, 44.0557 ], [ 2.1586, 44.0553 ], [ 2.1589, 44.0552 ], [ 2.1598, 44.0552 ], [ 2.1599, 44.0552 ], [ 2.1603, 44.055 ], [ 2.1611, 44.0545 ], [ 2.1596, 44.0535 ], [ 2.1595, 44.0535 ], [ 2.16, 44.0531 ], [ 2.1605, 44.0528 ] ] ], "type": "Polygon" }, "id": "81", "properties": { "code_commune": "81060", "code_departement": "81", "code_qp": "QP081009", "commune_qp": "Carmaux", "nom_commune": "Carmaux", "nom_qp": "Rajol - Cérou - Gourgatieux - Bouloc - Verrerie" }, "type": "Feature" }, { "bbox": [ 3.312, 43.7269, 3.3249, 43.7361 ], "geometry": { "coordinates": [ [ [ 3.3249, 43.731 ], [ 3.3246, 43.731 ], [ 3.3246, 43.731 ], [ 3.3244, 43.731 ], [ 3.3244, 43.7308 ], [ 3.3244, 43.7307 ], [ 3.3244, 43.7305 ], [ 3.3243, 43.7305 ], [ 3.3244, 43.7303 ], [ 3.3244, 43.7303 ], [ 3.3244, 43.7299 ], [ 3.3243, 43.7298 ], [ 3.3242, 43.7298 ], [ 3.3243, 43.7297 ], [ 3.3243, 43.7296 ], [ 3.3241, 43.7295 ], [ 3.3238, 43.7292 ], [ 3.3241, 43.7289 ], [ 3.3241, 43.7289 ], [ 3.3242, 43.7288 ], [ 3.3241, 43.7287 ], [ 3.324, 43.7285 ], [ 3.3238, 43.7283 ], [ 3.3237, 43.7281 ], [ 3.3232, 43.7278 ], [ 3.3231, 43.7279 ], [ 3.3233, 43.728 ], [ 3.3232, 43.7281 ], [ 3.3232, 43.7282 ], [ 3.3232, 43.7283 ], [ 3.3233, 43.7285 ], [ 3.3234, 43.7286 ], [ 3.3235, 43.7286 ], [ 3.3235, 43.7286 ], [ 3.3235, 43.7288 ], [ 3.3234, 43.729 ], [ 3.3231, 43.7291 ], [ 3.3229, 43.7291 ], [ 3.3227, 43.7291 ], [ 3.3224, 43.7291 ], [ 3.3223, 43.729 ], [ 3.3221, 43.729 ], [ 3.3221, 43.7289 ], [ 3.322, 43.7289 ], [ 3.3219, 43.7288 ], [ 3.3217, 43.7288 ], [ 3.3213, 43.7287 ], [ 3.3211, 43.7286 ], [ 3.321, 43.7287 ], [ 3.3208, 43.7287 ], [ 3.3205, 43.7287 ], [ 3.3202, 43.7288 ], [ 3.3202, 43.7289 ], [ 3.3201, 43.7289 ], [ 3.3197, 43.7287 ], [ 3.3197, 43.7286 ], [ 3.3197, 43.7285 ], [ 3.3196, 43.7283 ], [ 3.3195, 43.7282 ], [ 3.3194, 43.7282 ], [ 3.3193, 43.7281 ], [ 3.3187, 43.7281 ], [ 3.3182, 43.7278 ], [ 3.3181, 43.7277 ], [ 3.318, 43.7276 ], [ 3.3179, 43.7274 ], [ 3.3178, 43.7273 ], [ 3.3174, 43.7271 ], [ 3.3172, 43.727 ], [ 3.3167, 43.727 ], [ 3.3163, 43.727 ], [ 3.3161, 43.727 ], [ 3.3158, 43.7269 ], [ 3.3158, 43.7269 ], [ 3.3161, 43.7272 ], [ 3.3162, 43.7273 ], [ 3.3162, 43.7274 ], [ 3.316, 43.7278 ], [ 3.316, 43.7278 ], [ 3.3161, 43.728 ], [ 3.3163, 43.728 ], [ 3.3161, 43.7281 ], [ 3.3159, 43.7283 ], [ 3.316, 43.7284 ], [ 3.3161, 43.7288 ], [ 3.3161, 43.7288 ], [ 3.3163, 43.7291 ], [ 3.3163, 43.7292 ], [ 3.3162, 43.7294 ], [ 3.3167, 43.7295 ], [ 3.3166, 43.7297 ], [ 3.3168, 43.73 ], [ 3.3169, 43.7303 ], [ 3.3164, 43.7303 ], [ 3.3165, 43.7305 ], [ 3.3166, 43.7307 ], [ 3.3164, 43.7307 ], [ 3.3165, 43.7309 ], [ 3.3165, 43.7309 ], [ 3.316, 43.7312 ], [ 3.3149, 43.7318 ], [ 3.3147, 43.7319 ], [ 3.3146, 43.732 ], [ 3.3136, 43.7324 ], [ 3.313, 43.7327 ], [ 3.3125, 43.7329 ], [ 3.312, 43.7332 ], [ 3.3121, 43.7334 ], [ 3.3122, 43.7335 ], [ 3.3122, 43.7336 ], [ 3.3129, 43.7334 ], [ 3.3132, 43.7333 ], [ 3.3142, 43.7328 ], [ 3.3148, 43.7326 ], [ 3.3157, 43.7322 ], [ 3.3162, 43.7324 ], [ 3.3163, 43.7323 ], [ 3.3161, 43.7322 ], [ 3.3163, 43.7321 ], [ 3.3165, 43.732 ], [ 3.3166, 43.7318 ], [ 3.3168, 43.7316 ], [ 3.3171, 43.7313 ], [ 3.3174, 43.7315 ], [ 3.3175, 43.7315 ], [ 3.3176, 43.7317 ], [ 3.3177, 43.7318 ], [ 3.3177, 43.732 ], [ 3.3177, 43.7322 ], [ 3.3177, 43.7323 ], [ 3.3181, 43.7325 ], [ 3.3182, 43.7326 ], [ 3.3184, 43.7329 ], [ 3.3187, 43.7331 ], [ 3.319, 43.7329 ], [ 3.3191, 43.7329 ], [ 3.3193, 43.733 ], [ 3.3195, 43.7333 ], [ 3.3176, 43.7349 ], [ 3.3179, 43.735 ], [ 3.3174, 43.7354 ], [ 3.3176, 43.7355 ], [ 3.3176, 43.7355 ], [ 3.3177, 43.7356 ], [ 3.3176, 43.7357 ], [ 3.3175, 43.7357 ], [ 3.3175, 43.7358 ], [ 3.3176, 43.7359 ], [ 3.3176, 43.7359 ], [ 3.3183, 43.7361 ], [ 3.3184, 43.7361 ], [ 3.3187, 43.736 ], [ 3.3188, 43.7358 ], [ 3.3188, 43.7358 ], [ 3.3189, 43.7357 ], [ 3.319, 43.7358 ], [ 3.3194, 43.7356 ], [ 3.3195, 43.7355 ], [ 3.3198, 43.7355 ], [ 3.3206, 43.7354 ], [ 3.3205, 43.7351 ], [ 3.3194, 43.7352 ], [ 3.3197, 43.7349 ], [ 3.32, 43.7346 ], [ 3.3205, 43.7341 ], [ 3.3198, 43.7334 ], [ 3.3203, 43.733 ], [ 3.3205, 43.7329 ], [ 3.3207, 43.7327 ], [ 3.3208, 43.7328 ], [ 3.3212, 43.7325 ], [ 3.3215, 43.7322 ], [ 3.322, 43.7321 ], [ 3.3223, 43.732 ], [ 3.3227, 43.7322 ], [ 3.3233, 43.7323 ], [ 3.3236, 43.7323 ], [ 3.3236, 43.7325 ], [ 3.3236, 43.7327 ], [ 3.3237, 43.7332 ], [ 3.3239, 43.7337 ], [ 3.3249, 43.7338 ], [ 3.3249, 43.7334 ], [ 3.3246, 43.7335 ], [ 3.3245, 43.7331 ], [ 3.3245, 43.7329 ], [ 3.3244, 43.7324 ], [ 3.3244, 43.7324 ], [ 3.3245, 43.7324 ], [ 3.3246, 43.7321 ], [ 3.3246, 43.732 ], [ 3.3248, 43.7318 ], [ 3.3247, 43.7318 ], [ 3.3248, 43.7315 ], [ 3.3248, 43.7315 ], [ 3.3248, 43.7314 ], [ 3.3248, 43.7314 ], [ 3.3248, 43.7313 ], [ 3.3249, 43.7312 ], [ 3.3249, 43.731 ] ] ], "type": "Polygon" }, "id": "82", "properties": { "code_commune": "34142", "code_departement": "34", "code_qp": "QP034022", "commune_qp": "Lodève", "nom_commune": "Lodève", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.153, 43.6131, 3.1621, 43.6187 ], "geometry": { "coordinates": [ [ [ 3.1553, 43.6173 ], [ 3.1553, 43.6176 ], [ 3.1559, 43.6174 ], [ 3.1558, 43.6174 ], [ 3.1561, 43.6173 ], [ 3.1561, 43.6172 ], [ 3.1562, 43.6167 ], [ 3.1562, 43.6164 ], [ 3.1562, 43.6163 ], [ 3.1562, 43.6162 ], [ 3.157, 43.6162 ], [ 3.157, 43.6166 ], [ 3.157, 43.6173 ], [ 3.1568, 43.6175 ], [ 3.1568, 43.6175 ], [ 3.1567, 43.6176 ], [ 3.1567, 43.6176 ], [ 3.1566, 43.6177 ], [ 3.1575, 43.6182 ], [ 3.1578, 43.6179 ], [ 3.1585, 43.6183 ], [ 3.1589, 43.6185 ], [ 3.1593, 43.6187 ], [ 3.1601, 43.6181 ], [ 3.1605, 43.6177 ], [ 3.1608, 43.6175 ], [ 3.161, 43.6176 ], [ 3.1611, 43.6175 ], [ 3.1613, 43.6176 ], [ 3.1615, 43.6177 ], [ 3.1617, 43.6179 ], [ 3.1617, 43.6179 ], [ 3.1621, 43.6177 ], [ 3.1618, 43.6175 ], [ 3.162, 43.6174 ], [ 3.1615, 43.6169 ], [ 3.1614, 43.6168 ], [ 3.1614, 43.6168 ], [ 3.1613, 43.6167 ], [ 3.1613, 43.6167 ], [ 3.1611, 43.6163 ], [ 3.1609, 43.6161 ], [ 3.1609, 43.6161 ], [ 3.1608, 43.6161 ], [ 3.1608, 43.616 ], [ 3.1607, 43.6159 ], [ 3.1608, 43.6158 ], [ 3.1608, 43.6157 ], [ 3.1609, 43.6156 ], [ 3.1609, 43.6156 ], [ 3.1611, 43.6155 ], [ 3.1605, 43.615 ], [ 3.1597, 43.6145 ], [ 3.1596, 43.6144 ], [ 3.1595, 43.6142 ], [ 3.1595, 43.6142 ], [ 3.1593, 43.6141 ], [ 3.1595, 43.614 ], [ 3.1594, 43.6139 ], [ 3.1594, 43.6139 ], [ 3.1594, 43.6139 ], [ 3.1592, 43.6139 ], [ 3.1596, 43.6135 ], [ 3.1592, 43.6132 ], [ 3.159, 43.6131 ], [ 3.1589, 43.6131 ], [ 3.1585, 43.6133 ], [ 3.1583, 43.6134 ], [ 3.1582, 43.6134 ], [ 3.158, 43.6135 ], [ 3.158, 43.6135 ], [ 3.1575, 43.6137 ], [ 3.1576, 43.6139 ], [ 3.1576, 43.6139 ], [ 3.1576, 43.6139 ], [ 3.1577, 43.614 ], [ 3.1571, 43.6143 ], [ 3.1571, 43.6143 ], [ 3.157, 43.6144 ], [ 3.1569, 43.6143 ], [ 3.1569, 43.6143 ], [ 3.1568, 43.6142 ], [ 3.1567, 43.6143 ], [ 3.1566, 43.6142 ], [ 3.1563, 43.6144 ], [ 3.1564, 43.6145 ], [ 3.1565, 43.6147 ], [ 3.1568, 43.6149 ], [ 3.1569, 43.6149 ], [ 3.1569, 43.615 ], [ 3.1569, 43.615 ], [ 3.1569, 43.615 ], [ 3.157, 43.615 ], [ 3.1571, 43.6151 ], [ 3.1573, 43.6151 ], [ 3.1574, 43.6152 ], [ 3.1572, 43.6153 ], [ 3.1572, 43.6156 ], [ 3.1571, 43.6159 ], [ 3.1571, 43.6161 ], [ 3.1562, 43.6161 ], [ 3.1562, 43.6159 ], [ 3.1559, 43.6154 ], [ 3.1557, 43.6154 ], [ 3.1553, 43.6153 ], [ 3.1551, 43.6153 ], [ 3.1547, 43.6152 ], [ 3.1544, 43.6152 ], [ 3.1544, 43.6151 ], [ 3.1536, 43.6154 ], [ 3.1535, 43.6154 ], [ 3.1535, 43.6154 ], [ 3.1537, 43.6156 ], [ 3.1538, 43.6158 ], [ 3.1537, 43.6158 ], [ 3.1535, 43.6159 ], [ 3.1534, 43.6159 ], [ 3.153, 43.6161 ], [ 3.153, 43.6162 ], [ 3.1535, 43.6169 ], [ 3.1536, 43.6168 ], [ 3.1537, 43.617 ], [ 3.1537, 43.6171 ], [ 3.1537, 43.6172 ], [ 3.1539, 43.6173 ], [ 3.1541, 43.6176 ], [ 3.1541, 43.6176 ], [ 3.1543, 43.6175 ], [ 3.1543, 43.6176 ], [ 3.1553, 43.6173 ] ] ], "type": "Polygon" }, "id": "83", "properties": { "code_commune": "34028", "code_departement": "34", "code_qp": "QP034020", "commune_qp": "Bédarieux", "nom_commune": "Bédarieux", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.6053, 43.107, 1.6151, 43.1218 ], "geometry": { "coordinates": [ [ [ 1.6151, 43.108 ], [ 1.6148, 43.108 ], [ 1.6148, 43.1079 ], [ 1.6141, 43.1079 ], [ 1.6144, 43.1073 ], [ 1.6143, 43.1073 ], [ 1.6142, 43.1073 ], [ 1.6141, 43.1073 ], [ 1.614, 43.1072 ], [ 1.6138, 43.1071 ], [ 1.6137, 43.1071 ], [ 1.6135, 43.1071 ], [ 1.6134, 43.107 ], [ 1.6129, 43.1071 ], [ 1.6125, 43.1072 ], [ 1.6123, 43.1073 ], [ 1.6121, 43.1073 ], [ 1.612, 43.1074 ], [ 1.6115, 43.1075 ], [ 1.6109, 43.1077 ], [ 1.6108, 43.1077 ], [ 1.6106, 43.1077 ], [ 1.6099, 43.1077 ], [ 1.6097, 43.1077 ], [ 1.6094, 43.1077 ], [ 1.6089, 43.1077 ], [ 1.6084, 43.1077 ], [ 1.6081, 43.1077 ], [ 1.608, 43.1078 ], [ 1.6078, 43.108 ], [ 1.6073, 43.1085 ], [ 1.6074, 43.109 ], [ 1.6075, 43.1093 ], [ 1.6082, 43.109 ], [ 1.6083, 43.1091 ], [ 1.6089, 43.1088 ], [ 1.6093, 43.1093 ], [ 1.6102, 43.109 ], [ 1.611, 43.1095 ], [ 1.6112, 43.1097 ], [ 1.6116, 43.1102 ], [ 1.6117, 43.1104 ], [ 1.6121, 43.1109 ], [ 1.612, 43.111 ], [ 1.6115, 43.1111 ], [ 1.6114, 43.111 ], [ 1.6113, 43.111 ], [ 1.6113, 43.111 ], [ 1.6109, 43.1111 ], [ 1.6109, 43.1111 ], [ 1.6105, 43.111 ], [ 1.6097, 43.1107 ], [ 1.6096, 43.1107 ], [ 1.6095, 43.1107 ], [ 1.6093, 43.1108 ], [ 1.609, 43.1111 ], [ 1.6092, 43.1111 ], [ 1.6093, 43.1112 ], [ 1.6095, 43.1115 ], [ 1.6096, 43.1115 ], [ 1.6097, 43.1116 ], [ 1.6097, 43.1117 ], [ 1.6097, 43.1118 ], [ 1.6096, 43.112 ], [ 1.6096, 43.1124 ], [ 1.6095, 43.1126 ], [ 1.6085, 43.1126 ], [ 1.6085, 43.1128 ], [ 1.6085, 43.1129 ], [ 1.6085, 43.1131 ], [ 1.6085, 43.1131 ], [ 1.6086, 43.1131 ], [ 1.6087, 43.1131 ], [ 1.6089, 43.1131 ], [ 1.609, 43.113 ], [ 1.6091, 43.1131 ], [ 1.6093, 43.1131 ], [ 1.6094, 43.1131 ], [ 1.6094, 43.1131 ], [ 1.6095, 43.1131 ], [ 1.6095, 43.1132 ], [ 1.6096, 43.1132 ], [ 1.6096, 43.1132 ], [ 1.6097, 43.1132 ], [ 1.6099, 43.1133 ], [ 1.61, 43.1133 ], [ 1.6102, 43.1134 ], [ 1.6104, 43.1134 ], [ 1.6107, 43.1136 ], [ 1.6105, 43.1138 ], [ 1.6102, 43.1139 ], [ 1.6105, 43.1142 ], [ 1.6106, 43.1143 ], [ 1.6106, 43.1144 ], [ 1.6106, 43.1144 ], [ 1.6109, 43.1146 ], [ 1.6108, 43.1147 ], [ 1.6104, 43.1148 ], [ 1.6098, 43.115 ], [ 1.6095, 43.1151 ], [ 1.6097, 43.1153 ], [ 1.6095, 43.1154 ], [ 1.6094, 43.1155 ], [ 1.6094, 43.1156 ], [ 1.6093, 43.1156 ], [ 1.6089, 43.1157 ], [ 1.6087, 43.1153 ], [ 1.6081, 43.1154 ], [ 1.6076, 43.1147 ], [ 1.6072, 43.1145 ], [ 1.607, 43.1144 ], [ 1.6069, 43.1144 ], [ 1.6068, 43.1143 ], [ 1.6068, 43.1143 ], [ 1.6068, 43.1143 ], [ 1.6069, 43.1141 ], [ 1.6066, 43.1139 ], [ 1.6065, 43.1139 ], [ 1.6065, 43.1138 ], [ 1.6064, 43.1137 ], [ 1.6063, 43.1137 ], [ 1.6062, 43.1137 ], [ 1.6061, 43.1137 ], [ 1.6062, 43.1137 ], [ 1.6059, 43.1135 ], [ 1.6057, 43.1135 ], [ 1.6055, 43.1138 ], [ 1.6054, 43.114 ], [ 1.6053, 43.1143 ], [ 1.6054, 43.1144 ], [ 1.6054, 43.1144 ], [ 1.6055, 43.1145 ], [ 1.6055, 43.1145 ], [ 1.6056, 43.1145 ], [ 1.6064, 43.115 ], [ 1.6066, 43.115 ], [ 1.6067, 43.1152 ], [ 1.6069, 43.1154 ], [ 1.607, 43.1156 ], [ 1.6071, 43.1157 ], [ 1.6073, 43.1161 ], [ 1.6074, 43.1164 ], [ 1.6075, 43.1165 ], [ 1.6078, 43.1166 ], [ 1.608, 43.1167 ], [ 1.608, 43.1167 ], [ 1.6082, 43.1166 ], [ 1.6089, 43.1173 ], [ 1.6092, 43.1177 ], [ 1.6094, 43.1178 ], [ 1.6094, 43.1179 ], [ 1.6095, 43.1181 ], [ 1.6095, 43.1182 ], [ 1.6094, 43.1182 ], [ 1.609, 43.1182 ], [ 1.609, 43.1188 ], [ 1.6089, 43.1191 ], [ 1.6088, 43.1193 ], [ 1.6087, 43.1195 ], [ 1.6087, 43.1197 ], [ 1.6088, 43.1198 ], [ 1.609, 43.12 ], [ 1.6098, 43.1206 ], [ 1.6099, 43.1207 ], [ 1.61, 43.1206 ], [ 1.6105, 43.1204 ], [ 1.6109, 43.1203 ], [ 1.6111, 43.1202 ], [ 1.6113, 43.1202 ], [ 1.6115, 43.1203 ], [ 1.6115, 43.1204 ], [ 1.6116, 43.1204 ], [ 1.6116, 43.1207 ], [ 1.6117, 43.1213 ], [ 1.6124, 43.1214 ], [ 1.6125, 43.1215 ], [ 1.6128, 43.1217 ], [ 1.613, 43.1217 ], [ 1.6134, 43.1218 ], [ 1.6133, 43.1217 ], [ 1.6131, 43.1214 ], [ 1.6128, 43.1213 ], [ 1.6131, 43.1209 ], [ 1.6134, 43.1211 ], [ 1.6137, 43.1209 ], [ 1.6141, 43.1207 ], [ 1.614, 43.1207 ], [ 1.6134, 43.1206 ], [ 1.613, 43.1205 ], [ 1.6127, 43.1206 ], [ 1.6125, 43.1206 ], [ 1.6124, 43.1205 ], [ 1.6125, 43.1203 ], [ 1.6125, 43.12 ], [ 1.6129, 43.12 ], [ 1.6124, 43.1194 ], [ 1.6122, 43.1193 ], [ 1.6125, 43.1192 ], [ 1.6125, 43.1191 ], [ 1.6127, 43.119 ], [ 1.613, 43.1188 ], [ 1.6131, 43.1187 ], [ 1.6135, 43.1185 ], [ 1.6136, 43.1185 ], [ 1.6138, 43.1184 ], [ 1.614, 43.1184 ], [ 1.6142, 43.1182 ], [ 1.6145, 43.118 ], [ 1.6147, 43.1178 ], [ 1.6148, 43.1177 ], [ 1.6149, 43.1175 ], [ 1.6149, 43.1174 ], [ 1.6149, 43.1172 ], [ 1.6149, 43.1169 ], [ 1.6148, 43.1165 ], [ 1.6148, 43.1163 ], [ 1.6147, 43.116 ], [ 1.6146, 43.1155 ], [ 1.6145, 43.1151 ], [ 1.6141, 43.1152 ], [ 1.614, 43.1152 ], [ 1.6139, 43.1153 ], [ 1.6138, 43.1153 ], [ 1.6138, 43.1152 ], [ 1.6137, 43.1152 ], [ 1.6134, 43.1153 ], [ 1.6134, 43.1152 ], [ 1.6132, 43.1152 ], [ 1.6132, 43.1152 ], [ 1.6131, 43.1152 ], [ 1.6131, 43.1153 ], [ 1.6129, 43.1153 ], [ 1.6129, 43.1152 ], [ 1.6127, 43.1153 ], [ 1.6127, 43.1151 ], [ 1.6125, 43.1152 ], [ 1.6124, 43.1151 ], [ 1.6124, 43.1151 ], [ 1.6123, 43.1151 ], [ 1.6121, 43.1149 ], [ 1.6119, 43.1146 ], [ 1.6119, 43.1145 ], [ 1.6116, 43.1142 ], [ 1.6117, 43.1142 ], [ 1.6115, 43.1141 ], [ 1.6115, 43.1141 ], [ 1.6115, 43.114 ], [ 1.6114, 43.114 ], [ 1.6115, 43.114 ], [ 1.6112, 43.1138 ], [ 1.6116, 43.1135 ], [ 1.6121, 43.1137 ], [ 1.6122, 43.1135 ], [ 1.6116, 43.1131 ], [ 1.611, 43.1127 ], [ 1.6113, 43.1125 ], [ 1.6116, 43.1124 ], [ 1.612, 43.1121 ], [ 1.612, 43.112 ], [ 1.6125, 43.1118 ], [ 1.6124, 43.1117 ], [ 1.6123, 43.1117 ], [ 1.6122, 43.1117 ], [ 1.6122, 43.1116 ], [ 1.6122, 43.1116 ], [ 1.612, 43.1115 ], [ 1.6123, 43.1113 ], [ 1.613, 43.111 ], [ 1.6132, 43.1109 ], [ 1.6134, 43.1108 ], [ 1.614, 43.1106 ], [ 1.6147, 43.1102 ], [ 1.6147, 43.1102 ], [ 1.6147, 43.1101 ], [ 1.6146, 43.1099 ], [ 1.6145, 43.1098 ], [ 1.6144, 43.1097 ], [ 1.6141, 43.1094 ], [ 1.6138, 43.1091 ], [ 1.6138, 43.1087 ], [ 1.6138, 43.1084 ], [ 1.6139, 43.1084 ], [ 1.6142, 43.1084 ], [ 1.6147, 43.1084 ], [ 1.6148, 43.1084 ], [ 1.6151, 43.108 ] ] ], "type": "Polygon" }, "id": "84", "properties": { "code_commune": "09225", "code_departement": "09", "code_qp": "QP009003", "commune_qp": "Pamiers", "nom_commune": "Pamiers", "nom_qp": "Centre Ancien - La Gloriette" }, "type": "Feature" }, { "bbox": [ 3.4658, 43.3088, 3.4746, 43.3166 ], "geometry": { "coordinates": [ [ [ 3.4736, 43.316 ], [ 3.4736, 43.3158 ], [ 3.4736, 43.3155 ], [ 3.4735, 43.3151 ], [ 3.4734, 43.3147 ], [ 3.4733, 43.3145 ], [ 3.4733, 43.3143 ], [ 3.4732, 43.314 ], [ 3.4735, 43.3139 ], [ 3.4739, 43.3137 ], [ 3.4741, 43.3132 ], [ 3.4741, 43.3131 ], [ 3.474, 43.3131 ], [ 3.474, 43.3131 ], [ 3.4739, 43.3127 ], [ 3.4737, 43.3117 ], [ 3.4746, 43.3116 ], [ 3.4745, 43.3112 ], [ 3.4735, 43.3111 ], [ 3.4739, 43.3107 ], [ 3.4742, 43.3105 ], [ 3.4746, 43.3102 ], [ 3.4745, 43.3102 ], [ 3.4745, 43.3101 ], [ 3.4745, 43.3101 ], [ 3.4741, 43.3102 ], [ 3.4737, 43.3102 ], [ 3.4733, 43.3103 ], [ 3.4733, 43.3102 ], [ 3.4731, 43.3099 ], [ 3.4729, 43.3099 ], [ 3.4725, 43.31 ], [ 3.4721, 43.31 ], [ 3.4718, 43.31 ], [ 3.4718, 43.31 ], [ 3.4718, 43.3091 ], [ 3.4715, 43.3091 ], [ 3.4715, 43.3091 ], [ 3.471, 43.3089 ], [ 3.471, 43.3089 ], [ 3.4708, 43.3088 ], [ 3.4704, 43.3088 ], [ 3.4703, 43.3088 ], [ 3.4702, 43.3088 ], [ 3.4702, 43.3089 ], [ 3.4701, 43.3089 ], [ 3.4701, 43.3089 ], [ 3.47, 43.3089 ], [ 3.47, 43.309 ], [ 3.4699, 43.309 ], [ 3.4699, 43.309 ], [ 3.4699, 43.309 ], [ 3.4698, 43.309 ], [ 3.4697, 43.309 ], [ 3.4696, 43.3089 ], [ 3.4693, 43.3089 ], [ 3.4692, 43.3088 ], [ 3.4691, 43.3088 ], [ 3.469, 43.3088 ], [ 3.4685, 43.309 ], [ 3.4685, 43.309 ], [ 3.4686, 43.3092 ], [ 3.4687, 43.3093 ], [ 3.4687, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4682, 43.3096 ], [ 3.4681, 43.3097 ], [ 3.4681, 43.3097 ], [ 3.4682, 43.3099 ], [ 3.468, 43.3099 ], [ 3.4681, 43.3101 ], [ 3.4681, 43.3102 ], [ 3.4682, 43.3104 ], [ 3.4682, 43.3104 ], [ 3.4682, 43.3105 ], [ 3.4682, 43.3106 ], [ 3.4659, 43.3109 ], [ 3.466, 43.3111 ], [ 3.4658, 43.3112 ], [ 3.4659, 43.3114 ], [ 3.4661, 43.3114 ], [ 3.4661, 43.3116 ], [ 3.4662, 43.3117 ], [ 3.4663, 43.3119 ], [ 3.4666, 43.3122 ], [ 3.4668, 43.3124 ], [ 3.4669, 43.3126 ], [ 3.4669, 43.3126 ], [ 3.4669, 43.3126 ], [ 3.4674, 43.3133 ], [ 3.4675, 43.3134 ], [ 3.4676, 43.3135 ], [ 3.4678, 43.3136 ], [ 3.4682, 43.3138 ], [ 3.4686, 43.314 ], [ 3.4689, 43.3142 ], [ 3.4692, 43.3144 ], [ 3.4694, 43.3145 ], [ 3.4696, 43.3147 ], [ 3.469, 43.3148 ], [ 3.4682, 43.315 ], [ 3.4677, 43.3146 ], [ 3.4668, 43.315 ], [ 3.4666, 43.3151 ], [ 3.4663, 43.3153 ], [ 3.4662, 43.3153 ], [ 3.4664, 43.3154 ], [ 3.4664, 43.3154 ], [ 3.4665, 43.3154 ], [ 3.467, 43.3156 ], [ 3.4672, 43.3155 ], [ 3.4677, 43.3159 ], [ 3.4683, 43.3153 ], [ 3.47, 43.3148 ], [ 3.4704, 43.315 ], [ 3.4706, 43.3151 ], [ 3.4708, 43.3152 ], [ 3.4724, 43.3161 ], [ 3.4726, 43.3164 ], [ 3.4733, 43.3166 ], [ 3.4734, 43.3165 ], [ 3.4734, 43.316 ], [ 3.4736, 43.316 ] ] ], "type": "Polygon" }, "id": "85", "properties": { "code_commune": "34003", "code_departement": "34", "code_qp": "QP034019", "commune_qp": "Agde", "nom_commune": "Agde", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 0.0545, 43.2405, 0.0703, 43.2469 ], "geometry": { "coordinates": [ [ [ 0.0611, 43.2419 ], [ 0.0611, 43.2425 ], [ 0.061, 43.2425 ], [ 0.061, 43.2431 ], [ 0.0614, 43.2431 ], [ 0.0616, 43.2431 ], [ 0.0616, 43.2431 ], [ 0.0615, 43.2433 ], [ 0.0612, 43.2435 ], [ 0.0601, 43.2436 ], [ 0.0595, 43.2436 ], [ 0.0595, 43.2436 ], [ 0.059, 43.2436 ], [ 0.059, 43.2438 ], [ 0.059, 43.2444 ], [ 0.059, 43.2445 ], [ 0.0589, 43.2447 ], [ 0.0589, 43.2449 ], [ 0.0588, 43.2449 ], [ 0.0588, 43.2449 ], [ 0.0582, 43.2449 ], [ 0.0578, 43.2449 ], [ 0.0568, 43.2449 ], [ 0.0568, 43.245 ], [ 0.0565, 43.2449 ], [ 0.0559, 43.2449 ], [ 0.0559, 43.245 ], [ 0.0559, 43.2453 ], [ 0.0559, 43.2454 ], [ 0.0558, 43.2455 ], [ 0.0557, 43.2455 ], [ 0.0556, 43.2455 ], [ 0.0555, 43.2455 ], [ 0.0553, 43.2454 ], [ 0.0553, 43.2454 ], [ 0.0553, 43.2453 ], [ 0.0553, 43.2451 ], [ 0.0553, 43.245 ], [ 0.0553, 43.2449 ], [ 0.0552, 43.2449 ], [ 0.0552, 43.2448 ], [ 0.0551, 43.2447 ], [ 0.0548, 43.2446 ], [ 0.0547, 43.2446 ], [ 0.0546, 43.2458 ], [ 0.0546, 43.2459 ], [ 0.0545, 43.2459 ], [ 0.0545, 43.2461 ], [ 0.0545, 43.2463 ], [ 0.0546, 43.2466 ], [ 0.055, 43.2469 ], [ 0.0557, 43.2468 ], [ 0.0558, 43.2461 ], [ 0.0558, 43.2461 ], [ 0.0558, 43.2456 ], [ 0.0559, 43.2455 ], [ 0.0559, 43.2455 ], [ 0.056, 43.2455 ], [ 0.0561, 43.2457 ], [ 0.0562, 43.2459 ], [ 0.0563, 43.2459 ], [ 0.0565, 43.246 ], [ 0.057, 43.246 ], [ 0.0574, 43.2461 ], [ 0.0576, 43.2459 ], [ 0.0577, 43.2458 ], [ 0.058, 43.2456 ], [ 0.0583, 43.2454 ], [ 0.0586, 43.2452 ], [ 0.059, 43.2449 ], [ 0.0591, 43.245 ], [ 0.0595, 43.2452 ], [ 0.0602, 43.2445 ], [ 0.0609, 43.2438 ], [ 0.061, 43.2439 ], [ 0.0611, 43.2439 ], [ 0.0614, 43.2439 ], [ 0.0614, 43.244 ], [ 0.0615, 43.244 ], [ 0.0615, 43.2442 ], [ 0.0614, 43.2456 ], [ 0.0613, 43.2459 ], [ 0.0614, 43.2459 ], [ 0.0625, 43.2465 ], [ 0.0627, 43.2466 ], [ 0.0628, 43.2466 ], [ 0.0633, 43.2466 ], [ 0.0646, 43.2466 ], [ 0.0651, 43.2467 ], [ 0.0656, 43.2456 ], [ 0.0657, 43.2456 ], [ 0.0667, 43.2458 ], [ 0.0667, 43.2457 ], [ 0.0668, 43.2458 ], [ 0.0674, 43.2458 ], [ 0.0679, 43.2459 ], [ 0.0684, 43.2459 ], [ 0.0684, 43.2459 ], [ 0.0684, 43.2458 ], [ 0.0684, 43.2458 ], [ 0.0685, 43.2457 ], [ 0.0687, 43.2457 ], [ 0.0689, 43.2456 ], [ 0.0691, 43.2454 ], [ 0.0686, 43.245 ], [ 0.0686, 43.245 ], [ 0.0683, 43.2449 ], [ 0.0684, 43.2449 ], [ 0.0684, 43.2447 ], [ 0.0685, 43.2446 ], [ 0.0685, 43.2445 ], [ 0.0685, 43.2442 ], [ 0.0685, 43.2441 ], [ 0.0693, 43.2442 ], [ 0.07, 43.2442 ], [ 0.0701, 43.2437 ], [ 0.0701, 43.2436 ], [ 0.0702, 43.2434 ], [ 0.0703, 43.243 ], [ 0.0703, 43.2429 ], [ 0.0703, 43.2426 ], [ 0.0697, 43.2426 ], [ 0.0696, 43.2425 ], [ 0.0696, 43.2426 ], [ 0.0695, 43.2426 ], [ 0.0694, 43.2426 ], [ 0.0694, 43.2427 ], [ 0.0694, 43.2427 ], [ 0.0692, 43.243 ], [ 0.069, 43.2431 ], [ 0.069, 43.2432 ], [ 0.069, 43.2432 ], [ 0.069, 43.2432 ], [ 0.069, 43.2433 ], [ 0.069, 43.2434 ], [ 0.0682, 43.2433 ], [ 0.0683, 43.243 ], [ 0.0683, 43.2425 ], [ 0.0683, 43.2425 ], [ 0.0683, 43.2424 ], [ 0.0683, 43.2419 ], [ 0.0674, 43.2419 ], [ 0.0674, 43.2415 ], [ 0.0672, 43.2415 ], [ 0.0671, 43.2417 ], [ 0.0667, 43.2422 ], [ 0.0667, 43.2423 ], [ 0.0659, 43.2423 ], [ 0.0657, 43.2423 ], [ 0.0656, 43.2425 ], [ 0.0641, 43.2424 ], [ 0.064, 43.2424 ], [ 0.0639, 43.2425 ], [ 0.0638, 43.2425 ], [ 0.0635, 43.2428 ], [ 0.063, 43.2426 ], [ 0.0625, 43.2423 ], [ 0.0627, 43.2421 ], [ 0.0626, 43.242 ], [ 0.0626, 43.2421 ], [ 0.0621, 43.2421 ], [ 0.0621, 43.242 ], [ 0.062, 43.242 ], [ 0.0619, 43.242 ], [ 0.0617, 43.242 ], [ 0.0616, 43.242 ], [ 0.0616, 43.2405 ], [ 0.0612, 43.2405 ], [ 0.0609, 43.2405 ], [ 0.0603, 43.2406 ], [ 0.0597, 43.2407 ], [ 0.0591, 43.2408 ], [ 0.0588, 43.2408 ], [ 0.0587, 43.2409 ], [ 0.059, 43.2416 ], [ 0.0591, 43.2418 ], [ 0.0591, 43.242 ], [ 0.0591, 43.242 ], [ 0.0595, 43.2419 ], [ 0.0597, 43.2419 ], [ 0.0601, 43.2419 ], [ 0.0611, 43.2418 ], [ 0.0611, 43.2419 ] ] ], "type": "Polygon" }, "id": "86", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065002", "commune_qp": "Tarbes", "nom_commune": "Tarbes", "nom_qp": "Tarbes Nord" }, "type": "Feature" }, { "bbox": [ 1.8884, 43.8981, 1.9055, 43.91 ], "geometry": { "coordinates": [ [ [ 1.8974, 43.9039 ], [ 1.8973, 43.9038 ], [ 1.8973, 43.9038 ], [ 1.8972, 43.9038 ], [ 1.8972, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8972, 43.9035 ], [ 1.8972, 43.9034 ], [ 1.8965, 43.9033 ], [ 1.8963, 43.9033 ], [ 1.8962, 43.9032 ], [ 1.8961, 43.9031 ], [ 1.8959, 43.903 ], [ 1.8957, 43.9029 ], [ 1.8956, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8954, 43.9029 ], [ 1.8953, 43.9029 ], [ 1.8952, 43.9028 ], [ 1.8951, 43.9028 ], [ 1.8951, 43.9028 ], [ 1.895, 43.9028 ], [ 1.8949, 43.9028 ], [ 1.8948, 43.903 ], [ 1.8946, 43.9029 ], [ 1.8944, 43.9028 ], [ 1.8945, 43.9027 ], [ 1.8941, 43.9025 ], [ 1.8939, 43.9024 ], [ 1.8936, 43.9024 ], [ 1.8934, 43.9023 ], [ 1.8933, 43.9023 ], [ 1.8934, 43.9021 ], [ 1.8932, 43.9021 ], [ 1.8927, 43.9022 ], [ 1.8923, 43.9023 ], [ 1.8923, 43.902 ], [ 1.8922, 43.902 ], [ 1.8922, 43.9018 ], [ 1.8922, 43.9015 ], [ 1.8921, 43.9014 ], [ 1.8921, 43.9012 ], [ 1.8922, 43.9008 ], [ 1.8922, 43.9007 ], [ 1.8923, 43.9005 ], [ 1.8924, 43.9004 ], [ 1.8922, 43.9002 ], [ 1.8919, 43.9 ], [ 1.8918, 43.9001 ], [ 1.8916, 43.9002 ], [ 1.8914, 43.9003 ], [ 1.8912, 43.9004 ], [ 1.891, 43.9006 ], [ 1.8909, 43.9006 ], [ 1.8908, 43.9006 ], [ 1.8906, 43.9006 ], [ 1.8905, 43.9006 ], [ 1.8906, 43.9005 ], [ 1.8907, 43.9005 ], [ 1.8909, 43.9003 ], [ 1.8911, 43.9002 ], [ 1.8912, 43.9001 ], [ 1.8912, 43.9 ], [ 1.8912, 43.8999 ], [ 1.8912, 43.8998 ], [ 1.8913, 43.8997 ], [ 1.8913, 43.8996 ], [ 1.8915, 43.8994 ], [ 1.8915, 43.8994 ], [ 1.8916, 43.8993 ], [ 1.8917, 43.8993 ], [ 1.8919, 43.8992 ], [ 1.8921, 43.899 ], [ 1.8925, 43.8987 ], [ 1.8919, 43.8987 ], [ 1.8915, 43.8986 ], [ 1.8913, 43.8985 ], [ 1.8911, 43.8985 ], [ 1.8907, 43.8984 ], [ 1.8906, 43.8982 ], [ 1.8905, 43.8982 ], [ 1.8903, 43.8981 ], [ 1.89, 43.8981 ], [ 1.8899, 43.8983 ], [ 1.8897, 43.8986 ], [ 1.8894, 43.8989 ], [ 1.8892, 43.899 ], [ 1.889, 43.8992 ], [ 1.889, 43.8992 ], [ 1.8887, 43.8996 ], [ 1.8889, 43.8998 ], [ 1.8884, 43.9003 ], [ 1.8898, 43.9015 ], [ 1.8902, 43.9018 ], [ 1.8906, 43.9022 ], [ 1.8906, 43.9022 ], [ 1.8907, 43.9024 ], [ 1.8909, 43.9026 ], [ 1.8909, 43.9026 ], [ 1.8911, 43.9027 ], [ 1.8912, 43.9027 ], [ 1.8913, 43.9028 ], [ 1.8913, 43.9029 ], [ 1.8914, 43.903 ], [ 1.8915, 43.9032 ], [ 1.8916, 43.9033 ], [ 1.8917, 43.9034 ], [ 1.8918, 43.9035 ], [ 1.8921, 43.9035 ], [ 1.8927, 43.9037 ], [ 1.8928, 43.9037 ], [ 1.893, 43.9038 ], [ 1.893, 43.9039 ], [ 1.8931, 43.904 ], [ 1.8931, 43.9041 ], [ 1.8931, 43.9042 ], [ 1.8931, 43.9043 ], [ 1.893, 43.9046 ], [ 1.893, 43.9047 ], [ 1.8931, 43.9049 ], [ 1.8939, 43.9049 ], [ 1.8942, 43.9049 ], [ 1.8946, 43.9048 ], [ 1.8949, 43.9048 ], [ 1.8956, 43.9048 ], [ 1.8957, 43.9048 ], [ 1.8959, 43.9048 ], [ 1.896, 43.9049 ], [ 1.8961, 43.9049 ], [ 1.896, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8968, 43.9049 ], [ 1.8968, 43.9049 ], [ 1.8969, 43.9049 ], [ 1.8969, 43.9046 ], [ 1.8969, 43.9046 ], [ 1.8971, 43.9046 ], [ 1.8973, 43.9046 ], [ 1.8973, 43.9047 ], [ 1.8975, 43.9047 ], [ 1.8977, 43.9047 ], [ 1.8978, 43.9048 ], [ 1.8979, 43.9048 ], [ 1.8979, 43.9049 ], [ 1.8981, 43.9051 ], [ 1.8981, 43.9052 ], [ 1.8987, 43.9063 ], [ 1.9006, 43.9058 ], [ 1.9008, 43.906 ], [ 1.9014, 43.9068 ], [ 1.9016, 43.9072 ], [ 1.9019, 43.9075 ], [ 1.902, 43.9076 ], [ 1.9021, 43.9078 ], [ 1.9023, 43.9083 ], [ 1.9027, 43.9089 ], [ 1.9031, 43.9094 ], [ 1.9035, 43.9099 ], [ 1.9036, 43.91 ], [ 1.9036, 43.91 ], [ 1.9037, 43.91 ], [ 1.9043, 43.9094 ], [ 1.9052, 43.9087 ], [ 1.9055, 43.9084 ], [ 1.9042, 43.9062 ], [ 1.9041, 43.9061 ], [ 1.904, 43.9061 ], [ 1.9038, 43.9061 ], [ 1.9037, 43.9061 ], [ 1.9035, 43.9061 ], [ 1.9033, 43.9061 ], [ 1.9032, 43.9061 ], [ 1.9031, 43.9061 ], [ 1.9028, 43.906 ], [ 1.9022, 43.9058 ], [ 1.9016, 43.9056 ], [ 1.9012, 43.9055 ], [ 1.9008, 43.9054 ], [ 1.9004, 43.9053 ], [ 1.9001, 43.9052 ], [ 1.8993, 43.9051 ], [ 1.8992, 43.9051 ], [ 1.8987, 43.905 ], [ 1.8984, 43.905 ], [ 1.8983, 43.9049 ], [ 1.8982, 43.9049 ], [ 1.898, 43.9049 ], [ 1.898, 43.9049 ], [ 1.898, 43.9048 ], [ 1.8979, 43.9048 ], [ 1.8978, 43.9047 ], [ 1.8978, 43.9046 ], [ 1.8977, 43.9045 ], [ 1.8974, 43.9039 ] ] ], "type": "Polygon" }, "id": "87", "properties": { "code_commune": "81099", "code_departement": "81", "code_qp": "QP081010", "commune_qp": "Gaillac", "nom_commune": "Gaillac", "nom_qp": "Lentajou - Catalanis" }, "type": "Feature" }, { "bbox": [ 0.5908, 43.6323, 0.5997, 43.6392 ], "geometry": { "coordinates": [ [ [ 0.5963, 43.6372 ], [ 0.5963, 43.6371 ], [ 0.5964, 43.637 ], [ 0.5963, 43.6369 ], [ 0.5961, 43.6356 ], [ 0.5959, 43.6349 ], [ 0.5959, 43.6347 ], [ 0.5959, 43.6345 ], [ 0.5958, 43.6344 ], [ 0.5956, 43.6342 ], [ 0.5953, 43.6337 ], [ 0.595, 43.6333 ], [ 0.5948, 43.633 ], [ 0.5947, 43.6329 ], [ 0.5944, 43.6326 ], [ 0.5942, 43.6325 ], [ 0.5938, 43.6324 ], [ 0.5932, 43.6323 ], [ 0.593, 43.6323 ], [ 0.5928, 43.6323 ], [ 0.5926, 43.6323 ], [ 0.5924, 43.6323 ], [ 0.5921, 43.6324 ], [ 0.5922, 43.6327 ], [ 0.5921, 43.6327 ], [ 0.592, 43.6328 ], [ 0.5923, 43.6339 ], [ 0.5921, 43.6339 ], [ 0.5921, 43.6342 ], [ 0.5922, 43.6342 ], [ 0.5914, 43.6343 ], [ 0.5915, 43.6347 ], [ 0.5914, 43.6347 ], [ 0.5915, 43.6349 ], [ 0.5914, 43.6349 ], [ 0.5915, 43.6352 ], [ 0.5909, 43.6353 ], [ 0.5908, 43.6353 ], [ 0.5908, 43.6353 ], [ 0.5911, 43.636 ], [ 0.5911, 43.6361 ], [ 0.5913, 43.636 ], [ 0.5916, 43.636 ], [ 0.5919, 43.6359 ], [ 0.592, 43.6363 ], [ 0.5925, 43.6363 ], [ 0.5925, 43.6363 ], [ 0.5929, 43.6362 ], [ 0.5931, 43.6367 ], [ 0.5931, 43.6367 ], [ 0.5933, 43.6372 ], [ 0.5932, 43.6373 ], [ 0.5933, 43.6375 ], [ 0.5934, 43.6376 ], [ 0.5939, 43.6375 ], [ 0.5941, 43.6381 ], [ 0.5941, 43.6382 ], [ 0.5946, 43.6381 ], [ 0.5949, 43.6379 ], [ 0.5957, 43.6375 ], [ 0.5961, 43.6373 ], [ 0.5964, 43.6376 ], [ 0.5966, 43.6375 ], [ 0.5967, 43.6375 ], [ 0.5968, 43.6376 ], [ 0.5967, 43.6377 ], [ 0.5972, 43.6381 ], [ 0.596, 43.6386 ], [ 0.5961, 43.6386 ], [ 0.5962, 43.6387 ], [ 0.5966, 43.639 ], [ 0.5968, 43.6391 ], [ 0.5969, 43.6392 ], [ 0.5975, 43.6389 ], [ 0.5977, 43.6389 ], [ 0.5982, 43.6386 ], [ 0.598, 43.6381 ], [ 0.5981, 43.6381 ], [ 0.5983, 43.6381 ], [ 0.5983, 43.6379 ], [ 0.5985, 43.6378 ], [ 0.5989, 43.6376 ], [ 0.5991, 43.6374 ], [ 0.5993, 43.6373 ], [ 0.5994, 43.6371 ], [ 0.5995, 43.6369 ], [ 0.5996, 43.6366 ], [ 0.5997, 43.6366 ], [ 0.5997, 43.6365 ], [ 0.5997, 43.6364 ], [ 0.5997, 43.6363 ], [ 0.5994, 43.6364 ], [ 0.5994, 43.6364 ], [ 0.5992, 43.6363 ], [ 0.5989, 43.6361 ], [ 0.5988, 43.6362 ], [ 0.5985, 43.6363 ], [ 0.5981, 43.6365 ], [ 0.5978, 43.6366 ], [ 0.5974, 43.6367 ], [ 0.5971, 43.6368 ], [ 0.5969, 43.6369 ], [ 0.5967, 43.6371 ], [ 0.5966, 43.6371 ], [ 0.5964, 43.6372 ], [ 0.5964, 43.6372 ], [ 0.5963, 43.6372 ] ] ], "type": "Polygon" }, "id": "88", "properties": { "code_commune": "32013", "code_departement": "32", "code_qp": "QP032001", "commune_qp": "Auch", "nom_commune": "Auch", "nom_qp": "Grand Garros" }, "type": "Feature" }, { "bbox": [ 3.2468, 43.3314, 3.2605, 43.3417 ], "geometry": { "coordinates": [ [ [ 3.259, 43.3402 ], [ 3.2587, 43.34 ], [ 3.2587, 43.34 ], [ 3.2586, 43.34 ], [ 3.2584, 43.3401 ], [ 3.2583, 43.3402 ], [ 3.2583, 43.3401 ], [ 3.2583, 43.3399 ], [ 3.2582, 43.3396 ], [ 3.2581, 43.3391 ], [ 3.2573, 43.3393 ], [ 3.257, 43.3389 ], [ 3.257, 43.3388 ], [ 3.2568, 43.3384 ], [ 3.2567, 43.3383 ], [ 3.2569, 43.3379 ], [ 3.2571, 43.338 ], [ 3.2574, 43.3377 ], [ 3.2578, 43.3378 ], [ 3.2579, 43.3379 ], [ 3.258, 43.3379 ], [ 3.2579, 43.3378 ], [ 3.2583, 43.3373 ], [ 3.2583, 43.3373 ], [ 3.2584, 43.3372 ], [ 3.2584, 43.3372 ], [ 3.2587, 43.3369 ], [ 3.2589, 43.3366 ], [ 3.2589, 43.3366 ], [ 3.2589, 43.3364 ], [ 3.2588, 43.336 ], [ 3.2596, 43.3359 ], [ 3.2599, 43.3358 ], [ 3.26, 43.3357 ], [ 3.2602, 43.3356 ], [ 3.2603, 43.3355 ], [ 3.2604, 43.3354 ], [ 3.2604, 43.3353 ], [ 3.2605, 43.3351 ], [ 3.2595, 43.3351 ], [ 3.2595, 43.3348 ], [ 3.2589, 43.3348 ], [ 3.2586, 43.3348 ], [ 3.2586, 43.3348 ], [ 3.2585, 43.335 ], [ 3.2585, 43.3352 ], [ 3.2584, 43.3352 ], [ 3.2578, 43.3352 ], [ 3.2575, 43.3353 ], [ 3.2574, 43.3352 ], [ 3.2573, 43.3352 ], [ 3.2569, 43.3352 ], [ 3.2567, 43.3352 ], [ 3.2567, 43.3353 ], [ 3.2566, 43.3349 ], [ 3.2567, 43.3348 ], [ 3.2567, 43.334 ], [ 3.2566, 43.3336 ], [ 3.2565, 43.3336 ], [ 3.2561, 43.3336 ], [ 3.2557, 43.3336 ], [ 3.2554, 43.3336 ], [ 3.2552, 43.3336 ], [ 3.2549, 43.3336 ], [ 3.2542, 43.3336 ], [ 3.2537, 43.3336 ], [ 3.2528, 43.3336 ], [ 3.2524, 43.3336 ], [ 3.2522, 43.3336 ], [ 3.252, 43.3336 ], [ 3.2519, 43.3336 ], [ 3.2514, 43.3336 ], [ 3.2513, 43.3336 ], [ 3.2512, 43.3336 ], [ 3.2508, 43.3336 ], [ 3.2506, 43.3333 ], [ 3.2506, 43.3333 ], [ 3.2506, 43.3332 ], [ 3.2506, 43.3331 ], [ 3.2506, 43.3329 ], [ 3.2506, 43.3328 ], [ 3.2506, 43.3326 ], [ 3.2506, 43.3325 ], [ 3.2506, 43.3321 ], [ 3.2506, 43.3318 ], [ 3.2506, 43.3317 ], [ 3.2506, 43.3315 ], [ 3.2506, 43.3315 ], [ 3.2505, 43.3315 ], [ 3.2505, 43.3314 ], [ 3.2498, 43.3314 ], [ 3.2495, 43.3314 ], [ 3.2493, 43.3314 ], [ 3.2491, 43.3315 ], [ 3.2491, 43.3317 ], [ 3.2488, 43.3318 ], [ 3.2488, 43.3319 ], [ 3.2487, 43.3319 ], [ 3.2487, 43.332 ], [ 3.2487, 43.3321 ], [ 3.2487, 43.3321 ], [ 3.2487, 43.3322 ], [ 3.2488, 43.3323 ], [ 3.2488, 43.3323 ], [ 3.2487, 43.3323 ], [ 3.2485, 43.3325 ], [ 3.2485, 43.3326 ], [ 3.2486, 43.3327 ], [ 3.2485, 43.3328 ], [ 3.2485, 43.3328 ], [ 3.2484, 43.3328 ], [ 3.2484, 43.3329 ], [ 3.2483, 43.3329 ], [ 3.2482, 43.3328 ], [ 3.2482, 43.3328 ], [ 3.2479, 43.3328 ], [ 3.2474, 43.3328 ], [ 3.2474, 43.3328 ], [ 3.2473, 43.3329 ], [ 3.2473, 43.333 ], [ 3.2472, 43.333 ], [ 3.2472, 43.3331 ], [ 3.2472, 43.3332 ], [ 3.2472, 43.3333 ], [ 3.2472, 43.3333 ], [ 3.2471, 43.3336 ], [ 3.2471, 43.3338 ], [ 3.2471, 43.334 ], [ 3.2471, 43.3342 ], [ 3.2471, 43.3343 ], [ 3.247, 43.3345 ], [ 3.247, 43.3346 ], [ 3.247, 43.3347 ], [ 3.247, 43.3348 ], [ 3.2471, 43.3349 ], [ 3.2471, 43.3349 ], [ 3.2472, 43.335 ], [ 3.2471, 43.335 ], [ 3.2472, 43.3351 ], [ 3.2468, 43.3352 ], [ 3.2468, 43.3352 ], [ 3.2468, 43.3357 ], [ 3.247, 43.3357 ], [ 3.247, 43.3357 ], [ 3.247, 43.3359 ], [ 3.2475, 43.3359 ], [ 3.2477, 43.3359 ], [ 3.2478, 43.3359 ], [ 3.2478, 43.3358 ], [ 3.2477, 43.3357 ], [ 3.2476, 43.3355 ], [ 3.2475, 43.3353 ], [ 3.2474, 43.3351 ], [ 3.2473, 43.3349 ], [ 3.2472, 43.3349 ], [ 3.2478, 43.3347 ], [ 3.2481, 43.3346 ], [ 3.2484, 43.3345 ], [ 3.2484, 43.3344 ], [ 3.2484, 43.3342 ], [ 3.249, 43.3342 ], [ 3.2493, 43.3341 ], [ 3.2494, 43.334 ], [ 3.2496, 43.334 ], [ 3.2497, 43.3339 ], [ 3.2498, 43.3339 ], [ 3.2499, 43.3339 ], [ 3.25, 43.3339 ], [ 3.2501, 43.3339 ], [ 3.2502, 43.3341 ], [ 3.2502, 43.3342 ], [ 3.2502, 43.3343 ], [ 3.2502, 43.3348 ], [ 3.2502, 43.3352 ], [ 3.2502, 43.3354 ], [ 3.2502, 43.3356 ], [ 3.2502, 43.3356 ], [ 3.2501, 43.3357 ], [ 3.2501, 43.3359 ], [ 3.2501, 43.3365 ], [ 3.2501, 43.3365 ], [ 3.2501, 43.3366 ], [ 3.2502, 43.3366 ], [ 3.2503, 43.3366 ], [ 3.2504, 43.3366 ], [ 3.2504, 43.337 ], [ 3.2502, 43.3371 ], [ 3.2502, 43.337 ], [ 3.2502, 43.3371 ], [ 3.2502, 43.3372 ], [ 3.2496, 43.3374 ], [ 3.2492, 43.3376 ], [ 3.2494, 43.3378 ], [ 3.2495, 43.3379 ], [ 3.2495, 43.3379 ], [ 3.2496, 43.3379 ], [ 3.25, 43.3379 ], [ 3.2501, 43.3379 ], [ 3.2502, 43.3379 ], [ 3.2502, 43.3379 ], [ 3.2503, 43.3379 ], [ 3.2505, 43.3379 ], [ 3.2507, 43.338 ], [ 3.2509, 43.338 ], [ 3.251, 43.338 ], [ 3.251, 43.338 ], [ 3.2511, 43.3381 ], [ 3.2516, 43.3387 ], [ 3.2521, 43.3393 ], [ 3.2523, 43.3392 ], [ 3.2527, 43.3391 ], [ 3.2527, 43.3391 ], [ 3.2527, 43.339 ], [ 3.2529, 43.339 ], [ 3.253, 43.339 ], [ 3.2532, 43.3389 ], [ 3.2533, 43.3388 ], [ 3.2534, 43.3387 ], [ 3.2534, 43.3387 ], [ 3.2536, 43.3386 ], [ 3.2537, 43.3384 ], [ 3.2538, 43.3384 ], [ 3.2539, 43.3382 ], [ 3.2541, 43.338 ], [ 3.2542, 43.338 ], [ 3.2542, 43.3379 ], [ 3.2547, 43.3374 ], [ 3.2547, 43.3374 ], [ 3.2549, 43.3374 ], [ 3.2556, 43.3378 ], [ 3.2556, 43.3381 ], [ 3.2557, 43.3392 ], [ 3.2557, 43.3393 ], [ 3.2557, 43.3394 ], [ 3.2557, 43.3395 ], [ 3.2558, 43.3399 ], [ 3.2559, 43.3411 ], [ 3.2559, 43.3414 ], [ 3.2559, 43.3415 ], [ 3.2563, 43.3415 ], [ 3.2569, 43.3415 ], [ 3.2574, 43.3416 ], [ 3.258, 43.3417 ], [ 3.2584, 43.3417 ], [ 3.2585, 43.3417 ], [ 3.2586, 43.3415 ], [ 3.2586, 43.3414 ], [ 3.2587, 43.3411 ], [ 3.2588, 43.3408 ], [ 3.2591, 43.3403 ], [ 3.259, 43.3402 ] ] ], "type": "Polygon" }, "id": "89", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034003", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Devèze" }, "type": "Feature" }, { "bbox": [ 1.3182, 43.4559, 1.3307, 43.4649 ], "geometry": { "coordinates": [ [ [ 1.321, 43.464 ], [ 1.3214, 43.4638 ], [ 1.3218, 43.4638 ], [ 1.3214, 43.4627 ], [ 1.3218, 43.4626 ], [ 1.3221, 43.4624 ], [ 1.3227, 43.4622 ], [ 1.3229, 43.4625 ], [ 1.3234, 43.4628 ], [ 1.3246, 43.4624 ], [ 1.3248, 43.4624 ], [ 1.3252, 43.4622 ], [ 1.3254, 43.4622 ], [ 1.3256, 43.4622 ], [ 1.326, 43.4621 ], [ 1.3262, 43.4621 ], [ 1.3263, 43.4621 ], [ 1.3263, 43.4618 ], [ 1.3262, 43.4614 ], [ 1.3262, 43.4614 ], [ 1.3265, 43.4614 ], [ 1.3265, 43.4614 ], [ 1.327, 43.4613 ], [ 1.3272, 43.4613 ], [ 1.3276, 43.4612 ], [ 1.3283, 43.4611 ], [ 1.3289, 43.461 ], [ 1.3289, 43.461 ], [ 1.3291, 43.4611 ], [ 1.3292, 43.4611 ], [ 1.3294, 43.4612 ], [ 1.33, 43.4614 ], [ 1.3301, 43.4612 ], [ 1.3303, 43.4612 ], [ 1.3304, 43.4612 ], [ 1.3305, 43.4612 ], [ 1.3305, 43.4612 ], [ 1.3307, 43.4611 ], [ 1.3301, 43.4608 ], [ 1.3299, 43.4607 ], [ 1.3296, 43.4606 ], [ 1.3292, 43.4605 ], [ 1.329, 43.4605 ], [ 1.3288, 43.4603 ], [ 1.3287, 43.4602 ], [ 1.3286, 43.4601 ], [ 1.3285, 43.4601 ], [ 1.3281, 43.4598 ], [ 1.3277, 43.4595 ], [ 1.3275, 43.4594 ], [ 1.3275, 43.4594 ], [ 1.3275, 43.4593 ], [ 1.3275, 43.4593 ], [ 1.3274, 43.4592 ], [ 1.3275, 43.4592 ], [ 1.327, 43.4587 ], [ 1.3266, 43.4586 ], [ 1.3262, 43.458 ], [ 1.3262, 43.4579 ], [ 1.3261, 43.4578 ], [ 1.3259, 43.4575 ], [ 1.3258, 43.4573 ], [ 1.3257, 43.4573 ], [ 1.3256, 43.4573 ], [ 1.3254, 43.4573 ], [ 1.3253, 43.457 ], [ 1.3253, 43.4568 ], [ 1.3252, 43.4567 ], [ 1.3252, 43.4565 ], [ 1.3252, 43.4564 ], [ 1.325, 43.4562 ], [ 1.3249, 43.4561 ], [ 1.3249, 43.456 ], [ 1.3247, 43.4559 ], [ 1.3234, 43.4563 ], [ 1.3236, 43.4566 ], [ 1.3238, 43.4568 ], [ 1.3241, 43.4572 ], [ 1.3246, 43.4576 ], [ 1.3255, 43.4583 ], [ 1.3262, 43.4589 ], [ 1.3262, 43.459 ], [ 1.3262, 43.459 ], [ 1.3257, 43.4594 ], [ 1.3254, 43.4597 ], [ 1.325, 43.46 ], [ 1.3246, 43.4603 ], [ 1.3246, 43.4605 ], [ 1.3245, 43.4606 ], [ 1.3247, 43.4607 ], [ 1.3246, 43.4609 ], [ 1.3246, 43.4609 ], [ 1.3245, 43.461 ], [ 1.3245, 43.461 ], [ 1.3244, 43.4611 ], [ 1.3244, 43.4612 ], [ 1.3242, 43.4614 ], [ 1.3241, 43.4614 ], [ 1.3241, 43.4614 ], [ 1.324, 43.4614 ], [ 1.3239, 43.4615 ], [ 1.3236, 43.4615 ], [ 1.3233, 43.4615 ], [ 1.3232, 43.4615 ], [ 1.323, 43.4616 ], [ 1.323, 43.4616 ], [ 1.3226, 43.4618 ], [ 1.3226, 43.4617 ], [ 1.3223, 43.4618 ], [ 1.3216, 43.462 ], [ 1.3215, 43.4623 ], [ 1.3212, 43.4622 ], [ 1.3208, 43.4621 ], [ 1.3201, 43.4619 ], [ 1.32, 43.4618 ], [ 1.3202, 43.4613 ], [ 1.3202, 43.4613 ], [ 1.3201, 43.4613 ], [ 1.3201, 43.4612 ], [ 1.3202, 43.461 ], [ 1.3198, 43.4609 ], [ 1.3192, 43.4613 ], [ 1.319, 43.4616 ], [ 1.3194, 43.4617 ], [ 1.3199, 43.4618 ], [ 1.32, 43.4619 ], [ 1.3201, 43.4624 ], [ 1.3201, 43.4628 ], [ 1.3209, 43.4628 ], [ 1.321, 43.4628 ], [ 1.3207, 43.4629 ], [ 1.3201, 43.4632 ], [ 1.3193, 43.4636 ], [ 1.3192, 43.4637 ], [ 1.3187, 43.4638 ], [ 1.3182, 43.4639 ], [ 1.3185, 43.4646 ], [ 1.3198, 43.4649 ], [ 1.3203, 43.4647 ], [ 1.3203, 43.4647 ], [ 1.3203, 43.4646 ], [ 1.3212, 43.4644 ], [ 1.321, 43.464 ] ] ], "type": "Polygon" }, "id": "90", "properties": { "code_commune": "31395", "code_departement": "31", "code_qp": "QP031002", "commune_qp": "Muret", "nom_commune": "Muret", "nom_qp": "Centre Ouest" }, "type": "Feature" }, { "bbox": [ 2.9064, 42.6896, 2.9104, 42.6948 ], "geometry": { "coordinates": [ [ [ 2.9104, 42.6943 ], [ 2.9102, 42.6942 ], [ 2.9089, 42.6926 ], [ 2.908, 42.6915 ], [ 2.9077, 42.6912 ], [ 2.9078, 42.6912 ], [ 2.908, 42.691 ], [ 2.909, 42.6906 ], [ 2.9089, 42.6906 ], [ 2.9088, 42.6905 ], [ 2.9073, 42.6896 ], [ 2.907, 42.6899 ], [ 2.9075, 42.6904 ], [ 2.9077, 42.6905 ], [ 2.908, 42.6909 ], [ 2.9077, 42.6911 ], [ 2.9075, 42.6912 ], [ 2.9069, 42.6915 ], [ 2.9065, 42.6917 ], [ 2.9064, 42.6919 ], [ 2.9064, 42.6921 ], [ 2.9065, 42.6927 ], [ 2.9066, 42.6928 ], [ 2.9066, 42.6929 ], [ 2.9066, 42.6929 ], [ 2.9072, 42.6936 ], [ 2.9072, 42.6937 ], [ 2.9073, 42.6938 ], [ 2.9073, 42.6938 ], [ 2.9073, 42.6938 ], [ 2.9072, 42.6938 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9071, 42.694 ], [ 2.907, 42.694 ], [ 2.9069, 42.6941 ], [ 2.9068, 42.6941 ], [ 2.9068, 42.6942 ], [ 2.9068, 42.6942 ], [ 2.9067, 42.6942 ], [ 2.9067, 42.6945 ], [ 2.9066, 42.6947 ], [ 2.9067, 42.6948 ], [ 2.9069, 42.6948 ], [ 2.9069, 42.6948 ], [ 2.907, 42.6948 ], [ 2.9071, 42.6948 ], [ 2.9079, 42.6948 ], [ 2.908, 42.6948 ], [ 2.9082, 42.6948 ], [ 2.9084, 42.6946 ], [ 2.9085, 42.6946 ], [ 2.9091, 42.6943 ], [ 2.9091, 42.6943 ], [ 2.9091, 42.6943 ], [ 2.9092, 42.6943 ], [ 2.9097, 42.6945 ], [ 2.9099, 42.6945 ], [ 2.9099, 42.6945 ], [ 2.91, 42.6945 ], [ 2.91, 42.6945 ], [ 2.9104, 42.6943 ] ] ], "type": "Polygon" }, "id": "91", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066010", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Champs De Mars" }, "type": "Feature" }, { "bbox": [ 3.8632, 43.6049, 3.8725, 43.609 ], "geometry": { "coordinates": [ [ [ 3.8669, 43.609 ], [ 3.8671, 43.6089 ], [ 3.8676, 43.6086 ], [ 3.8684, 43.6082 ], [ 3.8686, 43.6081 ], [ 3.8687, 43.6082 ], [ 3.8688, 43.6082 ], [ 3.869, 43.6085 ], [ 3.8685, 43.6086 ], [ 3.8687, 43.6088 ], [ 3.8689, 43.6088 ], [ 3.8688, 43.6087 ], [ 3.869, 43.6087 ], [ 3.8692, 43.6087 ], [ 3.8692, 43.6087 ], [ 3.8694, 43.6087 ], [ 3.8694, 43.6086 ], [ 3.8694, 43.6086 ], [ 3.8695, 43.6089 ], [ 3.8696, 43.6089 ], [ 3.8696, 43.609 ], [ 3.8697, 43.6089 ], [ 3.8696, 43.6088 ], [ 3.8696, 43.6088 ], [ 3.8698, 43.6087 ], [ 3.8698, 43.6087 ], [ 3.8699, 43.6087 ], [ 3.8698, 43.6087 ], [ 3.8701, 43.6086 ], [ 3.8701, 43.6086 ], [ 3.8701, 43.6085 ], [ 3.8703, 43.6085 ], [ 3.8703, 43.6085 ], [ 3.8704, 43.6085 ], [ 3.8705, 43.6085 ], [ 3.8706, 43.6085 ], [ 3.8707, 43.6085 ], [ 3.8707, 43.6085 ], [ 3.8709, 43.6085 ], [ 3.8709, 43.6085 ], [ 3.8713, 43.6085 ], [ 3.8713, 43.6084 ], [ 3.8716, 43.6084 ], [ 3.8716, 43.6085 ], [ 3.872, 43.6086 ], [ 3.8721, 43.6085 ], [ 3.8724, 43.6086 ], [ 3.8725, 43.6084 ], [ 3.8722, 43.6083 ], [ 3.8722, 43.6083 ], [ 3.8723, 43.6081 ], [ 3.8722, 43.6081 ], [ 3.872, 43.6082 ], [ 3.872, 43.6082 ], [ 3.8716, 43.6079 ], [ 3.8714, 43.6077 ], [ 3.8711, 43.6075 ], [ 3.8708, 43.6072 ], [ 3.8699, 43.6077 ], [ 3.8691, 43.6069 ], [ 3.8685, 43.6062 ], [ 3.868, 43.6064 ], [ 3.8679, 43.6063 ], [ 3.8677, 43.6062 ], [ 3.8677, 43.6062 ], [ 3.8676, 43.6061 ], [ 3.8675, 43.6061 ], [ 3.8674, 43.6061 ], [ 3.8673, 43.6062 ], [ 3.8672, 43.6059 ], [ 3.8671, 43.6058 ], [ 3.8661, 43.6052 ], [ 3.866, 43.6051 ], [ 3.8656, 43.605 ], [ 3.8654, 43.6049 ], [ 3.8653, 43.6049 ], [ 3.8652, 43.605 ], [ 3.8651, 43.605 ], [ 3.865, 43.605 ], [ 3.865, 43.6051 ], [ 3.8649, 43.6052 ], [ 3.8649, 43.6053 ], [ 3.8649, 43.6054 ], [ 3.8648, 43.6056 ], [ 3.8647, 43.6058 ], [ 3.8638, 43.6055 ], [ 3.8635, 43.6061 ], [ 3.8636, 43.6061 ], [ 3.8634, 43.6066 ], [ 3.8633, 43.6068 ], [ 3.8632, 43.6071 ], [ 3.8635, 43.6073 ], [ 3.8636, 43.6074 ], [ 3.8638, 43.6078 ], [ 3.8636, 43.6083 ], [ 3.8639, 43.6083 ], [ 3.864, 43.6085 ], [ 3.8642, 43.6085 ], [ 3.8661, 43.6085 ], [ 3.8667, 43.6085 ], [ 3.8667, 43.6086 ], [ 3.8667, 43.6086 ], [ 3.8667, 43.6087 ], [ 3.8668, 43.6087 ], [ 3.8668, 43.6087 ], [ 3.8669, 43.6087 ], [ 3.8669, 43.609 ] ] ], "type": "Polygon" }, "id": "92", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034010", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Figuerolles" }, "type": "Feature" }, { "bbox": [ 2.2124, 43.0514, 2.2229, 43.0613 ], "geometry": { "coordinates": [ [ [ 2.2203, 43.0524 ], [ 2.2201, 43.0523 ], [ 2.2202, 43.052 ], [ 2.22, 43.0519 ], [ 2.2201, 43.0517 ], [ 2.2203, 43.0515 ], [ 2.2203, 43.0514 ], [ 2.2203, 43.0514 ], [ 2.2202, 43.0514 ], [ 2.22, 43.0514 ], [ 2.2198, 43.0515 ], [ 2.2196, 43.0516 ], [ 2.2194, 43.0518 ], [ 2.2192, 43.052 ], [ 2.2188, 43.0523 ], [ 2.2185, 43.0521 ], [ 2.2184, 43.0521 ], [ 2.2183, 43.0521 ], [ 2.2182, 43.0521 ], [ 2.2182, 43.0521 ], [ 2.2181, 43.0521 ], [ 2.218, 43.0521 ], [ 2.218, 43.0521 ], [ 2.2179, 43.0525 ], [ 2.2178, 43.0527 ], [ 2.2173, 43.0526 ], [ 2.2168, 43.0524 ], [ 2.2165, 43.0522 ], [ 2.2165, 43.0523 ], [ 2.2161, 43.0521 ], [ 2.2157, 43.0523 ], [ 2.2153, 43.0526 ], [ 2.2156, 43.0528 ], [ 2.2147, 43.0534 ], [ 2.2145, 43.0536 ], [ 2.2143, 43.0538 ], [ 2.2139, 43.0542 ], [ 2.2135, 43.0546 ], [ 2.2145, 43.0546 ], [ 2.2144, 43.0549 ], [ 2.2147, 43.055 ], [ 2.2148, 43.0549 ], [ 2.2151, 43.055 ], [ 2.2151, 43.0549 ], [ 2.2153, 43.055 ], [ 2.2155, 43.0547 ], [ 2.216, 43.0547 ], [ 2.2158, 43.055 ], [ 2.2157, 43.0551 ], [ 2.2154, 43.0555 ], [ 2.2153, 43.0559 ], [ 2.2147, 43.0563 ], [ 2.2137, 43.0561 ], [ 2.2141, 43.0554 ], [ 2.2134, 43.0551 ], [ 2.213, 43.0551 ], [ 2.2129, 43.0552 ], [ 2.2127, 43.0557 ], [ 2.2125, 43.056 ], [ 2.2124, 43.0563 ], [ 2.2124, 43.0565 ], [ 2.2129, 43.0564 ], [ 2.2134, 43.0562 ], [ 2.2135, 43.0567 ], [ 2.2137, 43.0569 ], [ 2.2138, 43.057 ], [ 2.2139, 43.057 ], [ 2.2141, 43.057 ], [ 2.2155, 43.0575 ], [ 2.2156, 43.0574 ], [ 2.2157, 43.0573 ], [ 2.2157, 43.0573 ], [ 2.2167, 43.0564 ], [ 2.217, 43.0561 ], [ 2.2177, 43.0554 ], [ 2.2187, 43.0558 ], [ 2.219, 43.0558 ], [ 2.2192, 43.0559 ], [ 2.2193, 43.0559 ], [ 2.2199, 43.0559 ], [ 2.2201, 43.0559 ], [ 2.2201, 43.0561 ], [ 2.22, 43.0567 ], [ 2.2205, 43.0567 ], [ 2.2205, 43.0569 ], [ 2.2205, 43.057 ], [ 2.2205, 43.057 ], [ 2.2207, 43.057 ], [ 2.2208, 43.0571 ], [ 2.221, 43.0571 ], [ 2.221, 43.0572 ], [ 2.2211, 43.0572 ], [ 2.2212, 43.0573 ], [ 2.2213, 43.0575 ], [ 2.2213, 43.0577 ], [ 2.2214, 43.0578 ], [ 2.2213, 43.0579 ], [ 2.2213, 43.0579 ], [ 2.2207, 43.0579 ], [ 2.2206, 43.0584 ], [ 2.22, 43.0584 ], [ 2.22, 43.0586 ], [ 2.2205, 43.0587 ], [ 2.2205, 43.0587 ], [ 2.2207, 43.0589 ], [ 2.2207, 43.059 ], [ 2.2206, 43.0592 ], [ 2.2206, 43.0592 ], [ 2.2207, 43.0593 ], [ 2.2208, 43.0593 ], [ 2.2208, 43.0596 ], [ 2.2207, 43.0596 ], [ 2.2203, 43.0596 ], [ 2.2197, 43.0597 ], [ 2.2186, 43.0598 ], [ 2.2178, 43.0599 ], [ 2.218, 43.0607 ], [ 2.2181, 43.0613 ], [ 2.2184, 43.0613 ], [ 2.2186, 43.0612 ], [ 2.219, 43.0611 ], [ 2.2193, 43.0611 ], [ 2.2198, 43.061 ], [ 2.2198, 43.0604 ], [ 2.2201, 43.0604 ], [ 2.22, 43.0601 ], [ 2.2212, 43.06 ], [ 2.2211, 43.0597 ], [ 2.2211, 43.0597 ], [ 2.2211, 43.0596 ], [ 2.2211, 43.0595 ], [ 2.2212, 43.0592 ], [ 2.2213, 43.0587 ], [ 2.2214, 43.0582 ], [ 2.2214, 43.058 ], [ 2.2214, 43.0579 ], [ 2.2215, 43.0578 ], [ 2.2219, 43.0578 ], [ 2.2223, 43.0578 ], [ 2.2223, 43.058 ], [ 2.2228, 43.0579 ], [ 2.2228, 43.0577 ], [ 2.2228, 43.0569 ], [ 2.2229, 43.0561 ], [ 2.2227, 43.0561 ], [ 2.2227, 43.0562 ], [ 2.2226, 43.0562 ], [ 2.2225, 43.0562 ], [ 2.2224, 43.0563 ], [ 2.2224, 43.0564 ], [ 2.2223, 43.0574 ], [ 2.2213, 43.0575 ], [ 2.2212, 43.0573 ], [ 2.2211, 43.0571 ], [ 2.2209, 43.057 ], [ 2.2209, 43.0569 ], [ 2.2209, 43.0568 ], [ 2.2208, 43.0567 ], [ 2.2205, 43.0562 ], [ 2.2203, 43.0559 ], [ 2.2201, 43.0557 ], [ 2.2202, 43.0553 ], [ 2.2203, 43.055 ], [ 2.2205, 43.055 ], [ 2.2207, 43.055 ], [ 2.2207, 43.055 ], [ 2.221, 43.0551 ], [ 2.2211, 43.0548 ], [ 2.2212, 43.0547 ], [ 2.2213, 43.0545 ], [ 2.2213, 43.0544 ], [ 2.2213, 43.0544 ], [ 2.2209, 43.0544 ], [ 2.2207, 43.0543 ], [ 2.2201, 43.0542 ], [ 2.219, 43.054 ], [ 2.2193, 43.0538 ], [ 2.2194, 43.0536 ], [ 2.2197, 43.0532 ], [ 2.22, 43.0529 ], [ 2.2203, 43.0524 ] ] ], "type": "Polygon" }, "id": "93", "properties": { "code_commune": "11206", "code_departement": "11", "code_qp": "QP011001", "commune_qp": "Limoux", "nom_commune": "Limoux", "nom_qp": "Quartier Aude" }, "type": "Feature" }, { "bbox": [ 4.6115, 44.1552, 4.6259, 44.1628 ], "geometry": { "coordinates": [ [ [ 4.6258, 44.1607 ], [ 4.6257, 44.1605 ], [ 4.6254, 44.1602 ], [ 4.6254, 44.1601 ], [ 4.6252, 44.16 ], [ 4.6251, 44.1599 ], [ 4.625, 44.1598 ], [ 4.6248, 44.1597 ], [ 4.6246, 44.1593 ], [ 4.6225, 44.1564 ], [ 4.6223, 44.1563 ], [ 4.6221, 44.156 ], [ 4.6219, 44.1559 ], [ 4.6218, 44.1558 ], [ 4.6216, 44.1557 ], [ 4.6208, 44.1557 ], [ 4.6192, 44.1556 ], [ 4.619, 44.1555 ], [ 4.618, 44.1555 ], [ 4.6177, 44.1554 ], [ 4.6175, 44.1554 ], [ 4.6173, 44.1554 ], [ 4.6171, 44.1553 ], [ 4.617, 44.1552 ], [ 4.6169, 44.1553 ], [ 4.6169, 44.1554 ], [ 4.6168, 44.1554 ], [ 4.6168, 44.1555 ], [ 4.6167, 44.1556 ], [ 4.6168, 44.1558 ], [ 4.6169, 44.1559 ], [ 4.617, 44.1561 ], [ 4.6172, 44.1564 ], [ 4.6169, 44.1565 ], [ 4.6165, 44.1566 ], [ 4.6161, 44.1566 ], [ 4.6157, 44.1561 ], [ 4.6154, 44.1557 ], [ 4.6153, 44.1556 ], [ 4.6153, 44.1556 ], [ 4.6153, 44.1555 ], [ 4.6144, 44.1557 ], [ 4.6145, 44.156 ], [ 4.6147, 44.1565 ], [ 4.6143, 44.1566 ], [ 4.614, 44.1566 ], [ 4.614, 44.1566 ], [ 4.614, 44.1567 ], [ 4.6141, 44.1568 ], [ 4.6145, 44.157 ], [ 4.6146, 44.1571 ], [ 4.6147, 44.1572 ], [ 4.6151, 44.1577 ], [ 4.6152, 44.1579 ], [ 4.6151, 44.1579 ], [ 4.6152, 44.1582 ], [ 4.6152, 44.1582 ], [ 4.6134, 44.1585 ], [ 4.6133, 44.1585 ], [ 4.6133, 44.1585 ], [ 4.6134, 44.1587 ], [ 4.6136, 44.159 ], [ 4.6139, 44.1597 ], [ 4.6137, 44.1598 ], [ 4.6129, 44.1598 ], [ 4.612, 44.16 ], [ 4.6116, 44.1601 ], [ 4.6116, 44.1601 ], [ 4.6115, 44.1602 ], [ 4.6115, 44.1604 ], [ 4.6116, 44.161 ], [ 4.6117, 44.1628 ], [ 4.6125, 44.1627 ], [ 4.6123, 44.1612 ], [ 4.6123, 44.16 ], [ 4.6124, 44.1599 ], [ 4.6129, 44.1599 ], [ 4.6138, 44.1598 ], [ 4.6139, 44.1597 ], [ 4.6136, 44.159 ], [ 4.6146, 44.159 ], [ 4.6147, 44.159 ], [ 4.6156, 44.1589 ], [ 4.6157, 44.1588 ], [ 4.6179, 44.1581 ], [ 4.618, 44.158 ], [ 4.618, 44.1582 ], [ 4.6181, 44.1583 ], [ 4.6182, 44.1585 ], [ 4.6184, 44.1587 ], [ 4.6186, 44.1589 ], [ 4.6189, 44.1594 ], [ 4.6194, 44.1592 ], [ 4.6195, 44.1595 ], [ 4.6196, 44.1595 ], [ 4.6197, 44.1595 ], [ 4.6198, 44.1598 ], [ 4.6197, 44.1598 ], [ 4.6197, 44.1602 ], [ 4.6206, 44.1602 ], [ 4.6208, 44.1602 ], [ 4.621, 44.1601 ], [ 4.6211, 44.1602 ], [ 4.6211, 44.1602 ], [ 4.6212, 44.1604 ], [ 4.6215, 44.1603 ], [ 4.6215, 44.1604 ], [ 4.6225, 44.1603 ], [ 4.6226, 44.1603 ], [ 4.6226, 44.1601 ], [ 4.6226, 44.1598 ], [ 4.623, 44.1598 ], [ 4.6234, 44.1598 ], [ 4.6235, 44.16 ], [ 4.6238, 44.1599 ], [ 4.624, 44.1602 ], [ 4.624, 44.1602 ], [ 4.6243, 44.1602 ], [ 4.6243, 44.1604 ], [ 4.6242, 44.1606 ], [ 4.6243, 44.1607 ], [ 4.6243, 44.1609 ], [ 4.6252, 44.1607 ], [ 4.6252, 44.1608 ], [ 4.6254, 44.1607 ], [ 4.6255, 44.161 ], [ 4.6256, 44.161 ], [ 4.6257, 44.1609 ], [ 4.6258, 44.1609 ], [ 4.6258, 44.1608 ], [ 4.6259, 44.1608 ], [ 4.6258, 44.1607 ] ] ], "type": "Polygon" }, "id": "94", "properties": { "code_commune": "30028", "code_departement": "30", "code_qp": "QP030010", "commune_qp": "Bagnols-sur-Cèze", "nom_commune": "Bagnols-sur-Cèze", "nom_qp": "Escanaux - Coronelle - Citadelle - Vigan Braquet" }, "type": "Feature" }, { "bbox": [ 4.4107, 44.0178, 4.4182, 44.0292 ], "geometry": { "coordinates": [ [ [ 4.4182, 44.0186 ], [ 4.418, 44.018 ], [ 4.4179, 44.0178 ], [ 4.4176, 44.0179 ], [ 4.4174, 44.0179 ], [ 4.4165, 44.0182 ], [ 4.4163, 44.0182 ], [ 4.4162, 44.0183 ], [ 4.416, 44.0183 ], [ 4.4159, 44.0183 ], [ 4.4159, 44.0183 ], [ 4.4158, 44.0183 ], [ 4.4155, 44.0184 ], [ 4.4152, 44.0186 ], [ 4.4146, 44.0187 ], [ 4.4145, 44.0188 ], [ 4.4144, 44.0188 ], [ 4.4138, 44.019 ], [ 4.4136, 44.0191 ], [ 4.4133, 44.0192 ], [ 4.4131, 44.0193 ], [ 4.4129, 44.0194 ], [ 4.4125, 44.0195 ], [ 4.4122, 44.0196 ], [ 4.4118, 44.0197 ], [ 4.4111, 44.02 ], [ 4.4113, 44.0204 ], [ 4.4115, 44.0208 ], [ 4.4117, 44.0212 ], [ 4.4122, 44.022 ], [ 4.4119, 44.0222 ], [ 4.4116, 44.0224 ], [ 4.4116, 44.0224 ], [ 4.4113, 44.0227 ], [ 4.4112, 44.0228 ], [ 4.411, 44.0229 ], [ 4.4108, 44.0233 ], [ 4.4108, 44.0234 ], [ 4.4107, 44.0239 ], [ 4.4107, 44.024 ], [ 4.4107, 44.0242 ], [ 4.4108, 44.0243 ], [ 4.4109, 44.0245 ], [ 4.4111, 44.0247 ], [ 4.4112, 44.0248 ], [ 4.4113, 44.0248 ], [ 4.412, 44.0251 ], [ 4.4121, 44.0252 ], [ 4.4122, 44.0252 ], [ 4.4123, 44.0253 ], [ 4.4126, 44.0253 ], [ 4.4126, 44.0254 ], [ 4.4126, 44.0254 ], [ 4.4126, 44.0254 ], [ 4.413, 44.0255 ], [ 4.4131, 44.0256 ], [ 4.4133, 44.0256 ], [ 4.4138, 44.0256 ], [ 4.4137, 44.0257 ], [ 4.4137, 44.0259 ], [ 4.4136, 44.0261 ], [ 4.4135, 44.0262 ], [ 4.4135, 44.0263 ], [ 4.4135, 44.0264 ], [ 4.4136, 44.0265 ], [ 4.4136, 44.0265 ], [ 4.4137, 44.0266 ], [ 4.4138, 44.0267 ], [ 4.4139, 44.0268 ], [ 4.4141, 44.0269 ], [ 4.4145, 44.027 ], [ 4.4144, 44.0271 ], [ 4.4145, 44.0272 ], [ 4.4147, 44.0274 ], [ 4.4149, 44.0276 ], [ 4.4151, 44.0278 ], [ 4.4157, 44.0287 ], [ 4.4158, 44.0288 ], [ 4.4159, 44.0288 ], [ 4.4161, 44.029 ], [ 4.4162, 44.0291 ], [ 4.4163, 44.0292 ], [ 4.417, 44.029 ], [ 4.4175, 44.0288 ], [ 4.4175, 44.0288 ], [ 4.4175, 44.0287 ], [ 4.4176, 44.0286 ], [ 4.4176, 44.0282 ], [ 4.4176, 44.0276 ], [ 4.4176, 44.0274 ], [ 4.4175, 44.0271 ], [ 4.4175, 44.027 ], [ 4.4175, 44.0268 ], [ 4.4174, 44.0267 ], [ 4.4173, 44.0263 ], [ 4.4173, 44.0262 ], [ 4.4173, 44.0261 ], [ 4.4172, 44.026 ], [ 4.4172, 44.0257 ], [ 4.4171, 44.0252 ], [ 4.4171, 44.0251 ], [ 4.417, 44.0249 ], [ 4.417, 44.0248 ], [ 4.4169, 44.0247 ], [ 4.4169, 44.0247 ], [ 4.4168, 44.0246 ], [ 4.4167, 44.0246 ], [ 4.4166, 44.0245 ], [ 4.4158, 44.0243 ], [ 4.4155, 44.024 ], [ 4.4153, 44.0239 ], [ 4.415, 44.0237 ], [ 4.4146, 44.0234 ], [ 4.4142, 44.0231 ], [ 4.4141, 44.023 ], [ 4.4147, 44.0215 ], [ 4.4149, 44.0211 ], [ 4.4152, 44.0202 ], [ 4.4155, 44.0194 ], [ 4.416, 44.0196 ], [ 4.4164, 44.0198 ], [ 4.4168, 44.0196 ], [ 4.4172, 44.0194 ], [ 4.4174, 44.0193 ], [ 4.4174, 44.0193 ], [ 4.4175, 44.0193 ], [ 4.4175, 44.0192 ], [ 4.4176, 44.0192 ], [ 4.4177, 44.0191 ], [ 4.4179, 44.0189 ], [ 4.4181, 44.0187 ], [ 4.4182, 44.0186 ] ] ], "type": "Polygon" }, "id": "95", "properties": { "code_commune": "30334", "code_departement": "30", "code_qp": "QP030018", "commune_qp": "Uzès", "nom_commune": "Uzès", "nom_qp": "Quartier Prioritaire D'Uzès" }, "type": "Feature" }, { "bbox": [ 2.1515, 43.9406, 2.1586, 43.9467 ], "geometry": { "coordinates": [ [ [ 2.1567, 43.9451 ], [ 2.1558, 43.9446 ], [ 2.1559, 43.9446 ], [ 2.1556, 43.9445 ], [ 2.1558, 43.9443 ], [ 2.1558, 43.9441 ], [ 2.1555, 43.9439 ], [ 2.156, 43.9436 ], [ 2.1562, 43.9436 ], [ 2.1564, 43.9437 ], [ 2.1565, 43.9438 ], [ 2.1566, 43.9438 ], [ 2.1567, 43.9438 ], [ 2.1569, 43.9438 ], [ 2.1571, 43.9439 ], [ 2.1573, 43.9439 ], [ 2.1575, 43.9438 ], [ 2.1576, 43.9438 ], [ 2.1579, 43.9438 ], [ 2.158, 43.9438 ], [ 2.1581, 43.9438 ], [ 2.1581, 43.9438 ], [ 2.1582, 43.9438 ], [ 2.1582, 43.9437 ], [ 2.1583, 43.9436 ], [ 2.1585, 43.9435 ], [ 2.1586, 43.9433 ], [ 2.1586, 43.9432 ], [ 2.1586, 43.9431 ], [ 2.1586, 43.943 ], [ 2.1586, 43.9428 ], [ 2.1586, 43.9426 ], [ 2.1585, 43.9422 ], [ 2.1584, 43.9419 ], [ 2.158, 43.9418 ], [ 2.1571, 43.9413 ], [ 2.157, 43.9413 ], [ 2.1569, 43.9413 ], [ 2.1569, 43.9413 ], [ 2.1565, 43.9411 ], [ 2.1564, 43.9411 ], [ 2.1563, 43.941 ], [ 2.1564, 43.941 ], [ 2.1562, 43.9409 ], [ 2.156, 43.9412 ], [ 2.1558, 43.9411 ], [ 2.1557, 43.9411 ], [ 2.1557, 43.9411 ], [ 2.1556, 43.9409 ], [ 2.1555, 43.9406 ], [ 2.1554, 43.9406 ], [ 2.1554, 43.9407 ], [ 2.1552, 43.9407 ], [ 2.1551, 43.9407 ], [ 2.155, 43.9407 ], [ 2.1542, 43.9407 ], [ 2.1542, 43.941 ], [ 2.1539, 43.941 ], [ 2.1537, 43.941 ], [ 2.1535, 43.941 ], [ 2.1533, 43.9411 ], [ 2.1532, 43.9412 ], [ 2.1531, 43.9413 ], [ 2.153, 43.9414 ], [ 2.1529, 43.9415 ], [ 2.1529, 43.9416 ], [ 2.1529, 43.9417 ], [ 2.1529, 43.9417 ], [ 2.1529, 43.9418 ], [ 2.1526, 43.942 ], [ 2.1523, 43.9423 ], [ 2.1521, 43.9423 ], [ 2.1521, 43.9424 ], [ 2.1519, 43.9424 ], [ 2.1518, 43.9425 ], [ 2.1517, 43.9425 ], [ 2.1515, 43.9425 ], [ 2.1517, 43.943 ], [ 2.1517, 43.9431 ], [ 2.1519, 43.9431 ], [ 2.153, 43.943 ], [ 2.1532, 43.943 ], [ 2.154, 43.9434 ], [ 2.1541, 43.9434 ], [ 2.1543, 43.9435 ], [ 2.154, 43.9438 ], [ 2.1543, 43.9439 ], [ 2.1541, 43.944 ], [ 2.154, 43.9441 ], [ 2.1539, 43.9442 ], [ 2.1538, 43.9444 ], [ 2.1538, 43.9445 ], [ 2.1537, 43.9446 ], [ 2.1537, 43.9447 ], [ 2.1536, 43.9448 ], [ 2.1536, 43.9452 ], [ 2.1535, 43.9455 ], [ 2.1535, 43.9456 ], [ 2.1535, 43.9457 ], [ 2.1536, 43.9458 ], [ 2.1536, 43.9459 ], [ 2.1537, 43.9461 ], [ 2.1538, 43.9462 ], [ 2.1539, 43.9463 ], [ 2.1541, 43.9463 ], [ 2.1546, 43.9466 ], [ 2.1549, 43.9467 ], [ 2.1552, 43.9464 ], [ 2.1553, 43.9464 ], [ 2.1554, 43.9465 ], [ 2.1554, 43.9462 ], [ 2.1556, 43.9462 ], [ 2.1556, 43.9462 ], [ 2.1557, 43.9462 ], [ 2.1558, 43.9462 ], [ 2.1559, 43.9462 ], [ 2.1559, 43.9461 ], [ 2.1562, 43.9458 ], [ 2.1564, 43.9458 ], [ 2.1565, 43.9456 ], [ 2.1563, 43.9456 ], [ 2.1564, 43.9455 ], [ 2.1565, 43.9453 ], [ 2.1567, 43.9451 ] ] ], "type": "Polygon" }, "id": "96", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081006", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Cantepau" }, "type": "Feature" }, { "bbox": [ 2.2488, 43.6026, 2.2616, 43.6152 ], "geometry": { "coordinates": [ [ [ 2.255, 43.6138 ], [ 2.2548, 43.6142 ], [ 2.2547, 43.6144 ], [ 2.2546, 43.6145 ], [ 2.2544, 43.6147 ], [ 2.2543, 43.6148 ], [ 2.254, 43.615 ], [ 2.2543, 43.6152 ], [ 2.2545, 43.6151 ], [ 2.2549, 43.6149 ], [ 2.2552, 43.6148 ], [ 2.2551, 43.6145 ], [ 2.2558, 43.6144 ], [ 2.2562, 43.6135 ], [ 2.2563, 43.6135 ], [ 2.2565, 43.6133 ], [ 2.2562, 43.6132 ], [ 2.2563, 43.6131 ], [ 2.2562, 43.6131 ], [ 2.2563, 43.6129 ], [ 2.2566, 43.6129 ], [ 2.2567, 43.6129 ], [ 2.2568, 43.6129 ], [ 2.2569, 43.6129 ], [ 2.257, 43.6129 ], [ 2.257, 43.6128 ], [ 2.2571, 43.6128 ], [ 2.2571, 43.6127 ], [ 2.2571, 43.6127 ], [ 2.2572, 43.6125 ], [ 2.2573, 43.6124 ], [ 2.2574, 43.6123 ], [ 2.2575, 43.6122 ], [ 2.2577, 43.6121 ], [ 2.2579, 43.612 ], [ 2.2579, 43.6119 ], [ 2.2579, 43.6118 ], [ 2.258, 43.6107 ], [ 2.258, 43.6104 ], [ 2.258, 43.6103 ], [ 2.2579, 43.6103 ], [ 2.2567, 43.6103 ], [ 2.2567, 43.6103 ], [ 2.2565, 43.6103 ], [ 2.2564, 43.6103 ], [ 2.2563, 43.6102 ], [ 2.2562, 43.6102 ], [ 2.256, 43.6102 ], [ 2.2559, 43.6102 ], [ 2.256, 43.6097 ], [ 2.2561, 43.6089 ], [ 2.2561, 43.6089 ], [ 2.2564, 43.6088 ], [ 2.2565, 43.6088 ], [ 2.2564, 43.6087 ], [ 2.2564, 43.6086 ], [ 2.2565, 43.6086 ], [ 2.2565, 43.6085 ], [ 2.2568, 43.6084 ], [ 2.2569, 43.6084 ], [ 2.257, 43.6084 ], [ 2.2571, 43.6085 ], [ 2.2573, 43.6085 ], [ 2.2574, 43.6085 ], [ 2.2576, 43.6085 ], [ 2.2577, 43.6085 ], [ 2.2579, 43.6084 ], [ 2.258, 43.6081 ], [ 2.258, 43.6079 ], [ 2.2579, 43.6078 ], [ 2.2577, 43.6077 ], [ 2.2576, 43.6076 ], [ 2.2576, 43.6075 ], [ 2.2576, 43.6075 ], [ 2.2576, 43.6074 ], [ 2.2586, 43.6068 ], [ 2.2601, 43.606 ], [ 2.2605, 43.6058 ], [ 2.2611, 43.6054 ], [ 2.2613, 43.6052 ], [ 2.2614, 43.6052 ], [ 2.2615, 43.6051 ], [ 2.2616, 43.605 ], [ 2.2616, 43.6049 ], [ 2.2615, 43.6049 ], [ 2.2613, 43.6047 ], [ 2.2611, 43.6044 ], [ 2.2603, 43.6035 ], [ 2.2595, 43.6026 ], [ 2.259, 43.6029 ], [ 2.2583, 43.6032 ], [ 2.2589, 43.6038 ], [ 2.258, 43.6044 ], [ 2.2582, 43.6045 ], [ 2.257, 43.6049 ], [ 2.2556, 43.6053 ], [ 2.2558, 43.6058 ], [ 2.256, 43.6063 ], [ 2.2561, 43.6063 ], [ 2.2547, 43.6067 ], [ 2.254, 43.6061 ], [ 2.2537, 43.6063 ], [ 2.252, 43.6073 ], [ 2.2523, 43.6073 ], [ 2.2528, 43.6075 ], [ 2.2552, 43.608 ], [ 2.2551, 43.6082 ], [ 2.2551, 43.6082 ], [ 2.2551, 43.6082 ], [ 2.2554, 43.6084 ], [ 2.2554, 43.6086 ], [ 2.2553, 43.6086 ], [ 2.2549, 43.6087 ], [ 2.2547, 43.6087 ], [ 2.2545, 43.6087 ], [ 2.2539, 43.6087 ], [ 2.2538, 43.6096 ], [ 2.2538, 43.6098 ], [ 2.2531, 43.6096 ], [ 2.2529, 43.6098 ], [ 2.2512, 43.6096 ], [ 2.2515, 43.6099 ], [ 2.2505, 43.6104 ], [ 2.251, 43.611 ], [ 2.2525, 43.6102 ], [ 2.2526, 43.6101 ], [ 2.2529, 43.6099 ], [ 2.253, 43.6099 ], [ 2.2534, 43.6103 ], [ 2.2538, 43.6103 ], [ 2.2538, 43.6105 ], [ 2.2538, 43.6107 ], [ 2.2538, 43.6109 ], [ 2.2536, 43.611 ], [ 2.2524, 43.6116 ], [ 2.2536, 43.6119 ], [ 2.2536, 43.6119 ], [ 2.2534, 43.6123 ], [ 2.2535, 43.6123 ], [ 2.2533, 43.6127 ], [ 2.2533, 43.6128 ], [ 2.2522, 43.6131 ], [ 2.2523, 43.6134 ], [ 2.2517, 43.6135 ], [ 2.2513, 43.6136 ], [ 2.2513, 43.6137 ], [ 2.2514, 43.6138 ], [ 2.2504, 43.6141 ], [ 2.2502, 43.6139 ], [ 2.2502, 43.614 ], [ 2.2498, 43.6141 ], [ 2.2495, 43.6136 ], [ 2.2488, 43.6138 ], [ 2.2491, 43.6143 ], [ 2.2492, 43.6145 ], [ 2.2492, 43.6146 ], [ 2.2492, 43.6147 ], [ 2.2493, 43.6147 ], [ 2.2495, 43.6148 ], [ 2.2495, 43.6148 ], [ 2.2498, 43.6147 ], [ 2.2499, 43.6147 ], [ 2.2502, 43.6145 ], [ 2.2508, 43.6144 ], [ 2.2516, 43.6141 ], [ 2.2524, 43.6138 ], [ 2.2528, 43.6137 ], [ 2.2531, 43.6136 ], [ 2.2534, 43.6135 ], [ 2.2536, 43.6135 ], [ 2.2537, 43.6135 ], [ 2.255, 43.6138 ] ] ], "type": "Polygon" }, "id": "97", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081004", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Aillot Bisséous Lardaillé" }, "type": "Feature" }, { "bbox": [ 1.4126, 43.5904, 1.4202, 43.595 ], "geometry": { "coordinates": [ [ [ 1.4184, 43.591 ], [ 1.4183, 43.5909 ], [ 1.4177, 43.5907 ], [ 1.4174, 43.5906 ], [ 1.4169, 43.5904 ], [ 1.4164, 43.5915 ], [ 1.4169, 43.5916 ], [ 1.4165, 43.5922 ], [ 1.4165, 43.5922 ], [ 1.416, 43.5931 ], [ 1.4159, 43.5931 ], [ 1.415, 43.593 ], [ 1.4151, 43.5927 ], [ 1.4153, 43.5924 ], [ 1.4151, 43.5923 ], [ 1.4142, 43.5921 ], [ 1.4141, 43.5929 ], [ 1.4141, 43.593 ], [ 1.414, 43.593 ], [ 1.414, 43.5934 ], [ 1.4135, 43.5933 ], [ 1.4131, 43.5933 ], [ 1.4128, 43.5939 ], [ 1.4128, 43.5939 ], [ 1.4126, 43.5944 ], [ 1.4128, 43.5945 ], [ 1.4129, 43.5945 ], [ 1.4153, 43.5949 ], [ 1.4153, 43.5949 ], [ 1.4155, 43.5949 ], [ 1.4155, 43.5949 ], [ 1.4156, 43.5949 ], [ 1.4158, 43.5941 ], [ 1.4163, 43.5942 ], [ 1.4163, 43.5943 ], [ 1.4178, 43.5944 ], [ 1.4179, 43.5941 ], [ 1.4192, 43.5942 ], [ 1.4193, 43.5949 ], [ 1.4199, 43.595 ], [ 1.4199, 43.5948 ], [ 1.42, 43.5948 ], [ 1.4202, 43.594 ], [ 1.4202, 43.594 ], [ 1.4196, 43.5941 ], [ 1.4199, 43.5932 ], [ 1.4197, 43.5931 ], [ 1.4197, 43.5931 ], [ 1.4195, 43.593 ], [ 1.4196, 43.593 ], [ 1.4196, 43.5929 ], [ 1.4194, 43.5928 ], [ 1.4194, 43.5928 ], [ 1.4193, 43.5927 ], [ 1.4193, 43.5927 ], [ 1.4189, 43.5927 ], [ 1.4188, 43.5927 ], [ 1.4187, 43.5927 ], [ 1.4187, 43.5927 ], [ 1.4178, 43.5929 ], [ 1.4175, 43.5928 ], [ 1.4176, 43.5925 ], [ 1.4176, 43.5924 ], [ 1.4175, 43.5924 ], [ 1.4176, 43.5922 ], [ 1.4177, 43.5915 ], [ 1.4178, 43.5915 ], [ 1.4185, 43.5914 ], [ 1.4185, 43.5911 ], [ 1.4184, 43.591 ] ] ], "type": "Polygon" }, "id": "98", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031008", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Arènes" }, "type": "Feature" }, { "bbox": [ 2.3607, 43.502, 2.3691, 43.5087 ], "geometry": { "coordinates": [ [ [ 2.3622, 43.5087 ], [ 2.3624, 43.5085 ], [ 2.3627, 43.5087 ], [ 2.3634, 43.508 ], [ 2.3639, 43.5075 ], [ 2.364, 43.5073 ], [ 2.3643, 43.507 ], [ 2.3643, 43.5069 ], [ 2.3646, 43.5068 ], [ 2.3647, 43.5069 ], [ 2.3653, 43.5069 ], [ 2.3668, 43.5069 ], [ 2.3668, 43.5072 ], [ 2.3668, 43.5083 ], [ 2.3673, 43.5083 ], [ 2.3673, 43.508 ], [ 2.3672, 43.508 ], [ 2.3673, 43.5069 ], [ 2.3675, 43.507 ], [ 2.3676, 43.507 ], [ 2.3677, 43.5064 ], [ 2.3677, 43.5059 ], [ 2.3669, 43.5059 ], [ 2.3669, 43.5054 ], [ 2.3669, 43.5054 ], [ 2.3669, 43.5053 ], [ 2.367, 43.5052 ], [ 2.3671, 43.5048 ], [ 2.3672, 43.5042 ], [ 2.3673, 43.5041 ], [ 2.3673, 43.5041 ], [ 2.3674, 43.504 ], [ 2.3676, 43.504 ], [ 2.3677, 43.5041 ], [ 2.3678, 43.5044 ], [ 2.3679, 43.5045 ], [ 2.3681, 43.5045 ], [ 2.3682, 43.5044 ], [ 2.3682, 43.5044 ], [ 2.3681, 43.5043 ], [ 2.3681, 43.5042 ], [ 2.3681, 43.5042 ], [ 2.3681, 43.504 ], [ 2.3682, 43.5039 ], [ 2.3683, 43.5038 ], [ 2.3684, 43.5037 ], [ 2.3683, 43.5037 ], [ 2.3681, 43.5036 ], [ 2.3686, 43.5032 ], [ 2.3691, 43.5028 ], [ 2.3686, 43.502 ], [ 2.3673, 43.5035 ], [ 2.3672, 43.5036 ], [ 2.3669, 43.5039 ], [ 2.3668, 43.5042 ], [ 2.3667, 43.5045 ], [ 2.3667, 43.5044 ], [ 2.3665, 43.5043 ], [ 2.3663, 43.5044 ], [ 2.366, 43.5042 ], [ 2.366, 43.5042 ], [ 2.3662, 43.5039 ], [ 2.3668, 43.5034 ], [ 2.3668, 43.5033 ], [ 2.3666, 43.5031 ], [ 2.3665, 43.5031 ], [ 2.3662, 43.5031 ], [ 2.3647, 43.5033 ], [ 2.3647, 43.5033 ], [ 2.3639, 43.5035 ], [ 2.3637, 43.5036 ], [ 2.3637, 43.5036 ], [ 2.3636, 43.5034 ], [ 2.3634, 43.5034 ], [ 2.3634, 43.5034 ], [ 2.3631, 43.5034 ], [ 2.363, 43.5033 ], [ 2.3629, 43.5034 ], [ 2.3626, 43.5035 ], [ 2.3626, 43.5034 ], [ 2.3625, 43.5034 ], [ 2.3624, 43.5034 ], [ 2.3622, 43.5033 ], [ 2.3608, 43.5042 ], [ 2.361, 43.5045 ], [ 2.363, 43.5051 ], [ 2.3632, 43.5048 ], [ 2.3635, 43.5048 ], [ 2.3636, 43.5048 ], [ 2.3638, 43.5053 ], [ 2.3639, 43.5055 ], [ 2.3632, 43.5056 ], [ 2.3623, 43.506 ], [ 2.3623, 43.506 ], [ 2.3623, 43.506 ], [ 2.3623, 43.5061 ], [ 2.3624, 43.5064 ], [ 2.3613, 43.5066 ], [ 2.3613, 43.5066 ], [ 2.3611, 43.5067 ], [ 2.3611, 43.5068 ], [ 2.3613, 43.507 ], [ 2.3607, 43.5077 ], [ 2.3611, 43.5079 ], [ 2.3618, 43.5082 ], [ 2.3617, 43.5084 ], [ 2.3622, 43.5087 ] ] ], "type": "Polygon" }, "id": "99", "properties": { "code_commune": "81021", "code_departement": "81", "code_qp": "QP081001", "commune_qp": "Aussillon", "nom_commune": "Aussillon", "nom_qp": "La Falgalarié" }, "type": "Feature" }, { "bbox": [ 0.0774, 43.2212, 0.0918, 43.2328 ], "geometry": { "coordinates": [ [ [ 0.0818, 43.2324 ], [ 0.0818, 43.2323 ], [ 0.0816, 43.2321 ], [ 0.0816, 43.2319 ], [ 0.0816, 43.2318 ], [ 0.0822, 43.2317 ], [ 0.0822, 43.2316 ], [ 0.0823, 43.2314 ], [ 0.0825, 43.2315 ], [ 0.0826, 43.2315 ], [ 0.083, 43.2306 ], [ 0.0828, 43.2305 ], [ 0.083, 43.23 ], [ 0.0834, 43.2301 ], [ 0.0843, 43.2304 ], [ 0.0847, 43.2305 ], [ 0.085, 43.2306 ], [ 0.0852, 43.2306 ], [ 0.0868, 43.231 ], [ 0.087, 43.2313 ], [ 0.0873, 43.2316 ], [ 0.0874, 43.2319 ], [ 0.0874, 43.232 ], [ 0.0875, 43.2322 ], [ 0.0904, 43.2328 ], [ 0.0905, 43.2328 ], [ 0.0906, 43.2327 ], [ 0.0908, 43.2322 ], [ 0.0912, 43.2317 ], [ 0.0915, 43.2311 ], [ 0.0894, 43.2309 ], [ 0.0895, 43.2307 ], [ 0.0892, 43.2307 ], [ 0.0892, 43.2309 ], [ 0.0876, 43.2306 ], [ 0.0878, 43.2298 ], [ 0.088, 43.2295 ], [ 0.088, 43.2293 ], [ 0.088, 43.2292 ], [ 0.0881, 43.2287 ], [ 0.0883, 43.2285 ], [ 0.0885, 43.2284 ], [ 0.0886, 43.2283 ], [ 0.0888, 43.228 ], [ 0.0892, 43.2273 ], [ 0.0895, 43.2268 ], [ 0.0897, 43.2263 ], [ 0.0898, 43.2261 ], [ 0.0898, 43.226 ], [ 0.09, 43.2255 ], [ 0.0901, 43.2253 ], [ 0.0903, 43.2251 ], [ 0.0904, 43.2248 ], [ 0.0905, 43.2245 ], [ 0.0906, 43.2243 ], [ 0.0906, 43.2243 ], [ 0.0908, 43.2239 ], [ 0.0908, 43.2239 ], [ 0.0909, 43.2238 ], [ 0.0909, 43.2238 ], [ 0.0909, 43.2237 ], [ 0.091, 43.2236 ], [ 0.0911, 43.2236 ], [ 0.0911, 43.2234 ], [ 0.0912, 43.2231 ], [ 0.0911, 43.223 ], [ 0.0911, 43.223 ], [ 0.091, 43.2229 ], [ 0.091, 43.2228 ], [ 0.0911, 43.2227 ], [ 0.0911, 43.2227 ], [ 0.0912, 43.2227 ], [ 0.0914, 43.2226 ], [ 0.0915, 43.2224 ], [ 0.0917, 43.2219 ], [ 0.0918, 43.2216 ], [ 0.0918, 43.2214 ], [ 0.0918, 43.2212 ], [ 0.0915, 43.2213 ], [ 0.0915, 43.2213 ], [ 0.091, 43.2214 ], [ 0.091, 43.2215 ], [ 0.0909, 43.2217 ], [ 0.0907, 43.2223 ], [ 0.0905, 43.2227 ], [ 0.0905, 43.2228 ], [ 0.0904, 43.2233 ], [ 0.0902, 43.2235 ], [ 0.0902, 43.2235 ], [ 0.0902, 43.2235 ], [ 0.09, 43.2239 ], [ 0.0897, 43.2245 ], [ 0.0897, 43.2245 ], [ 0.0894, 43.2251 ], [ 0.0891, 43.2257 ], [ 0.0889, 43.2264 ], [ 0.0888, 43.2267 ], [ 0.0884, 43.2267 ], [ 0.088, 43.2266 ], [ 0.0879, 43.2272 ], [ 0.0879, 43.2275 ], [ 0.0879, 43.2275 ], [ 0.0875, 43.2276 ], [ 0.0872, 43.2276 ], [ 0.0872, 43.2277 ], [ 0.0869, 43.2279 ], [ 0.0868, 43.2281 ], [ 0.0867, 43.2281 ], [ 0.0866, 43.2281 ], [ 0.0851, 43.228 ], [ 0.0844, 43.2283 ], [ 0.0841, 43.2279 ], [ 0.084, 43.2279 ], [ 0.0835, 43.2278 ], [ 0.083, 43.2288 ], [ 0.0827, 43.2288 ], [ 0.0821, 43.2289 ], [ 0.0811, 43.2289 ], [ 0.0804, 43.2289 ], [ 0.0804, 43.2279 ], [ 0.0804, 43.2279 ], [ 0.0804, 43.2276 ], [ 0.0803, 43.2276 ], [ 0.0799, 43.2276 ], [ 0.0799, 43.2275 ], [ 0.0799, 43.2274 ], [ 0.0799, 43.227 ], [ 0.0799, 43.2264 ], [ 0.0799, 43.2262 ], [ 0.0799, 43.2258 ], [ 0.0798, 43.2256 ], [ 0.0798, 43.2255 ], [ 0.0797, 43.2255 ], [ 0.0797, 43.2254 ], [ 0.0798, 43.2253 ], [ 0.0799, 43.2253 ], [ 0.08, 43.2253 ], [ 0.0802, 43.2251 ], [ 0.0804, 43.2249 ], [ 0.0809, 43.2244 ], [ 0.0811, 43.2242 ], [ 0.0812, 43.2243 ], [ 0.0813, 43.2242 ], [ 0.0813, 43.224 ], [ 0.0815, 43.2239 ], [ 0.0816, 43.2238 ], [ 0.0814, 43.2237 ], [ 0.0815, 43.2235 ], [ 0.0813, 43.2234 ], [ 0.0811, 43.2234 ], [ 0.0811, 43.2232 ], [ 0.0812, 43.223 ], [ 0.0812, 43.2229 ], [ 0.0802, 43.2227 ], [ 0.0797, 43.2229 ], [ 0.0796, 43.223 ], [ 0.0795, 43.223 ], [ 0.0794, 43.2231 ], [ 0.0792, 43.2236 ], [ 0.0789, 43.2235 ], [ 0.0786, 43.2236 ], [ 0.0782, 43.2235 ], [ 0.0781, 43.2239 ], [ 0.0782, 43.2239 ], [ 0.078, 43.2243 ], [ 0.078, 43.2244 ], [ 0.078, 43.2244 ], [ 0.078, 43.2246 ], [ 0.0779, 43.2246 ], [ 0.078, 43.2246 ], [ 0.078, 43.2247 ], [ 0.0782, 43.2247 ], [ 0.0782, 43.2249 ], [ 0.0784, 43.2249 ], [ 0.0786, 43.2249 ], [ 0.0784, 43.2252 ], [ 0.0784, 43.2252 ], [ 0.0784, 43.2253 ], [ 0.0783, 43.2254 ], [ 0.0779, 43.2257 ], [ 0.0777, 43.2259 ], [ 0.0776, 43.2263 ], [ 0.0778, 43.2263 ], [ 0.0776, 43.227 ], [ 0.0775, 43.2278 ], [ 0.0775, 43.2278 ], [ 0.0774, 43.2284 ], [ 0.0775, 43.2284 ], [ 0.0779, 43.2284 ], [ 0.0784, 43.2285 ], [ 0.0785, 43.2285 ], [ 0.0793, 43.2289 ], [ 0.0795, 43.2289 ], [ 0.0794, 43.2291 ], [ 0.0793, 43.2293 ], [ 0.0788, 43.2302 ], [ 0.0795, 43.2303 ], [ 0.0806, 43.2305 ], [ 0.0818, 43.2307 ], [ 0.0816, 43.2308 ], [ 0.0815, 43.2309 ], [ 0.0811, 43.2311 ], [ 0.0811, 43.2311 ], [ 0.081, 43.2311 ], [ 0.0809, 43.2311 ], [ 0.0808, 43.2318 ], [ 0.0807, 43.2318 ], [ 0.0797, 43.2319 ], [ 0.0798, 43.2326 ], [ 0.0807, 43.2325 ], [ 0.0813, 43.2325 ], [ 0.0817, 43.2324 ], [ 0.0818, 43.2324 ] ] ], "type": "Polygon" }, "id": "100", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065003", "commune_qp": "Tarbes", "nom_commune": "Séméac, Tarbes", "nom_qp": "Tarbes Est" }, "type": "Feature" }, { "bbox": [ 1.3353, 43.5363, 1.3406, 43.5391 ], "geometry": { "coordinates": [ [ [ 1.3353, 43.5369 ], [ 1.3354, 43.537 ], [ 1.3363, 43.5379 ], [ 1.3361, 43.538 ], [ 1.336, 43.5381 ], [ 1.3365, 43.5386 ], [ 1.3366, 43.5387 ], [ 1.3367, 43.5388 ], [ 1.3371, 43.5391 ], [ 1.3374, 43.5391 ], [ 1.3374, 43.5391 ], [ 1.3376, 43.5391 ], [ 1.3376, 43.5391 ], [ 1.3376, 43.539 ], [ 1.3381, 43.5391 ], [ 1.3383, 43.5391 ], [ 1.3387, 43.5389 ], [ 1.3386, 43.5388 ], [ 1.3388, 43.5388 ], [ 1.3391, 43.5386 ], [ 1.3392, 43.5388 ], [ 1.3394, 43.5388 ], [ 1.3395, 43.5388 ], [ 1.3397, 43.5387 ], [ 1.34, 43.5385 ], [ 1.3403, 43.5384 ], [ 1.3406, 43.5382 ], [ 1.3403, 43.5381 ], [ 1.3391, 43.5375 ], [ 1.3366, 43.5363 ], [ 1.3355, 43.5369 ], [ 1.3354, 43.5369 ], [ 1.3353, 43.5369 ] ] ], "type": "Polygon" }, "id": "101", "properties": { "code_commune": "31157", "code_departement": "31", "code_qp": "QP031017", "commune_qp": "Cugnaux", "nom_commune": "Cugnaux", "nom_qp": "Vivier Maçon" }, "type": "Feature" }, { "bbox": [ 1.3134, 43.6043, 1.3237, 43.6067 ], "geometry": { "coordinates": [ [ [ 1.3236, 43.6052 ], [ 1.3233, 43.6051 ], [ 1.3231, 43.6051 ], [ 1.3226, 43.6051 ], [ 1.3214, 43.605 ], [ 1.3196, 43.6048 ], [ 1.3174, 43.6046 ], [ 1.3162, 43.6045 ], [ 1.3153, 43.6045 ], [ 1.3134, 43.6043 ], [ 1.3137, 43.6046 ], [ 1.314, 43.605 ], [ 1.3147, 43.6047 ], [ 1.3149, 43.6047 ], [ 1.315, 43.6047 ], [ 1.3151, 43.6047 ], [ 1.3154, 43.6047 ], [ 1.3156, 43.605 ], [ 1.3162, 43.6048 ], [ 1.3162, 43.605 ], [ 1.3161, 43.6057 ], [ 1.3161, 43.6059 ], [ 1.3161, 43.6061 ], [ 1.3162, 43.6062 ], [ 1.3168, 43.6063 ], [ 1.3195, 43.6065 ], [ 1.3212, 43.6066 ], [ 1.322, 43.6067 ], [ 1.3224, 43.6067 ], [ 1.3233, 43.6067 ], [ 1.3234, 43.6067 ], [ 1.3235, 43.6067 ], [ 1.3235, 43.6066 ], [ 1.3235, 43.6065 ], [ 1.3235, 43.6062 ], [ 1.3236, 43.6058 ], [ 1.3236, 43.6056 ], [ 1.3237, 43.6054 ], [ 1.3236, 43.6052 ] ] ], "type": "Polygon" }, "id": "102", "properties": { "code_commune": "31149", "code_departement": "31", "code_qp": "QP031016", "commune_qp": "Colomiers", "nom_commune": "Colomiers", "nom_qp": "En Jacca" }, "type": "Feature" }, { "bbox": [ 1.4387, 43.6182, 1.446, 43.6219 ], "geometry": { "coordinates": [ [ [ 1.4416, 43.6184 ], [ 1.4409, 43.6185 ], [ 1.441, 43.6196 ], [ 1.4411, 43.62 ], [ 1.4411, 43.6201 ], [ 1.4401, 43.6205 ], [ 1.4399, 43.62 ], [ 1.4394, 43.6201 ], [ 1.4394, 43.62 ], [ 1.4387, 43.6201 ], [ 1.4388, 43.6204 ], [ 1.4388, 43.6204 ], [ 1.439, 43.621 ], [ 1.4397, 43.6208 ], [ 1.4397, 43.6208 ], [ 1.4401, 43.6219 ], [ 1.4406, 43.6217 ], [ 1.4401, 43.6206 ], [ 1.4412, 43.6202 ], [ 1.4413, 43.6201 ], [ 1.4421, 43.62 ], [ 1.4437, 43.6195 ], [ 1.446, 43.6188 ], [ 1.446, 43.6188 ], [ 1.4458, 43.6187 ], [ 1.4456, 43.6187 ], [ 1.4453, 43.6186 ], [ 1.4451, 43.6185 ], [ 1.4447, 43.6184 ], [ 1.4447, 43.6184 ], [ 1.4428, 43.6188 ], [ 1.4427, 43.6186 ], [ 1.4425, 43.6182 ], [ 1.4423, 43.6182 ], [ 1.4416, 43.6184 ] ] ], "type": "Polygon" }, "id": "103", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031018", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Négreneys" }, "type": "Feature" }, { "bbox": [ 1.4672, 43.607, 1.4729, 43.6102 ], "geometry": { "coordinates": [ [ [ 1.4729, 43.6074 ], [ 1.4727, 43.6073 ], [ 1.4727, 43.6073 ], [ 1.4724, 43.6071 ], [ 1.4722, 43.607 ], [ 1.4712, 43.6072 ], [ 1.471, 43.6073 ], [ 1.4706, 43.6073 ], [ 1.4692, 43.6073 ], [ 1.4681, 43.6072 ], [ 1.4672, 43.6072 ], [ 1.4675, 43.6073 ], [ 1.4676, 43.6074 ], [ 1.4679, 43.6076 ], [ 1.4681, 43.6077 ], [ 1.4686, 43.6079 ], [ 1.4698, 43.6086 ], [ 1.4686, 43.6096 ], [ 1.4694, 43.6102 ], [ 1.4701, 43.6096 ], [ 1.4724, 43.6079 ], [ 1.4725, 43.6078 ], [ 1.4728, 43.6076 ], [ 1.4729, 43.6074 ] ] ], "type": "Polygon" }, "id": "104", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031019", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "La Gloire" }, "type": "Feature" } ], "type": "FeatureCollection" }, "hovertemplate": "%{hovertext}

Quartier Prioritaire=%{location}
Taux d'Activité des Femmes=%{customdata[0]}
Taux Total en Emploi Précaire=%{customdata[1]}
Taux d'Activité des Etrangers=%{z}", "hovertext": [ "Pradettes", "Grand Mirail", "Arènes", "Bourbaki", "Empalot", "Les Izards - La Vache", "Cépière Beauregard", "Saint Exupéry", "Soupetard", "Rangueil", "Négreneys", "La Gloire" ], "locations": [ "Pradettes", "Grand Mirail", "Arènes", "Bourbaki", "Empalot", "Les Izards - La Vache", "Cépière Beauregard", "Saint Exupéry", "Soupetard", "Rangueil", "Négreneys", "La Gloire" ], "name": "", "subplot": "mapbox", "type": "choroplethmapbox", "z": [ 39.5, 33.5, 34.1, 36.5, 37.4, 33.1, 45.3, null, 44.8, 24.2, 53.7, 54.2 ] } ], "layout": { "autosize": true, "coloraxis": { "colorbar": { "title": { "text": "Taux d'Activité des Etrangers" } }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ] }, "legend": { "tracegroupgap": 0 }, "mapbox": { "center": { "lat": 43.6, "lon": 1.433333 }, "domain": { "x": [ 0, 1 ], "y": [ 0, 1 ] }, "style": "carto-positron", "zoom": 11.5 }, "margin": { "b": 0, "l": 0, "r": 0, "t": 25 }, "template": { "data": { "bar": [ { "error_x": { "color": "#2a3f5f" }, "error_y": { "color": "#2a3f5f" }, "marker": { "line": { "color": "#E5ECF6", "width": 0.5 }, "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "bar" } ], "barpolar": [ { "marker": { "line": { "color": "#E5ECF6", "width": 0.5 }, "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "barpolar" } ], "carpet": [ { "aaxis": { "endlinecolor": "#2a3f5f", "gridcolor": "white", "linecolor": "white", "minorgridcolor": "white", "startlinecolor": "#2a3f5f" }, "baxis": { "endlinecolor": "#2a3f5f", "gridcolor": "white", "linecolor": "white", "minorgridcolor": "white", "startlinecolor": "#2a3f5f" }, "type": "carpet" } ], "choropleth": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "choropleth" } ], "contour": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "contour" } ], "contourcarpet": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "contourcarpet" } ], "heatmap": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "heatmap" } ], "heatmapgl": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "heatmapgl" } ], "histogram": [ { "marker": { "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "histogram" } ], "histogram2d": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "histogram2d" } ], "histogram2dcontour": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "histogram2dcontour" } ], "mesh3d": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "mesh3d" } ], "parcoords": [ { "line": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "parcoords" } ], "pie": [ { "automargin": true, "type": "pie" } ], "scatter": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatter" } ], "scatter3d": [ { "line": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatter3d" } ], "scattercarpet": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattercarpet" } ], "scattergeo": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattergeo" } ], "scattergl": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattergl" } ], "scattermapbox": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattermapbox" } ], "scatterpolar": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterpolar" } ], "scatterpolargl": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterpolargl" } ], "scatterternary": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterternary" } ], "surface": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "surface" } ], "table": [ { "cells": { "fill": { "color": "#EBF0F8" }, "line": { "color": "white" } }, "header": { "fill": { "color": "#C8D4E3" }, "line": { "color": "white" } }, "type": "table" } ] }, "layout": { "annotationdefaults": { "arrowcolor": "#2a3f5f", "arrowhead": 0, "arrowwidth": 1 }, "autotypenumbers": "strict", "coloraxis": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "colorscale": { "diverging": [ [ 0, "#8e0152" ], [ 0.1, "#c51b7d" ], [ 0.2, "#de77ae" ], [ 0.3, "#f1b6da" ], [ 0.4, "#fde0ef" ], [ 0.5, "#f7f7f7" ], [ 0.6, "#e6f5d0" ], [ 0.7, "#b8e186" ], [ 0.8, "#7fbc41" ], [ 0.9, "#4d9221" ], [ 1, "#276419" ] ], "sequential": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "sequentialminus": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ] }, "colorway": [ "#636efa", "#EF553B", "#00cc96", "#ab63fa", "#FFA15A", "#19d3f3", "#FF6692", "#B6E880", "#FF97FF", "#FECB52" ], "font": { "color": "#2a3f5f" }, "geo": { "bgcolor": "white", "lakecolor": "white", "landcolor": "#E5ECF6", "showlakes": true, "showland": true, "subunitcolor": "white" }, "hoverlabel": { "align": "left" }, "hovermode": "closest", "mapbox": { "style": "light" }, "paper_bgcolor": "white", "plot_bgcolor": "#E5ECF6", "polar": { "angularaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "bgcolor": "#E5ECF6", "radialaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" } }, "scene": { "xaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" }, "yaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" }, "zaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" } }, "shapedefaults": { "line": { "color": "#2a3f5f" } }, "ternary": { "aaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "baxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "bgcolor": "#E5ECF6", "caxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" } }, "title": { "x": 0.05 }, "xaxis": { "automargin": true, "gridcolor": "white", "linecolor": "white", "ticks": "", "title": { "standoff": 15 }, "zerolinecolor": "white", "zerolinewidth": 2 }, "yaxis": { "automargin": true, "gridcolor": "white", "linecolor": "white", "ticks": "", "title": { "standoff": 15 }, "zerolinecolor": "white", "zerolinewidth": 2 } } }, "title": { "text": "Taux d'Activité des Etrangers selon le Q.P - Commune de Toulouse" } } }, "image/png": "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", "text/html": [ "
" ] }, "metadata": {}, "output_type": "display_data" }, { "name": "stdout", "output_type": "stream", "text": [ "\n" ] }, { "data": { "application/vnd.plotly.v1+json": { "config": { "plotlyServerURL": "https://plot.ly" }, "data": [ { "coloraxis": "coloraxis", "customdata": [ [ 44.8, 30 ], [ 32.5, 25.7 ], [ 38, 24.7 ], [ 41.1, null ], [ 38.2, 28.5 ], [ 42.1, 20.9 ], [ 34.1, null ], [ 58.5, 19.8 ], [ 56.1, 15.9 ], [ 25.2, 38.7 ], [ 53.6, 24 ], [ 52.6, 22.3 ] ], "featureidkey": "properties.nom_qp", "geojson": { "bbox": [ -0.0437, 42.5983, 4.6525, 44.4672 ], "features": [ { "bbox": [ 2.8882, 42.7035, 2.9005, 42.7101 ], "geometry": { "coordinates": [ [ [ 2.9005, 42.7081 ], [ 2.9004, 42.7077 ], [ 2.9004, 42.7075 ], [ 2.9003, 42.7074 ], [ 2.9003, 42.7069 ], [ 2.9, 42.7069 ], [ 2.9001, 42.7067 ], [ 2.9002, 42.7065 ], [ 2.9002, 42.7064 ], [ 2.9002, 42.7063 ], [ 2.9002, 42.7062 ], [ 2.9001, 42.7062 ], [ 2.9001, 42.7061 ], [ 2.8994, 42.7059 ], [ 2.8979, 42.7055 ], [ 2.8976, 42.7054 ], [ 2.8972, 42.7053 ], [ 2.8964, 42.7051 ], [ 2.8961, 42.705 ], [ 2.8957, 42.7049 ], [ 2.8957, 42.7049 ], [ 2.8953, 42.7047 ], [ 2.8949, 42.7046 ], [ 2.8948, 42.7045 ], [ 2.8946, 42.7045 ], [ 2.8944, 42.7044 ], [ 2.8941, 42.7044 ], [ 2.8938, 42.7043 ], [ 2.8934, 42.7042 ], [ 2.8933, 42.7042 ], [ 2.8932, 42.7042 ], [ 2.8931, 42.7041 ], [ 2.8927, 42.7042 ], [ 2.8926, 42.7043 ], [ 2.8923, 42.7043 ], [ 2.8916, 42.7041 ], [ 2.8915, 42.7041 ], [ 2.8906, 42.7039 ], [ 2.8905, 42.7039 ], [ 2.8896, 42.7037 ], [ 2.8889, 42.7035 ], [ 2.8887, 42.7039 ], [ 2.8886, 42.7042 ], [ 2.8891, 42.7044 ], [ 2.8898, 42.7046 ], [ 2.8904, 42.7049 ], [ 2.8904, 42.705 ], [ 2.8905, 42.7049 ], [ 2.8907, 42.705 ], [ 2.8908, 42.705 ], [ 2.8914, 42.7053 ], [ 2.8916, 42.7053 ], [ 2.8914, 42.7056 ], [ 2.8912, 42.7056 ], [ 2.891, 42.7056 ], [ 2.8905, 42.7056 ], [ 2.8898, 42.7056 ], [ 2.8893, 42.7056 ], [ 2.8892, 42.7056 ], [ 2.889, 42.7057 ], [ 2.8888, 42.7059 ], [ 2.8887, 42.7059 ], [ 2.8887, 42.706 ], [ 2.8885, 42.706 ], [ 2.8884, 42.706 ], [ 2.8884, 42.706 ], [ 2.8883, 42.7061 ], [ 2.8882, 42.7064 ], [ 2.8887, 42.7065 ], [ 2.8888, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8893, 42.7062 ], [ 2.8893, 42.7061 ], [ 2.8893, 42.7061 ], [ 2.8905, 42.7062 ], [ 2.891, 42.7062 ], [ 2.8911, 42.7063 ], [ 2.8918, 42.7064 ], [ 2.8918, 42.7065 ], [ 2.892, 42.7065 ], [ 2.8925, 42.7066 ], [ 2.8925, 42.7067 ], [ 2.8926, 42.7067 ], [ 2.8928, 42.7069 ], [ 2.8932, 42.7072 ], [ 2.8931, 42.7073 ], [ 2.893, 42.7076 ], [ 2.8929, 42.7079 ], [ 2.8923, 42.7077 ], [ 2.892, 42.7077 ], [ 2.8919, 42.7077 ], [ 2.8919, 42.7077 ], [ 2.8918, 42.7077 ], [ 2.8918, 42.7077 ], [ 2.8916, 42.7077 ], [ 2.8916, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8914, 42.7076 ], [ 2.8913, 42.7075 ], [ 2.8912, 42.7078 ], [ 2.8911, 42.7081 ], [ 2.8911, 42.7082 ], [ 2.8909, 42.7086 ], [ 2.8907, 42.7092 ], [ 2.8906, 42.7093 ], [ 2.8906, 42.7095 ], [ 2.8905, 42.7096 ], [ 2.8908, 42.7096 ], [ 2.8909, 42.7096 ], [ 2.891, 42.7095 ], [ 2.8913, 42.7097 ], [ 2.8916, 42.7098 ], [ 2.8917, 42.7099 ], [ 2.8921, 42.71 ], [ 2.8921, 42.71 ], [ 2.8921, 42.7101 ], [ 2.8924, 42.7101 ], [ 2.8924, 42.71 ], [ 2.8924, 42.71 ], [ 2.8925, 42.7097 ], [ 2.8926, 42.7095 ], [ 2.8926, 42.7094 ], [ 2.8926, 42.7094 ], [ 2.8927, 42.7093 ], [ 2.8929, 42.7093 ], [ 2.893, 42.7094 ], [ 2.893, 42.7094 ], [ 2.893, 42.7094 ], [ 2.8933, 42.7088 ], [ 2.8936, 42.7082 ], [ 2.8938, 42.7081 ], [ 2.8937, 42.7081 ], [ 2.894, 42.7079 ], [ 2.894, 42.7079 ], [ 2.8946, 42.7083 ], [ 2.8946, 42.7083 ], [ 2.8948, 42.7083 ], [ 2.8952, 42.7084 ], [ 2.8955, 42.7084 ], [ 2.8958, 42.7085 ], [ 2.8958, 42.7085 ], [ 2.8959, 42.7084 ], [ 2.8964, 42.7082 ], [ 2.8967, 42.7081 ], [ 2.8965, 42.7078 ], [ 2.8965, 42.7078 ], [ 2.8963, 42.7076 ], [ 2.8962, 42.7075 ], [ 2.896, 42.7072 ], [ 2.8958, 42.707 ], [ 2.8957, 42.7068 ], [ 2.8959, 42.7068 ], [ 2.8959, 42.7068 ], [ 2.8957, 42.7066 ], [ 2.8957, 42.7065 ], [ 2.8958, 42.7065 ], [ 2.8962, 42.7063 ], [ 2.8963, 42.7063 ], [ 2.8964, 42.7062 ], [ 2.8965, 42.7062 ], [ 2.8967, 42.7062 ], [ 2.8968, 42.7063 ], [ 2.8968, 42.7063 ], [ 2.8969, 42.7066 ], [ 2.897, 42.7069 ], [ 2.8973, 42.7071 ], [ 2.8973, 42.7072 ], [ 2.8977, 42.7073 ], [ 2.898, 42.707 ], [ 2.899, 42.7074 ], [ 2.8992, 42.7075 ], [ 2.8992, 42.7075 ], [ 2.8992, 42.7076 ], [ 2.8995, 42.7077 ], [ 2.8995, 42.7077 ], [ 2.8999, 42.7079 ], [ 2.9005, 42.7081 ] ] ], "type": "Polygon" }, "id": "0", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066007", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Bas-Vernet Nouveau QPV" }, "type": "Feature" }, { "bbox": [ 4.0233, 44.2076, 4.0343, 44.2164 ], "geometry": { "coordinates": [ [ [ 4.0343, 44.2092 ], [ 4.0343, 44.2091 ], [ 4.0343, 44.209 ], [ 4.0342, 44.209 ], [ 4.0328, 44.2087 ], [ 4.0319, 44.2084 ], [ 4.0303, 44.208 ], [ 4.0298, 44.2079 ], [ 4.0294, 44.2077 ], [ 4.0288, 44.2076 ], [ 4.0285, 44.2076 ], [ 4.0282, 44.2076 ], [ 4.028, 44.2076 ], [ 4.0278, 44.2076 ], [ 4.0276, 44.2076 ], [ 4.0274, 44.2076 ], [ 4.027, 44.2077 ], [ 4.0267, 44.2078 ], [ 4.0265, 44.2079 ], [ 4.026, 44.2081 ], [ 4.0255, 44.2084 ], [ 4.0254, 44.2085 ], [ 4.0256, 44.2089 ], [ 4.0258, 44.2092 ], [ 4.0258, 44.2093 ], [ 4.0258, 44.2095 ], [ 4.0258, 44.2095 ], [ 4.0257, 44.2096 ], [ 4.0255, 44.2098 ], [ 4.0252, 44.21 ], [ 4.0251, 44.2102 ], [ 4.0245, 44.2103 ], [ 4.0247, 44.2105 ], [ 4.0247, 44.2105 ], [ 4.0246, 44.2106 ], [ 4.0245, 44.2106 ], [ 4.0243, 44.2107 ], [ 4.0245, 44.2108 ], [ 4.0245, 44.2108 ], [ 4.0249, 44.2111 ], [ 4.0249, 44.2111 ], [ 4.0251, 44.2114 ], [ 4.0248, 44.2115 ], [ 4.0245, 44.2117 ], [ 4.0242, 44.2119 ], [ 4.0238, 44.2122 ], [ 4.0237, 44.2123 ], [ 4.0233, 44.2126 ], [ 4.0239, 44.213 ], [ 4.0244, 44.2125 ], [ 4.0241, 44.2123 ], [ 4.024, 44.2123 ], [ 4.024, 44.2123 ], [ 4.0241, 44.2121 ], [ 4.0241, 44.2122 ], [ 4.0242, 44.2121 ], [ 4.0243, 44.212 ], [ 4.0244, 44.212 ], [ 4.0244, 44.212 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0246, 44.2118 ], [ 4.0246, 44.2118 ], [ 4.0246, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0248, 44.2118 ], [ 4.025, 44.2118 ], [ 4.0251, 44.2119 ], [ 4.0252, 44.212 ], [ 4.0252, 44.212 ], [ 4.0253, 44.212 ], [ 4.0253, 44.2119 ], [ 4.0254, 44.2119 ], [ 4.0255, 44.212 ], [ 4.0257, 44.2118 ], [ 4.0257, 44.2118 ], [ 4.0258, 44.2118 ], [ 4.0258, 44.2118 ], [ 4.0259, 44.2118 ], [ 4.026, 44.2119 ], [ 4.0261, 44.2119 ], [ 4.0262, 44.2119 ], [ 4.0262, 44.2119 ], [ 4.0263, 44.2118 ], [ 4.0264, 44.2118 ], [ 4.0265, 44.2118 ], [ 4.0266, 44.2118 ], [ 4.0267, 44.2118 ], [ 4.0269, 44.2118 ], [ 4.027, 44.2119 ], [ 4.0276, 44.212 ], [ 4.028, 44.2121 ], [ 4.0282, 44.2121 ], [ 4.0284, 44.2125 ], [ 4.0284, 44.2126 ], [ 4.0284, 44.2128 ], [ 4.0284, 44.2128 ], [ 4.0284, 44.2132 ], [ 4.0285, 44.2134 ], [ 4.0286, 44.2136 ], [ 4.0288, 44.2136 ], [ 4.0288, 44.2136 ], [ 4.0288, 44.2137 ], [ 4.0289, 44.2137 ], [ 4.029, 44.2139 ], [ 4.0291, 44.2141 ], [ 4.0292, 44.2142 ], [ 4.0292, 44.2142 ], [ 4.0291, 44.2143 ], [ 4.029, 44.2144 ], [ 4.029, 44.2144 ], [ 4.0289, 44.2145 ], [ 4.0289, 44.2146 ], [ 4.0286, 44.2146 ], [ 4.0281, 44.2147 ], [ 4.0278, 44.2147 ], [ 4.0278, 44.2148 ], [ 4.0278, 44.2148 ], [ 4.0278, 44.2151 ], [ 4.0278, 44.2153 ], [ 4.0278, 44.2154 ], [ 4.0276, 44.2154 ], [ 4.0276, 44.2156 ], [ 4.0273, 44.2156 ], [ 4.0273, 44.216 ], [ 4.0273, 44.216 ], [ 4.0275, 44.216 ], [ 4.0283, 44.216 ], [ 4.0283, 44.216 ], [ 4.0284, 44.216 ], [ 4.0284, 44.216 ], [ 4.0285, 44.2161 ], [ 4.0286, 44.2161 ], [ 4.0287, 44.2162 ], [ 4.0288, 44.2162 ], [ 4.0295, 44.2162 ], [ 4.0296, 44.2162 ], [ 4.0299, 44.2162 ], [ 4.0305, 44.216 ], [ 4.0306, 44.2159 ], [ 4.031, 44.2158 ], [ 4.0311, 44.2158 ], [ 4.0312, 44.216 ], [ 4.0312, 44.216 ], [ 4.0315, 44.2164 ], [ 4.0318, 44.2164 ], [ 4.0321, 44.2163 ], [ 4.0325, 44.2161 ], [ 4.0321, 44.2157 ], [ 4.0331, 44.2154 ], [ 4.0331, 44.2152 ], [ 4.0331, 44.2152 ], [ 4.033, 44.215 ], [ 4.033, 44.2146 ], [ 4.0329, 44.2144 ], [ 4.0336, 44.2145 ], [ 4.034, 44.2143 ], [ 4.0336, 44.2139 ], [ 4.0336, 44.2139 ], [ 4.0337, 44.2139 ], [ 4.0339, 44.2138 ], [ 4.0339, 44.2138 ], [ 4.034, 44.2135 ], [ 4.034, 44.2135 ], [ 4.0341, 44.2135 ], [ 4.0342, 44.2135 ], [ 4.0342, 44.2135 ], [ 4.0343, 44.2135 ], [ 4.0343, 44.2135 ], [ 4.0343, 44.2134 ], [ 4.0343, 44.2134 ], [ 4.0342, 44.2133 ], [ 4.034, 44.2131 ], [ 4.0339, 44.2131 ], [ 4.0339, 44.213 ], [ 4.0338, 44.2128 ], [ 4.0337, 44.2127 ], [ 4.0336, 44.2127 ], [ 4.0334, 44.2126 ], [ 4.0332, 44.2124 ], [ 4.0327, 44.2121 ], [ 4.0326, 44.212 ], [ 4.0325, 44.2119 ], [ 4.0323, 44.2119 ], [ 4.0316, 44.2114 ], [ 4.0315, 44.2113 ], [ 4.0315, 44.2112 ], [ 4.0314, 44.2109 ], [ 4.0317, 44.2109 ], [ 4.032, 44.2105 ], [ 4.0323, 44.2104 ], [ 4.0325, 44.2103 ], [ 4.033, 44.2101 ], [ 4.0331, 44.2101 ], [ 4.0333, 44.21 ], [ 4.0334, 44.2097 ], [ 4.0336, 44.2097 ], [ 4.0337, 44.2096 ], [ 4.0339, 44.2095 ], [ 4.0339, 44.2095 ], [ 4.0342, 44.2093 ], [ 4.0343, 44.2092 ] ] ], "type": "Polygon" }, "id": "1", "properties": { "code_commune": "30132", "code_departement": "30", "code_qp": "QP030016", "commune_qp": "La Grand-Combe", "nom_commune": "La Grand-Combe", "nom_qp": "Centre Ville - Arboux" }, "type": "Feature" }, { "bbox": [ 4.4296, 43.6741, 4.438, 43.6845 ], "geometry": { "coordinates": [ [ [ 4.438, 43.6827 ], [ 4.438, 43.6826 ], [ 4.438, 43.6826 ], [ 4.4376, 43.6824 ], [ 4.4375, 43.6823 ], [ 4.4374, 43.6823 ], [ 4.4373, 43.6823 ], [ 4.4371, 43.6819 ], [ 4.4367, 43.6817 ], [ 4.4362, 43.6815 ], [ 4.4353, 43.6813 ], [ 4.4351, 43.6809 ], [ 4.4351, 43.6804 ], [ 4.4353, 43.6801 ], [ 4.4363, 43.68 ], [ 4.4362, 43.6799 ], [ 4.4361, 43.6796 ], [ 4.436, 43.6794 ], [ 4.4359, 43.6794 ], [ 4.4359, 43.6793 ], [ 4.4359, 43.6792 ], [ 4.4358, 43.6791 ], [ 4.4358, 43.6791 ], [ 4.4356, 43.679 ], [ 4.4355, 43.679 ], [ 4.4353, 43.679 ], [ 4.4349, 43.679 ], [ 4.4343, 43.6791 ], [ 4.4341, 43.6791 ], [ 4.4336, 43.679 ], [ 4.4337, 43.6789 ], [ 4.4336, 43.6788 ], [ 4.4336, 43.6787 ], [ 4.4336, 43.6786 ], [ 4.4336, 43.6786 ], [ 4.4335, 43.6784 ], [ 4.4335, 43.6783 ], [ 4.4335, 43.6782 ], [ 4.4335, 43.6781 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6777 ], [ 4.4336, 43.6776 ], [ 4.4336, 43.6776 ], [ 4.4335, 43.6775 ], [ 4.4335, 43.6774 ], [ 4.4334, 43.6772 ], [ 4.4334, 43.6772 ], [ 4.4336, 43.6771 ], [ 4.4338, 43.6771 ], [ 4.4338, 43.677 ], [ 4.4337, 43.6766 ], [ 4.4336, 43.6765 ], [ 4.4336, 43.6763 ], [ 4.4336, 43.6761 ], [ 4.4336, 43.6761 ], [ 4.4333, 43.6757 ], [ 4.4332, 43.6756 ], [ 4.4326, 43.6752 ], [ 4.4324, 43.6751 ], [ 4.4325, 43.6748 ], [ 4.4325, 43.6748 ], [ 4.4324, 43.6747 ], [ 4.4324, 43.6746 ], [ 4.4325, 43.6746 ], [ 4.4325, 43.6744 ], [ 4.4324, 43.6743 ], [ 4.4324, 43.6742 ], [ 4.4324, 43.6741 ], [ 4.4322, 43.6743 ], [ 4.4317, 43.6748 ], [ 4.4312, 43.6752 ], [ 4.4309, 43.6755 ], [ 4.4306, 43.6759 ], [ 4.4304, 43.6761 ], [ 4.4299, 43.6765 ], [ 4.4298, 43.6766 ], [ 4.4297, 43.6768 ], [ 4.4297, 43.6771 ], [ 4.4296, 43.6772 ], [ 4.4296, 43.6779 ], [ 4.4298, 43.6779 ], [ 4.4299, 43.678 ], [ 4.4299, 43.678 ], [ 4.4299, 43.6781 ], [ 4.43, 43.6781 ], [ 4.4301, 43.6782 ], [ 4.4303, 43.6783 ], [ 4.4305, 43.6784 ], [ 4.4306, 43.6784 ], [ 4.4307, 43.6785 ], [ 4.4309, 43.6785 ], [ 4.4309, 43.6786 ], [ 4.431, 43.6786 ], [ 4.4311, 43.6788 ], [ 4.4311, 43.6788 ], [ 4.4312, 43.6788 ], [ 4.4312, 43.679 ], [ 4.4312, 43.679 ], [ 4.4314, 43.6791 ], [ 4.4318, 43.6791 ], [ 4.432, 43.6792 ], [ 4.4322, 43.6792 ], [ 4.4326, 43.6792 ], [ 4.4327, 43.6792 ], [ 4.4331, 43.6801 ], [ 4.4332, 43.6801 ], [ 4.4332, 43.6802 ], [ 4.4333, 43.6804 ], [ 4.4334, 43.6805 ], [ 4.4326, 43.6811 ], [ 4.433, 43.6812 ], [ 4.4327, 43.6813 ], [ 4.4326, 43.6814 ], [ 4.4325, 43.6815 ], [ 4.4325, 43.6815 ], [ 4.4322, 43.6816 ], [ 4.4321, 43.6815 ], [ 4.4319, 43.6815 ], [ 4.4318, 43.6816 ], [ 4.4318, 43.6816 ], [ 4.4318, 43.6816 ], [ 4.4319, 43.6817 ], [ 4.432, 43.6818 ], [ 4.4319, 43.6818 ], [ 4.4319, 43.6819 ], [ 4.4315, 43.6821 ], [ 4.4315, 43.6821 ], [ 4.4315, 43.6822 ], [ 4.4316, 43.6822 ], [ 4.4313, 43.6825 ], [ 4.4331, 43.6825 ], [ 4.4336, 43.6825 ], [ 4.4336, 43.6825 ], [ 4.4337, 43.6826 ], [ 4.4339, 43.6826 ], [ 4.4342, 43.6826 ], [ 4.4342, 43.6826 ], [ 4.4343, 43.6827 ], [ 4.4346, 43.6828 ], [ 4.4349, 43.6828 ], [ 4.4354, 43.6831 ], [ 4.4356, 43.6832 ], [ 4.4359, 43.6833 ], [ 4.4361, 43.6835 ], [ 4.4362, 43.6836 ], [ 4.4366, 43.6839 ], [ 4.4369, 43.6841 ], [ 4.4372, 43.6842 ], [ 4.4376, 43.6845 ], [ 4.4378, 43.6844 ], [ 4.4376, 43.6841 ], [ 4.4376, 43.6841 ], [ 4.4378, 43.684 ], [ 4.4379, 43.6839 ], [ 4.4379, 43.6835 ], [ 4.438, 43.6827 ] ] ], "type": "Polygon" }, "id": "2", "properties": { "code_commune": "30258", "code_departement": "30", "code_qp": "QP030009", "commune_qp": "Saint-Gilles", "nom_commune": "Saint-Gilles", "nom_qp": "Sabatot - Centre Ancien" }, "type": "Feature" }, { "bbox": [ 2.3637, 43.2054, 2.3794, 43.2191 ], "geometry": { "coordinates": [ [ [ 2.3743, 43.218 ], [ 2.3742, 43.2177 ], [ 2.3741, 43.2174 ], [ 2.3741, 43.2174 ], [ 2.374, 43.2175 ], [ 2.3738, 43.2173 ], [ 2.3732, 43.2176 ], [ 2.3725, 43.2179 ], [ 2.3723, 43.218 ], [ 2.3717, 43.2173 ], [ 2.3714, 43.2171 ], [ 2.3713, 43.2171 ], [ 2.3712, 43.217 ], [ 2.3708, 43.2165 ], [ 2.3704, 43.2162 ], [ 2.3702, 43.2163 ], [ 2.3702, 43.2163 ], [ 2.3699, 43.2165 ], [ 2.3693, 43.2156 ], [ 2.3697, 43.2155 ], [ 2.37, 43.2153 ], [ 2.3689, 43.2141 ], [ 2.3688, 43.214 ], [ 2.3693, 43.2138 ], [ 2.3697, 43.2136 ], [ 2.3702, 43.2133 ], [ 2.3705, 43.2132 ], [ 2.3709, 43.213 ], [ 2.3711, 43.2129 ], [ 2.3716, 43.213 ], [ 2.3721, 43.2131 ], [ 2.3736, 43.2144 ], [ 2.3753, 43.2136 ], [ 2.3778, 43.2125 ], [ 2.3782, 43.2123 ], [ 2.3788, 43.212 ], [ 2.379, 43.2118 ], [ 2.3789, 43.2116 ], [ 2.3794, 43.2114 ], [ 2.3792, 43.2112 ], [ 2.3792, 43.2111 ], [ 2.3792, 43.2105 ], [ 2.3791, 43.2099 ], [ 2.3788, 43.21 ], [ 2.3786, 43.2097 ], [ 2.3783, 43.2088 ], [ 2.3782, 43.2088 ], [ 2.3781, 43.2082 ], [ 2.3777, 43.2083 ], [ 2.3776, 43.2079 ], [ 2.3776, 43.2079 ], [ 2.3776, 43.2075 ], [ 2.3774, 43.2075 ], [ 2.3774, 43.2073 ], [ 2.3774, 43.2073 ], [ 2.3774, 43.2072 ], [ 2.3776, 43.2072 ], [ 2.3775, 43.2069 ], [ 2.3775, 43.2068 ], [ 2.3783, 43.2068 ], [ 2.3783, 43.2068 ], [ 2.3786, 43.2068 ], [ 2.3787, 43.2067 ], [ 2.3788, 43.2062 ], [ 2.379, 43.2055 ], [ 2.3786, 43.2055 ], [ 2.3784, 43.2055 ], [ 2.3764, 43.2057 ], [ 2.3757, 43.2058 ], [ 2.3752, 43.2057 ], [ 2.3747, 43.2057 ], [ 2.3739, 43.2056 ], [ 2.373, 43.2054 ], [ 2.3728, 43.2054 ], [ 2.3724, 43.2061 ], [ 2.3723, 43.2064 ], [ 2.372, 43.2071 ], [ 2.3727, 43.207 ], [ 2.3734, 43.2069 ], [ 2.374, 43.2068 ], [ 2.3744, 43.2067 ], [ 2.3745, 43.2067 ], [ 2.3749, 43.2065 ], [ 2.3751, 43.2073 ], [ 2.3758, 43.2072 ], [ 2.3758, 43.2072 ], [ 2.3763, 43.2071 ], [ 2.3765, 43.2071 ], [ 2.3769, 43.207 ], [ 2.3768, 43.2072 ], [ 2.3769, 43.2075 ], [ 2.3767, 43.2076 ], [ 2.3768, 43.2082 ], [ 2.377, 43.2082 ], [ 2.377, 43.2087 ], [ 2.377, 43.2088 ], [ 2.3778, 43.2088 ], [ 2.3781, 43.2095 ], [ 2.378, 43.2096 ], [ 2.3782, 43.2098 ], [ 2.3781, 43.2098 ], [ 2.3784, 43.2102 ], [ 2.3776, 43.2105 ], [ 2.3773, 43.2106 ], [ 2.3768, 43.2108 ], [ 2.3757, 43.2112 ], [ 2.3721, 43.2126 ], [ 2.3718, 43.2126 ], [ 2.3717, 43.2126 ], [ 2.3713, 43.2124 ], [ 2.3712, 43.2124 ], [ 2.3717, 43.212 ], [ 2.3711, 43.2114 ], [ 2.3711, 43.2114 ], [ 2.3709, 43.2112 ], [ 2.3709, 43.2112 ], [ 2.3706, 43.211 ], [ 2.3701, 43.2113 ], [ 2.3701, 43.2113 ], [ 2.37, 43.2113 ], [ 2.3692, 43.2117 ], [ 2.3691, 43.2117 ], [ 2.3693, 43.2119 ], [ 2.3694, 43.212 ], [ 2.3691, 43.2121 ], [ 2.3686, 43.2123 ], [ 2.3685, 43.2124 ], [ 2.3685, 43.2124 ], [ 2.3683, 43.2123 ], [ 2.3683, 43.2123 ], [ 2.3683, 43.2123 ], [ 2.3681, 43.2123 ], [ 2.3678, 43.2124 ], [ 2.3676, 43.2124 ], [ 2.3669, 43.2126 ], [ 2.3668, 43.2126 ], [ 2.3664, 43.2127 ], [ 2.3666, 43.2131 ], [ 2.3667, 43.2133 ], [ 2.3662, 43.2136 ], [ 2.3661, 43.2136 ], [ 2.3665, 43.2144 ], [ 2.3665, 43.2145 ], [ 2.3666, 43.2147 ], [ 2.3668, 43.2149 ], [ 2.3664, 43.215 ], [ 2.3654, 43.2152 ], [ 2.3654, 43.2155 ], [ 2.3653, 43.2156 ], [ 2.3651, 43.2157 ], [ 2.365, 43.2157 ], [ 2.3646, 43.2158 ], [ 2.3645, 43.2158 ], [ 2.3645, 43.2158 ], [ 2.3644, 43.2158 ], [ 2.3644, 43.2159 ], [ 2.3644, 43.2159 ], [ 2.3644, 43.216 ], [ 2.3644, 43.2161 ], [ 2.3637, 43.2161 ], [ 2.3638, 43.2162 ], [ 2.3639, 43.2167 ], [ 2.3642, 43.2165 ], [ 2.3646, 43.2164 ], [ 2.3647, 43.2163 ], [ 2.3652, 43.2162 ], [ 2.3654, 43.2164 ], [ 2.3656, 43.2165 ], [ 2.3659, 43.2163 ], [ 2.3661, 43.2164 ], [ 2.3663, 43.2164 ], [ 2.3669, 43.2161 ], [ 2.3672, 43.2168 ], [ 2.3675, 43.2175 ], [ 2.3676, 43.2177 ], [ 2.3676, 43.2178 ], [ 2.368, 43.2184 ], [ 2.3681, 43.2185 ], [ 2.3679, 43.2188 ], [ 2.3678, 43.2188 ], [ 2.368, 43.2188 ], [ 2.3683, 43.2189 ], [ 2.3688, 43.2189 ], [ 2.3697, 43.2189 ], [ 2.3701, 43.219 ], [ 2.3709, 43.219 ], [ 2.3713, 43.219 ], [ 2.3719, 43.2191 ], [ 2.3722, 43.2191 ], [ 2.3722, 43.219 ], [ 2.3725, 43.2188 ], [ 2.3735, 43.2184 ], [ 2.3743, 43.218 ] ] ], "type": "Polygon" }, "id": "3", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011002", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "La Conte - Ozanam" }, "type": "Feature" }, { "bbox": [ 4.2702, 43.6938, 4.2823, 43.701 ], "geometry": { "coordinates": [ [ [ 4.2819, 43.7001 ], [ 4.2818, 43.7 ], [ 4.2818, 43.6999 ], [ 4.2817, 43.6999 ], [ 4.2817, 43.6998 ], [ 4.2818, 43.6996 ], [ 4.2818, 43.6996 ], [ 4.2818, 43.6996 ], [ 4.2819, 43.6995 ], [ 4.2823, 43.6994 ], [ 4.2822, 43.6994 ], [ 4.2821, 43.6993 ], [ 4.282, 43.6993 ], [ 4.2815, 43.6992 ], [ 4.2818, 43.6986 ], [ 4.2815, 43.6985 ], [ 4.2813, 43.6985 ], [ 4.2813, 43.6984 ], [ 4.2817, 43.6974 ], [ 4.2817, 43.6974 ], [ 4.281, 43.6972 ], [ 4.2808, 43.6972 ], [ 4.2806, 43.6971 ], [ 4.2804, 43.6971 ], [ 4.2802, 43.697 ], [ 4.28, 43.697 ], [ 4.2793, 43.6971 ], [ 4.2786, 43.6972 ], [ 4.2785, 43.6974 ], [ 4.2785, 43.6975 ], [ 4.2783, 43.6974 ], [ 4.2782, 43.6974 ], [ 4.2782, 43.6974 ], [ 4.2782, 43.6972 ], [ 4.2782, 43.6971 ], [ 4.2782, 43.6969 ], [ 4.2782, 43.6969 ], [ 4.2782, 43.6968 ], [ 4.2772, 43.6966 ], [ 4.2771, 43.6968 ], [ 4.2769, 43.6973 ], [ 4.2759, 43.6971 ], [ 4.2758, 43.6971 ], [ 4.2759, 43.6969 ], [ 4.2759, 43.6968 ], [ 4.2756, 43.6967 ], [ 4.2757, 43.6964 ], [ 4.2758, 43.6963 ], [ 4.2752, 43.6962 ], [ 4.2753, 43.6961 ], [ 4.2754, 43.696 ], [ 4.2748, 43.6958 ], [ 4.2745, 43.6963 ], [ 4.2742, 43.6967 ], [ 4.2741, 43.697 ], [ 4.274, 43.6971 ], [ 4.2739, 43.697 ], [ 4.2737, 43.697 ], [ 4.2734, 43.6969 ], [ 4.2735, 43.6966 ], [ 4.2736, 43.6965 ], [ 4.2737, 43.6964 ], [ 4.2739, 43.696 ], [ 4.2738, 43.696 ], [ 4.2739, 43.6959 ], [ 4.2737, 43.6956 ], [ 4.2738, 43.6956 ], [ 4.2734, 43.695 ], [ 4.273, 43.6951 ], [ 4.2728, 43.6947 ], [ 4.2731, 43.6946 ], [ 4.273, 43.6946 ], [ 4.2729, 43.6943 ], [ 4.2731, 43.6942 ], [ 4.2729, 43.6938 ], [ 4.2722, 43.6941 ], [ 4.2721, 43.6942 ], [ 4.2707, 43.6947 ], [ 4.2702, 43.695 ], [ 4.2703, 43.6953 ], [ 4.2702, 43.6953 ], [ 4.2705, 43.696 ], [ 4.2705, 43.6961 ], [ 4.2707, 43.6965 ], [ 4.271, 43.697 ], [ 4.2711, 43.6974 ], [ 4.2715, 43.6975 ], [ 4.2716, 43.6976 ], [ 4.272, 43.6976 ], [ 4.2725, 43.6977 ], [ 4.2726, 43.6977 ], [ 4.2728, 43.6978 ], [ 4.2729, 43.6978 ], [ 4.2732, 43.6979 ], [ 4.2733, 43.698 ], [ 4.2733, 43.698 ], [ 4.2734, 43.698 ], [ 4.2734, 43.698 ], [ 4.2735, 43.698 ], [ 4.2735, 43.698 ], [ 4.2737, 43.6976 ], [ 4.2753, 43.6981 ], [ 4.2755, 43.6982 ], [ 4.2765, 43.6985 ], [ 4.2763, 43.6988 ], [ 4.2763, 43.6989 ], [ 4.2763, 43.699 ], [ 4.2772, 43.6992 ], [ 4.2772, 43.6993 ], [ 4.2775, 43.6993 ], [ 4.2775, 43.6994 ], [ 4.2775, 43.6994 ], [ 4.2775, 43.6995 ], [ 4.2777, 43.6995 ], [ 4.278, 43.6996 ], [ 4.2783, 43.6996 ], [ 4.2783, 43.6997 ], [ 4.2797, 43.7 ], [ 4.2798, 43.7001 ], [ 4.2798, 43.7001 ], [ 4.2798, 43.7001 ], [ 4.2797, 43.7004 ], [ 4.2802, 43.7005 ], [ 4.2803, 43.7005 ], [ 4.2805, 43.7007 ], [ 4.2809, 43.7009 ], [ 4.2811, 43.701 ], [ 4.2811, 43.701 ], [ 4.2812, 43.701 ], [ 4.2814, 43.701 ], [ 4.2817, 43.7009 ], [ 4.2818, 43.7009 ], [ 4.2818, 43.7007 ], [ 4.2818, 43.7006 ], [ 4.2818, 43.7006 ], [ 4.2819, 43.7004 ], [ 4.282, 43.7003 ], [ 4.282, 43.7001 ], [ 4.2819, 43.7001 ] ] ], "type": "Polygon" }, "id": "4", "properties": { "code_commune": "30341", "code_departement": "30", "code_qp": "QP030015", "commune_qp": "Vauvert", "nom_commune": "Vauvert", "nom_qp": "Les Costières" }, "type": "Feature" }, { "bbox": [ 3.6599, 43.4106, 3.667, 43.4154 ], "geometry": { "coordinates": [ [ [ 3.667, 43.4154 ], [ 3.667, 43.4145 ], [ 3.667, 43.4143 ], [ 3.6669, 43.4141 ], [ 3.6668, 43.4139 ], [ 3.6665, 43.4137 ], [ 3.666, 43.4133 ], [ 3.6653, 43.4128 ], [ 3.6652, 43.4127 ], [ 3.6653, 43.4126 ], [ 3.6654, 43.4124 ], [ 3.6653, 43.4122 ], [ 3.6653, 43.4121 ], [ 3.6653, 43.412 ], [ 3.6644, 43.4114 ], [ 3.6638, 43.4118 ], [ 3.6635, 43.4115 ], [ 3.664, 43.4111 ], [ 3.6637, 43.4109 ], [ 3.6631, 43.4113 ], [ 3.6623, 43.4106 ], [ 3.6619, 43.4109 ], [ 3.6613, 43.4114 ], [ 3.6606, 43.4119 ], [ 3.6606, 43.4119 ], [ 3.6602, 43.4121 ], [ 3.6601, 43.4121 ], [ 3.66, 43.4121 ], [ 3.66, 43.4122 ], [ 3.6599, 43.4124 ], [ 3.6599, 43.4125 ], [ 3.6608, 43.4131 ], [ 3.661, 43.4132 ], [ 3.6623, 43.4141 ], [ 3.6624, 43.4141 ], [ 3.6625, 43.4142 ], [ 3.6626, 43.4142 ], [ 3.6627, 43.4143 ], [ 3.6628, 43.4145 ], [ 3.6632, 43.4144 ], [ 3.6635, 43.4142 ], [ 3.6636, 43.4142 ], [ 3.6637, 43.4143 ], [ 3.6642, 43.4146 ], [ 3.6644, 43.4145 ], [ 3.6648, 43.4143 ], [ 3.665, 43.4144 ], [ 3.6652, 43.4142 ], [ 3.6669, 43.4154 ], [ 3.667, 43.4154 ], [ 3.667, 43.4154 ] ] ], "type": "Polygon" }, "id": "5", "properties": { "code_commune": "34301", "code_departement": "34", "code_qp": "QP034017", "commune_qp": "Sète", "nom_commune": "Sète", "nom_qp": "Ile De Thau" }, "type": "Feature" }, { "bbox": [ 2.8805, 42.7129, 2.902, 42.7278 ], "geometry": { "coordinates": [ [ [ 2.902, 42.7151 ], [ 2.902, 42.7149 ], [ 2.902, 42.7148 ], [ 2.9019, 42.7146 ], [ 2.9019, 42.7145 ], [ 2.9018, 42.7144 ], [ 2.9018, 42.7143 ], [ 2.9016, 42.7141 ], [ 2.9016, 42.7139 ], [ 2.9014, 42.7137 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9012, 42.7135 ], [ 2.9011, 42.7134 ], [ 2.9009, 42.7133 ], [ 2.9008, 42.7132 ], [ 2.9006, 42.713 ], [ 2.9005, 42.713 ], [ 2.9005, 42.7129 ], [ 2.9005, 42.7129 ], [ 2.9004, 42.713 ], [ 2.9002, 42.7131 ], [ 2.8998, 42.7135 ], [ 2.8993, 42.714 ], [ 2.8993, 42.714 ], [ 2.8991, 42.7144 ], [ 2.8987, 42.7143 ], [ 2.8984, 42.7142 ], [ 2.8983, 42.7142 ], [ 2.898, 42.7141 ], [ 2.8978, 42.714 ], [ 2.8974, 42.7139 ], [ 2.8972, 42.7139 ], [ 2.897, 42.7138 ], [ 2.8967, 42.7138 ], [ 2.8966, 42.7138 ], [ 2.8965, 42.7137 ], [ 2.8963, 42.7137 ], [ 2.8961, 42.7137 ], [ 2.8959, 42.7137 ], [ 2.8958, 42.7138 ], [ 2.8958, 42.7139 ], [ 2.8958, 42.714 ], [ 2.8957, 42.7142 ], [ 2.8957, 42.7145 ], [ 2.8956, 42.7146 ], [ 2.8956, 42.715 ], [ 2.8955, 42.7153 ], [ 2.8955, 42.7155 ], [ 2.8955, 42.7157 ], [ 2.8955, 42.7159 ], [ 2.8956, 42.7162 ], [ 2.8956, 42.7164 ], [ 2.8957, 42.7165 ], [ 2.8957, 42.7167 ], [ 2.8953, 42.7167 ], [ 2.8951, 42.7168 ], [ 2.8948, 42.7169 ], [ 2.8946, 42.7168 ], [ 2.8943, 42.7168 ], [ 2.8939, 42.7169 ], [ 2.8934, 42.7171 ], [ 2.8931, 42.7172 ], [ 2.8927, 42.7173 ], [ 2.8924, 42.7174 ], [ 2.8918, 42.7174 ], [ 2.8913, 42.7175 ], [ 2.8909, 42.7175 ], [ 2.8908, 42.7174 ], [ 2.8909, 42.7173 ], [ 2.8908, 42.7173 ], [ 2.8908, 42.7173 ], [ 2.8906, 42.7173 ], [ 2.8902, 42.7174 ], [ 2.8893, 42.7175 ], [ 2.8881, 42.7176 ], [ 2.8881, 42.7178 ], [ 2.8881, 42.718 ], [ 2.888, 42.7182 ], [ 2.8881, 42.7183 ], [ 2.8882, 42.7184 ], [ 2.8882, 42.7185 ], [ 2.8882, 42.7185 ], [ 2.8882, 42.7186 ], [ 2.8883, 42.7188 ], [ 2.8882, 42.7188 ], [ 2.8882, 42.7189 ], [ 2.8882, 42.7189 ], [ 2.8881, 42.719 ], [ 2.888, 42.7198 ], [ 2.8875, 42.7198 ], [ 2.8874, 42.7198 ], [ 2.8873, 42.7198 ], [ 2.8873, 42.7198 ], [ 2.8872, 42.7199 ], [ 2.8868, 42.7198 ], [ 2.8865, 42.7197 ], [ 2.8863, 42.7204 ], [ 2.8861, 42.7208 ], [ 2.886, 42.7208 ], [ 2.8858, 42.7208 ], [ 2.8857, 42.7208 ], [ 2.8857, 42.7208 ], [ 2.8856, 42.7207 ], [ 2.8853, 42.7205 ], [ 2.8852, 42.7206 ], [ 2.8849, 42.7209 ], [ 2.8848, 42.721 ], [ 2.8842, 42.721 ], [ 2.8843, 42.721 ], [ 2.8842, 42.721 ], [ 2.8836, 42.7212 ], [ 2.8834, 42.7213 ], [ 2.8831, 42.7213 ], [ 2.8834, 42.7213 ], [ 2.8835, 42.7213 ], [ 2.8837, 42.7214 ], [ 2.8837, 42.7215 ], [ 2.8836, 42.7219 ], [ 2.8835, 42.7219 ], [ 2.8835, 42.7221 ], [ 2.8834, 42.7222 ], [ 2.8834, 42.7224 ], [ 2.8827, 42.7224 ], [ 2.8825, 42.7224 ], [ 2.8823, 42.7224 ], [ 2.8818, 42.7224 ], [ 2.8817, 42.7224 ], [ 2.8815, 42.7224 ], [ 2.8811, 42.7224 ], [ 2.8811, 42.7227 ], [ 2.8811, 42.7229 ], [ 2.8811, 42.7231 ], [ 2.8811, 42.7231 ], [ 2.881, 42.7231 ], [ 2.881, 42.7233 ], [ 2.8809, 42.7234 ], [ 2.8811, 42.7234 ], [ 2.881, 42.7237 ], [ 2.8811, 42.7237 ], [ 2.8813, 42.7237 ], [ 2.8814, 42.7237 ], [ 2.8813, 42.7238 ], [ 2.8813, 42.724 ], [ 2.8815, 42.724 ], [ 2.8813, 42.7245 ], [ 2.8812, 42.7246 ], [ 2.8819, 42.7247 ], [ 2.8816, 42.725 ], [ 2.881, 42.7255 ], [ 2.8806, 42.7258 ], [ 2.8807, 42.7259 ], [ 2.8807, 42.7259 ], [ 2.8806, 42.726 ], [ 2.8806, 42.7261 ], [ 2.8805, 42.7261 ], [ 2.8805, 42.7262 ], [ 2.8805, 42.7262 ], [ 2.8805, 42.7263 ], [ 2.8806, 42.7264 ], [ 2.8806, 42.7265 ], [ 2.8806, 42.7266 ], [ 2.8806, 42.7267 ], [ 2.8807, 42.727 ], [ 2.8807, 42.7273 ], [ 2.8813, 42.7272 ], [ 2.8814, 42.7272 ], [ 2.8817, 42.7272 ], [ 2.8818, 42.7272 ], [ 2.8822, 42.7271 ], [ 2.8823, 42.7271 ], [ 2.8825, 42.727 ], [ 2.8827, 42.727 ], [ 2.8827, 42.727 ], [ 2.8829, 42.7271 ], [ 2.883, 42.727 ], [ 2.8831, 42.7271 ], [ 2.8836, 42.7274 ], [ 2.8836, 42.7274 ], [ 2.8838, 42.7275 ], [ 2.8841, 42.7277 ], [ 2.8842, 42.7277 ], [ 2.8844, 42.7277 ], [ 2.8849, 42.7278 ], [ 2.885, 42.7278 ], [ 2.8851, 42.7278 ], [ 2.8854, 42.7277 ], [ 2.8854, 42.7276 ], [ 2.8854, 42.7275 ], [ 2.8854, 42.7269 ], [ 2.8861, 42.7268 ], [ 2.8859, 42.7267 ], [ 2.8858, 42.7266 ], [ 2.8859, 42.7264 ], [ 2.886, 42.7261 ], [ 2.886, 42.7261 ], [ 2.8861, 42.7261 ], [ 2.886, 42.7259 ], [ 2.886, 42.7258 ], [ 2.886, 42.7258 ], [ 2.886, 42.7258 ], [ 2.8859, 42.7257 ], [ 2.8858, 42.7254 ], [ 2.8858, 42.7252 ], [ 2.8858, 42.7252 ], [ 2.8857, 42.7249 ], [ 2.8857, 42.7247 ], [ 2.8856, 42.7244 ], [ 2.8856, 42.7242 ], [ 2.8855, 42.7241 ], [ 2.8855, 42.7241 ], [ 2.8853, 42.7242 ], [ 2.8849, 42.7242 ], [ 2.8841, 42.7243 ], [ 2.884, 42.7243 ], [ 2.884, 42.7243 ], [ 2.8838, 42.7231 ], [ 2.8837, 42.723 ], [ 2.884, 42.7228 ], [ 2.8843, 42.7225 ], [ 2.8848, 42.7221 ], [ 2.885, 42.7219 ], [ 2.8851, 42.7219 ], [ 2.8853, 42.722 ], [ 2.8853, 42.722 ], [ 2.8854, 42.722 ], [ 2.8855, 42.7221 ], [ 2.8855, 42.7221 ], [ 2.8856, 42.7221 ], [ 2.8856, 42.7221 ], [ 2.8857, 42.7222 ], [ 2.8858, 42.7222 ], [ 2.886, 42.7222 ], [ 2.8861, 42.7222 ], [ 2.8862, 42.7222 ], [ 2.8863, 42.7223 ], [ 2.8866, 42.7222 ], [ 2.8866, 42.7222 ], [ 2.8869, 42.7222 ], [ 2.8871, 42.7223 ], [ 2.8871, 42.7224 ], [ 2.8875, 42.7224 ], [ 2.8877, 42.7224 ], [ 2.888, 42.7224 ], [ 2.8883, 42.7225 ], [ 2.8883, 42.7223 ], [ 2.8884, 42.7222 ], [ 2.8885, 42.722 ], [ 2.8886, 42.7219 ], [ 2.8888, 42.7216 ], [ 2.8888, 42.7216 ], [ 2.8886, 42.7215 ], [ 2.8885, 42.7214 ], [ 2.8883, 42.7214 ], [ 2.8882, 42.7213 ], [ 2.8879, 42.7212 ], [ 2.8879, 42.7211 ], [ 2.8881, 42.721 ], [ 2.8882, 42.7209 ], [ 2.8883, 42.7209 ], [ 2.8885, 42.7209 ], [ 2.8888, 42.7208 ], [ 2.889, 42.7208 ], [ 2.8891, 42.7208 ], [ 2.8892, 42.7207 ], [ 2.8892, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8895, 42.7207 ], [ 2.8895, 42.7206 ], [ 2.8897, 42.7205 ], [ 2.8897, 42.7204 ], [ 2.8898, 42.7204 ], [ 2.89, 42.7204 ], [ 2.8901, 42.7203 ], [ 2.8904, 42.7202 ], [ 2.8907, 42.7201 ], [ 2.8909, 42.7201 ], [ 2.891, 42.7201 ], [ 2.8911, 42.7201 ], [ 2.8911, 42.72 ], [ 2.8912, 42.72 ], [ 2.8913, 42.72 ], [ 2.8918, 42.7198 ], [ 2.8919, 42.7197 ], [ 2.8923, 42.7196 ], [ 2.8923, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8925, 42.7196 ], [ 2.8928, 42.7194 ], [ 2.893, 42.7192 ], [ 2.8924, 42.7189 ], [ 2.8924, 42.7188 ], [ 2.8923, 42.7188 ], [ 2.8922, 42.7188 ], [ 2.892, 42.7188 ], [ 2.8918, 42.7188 ], [ 2.8918, 42.7187 ], [ 2.8917, 42.7184 ], [ 2.8918, 42.7184 ], [ 2.8921, 42.7183 ], [ 2.8925, 42.7182 ], [ 2.8933, 42.7181 ], [ 2.8933, 42.7182 ], [ 2.8942, 42.7184 ], [ 2.8953, 42.7186 ], [ 2.8953, 42.7184 ], [ 2.8955, 42.718 ], [ 2.8956, 42.7176 ], [ 2.8956, 42.7176 ], [ 2.8956, 42.7173 ], [ 2.8956, 42.7173 ], [ 2.8957, 42.7173 ], [ 2.8959, 42.7174 ], [ 2.8961, 42.7174 ], [ 2.8963, 42.7175 ], [ 2.8967, 42.7176 ], [ 2.8972, 42.7177 ], [ 2.8975, 42.7178 ], [ 2.8978, 42.7178 ], [ 2.898, 42.7179 ], [ 2.8984, 42.7179 ], [ 2.8987, 42.718 ], [ 2.8988, 42.7175 ], [ 2.8993, 42.7177 ], [ 2.8995, 42.7174 ], [ 2.8997, 42.7172 ], [ 2.9, 42.7169 ], [ 2.9001, 42.7168 ], [ 2.9002, 42.7167 ], [ 2.9003, 42.7166 ], [ 2.9011, 42.7167 ], [ 2.9011, 42.7165 ], [ 2.901, 42.7165 ], [ 2.9011, 42.7164 ], [ 2.9011, 42.7162 ], [ 2.9011, 42.716 ], [ 2.901, 42.7159 ], [ 2.9007, 42.7156 ], [ 2.9004, 42.7153 ], [ 2.9005, 42.7151 ], [ 2.9006, 42.7152 ], [ 2.9008, 42.7153 ], [ 2.9011, 42.7154 ], [ 2.9015, 42.7153 ], [ 2.9016, 42.7153 ], [ 2.9018, 42.7152 ], [ 2.902, 42.7152 ], [ 2.902, 42.7151 ] ] ], "type": "Polygon" }, "id": "6", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066005", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Diagonale Du Haut - Moyen-Vernet" }, "type": "Feature" }, { "bbox": [ 2.8756, 42.6876, 2.8837, 42.7006 ], "geometry": { "coordinates": [ [ [ 2.8837, 42.6899 ], [ 2.8836, 42.6899 ], [ 2.8831, 42.6897 ], [ 2.8827, 42.6896 ], [ 2.8826, 42.6896 ], [ 2.8825, 42.6895 ], [ 2.8824, 42.6896 ], [ 2.8818, 42.6896 ], [ 2.8816, 42.6895 ], [ 2.8816, 42.6894 ], [ 2.8816, 42.6893 ], [ 2.8816, 42.6893 ], [ 2.8817, 42.6893 ], [ 2.8816, 42.6891 ], [ 2.8816, 42.689 ], [ 2.8816, 42.6889 ], [ 2.8816, 42.6888 ], [ 2.8816, 42.6888 ], [ 2.8816, 42.6885 ], [ 2.8816, 42.6884 ], [ 2.8816, 42.6883 ], [ 2.8818, 42.6882 ], [ 2.8818, 42.6881 ], [ 2.8818, 42.6878 ], [ 2.8814, 42.6878 ], [ 2.8813, 42.6878 ], [ 2.8813, 42.6876 ], [ 2.8809, 42.6876 ], [ 2.8809, 42.6877 ], [ 2.8809, 42.6881 ], [ 2.8806, 42.688 ], [ 2.8805, 42.688 ], [ 2.8804, 42.6883 ], [ 2.8804, 42.6884 ], [ 2.8794, 42.6881 ], [ 2.8794, 42.6882 ], [ 2.879, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6882 ], [ 2.8789, 42.6883 ], [ 2.8786, 42.6882 ], [ 2.8782, 42.6881 ], [ 2.8781, 42.6883 ], [ 2.878, 42.6885 ], [ 2.8779, 42.6888 ], [ 2.8777, 42.6891 ], [ 2.8777, 42.6891 ], [ 2.8782, 42.6893 ], [ 2.8787, 42.6896 ], [ 2.8792, 42.6898 ], [ 2.8797, 42.6901 ], [ 2.88, 42.6902 ], [ 2.8804, 42.6904 ], [ 2.8808, 42.6906 ], [ 2.881, 42.6908 ], [ 2.8812, 42.6909 ], [ 2.8815, 42.691 ], [ 2.8815, 42.6911 ], [ 2.8813, 42.6915 ], [ 2.8813, 42.6916 ], [ 2.8812, 42.6916 ], [ 2.8808, 42.6917 ], [ 2.8806, 42.6917 ], [ 2.8804, 42.6918 ], [ 2.8803, 42.6919 ], [ 2.8802, 42.692 ], [ 2.8801, 42.6921 ], [ 2.8799, 42.6924 ], [ 2.8796, 42.6926 ], [ 2.8794, 42.6927 ], [ 2.8791, 42.6927 ], [ 2.8789, 42.6928 ], [ 2.8789, 42.6928 ], [ 2.8788, 42.6928 ], [ 2.8788, 42.6928 ], [ 2.8787, 42.6929 ], [ 2.8786, 42.6929 ], [ 2.8788, 42.6931 ], [ 2.8787, 42.6932 ], [ 2.8785, 42.6935 ], [ 2.878, 42.6934 ], [ 2.8771, 42.6931 ], [ 2.8769, 42.693 ], [ 2.8768, 42.6931 ], [ 2.8767, 42.6931 ], [ 2.8767, 42.6932 ], [ 2.8766, 42.6933 ], [ 2.8765, 42.6934 ], [ 2.8765, 42.6934 ], [ 2.8765, 42.6935 ], [ 2.8765, 42.6938 ], [ 2.8765, 42.694 ], [ 2.8765, 42.6941 ], [ 2.8765, 42.6944 ], [ 2.8763, 42.6943 ], [ 2.8763, 42.6944 ], [ 2.8762, 42.6946 ], [ 2.8761, 42.6949 ], [ 2.876, 42.6953 ], [ 2.876, 42.6955 ], [ 2.876, 42.6956 ], [ 2.8761, 42.6956 ], [ 2.8763, 42.6956 ], [ 2.8764, 42.6956 ], [ 2.8764, 42.6956 ], [ 2.8765, 42.6957 ], [ 2.8766, 42.6957 ], [ 2.8767, 42.6958 ], [ 2.8769, 42.6959 ], [ 2.8768, 42.696 ], [ 2.8768, 42.6964 ], [ 2.8768, 42.6968 ], [ 2.8768, 42.6969 ], [ 2.8768, 42.697 ], [ 2.8767, 42.6972 ], [ 2.8766, 42.6973 ], [ 2.8766, 42.6973 ], [ 2.8765, 42.6974 ], [ 2.8763, 42.6974 ], [ 2.876, 42.6974 ], [ 2.876, 42.6977 ], [ 2.876, 42.698 ], [ 2.8759, 42.6983 ], [ 2.8759, 42.6985 ], [ 2.8759, 42.6986 ], [ 2.8758, 42.6986 ], [ 2.8757, 42.699 ], [ 2.8756, 42.6991 ], [ 2.8761, 42.6991 ], [ 2.8766, 42.6992 ], [ 2.8771, 42.6993 ], [ 2.8772, 42.6993 ], [ 2.8774, 42.6993 ], [ 2.8778, 42.6994 ], [ 2.8778, 42.6994 ], [ 2.878, 42.6995 ], [ 2.8782, 42.6996 ], [ 2.8785, 42.6996 ], [ 2.8789, 42.6998 ], [ 2.8791, 42.6999 ], [ 2.8794, 42.7 ], [ 2.8799, 42.7001 ], [ 2.8808, 42.7004 ], [ 2.8815, 42.7006 ], [ 2.8817, 42.7006 ], [ 2.8817, 42.7003 ], [ 2.8814, 42.7003 ], [ 2.8814, 42.7003 ], [ 2.8809, 42.7001 ], [ 2.881, 42.6996 ], [ 2.8811, 42.6993 ], [ 2.8811, 42.6992 ], [ 2.8803, 42.6991 ], [ 2.8798, 42.6991 ], [ 2.8794, 42.699 ], [ 2.8789, 42.6989 ], [ 2.8785, 42.6989 ], [ 2.8781, 42.6988 ], [ 2.878, 42.6988 ], [ 2.8778, 42.6988 ], [ 2.8778, 42.6987 ], [ 2.8778, 42.6985 ], [ 2.8778, 42.6982 ], [ 2.8779, 42.698 ], [ 2.8779, 42.6976 ], [ 2.878, 42.6977 ], [ 2.8783, 42.6977 ], [ 2.8784, 42.6972 ], [ 2.8787, 42.6967 ], [ 2.8798, 42.6968 ], [ 2.8798, 42.6968 ], [ 2.8799, 42.6968 ], [ 2.8801, 42.6968 ], [ 2.8804, 42.6968 ], [ 2.8805, 42.6968 ], [ 2.881, 42.6969 ], [ 2.8812, 42.6969 ], [ 2.8812, 42.6969 ], [ 2.8814, 42.6969 ], [ 2.8815, 42.6969 ], [ 2.8815, 42.6969 ], [ 2.8815, 42.6971 ], [ 2.8816, 42.6971 ], [ 2.8816, 42.6972 ], [ 2.8822, 42.6973 ], [ 2.8822, 42.6972 ], [ 2.8823, 42.6969 ], [ 2.8823, 42.6969 ], [ 2.8826, 42.697 ], [ 2.8829, 42.6965 ], [ 2.8831, 42.6963 ], [ 2.8831, 42.6962 ], [ 2.8833, 42.696 ], [ 2.8832, 42.6959 ], [ 2.8828, 42.6958 ], [ 2.8829, 42.6956 ], [ 2.8832, 42.6957 ], [ 2.8833, 42.6955 ], [ 2.8832, 42.6955 ], [ 2.8832, 42.6954 ], [ 2.883, 42.6953 ], [ 2.8823, 42.6952 ], [ 2.8823, 42.6952 ], [ 2.8821, 42.6951 ], [ 2.882, 42.6953 ], [ 2.8813, 42.6952 ], [ 2.8811, 42.6951 ], [ 2.8812, 42.6946 ], [ 2.8813, 42.6942 ], [ 2.8814, 42.6939 ], [ 2.8815, 42.6937 ], [ 2.8808, 42.6936 ], [ 2.8805, 42.6935 ], [ 2.881, 42.6922 ], [ 2.8816, 42.6921 ], [ 2.8817, 42.6921 ], [ 2.8817, 42.692 ], [ 2.8818, 42.6919 ], [ 2.8824, 42.6917 ], [ 2.8826, 42.6917 ], [ 2.8827, 42.6915 ], [ 2.8827, 42.6916 ], [ 2.8831, 42.691 ], [ 2.883, 42.691 ], [ 2.8833, 42.6905 ], [ 2.8835, 42.6901 ], [ 2.8836, 42.69 ], [ 2.8837, 42.6899 ] ] ], "type": "Polygon" }, "id": "7", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066003", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Gare" }, "type": "Feature" }, { "bbox": [ 2.3465, 43.2102, 2.3579, 43.2164 ], "geometry": { "coordinates": [ [ [ 2.3579, 43.2105 ], [ 2.3578, 43.2103 ], [ 2.3577, 43.2102 ], [ 2.3571, 43.2102 ], [ 2.3567, 43.2102 ], [ 2.3562, 43.2102 ], [ 2.356, 43.2103 ], [ 2.3558, 43.2103 ], [ 2.3552, 43.2104 ], [ 2.3552, 43.2105 ], [ 2.3473, 43.2105 ], [ 2.3472, 43.2105 ], [ 2.347, 43.211 ], [ 2.3468, 43.2118 ], [ 2.3466, 43.2118 ], [ 2.3465, 43.2124 ], [ 2.3466, 43.2125 ], [ 2.3465, 43.2126 ], [ 2.3465, 43.2127 ], [ 2.3466, 43.2128 ], [ 2.3468, 43.2128 ], [ 2.3471, 43.2134 ], [ 2.3471, 43.2134 ], [ 2.3475, 43.2142 ], [ 2.3474, 43.2142 ], [ 2.348, 43.2151 ], [ 2.348, 43.2151 ], [ 2.3479, 43.2151 ], [ 2.3483, 43.2157 ], [ 2.3487, 43.2164 ], [ 2.3489, 43.2164 ], [ 2.3489, 43.2164 ], [ 2.353, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3536, 43.2163 ], [ 2.3539, 43.2156 ], [ 2.3544, 43.2148 ], [ 2.3544, 43.2148 ], [ 2.3548, 43.2141 ], [ 2.355, 43.2138 ], [ 2.3554, 43.213 ], [ 2.3554, 43.2126 ], [ 2.3555, 43.2126 ], [ 2.3554, 43.2126 ], [ 2.3552, 43.2118 ], [ 2.3555, 43.2119 ], [ 2.3556, 43.2119 ], [ 2.3558, 43.2118 ], [ 2.3573, 43.2116 ], [ 2.3575, 43.2116 ], [ 2.3575, 43.2117 ], [ 2.3576, 43.2116 ], [ 2.3576, 43.2114 ], [ 2.3579, 43.2105 ] ] ], "type": "Polygon" }, "id": "8", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011004", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Bastide Pont-Vieux" }, "type": "Feature" }, { "bbox": [ 2.9955, 43.1804, 3.0095, 43.1877 ], "geometry": { "coordinates": [ [ [ 3.0095, 43.1855 ], [ 3.0095, 43.1854 ], [ 3.0095, 43.1853 ], [ 3.0095, 43.1853 ], [ 3.0094, 43.1852 ], [ 3.0094, 43.1851 ], [ 3.0093, 43.185 ], [ 3.0091, 43.1848 ], [ 3.009, 43.1846 ], [ 3.0089, 43.1845 ], [ 3.0082, 43.1847 ], [ 3.0082, 43.1847 ], [ 3.0078, 43.1848 ], [ 3.0077, 43.1848 ], [ 3.0076, 43.1847 ], [ 3.0075, 43.1846 ], [ 3.0075, 43.1845 ], [ 3.0074, 43.1844 ], [ 3.0076, 43.1844 ], [ 3.0075, 43.1843 ], [ 3.0075, 43.1842 ], [ 3.0074, 43.1841 ], [ 3.0073, 43.1841 ], [ 3.0072, 43.184 ], [ 3.0072, 43.1839 ], [ 3.007, 43.1838 ], [ 3.007, 43.1837 ], [ 3.0068, 43.1837 ], [ 3.0067, 43.1835 ], [ 3.0066, 43.1834 ], [ 3.0066, 43.1834 ], [ 3.0065, 43.1833 ], [ 3.0065, 43.1833 ], [ 3.0064, 43.1833 ], [ 3.0059, 43.1834 ], [ 3.0058, 43.1834 ], [ 3.0057, 43.1835 ], [ 3.0056, 43.1833 ], [ 3.0056, 43.1833 ], [ 3.0055, 43.1833 ], [ 3.0055, 43.1833 ], [ 3.0054, 43.1832 ], [ 3.0054, 43.1832 ], [ 3.0054, 43.1832 ], [ 3.0053, 43.1831 ], [ 3.0053, 43.1832 ], [ 3.0053, 43.1831 ], [ 3.0052, 43.1831 ], [ 3.0051, 43.1831 ], [ 3.005, 43.1829 ], [ 3.004, 43.1823 ], [ 3.0039, 43.1822 ], [ 3.0037, 43.1819 ], [ 3.0036, 43.1819 ], [ 3.0036, 43.1819 ], [ 3.0035, 43.1819 ], [ 3.0034, 43.1819 ], [ 3.0032, 43.1817 ], [ 3.0032, 43.1817 ], [ 3.0031, 43.1818 ], [ 3.003, 43.1817 ], [ 3.0029, 43.1817 ], [ 3.0029, 43.1817 ], [ 3.0028, 43.1816 ], [ 3.0027, 43.1815 ], [ 3.0026, 43.1816 ], [ 3.0023, 43.1817 ], [ 3.0023, 43.1816 ], [ 3.0021, 43.1813 ], [ 3.0018, 43.181 ], [ 3.0015, 43.1808 ], [ 3.0014, 43.1807 ], [ 3.0013, 43.1807 ], [ 3.001, 43.1807 ], [ 3.001, 43.1808 ], [ 3.0011, 43.1812 ], [ 3.0008, 43.1813 ], [ 3.0004, 43.1813 ], [ 3.0001, 43.1814 ], [ 2.9999, 43.1814 ], [ 2.9996, 43.1813 ], [ 2.9995, 43.1814 ], [ 2.9993, 43.1814 ], [ 2.9993, 43.1814 ], [ 2.9992, 43.1814 ], [ 2.9992, 43.1813 ], [ 2.9992, 43.1812 ], [ 2.9991, 43.1812 ], [ 2.999, 43.1808 ], [ 2.9987, 43.1809 ], [ 2.9983, 43.181 ], [ 2.9977, 43.1812 ], [ 2.9976, 43.181 ], [ 2.9975, 43.1807 ], [ 2.9973, 43.1804 ], [ 2.997, 43.1804 ], [ 2.9966, 43.1804 ], [ 2.9968, 43.1808 ], [ 2.9971, 43.1812 ], [ 2.997, 43.1813 ], [ 2.9968, 43.1813 ], [ 2.9961, 43.1814 ], [ 2.9955, 43.1815 ], [ 2.9956, 43.1818 ], [ 2.9955, 43.1819 ], [ 2.9955, 43.1823 ], [ 2.9957, 43.1823 ], [ 2.9957, 43.1828 ], [ 2.9957, 43.183 ], [ 2.9958, 43.183 ], [ 2.9959, 43.183 ], [ 2.9959, 43.1832 ], [ 2.9959, 43.1832 ], [ 2.9959, 43.1832 ], [ 2.9963, 43.1833 ], [ 2.9965, 43.1834 ], [ 2.9967, 43.1835 ], [ 2.9968, 43.1836 ], [ 2.9969, 43.1836 ], [ 2.9971, 43.1836 ], [ 2.9971, 43.1836 ], [ 2.9972, 43.1836 ], [ 2.9977, 43.1835 ], [ 2.9978, 43.1836 ], [ 2.9989, 43.1844 ], [ 2.9992, 43.1847 ], [ 2.9995, 43.1849 ], [ 2.9996, 43.1848 ], [ 2.9997, 43.1847 ], [ 2.9998, 43.1847 ], [ 2.9999, 43.1847 ], [ 3.0001, 43.1846 ], [ 3.0002, 43.1846 ], [ 3.0005, 43.1844 ], [ 3.0008, 43.1843 ], [ 3.0012, 43.1841 ], [ 3.0016, 43.184 ], [ 3.0017, 43.1839 ], [ 3.0019, 43.1839 ], [ 3.0023, 43.1837 ], [ 3.0026, 43.1839 ], [ 3.0027, 43.184 ], [ 3.0028, 43.1841 ], [ 3.0028, 43.1842 ], [ 3.0032, 43.1852 ], [ 3.0033, 43.1852 ], [ 3.0033, 43.1853 ], [ 3.0037, 43.1851 ], [ 3.0037, 43.1852 ], [ 3.0038, 43.1854 ], [ 3.0039, 43.1855 ], [ 3.004, 43.1857 ], [ 3.004, 43.1858 ], [ 3.0041, 43.1858 ], [ 3.0042, 43.1859 ], [ 3.0043, 43.1859 ], [ 3.0044, 43.1859 ], [ 3.0045, 43.1859 ], [ 3.0045, 43.186 ], [ 3.0045, 43.1862 ], [ 3.0045, 43.1863 ], [ 3.0046, 43.1864 ], [ 3.0046, 43.1864 ], [ 3.0047, 43.1865 ], [ 3.0048, 43.1866 ], [ 3.0049, 43.1867 ], [ 3.0049, 43.1868 ], [ 3.005, 43.1869 ], [ 3.0051, 43.187 ], [ 3.0052, 43.1871 ], [ 3.0053, 43.1873 ], [ 3.0056, 43.187 ], [ 3.0064, 43.1873 ], [ 3.0072, 43.1877 ], [ 3.0073, 43.1877 ], [ 3.0074, 43.1876 ], [ 3.0075, 43.1873 ], [ 3.0076, 43.1872 ], [ 3.0078, 43.1871 ], [ 3.0079, 43.1871 ], [ 3.008, 43.1871 ], [ 3.008, 43.1871 ], [ 3.0082, 43.1871 ], [ 3.0087, 43.1864 ], [ 3.0093, 43.1858 ], [ 3.0094, 43.1856 ], [ 3.0095, 43.1855 ] ] ], "type": "Polygon" }, "id": "9", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011008", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Centre" }, "type": "Feature" }, { "bbox": [ 3.0116, 43.192, 3.0172, 43.1962 ], "geometry": { "coordinates": [ [ [ 3.0167, 43.1938 ], [ 3.0165, 43.1936 ], [ 3.0165, 43.1934 ], [ 3.0163, 43.1933 ], [ 3.0159, 43.1928 ], [ 3.0157, 43.1927 ], [ 3.0155, 43.1924 ], [ 3.0152, 43.192 ], [ 3.0141, 43.1924 ], [ 3.014, 43.1925 ], [ 3.0139, 43.1924 ], [ 3.0137, 43.1921 ], [ 3.013, 43.1924 ], [ 3.0123, 43.1926 ], [ 3.0129, 43.1937 ], [ 3.0126, 43.1938 ], [ 3.0126, 43.1938 ], [ 3.0128, 43.1944 ], [ 3.0131, 43.195 ], [ 3.0126, 43.1952 ], [ 3.0126, 43.1952 ], [ 3.0126, 43.1954 ], [ 3.0116, 43.1956 ], [ 3.0123, 43.1962 ], [ 3.0123, 43.1962 ], [ 3.0133, 43.196 ], [ 3.0131, 43.1954 ], [ 3.0135, 43.1953 ], [ 3.0143, 43.1952 ], [ 3.0144, 43.1952 ], [ 3.0145, 43.1952 ], [ 3.0149, 43.1951 ], [ 3.0149, 43.1951 ], [ 3.0149, 43.1954 ], [ 3.015, 43.1957 ], [ 3.015, 43.1957 ], [ 3.0158, 43.1952 ], [ 3.0159, 43.1952 ], [ 3.0162, 43.195 ], [ 3.0166, 43.1947 ], [ 3.017, 43.1945 ], [ 3.0171, 43.1944 ], [ 3.0172, 43.1943 ], [ 3.0172, 43.1941 ], [ 3.0171, 43.194 ], [ 3.017, 43.1939 ], [ 3.0169, 43.1938 ], [ 3.0167, 43.1938 ] ] ], "type": "Polygon" }, "id": "10", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011009", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Est" }, "type": "Feature" }, { "bbox": [ 4.3233, 43.8189, 4.342, 43.8338 ], "geometry": { "coordinates": [ [ [ 4.3277, 43.8276 ], [ 4.3268, 43.8273 ], [ 4.3267, 43.8274 ], [ 4.3259, 43.8287 ], [ 4.3256, 43.8292 ], [ 4.3252, 43.8299 ], [ 4.3251, 43.8301 ], [ 4.3249, 43.8301 ], [ 4.3245, 43.8303 ], [ 4.3242, 43.8303 ], [ 4.3238, 43.8305 ], [ 4.3235, 43.8307 ], [ 4.3233, 43.8308 ], [ 4.3233, 43.8311 ], [ 4.3234, 43.8312 ], [ 4.3239, 43.8319 ], [ 4.324, 43.8321 ], [ 4.324, 43.8323 ], [ 4.3242, 43.8324 ], [ 4.3244, 43.8325 ], [ 4.3246, 43.8326 ], [ 4.3251, 43.8329 ], [ 4.3253, 43.8329 ], [ 4.3254, 43.8329 ], [ 4.3256, 43.8329 ], [ 4.3257, 43.8328 ], [ 4.3258, 43.8327 ], [ 4.326, 43.8325 ], [ 4.3263, 43.8321 ], [ 4.3263, 43.832 ], [ 4.3264, 43.8321 ], [ 4.3268, 43.8322 ], [ 4.3269, 43.832 ], [ 4.327, 43.832 ], [ 4.3273, 43.832 ], [ 4.3273, 43.832 ], [ 4.3278, 43.8322 ], [ 4.3283, 43.8324 ], [ 4.3283, 43.8323 ], [ 4.3285, 43.8324 ], [ 4.3287, 43.8329 ], [ 4.3284, 43.833 ], [ 4.3289, 43.8333 ], [ 4.3286, 43.8336 ], [ 4.3291, 43.8338 ], [ 4.3293, 43.8336 ], [ 4.3301, 43.8334 ], [ 4.3308, 43.8331 ], [ 4.3306, 43.8329 ], [ 4.3307, 43.8325 ], [ 4.3308, 43.8325 ], [ 4.3309, 43.8324 ], [ 4.331, 43.8323 ], [ 4.3317, 43.8326 ], [ 4.3317, 43.8325 ], [ 4.3317, 43.8325 ], [ 4.3317, 43.8324 ], [ 4.3316, 43.8323 ], [ 4.3316, 43.8322 ], [ 4.3319, 43.8322 ], [ 4.332, 43.8322 ], [ 4.3321, 43.8322 ], [ 4.3323, 43.8322 ], [ 4.3329, 43.8321 ], [ 4.3329, 43.8321 ], [ 4.3329, 43.832 ], [ 4.3329, 43.8319 ], [ 4.3332, 43.8315 ], [ 4.3333, 43.8314 ], [ 4.3334, 43.8312 ], [ 4.3337, 43.8307 ], [ 4.3332, 43.8306 ], [ 4.3333, 43.8305 ], [ 4.333, 43.8304 ], [ 4.3323, 43.8301 ], [ 4.333, 43.8291 ], [ 4.3331, 43.8288 ], [ 4.3332, 43.8286 ], [ 4.3332, 43.8285 ], [ 4.3334, 43.8288 ], [ 4.3335, 43.8289 ], [ 4.3335, 43.8289 ], [ 4.3336, 43.829 ], [ 4.3337, 43.8291 ], [ 4.3339, 43.8291 ], [ 4.334, 43.8292 ], [ 4.3341, 43.8292 ], [ 4.3344, 43.8292 ], [ 4.3345, 43.8292 ], [ 4.335, 43.8291 ], [ 4.3356, 43.8289 ], [ 4.3356, 43.8288 ], [ 4.3356, 43.8287 ], [ 4.3358, 43.8284 ], [ 4.3365, 43.8285 ], [ 4.3367, 43.8285 ], [ 4.3368, 43.8286 ], [ 4.3369, 43.8287 ], [ 4.3377, 43.8292 ], [ 4.338, 43.8289 ], [ 4.338, 43.8288 ], [ 4.3381, 43.8287 ], [ 4.3382, 43.8288 ], [ 4.3383, 43.8286 ], [ 4.3384, 43.8287 ], [ 4.3384, 43.8287 ], [ 4.3379, 43.8284 ], [ 4.338, 43.828 ], [ 4.3383, 43.828 ], [ 4.3386, 43.8281 ], [ 4.3387, 43.8282 ], [ 4.3387, 43.8281 ], [ 4.3386, 43.8278 ], [ 4.3386, 43.8278 ], [ 4.3387, 43.8275 ], [ 4.3388, 43.8275 ], [ 4.3388, 43.8272 ], [ 4.3384, 43.8274 ], [ 4.3381, 43.8275 ], [ 4.3379, 43.8275 ], [ 4.3378, 43.8274 ], [ 4.3381, 43.8268 ], [ 4.3382, 43.8265 ], [ 4.3372, 43.8262 ], [ 4.3363, 43.8259 ], [ 4.3363, 43.8258 ], [ 4.337, 43.8246 ], [ 4.3375, 43.8247 ], [ 4.3377, 43.8249 ], [ 4.3387, 43.8252 ], [ 4.3389, 43.8253 ], [ 4.3391, 43.8252 ], [ 4.3395, 43.8251 ], [ 4.3398, 43.8251 ], [ 4.3401, 43.8251 ], [ 4.3403, 43.8251 ], [ 4.3404, 43.8252 ], [ 4.3407, 43.8253 ], [ 4.3413, 43.8252 ], [ 4.3419, 43.8251 ], [ 4.342, 43.825 ], [ 4.3419, 43.8248 ], [ 4.3414, 43.8247 ], [ 4.3418, 43.8243 ], [ 4.3414, 43.8242 ], [ 4.3413, 43.8241 ], [ 4.341, 43.824 ], [ 4.3414, 43.8235 ], [ 4.341, 43.8234 ], [ 4.3406, 43.8233 ], [ 4.3402, 43.8232 ], [ 4.3404, 43.8229 ], [ 4.3407, 43.8225 ], [ 4.3408, 43.8221 ], [ 4.3411, 43.8217 ], [ 4.3413, 43.8214 ], [ 4.3417, 43.821 ], [ 4.3417, 43.8209 ], [ 4.3412, 43.8207 ], [ 4.3406, 43.8205 ], [ 4.3403, 43.8203 ], [ 4.34, 43.8202 ], [ 4.3394, 43.8199 ], [ 4.3388, 43.8196 ], [ 4.3385, 43.8195 ], [ 4.3382, 43.8193 ], [ 4.3379, 43.8191 ], [ 4.3375, 43.8189 ], [ 4.337, 43.8193 ], [ 4.3368, 43.8195 ], [ 4.3364, 43.8198 ], [ 4.3362, 43.82 ], [ 4.3361, 43.8202 ], [ 4.3359, 43.8203 ], [ 4.3356, 43.8202 ], [ 4.3353, 43.8202 ], [ 4.3347, 43.8202 ], [ 4.3342, 43.8203 ], [ 4.3327, 43.8205 ], [ 4.3322, 43.8206 ], [ 4.3316, 43.8208 ], [ 4.331, 43.821 ], [ 4.3306, 43.8211 ], [ 4.3303, 43.8212 ], [ 4.3299, 43.8215 ], [ 4.3295, 43.8218 ], [ 4.3289, 43.8223 ], [ 4.3285, 43.8228 ], [ 4.3282, 43.8233 ], [ 4.3283, 43.8235 ], [ 4.3284, 43.8236 ], [ 4.3289, 43.8238 ], [ 4.3295, 43.8241 ], [ 4.3305, 43.8248 ], [ 4.3313, 43.8255 ], [ 4.3321, 43.826 ], [ 4.3323, 43.8261 ], [ 4.3326, 43.8263 ], [ 4.3328, 43.8265 ], [ 4.333, 43.8267 ], [ 4.3332, 43.8268 ], [ 4.3336, 43.8271 ], [ 4.334, 43.8265 ], [ 4.3343, 43.8259 ], [ 4.3346, 43.826 ], [ 4.3347, 43.826 ], [ 4.3349, 43.8258 ], [ 4.335, 43.8257 ], [ 4.335, 43.8257 ], [ 4.3352, 43.8256 ], [ 4.3358, 43.8258 ], [ 4.3361, 43.8259 ], [ 4.3362, 43.826 ], [ 4.3362, 43.8261 ], [ 4.3358, 43.8268 ], [ 4.3356, 43.8267 ], [ 4.3355, 43.8268 ], [ 4.3357, 43.8269 ], [ 4.3358, 43.827 ], [ 4.3358, 43.8271 ], [ 4.3351, 43.8273 ], [ 4.3352, 43.8274 ], [ 4.3353, 43.8276 ], [ 4.3355, 43.8278 ], [ 4.3356, 43.828 ], [ 4.3356, 43.8282 ], [ 4.3352, 43.8283 ], [ 4.3349, 43.8281 ], [ 4.3347, 43.8279 ], [ 4.3335, 43.8272 ], [ 4.3337, 43.8276 ], [ 4.3338, 43.8278 ], [ 4.3339, 43.8278 ], [ 4.3339, 43.8279 ], [ 4.3339, 43.8279 ], [ 4.3338, 43.828 ], [ 4.3334, 43.8279 ], [ 4.3332, 43.8278 ], [ 4.3331, 43.8279 ], [ 4.333, 43.828 ], [ 4.3329, 43.828 ], [ 4.3331, 43.8282 ], [ 4.3329, 43.8283 ], [ 4.3327, 43.8282 ], [ 4.3325, 43.8281 ], [ 4.3321, 43.8279 ], [ 4.3319, 43.8286 ], [ 4.3317, 43.8289 ], [ 4.3316, 43.829 ], [ 4.3315, 43.8289 ], [ 4.3314, 43.8289 ], [ 4.3314, 43.829 ], [ 4.3313, 43.8292 ], [ 4.3313, 43.8292 ], [ 4.3313, 43.8293 ], [ 4.3312, 43.8293 ], [ 4.3312, 43.8293 ], [ 4.3311, 43.8293 ], [ 4.331, 43.8293 ], [ 4.3309, 43.8294 ], [ 4.3308, 43.8294 ], [ 4.3308, 43.8294 ], [ 4.3308, 43.8295 ], [ 4.3307, 43.8295 ], [ 4.3306, 43.8295 ], [ 4.3305, 43.8296 ], [ 4.3304, 43.8296 ], [ 4.3304, 43.8296 ], [ 4.3309, 43.8298 ], [ 4.3309, 43.8299 ], [ 4.3308, 43.83 ], [ 4.3307, 43.8301 ], [ 4.3307, 43.8304 ], [ 4.3306, 43.8306 ], [ 4.3304, 43.8308 ], [ 4.3304, 43.8309 ], [ 4.3303, 43.8309 ], [ 4.3292, 43.8305 ], [ 4.3293, 43.8303 ], [ 4.3287, 43.8291 ], [ 4.33, 43.8287 ], [ 4.3301, 43.8287 ], [ 4.3303, 43.8288 ], [ 4.3304, 43.8285 ], [ 4.3304, 43.8285 ], [ 4.3305, 43.8284 ], [ 4.3307, 43.8281 ], [ 4.3307, 43.828 ], [ 4.3307, 43.8278 ], [ 4.331, 43.8274 ], [ 4.3308, 43.8273 ], [ 4.3304, 43.8275 ], [ 4.3301, 43.8276 ], [ 4.3299, 43.8276 ], [ 4.3298, 43.8279 ], [ 4.3292, 43.8279 ], [ 4.3292, 43.8274 ], [ 4.3281, 43.827 ], [ 4.3277, 43.8276 ] ] ], "type": "Polygon" }, "id": "11", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030003", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Pissevin - Valdegour" }, "type": "Feature" }, { "bbox": [ 3.9824, 44.0535, 3.9873, 44.0594 ], "geometry": { "coordinates": [ [ [ 3.9824, 44.0536 ], [ 3.9825, 44.0537 ], [ 3.9828, 44.0539 ], [ 3.9829, 44.054 ], [ 3.983, 44.0541 ], [ 3.9831, 44.0543 ], [ 3.9833, 44.0544 ], [ 3.9833, 44.0544 ], [ 3.9833, 44.0545 ], [ 3.9834, 44.0545 ], [ 3.9836, 44.0548 ], [ 3.9835, 44.0548 ], [ 3.9836, 44.0549 ], [ 3.9834, 44.055 ], [ 3.9836, 44.0552 ], [ 3.9838, 44.0551 ], [ 3.9838, 44.0553 ], [ 3.9839, 44.0554 ], [ 3.9839, 44.0554 ], [ 3.9838, 44.0555 ], [ 3.9838, 44.0556 ], [ 3.9838, 44.0556 ], [ 3.9839, 44.0558 ], [ 3.984, 44.0558 ], [ 3.9841, 44.0559 ], [ 3.9843, 44.0559 ], [ 3.9843, 44.056 ], [ 3.9843, 44.056 ], [ 3.9842, 44.0561 ], [ 3.9844, 44.0562 ], [ 3.9845, 44.0564 ], [ 3.9846, 44.0565 ], [ 3.9846, 44.0566 ], [ 3.9846, 44.0567 ], [ 3.9846, 44.0568 ], [ 3.9847, 44.0569 ], [ 3.9847, 44.0569 ], [ 3.9849, 44.0568 ], [ 3.9849, 44.0568 ], [ 3.985, 44.0568 ], [ 3.985, 44.0569 ], [ 3.985, 44.0569 ], [ 3.985, 44.057 ], [ 3.9851, 44.057 ], [ 3.9851, 44.0571 ], [ 3.9852, 44.0572 ], [ 3.9852, 44.0573 ], [ 3.9853, 44.0574 ], [ 3.9853, 44.0574 ], [ 3.9853, 44.0575 ], [ 3.9853, 44.0575 ], [ 3.9848, 44.0575 ], [ 3.9848, 44.0576 ], [ 3.9848, 44.0577 ], [ 3.985, 44.0578 ], [ 3.9851, 44.0578 ], [ 3.9853, 44.0578 ], [ 3.9851, 44.0582 ], [ 3.985, 44.0583 ], [ 3.9849, 44.0584 ], [ 3.9849, 44.0585 ], [ 3.9848, 44.0585 ], [ 3.9847, 44.0587 ], [ 3.9845, 44.0589 ], [ 3.9845, 44.0593 ], [ 3.9847, 44.0594 ], [ 3.9851, 44.0591 ], [ 3.9852, 44.059 ], [ 3.9853, 44.0589 ], [ 3.9852, 44.0588 ], [ 3.9854, 44.0587 ], [ 3.9856, 44.0584 ], [ 3.9858, 44.0583 ], [ 3.9859, 44.0581 ], [ 3.986, 44.058 ], [ 3.9861, 44.0578 ], [ 3.9862, 44.0576 ], [ 3.9863, 44.0574 ], [ 3.9865, 44.057 ], [ 3.9867, 44.0564 ], [ 3.9868, 44.0562 ], [ 3.9869, 44.056 ], [ 3.9869, 44.0559 ], [ 3.987, 44.0557 ], [ 3.987, 44.0556 ], [ 3.987, 44.0554 ], [ 3.9872, 44.0554 ], [ 3.9872, 44.0551 ], [ 3.9871, 44.055 ], [ 3.9871, 44.0548 ], [ 3.9871, 44.0546 ], [ 3.9871, 44.0546 ], [ 3.9872, 44.0545 ], [ 3.9873, 44.0542 ], [ 3.9873, 44.054 ], [ 3.9873, 44.054 ], [ 3.987, 44.0538 ], [ 3.9863, 44.0536 ], [ 3.9859, 44.0535 ], [ 3.9861, 44.0536 ], [ 3.9859, 44.0536 ], [ 3.9856, 44.0536 ], [ 3.9854, 44.0536 ], [ 3.9853, 44.0536 ], [ 3.9851, 44.0536 ], [ 3.9849, 44.0537 ], [ 3.9848, 44.0537 ], [ 3.9847, 44.0536 ], [ 3.9846, 44.0535 ], [ 3.9846, 44.0535 ], [ 3.9845, 44.0535 ], [ 3.984, 44.0537 ], [ 3.9839, 44.0537 ], [ 3.9839, 44.0537 ], [ 3.9837, 44.0537 ], [ 3.983, 44.0537 ], [ 3.983, 44.0537 ], [ 3.9829, 44.0537 ], [ 3.9824, 44.0535 ], [ 3.9824, 44.0536 ] ] ], "type": "Polygon" }, "id": "12", "properties": { "code_commune": "30010", "code_departement": "30", "code_qp": "QP030002", "commune_qp": "Anduze", "nom_commune": "Anduze", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 4.1241, 43.6696, 4.1407, 43.6799 ], "geometry": { "coordinates": [ [ [ 4.1386, 43.6762 ], [ 4.1385, 43.676 ], [ 4.1383, 43.6759 ], [ 4.1382, 43.6759 ], [ 4.1379, 43.6755 ], [ 4.138, 43.6751 ], [ 4.138, 43.6749 ], [ 4.138, 43.6745 ], [ 4.1378, 43.6741 ], [ 4.1374, 43.6734 ], [ 4.1373, 43.6732 ], [ 4.1369, 43.6728 ], [ 4.1367, 43.6726 ], [ 4.1366, 43.6725 ], [ 4.1366, 43.6725 ], [ 4.1366, 43.6722 ], [ 4.1371, 43.6721 ], [ 4.1373, 43.6721 ], [ 4.1383, 43.6722 ], [ 4.1396, 43.6723 ], [ 4.1404, 43.6724 ], [ 4.1405, 43.6715 ], [ 4.1407, 43.6705 ], [ 4.1402, 43.6705 ], [ 4.1402, 43.6706 ], [ 4.1391, 43.6705 ], [ 4.1391, 43.6705 ], [ 4.1383, 43.6704 ], [ 4.1383, 43.6704 ], [ 4.1379, 43.6704 ], [ 4.1378, 43.6705 ], [ 4.1378, 43.6709 ], [ 4.1379, 43.6709 ], [ 4.1379, 43.6709 ], [ 4.1378, 43.671 ], [ 4.1377, 43.671 ], [ 4.1376, 43.6709 ], [ 4.1376, 43.6709 ], [ 4.1375, 43.6709 ], [ 4.1375, 43.6709 ], [ 4.1368, 43.6708 ], [ 4.1367, 43.671 ], [ 4.1367, 43.6711 ], [ 4.1367, 43.6713 ], [ 4.1367, 43.6715 ], [ 4.1367, 43.6716 ], [ 4.1367, 43.6717 ], [ 4.1367, 43.672 ], [ 4.1367, 43.6721 ], [ 4.1366, 43.6722 ], [ 4.1365, 43.6722 ], [ 4.1365, 43.6722 ], [ 4.1363, 43.6722 ], [ 4.1363, 43.6724 ], [ 4.1361, 43.6726 ], [ 4.136, 43.6726 ], [ 4.136, 43.6727 ], [ 4.136, 43.6728 ], [ 4.1359, 43.6737 ], [ 4.1356, 43.6737 ], [ 4.1356, 43.6736 ], [ 4.1356, 43.6736 ], [ 4.1356, 43.6736 ], [ 4.1354, 43.6734 ], [ 4.1347, 43.6734 ], [ 4.1342, 43.6734 ], [ 4.1342, 43.6734 ], [ 4.1342, 43.6732 ], [ 4.1339, 43.6732 ], [ 4.1337, 43.6732 ], [ 4.1334, 43.6732 ], [ 4.1334, 43.6732 ], [ 4.1332, 43.6733 ], [ 4.1332, 43.6732 ], [ 4.133, 43.6734 ], [ 4.1328, 43.6733 ], [ 4.133, 43.6728 ], [ 4.1327, 43.6727 ], [ 4.1325, 43.6731 ], [ 4.1323, 43.6732 ], [ 4.1322, 43.6732 ], [ 4.1322, 43.6733 ], [ 4.1321, 43.6735 ], [ 4.1321, 43.6736 ], [ 4.132, 43.6737 ], [ 4.132, 43.674 ], [ 4.1321, 43.674 ], [ 4.1321, 43.674 ], [ 4.1325, 43.674 ], [ 4.1325, 43.6741 ], [ 4.1325, 43.6743 ], [ 4.1324, 43.6744 ], [ 4.1324, 43.6745 ], [ 4.1324, 43.6746 ], [ 4.1323, 43.6747 ], [ 4.1323, 43.6748 ], [ 4.1321, 43.6748 ], [ 4.1318, 43.6747 ], [ 4.1315, 43.6747 ], [ 4.1314, 43.6746 ], [ 4.1312, 43.6746 ], [ 4.1313, 43.6742 ], [ 4.1299, 43.6743 ], [ 4.1298, 43.6743 ], [ 4.1298, 43.6744 ], [ 4.1299, 43.6744 ], [ 4.13, 43.6744 ], [ 4.1299, 43.6746 ], [ 4.1297, 43.6751 ], [ 4.1294, 43.6749 ], [ 4.1294, 43.6752 ], [ 4.1288, 43.6753 ], [ 4.1287, 43.6751 ], [ 4.1281, 43.6752 ], [ 4.1278, 43.6754 ], [ 4.1273, 43.675 ], [ 4.1273, 43.6749 ], [ 4.1278, 43.6745 ], [ 4.1281, 43.6743 ], [ 4.1282, 43.6743 ], [ 4.1282, 43.6742 ], [ 4.1284, 43.6739 ], [ 4.1282, 43.6738 ], [ 4.1284, 43.6738 ], [ 4.1285, 43.6737 ], [ 4.1288, 43.6733 ], [ 4.129, 43.6729 ], [ 4.1291, 43.6727 ], [ 4.1293, 43.6724 ], [ 4.1296, 43.672 ], [ 4.1295, 43.672 ], [ 4.1294, 43.672 ], [ 4.129, 43.6718 ], [ 4.1286, 43.6716 ], [ 4.1284, 43.6716 ], [ 4.1277, 43.6714 ], [ 4.1276, 43.6713 ], [ 4.1272, 43.6713 ], [ 4.127, 43.6712 ], [ 4.1271, 43.671 ], [ 4.1271, 43.6709 ], [ 4.1273, 43.6708 ], [ 4.1275, 43.6708 ], [ 4.1276, 43.6708 ], [ 4.1278, 43.6704 ], [ 4.1281, 43.6701 ], [ 4.1282, 43.67 ], [ 4.1272, 43.6698 ], [ 4.1258, 43.6696 ], [ 4.1254, 43.671 ], [ 4.1254, 43.6711 ], [ 4.1253, 43.6711 ], [ 4.1251, 43.6711 ], [ 4.1249, 43.6711 ], [ 4.1246, 43.6711 ], [ 4.1243, 43.671 ], [ 4.1243, 43.6712 ], [ 4.1242, 43.6715 ], [ 4.1242, 43.6719 ], [ 4.1243, 43.6721 ], [ 4.1244, 43.6721 ], [ 4.1244, 43.6721 ], [ 4.1251, 43.672 ], [ 4.1263, 43.6724 ], [ 4.1262, 43.6726 ], [ 4.1265, 43.6727 ], [ 4.1276, 43.673 ], [ 4.1281, 43.6731 ], [ 4.1279, 43.6736 ], [ 4.1278, 43.6739 ], [ 4.1276, 43.674 ], [ 4.1274, 43.674 ], [ 4.1271, 43.6739 ], [ 4.1269, 43.674 ], [ 4.1267, 43.6741 ], [ 4.1263, 43.6743 ], [ 4.1262, 43.6744 ], [ 4.1266, 43.6746 ], [ 4.1261, 43.675 ], [ 4.1256, 43.6754 ], [ 4.1252, 43.6757 ], [ 4.1252, 43.6758 ], [ 4.1247, 43.6756 ], [ 4.1244, 43.6754 ], [ 4.1241, 43.6755 ], [ 4.1243, 43.6757 ], [ 4.1241, 43.6758 ], [ 4.1244, 43.6761 ], [ 4.1246, 43.676 ], [ 4.1251, 43.6764 ], [ 4.1252, 43.6764 ], [ 4.1265, 43.6761 ], [ 4.1283, 43.6758 ], [ 4.1285, 43.6758 ], [ 4.1291, 43.6757 ], [ 4.1301, 43.6754 ], [ 4.1303, 43.6754 ], [ 4.1315, 43.6755 ], [ 4.1317, 43.6756 ], [ 4.1319, 43.6758 ], [ 4.1322, 43.676 ], [ 4.1324, 43.6762 ], [ 4.1329, 43.6764 ], [ 4.1333, 43.6766 ], [ 4.1337, 43.6769 ], [ 4.1335, 43.6772 ], [ 4.1333, 43.6774 ], [ 4.1332, 43.6776 ], [ 4.1331, 43.6779 ], [ 4.1342, 43.6781 ], [ 4.1342, 43.6781 ], [ 4.1344, 43.6781 ], [ 4.1342, 43.6784 ], [ 4.1341, 43.6787 ], [ 4.1339, 43.6786 ], [ 4.1338, 43.6787 ], [ 4.1337, 43.6787 ], [ 4.1336, 43.6789 ], [ 4.1335, 43.6788 ], [ 4.1332, 43.6791 ], [ 4.133, 43.6792 ], [ 4.1328, 43.6791 ], [ 4.1327, 43.6794 ], [ 4.1326, 43.6794 ], [ 4.1326, 43.6794 ], [ 4.1324, 43.6797 ], [ 4.1334, 43.6799 ], [ 4.1334, 43.6797 ], [ 4.1334, 43.6797 ], [ 4.1335, 43.6795 ], [ 4.1339, 43.6796 ], [ 4.134, 43.6794 ], [ 4.1341, 43.6791 ], [ 4.1343, 43.6792 ], [ 4.1344, 43.679 ], [ 4.1348, 43.6792 ], [ 4.1349, 43.6789 ], [ 4.1351, 43.679 ], [ 4.1354, 43.6782 ], [ 4.1355, 43.6778 ], [ 4.1365, 43.678 ], [ 4.1365, 43.6779 ], [ 4.1366, 43.6779 ], [ 4.1367, 43.6773 ], [ 4.1369, 43.6774 ], [ 4.1371, 43.6774 ], [ 4.1375, 43.6776 ], [ 4.1379, 43.6777 ], [ 4.1378, 43.6776 ], [ 4.1378, 43.6776 ], [ 4.1382, 43.677 ], [ 4.1382, 43.677 ], [ 4.1386, 43.6762 ] ] ], "type": "Polygon" }, "id": "13", "properties": { "code_commune": "34145", "code_departement": "34", "code_qp": "QP034021", "commune_qp": "Lunel", "nom_commune": "Lunel", "nom_qp": "Centre Et Périphérie" }, "type": "Feature" }, { "bbox": [ 4.6254, 43.8078, 4.6319, 43.8124 ], "geometry": { "coordinates": [ [ [ 4.6319, 43.8112 ], [ 4.6319, 43.8111 ], [ 4.6318, 43.8107 ], [ 4.6317, 43.8107 ], [ 4.6317, 43.8107 ], [ 4.6317, 43.8106 ], [ 4.6313, 43.8103 ], [ 4.6311, 43.8094 ], [ 4.6311, 43.8093 ], [ 4.6311, 43.8085 ], [ 4.6304, 43.8084 ], [ 4.6304, 43.8084 ], [ 4.6296, 43.8082 ], [ 4.6297, 43.8079 ], [ 4.6293, 43.8078 ], [ 4.6287, 43.8078 ], [ 4.6286, 43.8078 ], [ 4.6278, 43.8078 ], [ 4.6274, 43.8078 ], [ 4.6273, 43.8078 ], [ 4.6273, 43.8079 ], [ 4.6272, 43.8079 ], [ 4.6272, 43.808 ], [ 4.6271, 43.8081 ], [ 4.627, 43.8083 ], [ 4.6269, 43.8085 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8087 ], [ 4.6271, 43.8088 ], [ 4.6272, 43.8088 ], [ 4.6274, 43.8089 ], [ 4.6275, 43.809 ], [ 4.6278, 43.809 ], [ 4.6279, 43.8091 ], [ 4.628, 43.809 ], [ 4.6281, 43.8093 ], [ 4.6279, 43.8093 ], [ 4.6277, 43.8094 ], [ 4.6274, 43.8095 ], [ 4.6268, 43.8095 ], [ 4.6268, 43.8096 ], [ 4.6267, 43.8096 ], [ 4.6267, 43.8097 ], [ 4.6266, 43.8098 ], [ 4.6266, 43.8098 ], [ 4.6266, 43.8098 ], [ 4.6265, 43.8098 ], [ 4.6265, 43.8098 ], [ 4.6264, 43.8098 ], [ 4.6263, 43.8098 ], [ 4.6261, 43.8098 ], [ 4.6259, 43.8098 ], [ 4.6254, 43.8098 ], [ 4.6254, 43.8105 ], [ 4.6255, 43.811 ], [ 4.6255, 43.811 ], [ 4.6256, 43.811 ], [ 4.6266, 43.811 ], [ 4.6271, 43.811 ], [ 4.6275, 43.8109 ], [ 4.6275, 43.8111 ], [ 4.6276, 43.8116 ], [ 4.6276, 43.8119 ], [ 4.6283, 43.8118 ], [ 4.6286, 43.8118 ], [ 4.6288, 43.8119 ], [ 4.6289, 43.8124 ], [ 4.6295, 43.8122 ], [ 4.6294, 43.8122 ], [ 4.6298, 43.8121 ], [ 4.6305, 43.8119 ], [ 4.6318, 43.8116 ], [ 4.6318, 43.8116 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8112 ] ] ], "type": "Polygon" }, "id": "14", "properties": { "code_commune": "30032", "code_departement": "30", "code_qp": "QP030012", "commune_qp": "Beaucaire", "nom_commune": "Beaucaire", "nom_qp": "La Moulinelle" }, "type": "Feature" }, { "bbox": [ 2.7551, 43.1974, 2.7711, 43.2053 ], "geometry": { "coordinates": [ [ [ 2.7564, 43.2037 ], [ 2.7557, 43.2044 ], [ 2.7554, 43.2049 ], [ 2.7551, 43.2052 ], [ 2.7557, 43.2053 ], [ 2.7559, 43.2052 ], [ 2.7567, 43.2051 ], [ 2.7571, 43.205 ], [ 2.7586, 43.2044 ], [ 2.7599, 43.204 ], [ 2.7605, 43.2038 ], [ 2.7615, 43.2034 ], [ 2.7621, 43.2032 ], [ 2.7625, 43.2031 ], [ 2.7631, 43.203 ], [ 2.7638, 43.2029 ], [ 2.7642, 43.2029 ], [ 2.765, 43.2027 ], [ 2.7659, 43.2025 ], [ 2.7658, 43.2023 ], [ 2.7655, 43.2023 ], [ 2.7647, 43.2014 ], [ 2.7654, 43.201 ], [ 2.766, 43.2005 ], [ 2.7666, 43.2008 ], [ 2.7671, 43.2005 ], [ 2.7677, 43.201 ], [ 2.7681, 43.2008 ], [ 2.7683, 43.2009 ], [ 2.7685, 43.201 ], [ 2.7688, 43.2007 ], [ 2.7696, 43.2011 ], [ 2.7703, 43.2014 ], [ 2.7709, 43.2015 ], [ 2.7711, 43.2014 ], [ 2.7711, 43.2013 ], [ 2.7709, 43.2009 ], [ 2.7709, 43.2007 ], [ 2.77, 43.2005 ], [ 2.7689, 43.2002 ], [ 2.7686, 43.2001 ], [ 2.7687, 43.1999 ], [ 2.7681, 43.1997 ], [ 2.768, 43.1996 ], [ 2.767, 43.1994 ], [ 2.767, 43.1994 ], [ 2.7667, 43.1993 ], [ 2.7647, 43.199 ], [ 2.7634, 43.1987 ], [ 2.7632, 43.1986 ], [ 2.7609, 43.1981 ], [ 2.7604, 43.198 ], [ 2.7577, 43.1974 ], [ 2.758, 43.1982 ], [ 2.7581, 43.1983 ], [ 2.7586, 43.1994 ], [ 2.7578, 43.1997 ], [ 2.7569, 43.2001 ], [ 2.7566, 43.2002 ], [ 2.7558, 43.2006 ], [ 2.7558, 43.2005 ], [ 2.7556, 43.2006 ], [ 2.7555, 43.2006 ], [ 2.7552, 43.2008 ], [ 2.7551, 43.2009 ], [ 2.7553, 43.201 ], [ 2.7552, 43.2019 ], [ 2.7552, 43.202 ], [ 2.7552, 43.202 ], [ 2.7552, 43.2021 ], [ 2.7551, 43.2027 ], [ 2.7551, 43.2028 ], [ 2.7551, 43.2029 ], [ 2.7558, 43.2027 ], [ 2.7564, 43.2037 ] ] ], "type": "Polygon" }, "id": "15", "properties": { "code_commune": "11203", "code_departement": "11", "code_qp": "QP011010", "commune_qp": "Lézignan-Corbières", "nom_commune": "Lézignan-Corbières", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.2331, 43.3431, 3.2394, 43.3527 ], "geometry": { "coordinates": [ [ [ 3.2393, 43.3502 ], [ 3.2394, 43.3501 ], [ 3.2393, 43.3495 ], [ 3.239, 43.3494 ], [ 3.2389, 43.3493 ], [ 3.2379, 43.3491 ], [ 3.2377, 43.3492 ], [ 3.2374, 43.3494 ], [ 3.2372, 43.3497 ], [ 3.2371, 43.3497 ], [ 3.237, 43.3498 ], [ 3.2369, 43.3497 ], [ 3.2368, 43.3496 ], [ 3.2366, 43.3496 ], [ 3.2361, 43.3492 ], [ 3.2365, 43.3488 ], [ 3.2365, 43.3488 ], [ 3.2366, 43.3487 ], [ 3.2367, 43.3486 ], [ 3.2368, 43.3486 ], [ 3.237, 43.3483 ], [ 3.2372, 43.3481 ], [ 3.2367, 43.3479 ], [ 3.2366, 43.3478 ], [ 3.2369, 43.3476 ], [ 3.2371, 43.3474 ], [ 3.2367, 43.3471 ], [ 3.2365, 43.3471 ], [ 3.2363, 43.3473 ], [ 3.2363, 43.3472 ], [ 3.2361, 43.3471 ], [ 3.2362, 43.347 ], [ 3.2355, 43.3466 ], [ 3.2359, 43.3462 ], [ 3.2364, 43.3455 ], [ 3.2366, 43.3453 ], [ 3.2364, 43.3452 ], [ 3.2362, 43.3451 ], [ 3.2359, 43.3451 ], [ 3.2358, 43.345 ], [ 3.2359, 43.3448 ], [ 3.2363, 43.3443 ], [ 3.2365, 43.3444 ], [ 3.2366, 43.3444 ], [ 3.2367, 43.3441 ], [ 3.2368, 43.3439 ], [ 3.2368, 43.3436 ], [ 3.237, 43.3434 ], [ 3.2368, 43.3434 ], [ 3.2363, 43.3432 ], [ 3.2362, 43.3432 ], [ 3.2354, 43.3431 ], [ 3.2348, 43.3431 ], [ 3.2346, 43.3431 ], [ 3.2344, 43.3431 ], [ 3.2343, 43.3432 ], [ 3.234, 43.3433 ], [ 3.2338, 43.3433 ], [ 3.2337, 43.3434 ], [ 3.2338, 43.3435 ], [ 3.2338, 43.3436 ], [ 3.2339, 43.3438 ], [ 3.234, 43.3442 ], [ 3.2341, 43.3447 ], [ 3.2341, 43.3448 ], [ 3.234, 43.3454 ], [ 3.2339, 43.3456 ], [ 3.2339, 43.3457 ], [ 3.2338, 43.3459 ], [ 3.2338, 43.3461 ], [ 3.2335, 43.3465 ], [ 3.2331, 43.347 ], [ 3.2335, 43.3471 ], [ 3.2342, 43.3474 ], [ 3.2343, 43.3475 ], [ 3.2355, 43.348 ], [ 3.2354, 43.3481 ], [ 3.2352, 43.3483 ], [ 3.235, 43.3486 ], [ 3.2348, 43.349 ], [ 3.2344, 43.3497 ], [ 3.2341, 43.35 ], [ 3.2338, 43.3504 ], [ 3.2335, 43.3508 ], [ 3.2334, 43.351 ], [ 3.2335, 43.3511 ], [ 3.2333, 43.3514 ], [ 3.2333, 43.3514 ], [ 3.2333, 43.3515 ], [ 3.2333, 43.3515 ], [ 3.2337, 43.3517 ], [ 3.2338, 43.3517 ], [ 3.2339, 43.3517 ], [ 3.234, 43.3517 ], [ 3.2342, 43.3514 ], [ 3.2343, 43.3514 ], [ 3.235, 43.3517 ], [ 3.2351, 43.3517 ], [ 3.2352, 43.3518 ], [ 3.2353, 43.352 ], [ 3.2355, 43.3521 ], [ 3.2356, 43.3519 ], [ 3.2362, 43.3522 ], [ 3.237, 43.3525 ], [ 3.2374, 43.3527 ], [ 3.2374, 43.3527 ], [ 3.2375, 43.3526 ], [ 3.2377, 43.3523 ], [ 3.2379, 43.3521 ], [ 3.2378, 43.352 ], [ 3.2371, 43.3517 ], [ 3.2373, 43.3515 ], [ 3.2378, 43.3508 ], [ 3.2383, 43.3502 ], [ 3.2389, 43.3504 ], [ 3.239, 43.3504 ], [ 3.2392, 43.3504 ], [ 3.2392, 43.3504 ], [ 3.2393, 43.3502 ] ] ], "type": "Polygon" }, "id": "16", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034002", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Iranget Grangette" }, "type": "Feature" }, { "bbox": [ 4.6382, 43.8051, 4.6484, 43.8134 ], "geometry": { "coordinates": [ [ [ 4.6387, 43.8096 ], [ 4.6393, 43.8096 ], [ 4.6398, 43.8096 ], [ 4.64, 43.8096 ], [ 4.6401, 43.8096 ], [ 4.6403, 43.8096 ], [ 4.6404, 43.8097 ], [ 4.6407, 43.8097 ], [ 4.6413, 43.8097 ], [ 4.6415, 43.8097 ], [ 4.6424, 43.8097 ], [ 4.6429, 43.8097 ], [ 4.6431, 43.8097 ], [ 4.6432, 43.8102 ], [ 4.6432, 43.8103 ], [ 4.6433, 43.8105 ], [ 4.6426, 43.8105 ], [ 4.6421, 43.8104 ], [ 4.6418, 43.8104 ], [ 4.6417, 43.8104 ], [ 4.6416, 43.8105 ], [ 4.6414, 43.8107 ], [ 4.6411, 43.8108 ], [ 4.641, 43.8109 ], [ 4.6409, 43.8109 ], [ 4.6408, 43.8109 ], [ 4.6407, 43.8109 ], [ 4.6405, 43.8108 ], [ 4.6404, 43.8108 ], [ 4.6404, 43.8108 ], [ 4.6407, 43.8111 ], [ 4.6413, 43.8115 ], [ 4.6414, 43.8117 ], [ 4.6413, 43.8119 ], [ 4.6413, 43.8121 ], [ 4.6413, 43.8122 ], [ 4.6411, 43.8126 ], [ 4.6409, 43.8128 ], [ 4.6408, 43.8129 ], [ 4.6408, 43.813 ], [ 4.6408, 43.8131 ], [ 4.6411, 43.8132 ], [ 4.6411, 43.8132 ], [ 4.6412, 43.8132 ], [ 4.6413, 43.8132 ], [ 4.6414, 43.8132 ], [ 4.6414, 43.8133 ], [ 4.6414, 43.8133 ], [ 4.6415, 43.8133 ], [ 4.6417, 43.8134 ], [ 4.6418, 43.8134 ], [ 4.642, 43.8132 ], [ 4.642, 43.8128 ], [ 4.642, 43.8128 ], [ 4.6421, 43.8126 ], [ 4.6422, 43.8126 ], [ 4.6422, 43.8126 ], [ 4.6417, 43.8122 ], [ 4.6416, 43.8122 ], [ 4.6417, 43.8122 ], [ 4.6414, 43.8121 ], [ 4.6414, 43.8119 ], [ 4.6415, 43.8117 ], [ 4.6417, 43.812 ], [ 4.6418, 43.812 ], [ 4.6423, 43.8123 ], [ 4.6426, 43.8125 ], [ 4.6427, 43.8125 ], [ 4.6428, 43.8125 ], [ 4.6429, 43.8126 ], [ 4.644, 43.8115 ], [ 4.6442, 43.8113 ], [ 4.6444, 43.8112 ], [ 4.6456, 43.81 ], [ 4.6457, 43.8099 ], [ 4.6458, 43.8099 ], [ 4.6462, 43.8097 ], [ 4.6461, 43.8096 ], [ 4.6462, 43.8096 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8094 ], [ 4.6465, 43.8088 ], [ 4.6466, 43.8085 ], [ 4.6466, 43.8084 ], [ 4.6467, 43.8082 ], [ 4.6467, 43.8082 ], [ 4.6475, 43.8075 ], [ 4.6475, 43.8075 ], [ 4.6477, 43.8074 ], [ 4.6477, 43.8073 ], [ 4.6478, 43.8072 ], [ 4.6481, 43.8066 ], [ 4.6482, 43.8063 ], [ 4.6483, 43.806 ], [ 4.6484, 43.8056 ], [ 4.6483, 43.8051 ], [ 4.6472, 43.8052 ], [ 4.6469, 43.8053 ], [ 4.6468, 43.8053 ], [ 4.6467, 43.8052 ], [ 4.6465, 43.8053 ], [ 4.6461, 43.8053 ], [ 4.6453, 43.8055 ], [ 4.6445, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6422, 43.8059 ], [ 4.6419, 43.806 ], [ 4.6418, 43.806 ], [ 4.6417, 43.806 ], [ 4.6416, 43.806 ], [ 4.6415, 43.806 ], [ 4.641, 43.8061 ], [ 4.6403, 43.8062 ], [ 4.6395, 43.8063 ], [ 4.6388, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6386, 43.8064 ], [ 4.6385, 43.8065 ], [ 4.6385, 43.8065 ], [ 4.6384, 43.8066 ], [ 4.6384, 43.8066 ], [ 4.6384, 43.8067 ], [ 4.6383, 43.8068 ], [ 4.6383, 43.8068 ], [ 4.6383, 43.8069 ], [ 4.6382, 43.807 ], [ 4.6382, 43.8071 ], [ 4.6383, 43.8076 ], [ 4.6383, 43.8081 ], [ 4.6385, 43.809 ], [ 4.6386, 43.8094 ], [ 4.6386, 43.8096 ], [ 4.6387, 43.8096 ] ] ], "type": "Polygon" }, "id": "17", "properties": { "code_commune": "30032", "code_departement": "30", "code_qp": "QP030013", "commune_qp": "Beaucaire", "nom_commune": "Beaucaire", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 4.0674, 44.1171, 4.0918, 44.1538 ], "geometry": { "coordinates": [ [ [ 4.0918, 44.1425 ], [ 4.0916, 44.1424 ], [ 4.0914, 44.1423 ], [ 4.0912, 44.1421 ], [ 4.091, 44.142 ], [ 4.0908, 44.1419 ], [ 4.0907, 44.1418 ], [ 4.0906, 44.1417 ], [ 4.0903, 44.1414 ], [ 4.0898, 44.1409 ], [ 4.0895, 44.1406 ], [ 4.089, 44.1403 ], [ 4.0886, 44.14 ], [ 4.0886, 44.14 ], [ 4.0884, 44.1399 ], [ 4.0883, 44.1398 ], [ 4.088, 44.1397 ], [ 4.0879, 44.1396 ], [ 4.0869, 44.1391 ], [ 4.0864, 44.1389 ], [ 4.0856, 44.1384 ], [ 4.0854, 44.1382 ], [ 4.0851, 44.138 ], [ 4.0847, 44.1377 ], [ 4.0846, 44.1377 ], [ 4.0845, 44.1377 ], [ 4.0843, 44.1377 ], [ 4.084, 44.1375 ], [ 4.084, 44.1373 ], [ 4.084, 44.1372 ], [ 4.084, 44.1371 ], [ 4.0838, 44.1364 ], [ 4.0837, 44.1363 ], [ 4.0837, 44.1362 ], [ 4.0835, 44.1355 ], [ 4.0835, 44.1354 ], [ 4.0836, 44.1353 ], [ 4.0835, 44.1351 ], [ 4.0841, 44.1351 ], [ 4.084, 44.135 ], [ 4.0841, 44.135 ], [ 4.0841, 44.1349 ], [ 4.0842, 44.1348 ], [ 4.0843, 44.1347 ], [ 4.0844, 44.1347 ], [ 4.0845, 44.1346 ], [ 4.0846, 44.1346 ], [ 4.0849, 44.1345 ], [ 4.085, 44.1344 ], [ 4.0851, 44.1343 ], [ 4.0851, 44.1342 ], [ 4.0852, 44.1341 ], [ 4.0853, 44.1341 ], [ 4.0853, 44.1341 ], [ 4.0853, 44.134 ], [ 4.0854, 44.134 ], [ 4.0854, 44.134 ], [ 4.0854, 44.1339 ], [ 4.0855, 44.1339 ], [ 4.0856, 44.1338 ], [ 4.0856, 44.1337 ], [ 4.0858, 44.1335 ], [ 4.0856, 44.1335 ], [ 4.0858, 44.1333 ], [ 4.0856, 44.1331 ], [ 4.0856, 44.133 ], [ 4.0854, 44.1328 ], [ 4.0854, 44.1328 ], [ 4.0855, 44.1328 ], [ 4.0852, 44.1324 ], [ 4.0849, 44.1325 ], [ 4.0845, 44.1326 ], [ 4.0841, 44.1327 ], [ 4.084, 44.1327 ], [ 4.0839, 44.1327 ], [ 4.0837, 44.1327 ], [ 4.0831, 44.1326 ], [ 4.083, 44.1326 ], [ 4.083, 44.1325 ], [ 4.0829, 44.1324 ], [ 4.0829, 44.1323 ], [ 4.0828, 44.1323 ], [ 4.0826, 44.132 ], [ 4.0825, 44.1319 ], [ 4.0824, 44.1318 ], [ 4.0824, 44.1318 ], [ 4.0823, 44.1318 ], [ 4.0821, 44.1317 ], [ 4.0819, 44.1316 ], [ 4.0818, 44.1315 ], [ 4.0818, 44.1316 ], [ 4.0816, 44.1316 ], [ 4.0814, 44.1317 ], [ 4.0814, 44.1317 ], [ 4.0813, 44.1316 ], [ 4.0812, 44.1316 ], [ 4.0812, 44.1316 ], [ 4.0811, 44.1316 ], [ 4.081, 44.1314 ], [ 4.0808, 44.1313 ], [ 4.0807, 44.1312 ], [ 4.0807, 44.1311 ], [ 4.0806, 44.131 ], [ 4.0806, 44.1308 ], [ 4.0805, 44.1307 ], [ 4.0805, 44.1304 ], [ 4.0805, 44.1303 ], [ 4.0805, 44.1302 ], [ 4.0804, 44.1301 ], [ 4.0804, 44.13 ], [ 4.0802, 44.1299 ], [ 4.0803, 44.1298 ], [ 4.0803, 44.1296 ], [ 4.0804, 44.1295 ], [ 4.0804, 44.1294 ], [ 4.0804, 44.1294 ], [ 4.0802, 44.1295 ], [ 4.0802, 44.1295 ], [ 4.0798, 44.1292 ], [ 4.0797, 44.1291 ], [ 4.0796, 44.1291 ], [ 4.0796, 44.129 ], [ 4.0794, 44.1289 ], [ 4.0793, 44.1288 ], [ 4.0793, 44.1287 ], [ 4.0792, 44.1286 ], [ 4.0792, 44.1285 ], [ 4.0791, 44.1285 ], [ 4.0791, 44.1283 ], [ 4.079, 44.1281 ], [ 4.0791, 44.1279 ], [ 4.0792, 44.1274 ], [ 4.0792, 44.1274 ], [ 4.0792, 44.1273 ], [ 4.0795, 44.1269 ], [ 4.0797, 44.1267 ], [ 4.0797, 44.1266 ], [ 4.0798, 44.1265 ], [ 4.0799, 44.1263 ], [ 4.0799, 44.1262 ], [ 4.0801, 44.125 ], [ 4.0802, 44.1246 ], [ 4.0802, 44.1245 ], [ 4.0803, 44.124 ], [ 4.0804, 44.1239 ], [ 4.0805, 44.1238 ], [ 4.0806, 44.1237 ], [ 4.0816, 44.1236 ], [ 4.0819, 44.1236 ], [ 4.0821, 44.1236 ], [ 4.0822, 44.1236 ], [ 4.0823, 44.1236 ], [ 4.0825, 44.1236 ], [ 4.0828, 44.1236 ], [ 4.0829, 44.1236 ], [ 4.083, 44.1234 ], [ 4.0832, 44.1229 ], [ 4.0834, 44.1225 ], [ 4.0846, 44.1228 ], [ 4.0847, 44.1227 ], [ 4.0847, 44.1219 ], [ 4.0847, 44.1213 ], [ 4.0845, 44.1213 ], [ 4.0845, 44.1213 ], [ 4.0843, 44.1213 ], [ 4.0841, 44.1213 ], [ 4.0839, 44.1212 ], [ 4.0836, 44.1212 ], [ 4.0834, 44.1212 ], [ 4.0831, 44.1212 ], [ 4.0828, 44.1212 ], [ 4.0825, 44.1212 ], [ 4.0822, 44.1212 ], [ 4.0819, 44.1212 ], [ 4.0816, 44.1212 ], [ 4.0815, 44.1212 ], [ 4.0815, 44.1213 ], [ 4.0809, 44.1214 ], [ 4.0806, 44.1213 ], [ 4.0805, 44.1199 ], [ 4.0805, 44.1196 ], [ 4.0805, 44.1196 ], [ 4.0804, 44.1196 ], [ 4.0803, 44.1196 ], [ 4.0802, 44.1193 ], [ 4.0801, 44.1192 ], [ 4.0802, 44.1191 ], [ 4.0804, 44.1189 ], [ 4.0809, 44.1187 ], [ 4.0807, 44.1184 ], [ 4.0805, 44.1183 ], [ 4.0805, 44.1182 ], [ 4.0804, 44.1182 ], [ 4.0806, 44.1179 ], [ 4.0804, 44.1178 ], [ 4.0804, 44.1178 ], [ 4.0806, 44.1176 ], [ 4.0808, 44.1174 ], [ 4.0807, 44.1173 ], [ 4.0806, 44.1173 ], [ 4.0805, 44.1173 ], [ 4.0802, 44.1174 ], [ 4.0801, 44.1174 ], [ 4.0799, 44.1174 ], [ 4.0798, 44.1173 ], [ 4.0797, 44.1173 ], [ 4.0796, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.079, 44.1171 ], [ 4.0789, 44.1171 ], [ 4.0789, 44.1172 ], [ 4.0788, 44.1174 ], [ 4.0788, 44.1175 ], [ 4.0788, 44.1176 ], [ 4.0788, 44.1176 ], [ 4.0789, 44.1177 ], [ 4.0793, 44.118 ], [ 4.0794, 44.118 ], [ 4.0794, 44.1181 ], [ 4.0795, 44.1183 ], [ 4.0795, 44.1183 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0793, 44.1185 ], [ 4.0792, 44.1185 ], [ 4.0791, 44.1185 ], [ 4.079, 44.1185 ], [ 4.0788, 44.1186 ], [ 4.0787, 44.1186 ], [ 4.0784, 44.1187 ], [ 4.0782, 44.1187 ], [ 4.0782, 44.1189 ], [ 4.0781, 44.119 ], [ 4.0782, 44.1193 ], [ 4.0782, 44.1194 ], [ 4.0783, 44.1195 ], [ 4.0785, 44.1198 ], [ 4.0784, 44.1198 ], [ 4.0785, 44.12 ], [ 4.0782, 44.121 ], [ 4.078, 44.121 ], [ 4.0773, 44.121 ], [ 4.0768, 44.121 ], [ 4.0767, 44.121 ], [ 4.0765, 44.121 ], [ 4.0763, 44.1211 ], [ 4.076, 44.1212 ], [ 4.0756, 44.1214 ], [ 4.075, 44.1217 ], [ 4.0747, 44.1219 ], [ 4.0741, 44.1223 ], [ 4.0737, 44.1225 ], [ 4.0735, 44.1227 ], [ 4.0733, 44.1228 ], [ 4.0731, 44.123 ], [ 4.073, 44.1231 ], [ 4.0729, 44.1232 ], [ 4.0729, 44.1232 ], [ 4.0728, 44.1234 ], [ 4.0713, 44.1232 ], [ 4.0712, 44.123 ], [ 4.071, 44.1231 ], [ 4.0708, 44.1231 ], [ 4.0708, 44.1232 ], [ 4.0702, 44.1232 ], [ 4.07, 44.1232 ], [ 4.0699, 44.1232 ], [ 4.0699, 44.1232 ], [ 4.0698, 44.1233 ], [ 4.0698, 44.1233 ], [ 4.0697, 44.1233 ], [ 4.0696, 44.1233 ], [ 4.0694, 44.1233 ], [ 4.0693, 44.1233 ], [ 4.0693, 44.1234 ], [ 4.0692, 44.1235 ], [ 4.0692, 44.1236 ], [ 4.0692, 44.1237 ], [ 4.0692, 44.1237 ], [ 4.0692, 44.1238 ], [ 4.0692, 44.1239 ], [ 4.0692, 44.1239 ], [ 4.0692, 44.124 ], [ 4.0692, 44.1241 ], [ 4.0692, 44.1241 ], [ 4.0689, 44.1246 ], [ 4.0688, 44.1246 ], [ 4.0685, 44.1245 ], [ 4.0685, 44.1245 ], [ 4.0684, 44.1245 ], [ 4.0683, 44.1247 ], [ 4.0682, 44.1247 ], [ 4.0681, 44.1248 ], [ 4.068, 44.1248 ], [ 4.068, 44.1248 ], [ 4.068, 44.1249 ], [ 4.0679, 44.1249 ], [ 4.0679, 44.1251 ], [ 4.0679, 44.1251 ], [ 4.0679, 44.1252 ], [ 4.0678, 44.1252 ], [ 4.0677, 44.1253 ], [ 4.0676, 44.1253 ], [ 4.0679, 44.1256 ], [ 4.068, 44.1256 ], [ 4.0683, 44.1259 ], [ 4.0683, 44.1259 ], [ 4.0684, 44.1258 ], [ 4.0683, 44.1259 ], [ 4.0682, 44.126 ], [ 4.0682, 44.126 ], [ 4.0681, 44.1261 ], [ 4.0684, 44.1263 ], [ 4.0684, 44.1263 ], [ 4.0683, 44.1264 ], [ 4.0686, 44.1266 ], [ 4.0688, 44.1265 ], [ 4.069, 44.1264 ], [ 4.0693, 44.1261 ], [ 4.0695, 44.1259 ], [ 4.0698, 44.1256 ], [ 4.0699, 44.1256 ], [ 4.0702, 44.1258 ], [ 4.0703, 44.1258 ], [ 4.0703, 44.1259 ], [ 4.0703, 44.126 ], [ 4.0703, 44.126 ], [ 4.0703, 44.1261 ], [ 4.0703, 44.1262 ], [ 4.0703, 44.1262 ], [ 4.0702, 44.1263 ], [ 4.0702, 44.1264 ], [ 4.0703, 44.1265 ], [ 4.0703, 44.1266 ], [ 4.0703, 44.1266 ], [ 4.0702, 44.1266 ], [ 4.0702, 44.1268 ], [ 4.0701, 44.127 ], [ 4.0701, 44.1271 ], [ 4.0701, 44.1272 ], [ 4.0701, 44.1272 ], [ 4.0701, 44.1272 ], [ 4.0702, 44.1273 ], [ 4.0703, 44.1274 ], [ 4.0703, 44.1275 ], [ 4.0703, 44.1276 ], [ 4.0703, 44.1276 ], [ 4.0704, 44.1279 ], [ 4.0703, 44.1279 ], [ 4.0702, 44.128 ], [ 4.0702, 44.1281 ], [ 4.0704, 44.1282 ], [ 4.0704, 44.1282 ], [ 4.0703, 44.1283 ], [ 4.0703, 44.1284 ], [ 4.0702, 44.1284 ], [ 4.0701, 44.1286 ], [ 4.0701, 44.1285 ], [ 4.07, 44.1287 ], [ 4.0701, 44.1288 ], [ 4.0702, 44.1288 ], [ 4.0702, 44.1289 ], [ 4.0701, 44.1289 ], [ 4.07, 44.1292 ], [ 4.0699, 44.1294 ], [ 4.0698, 44.1293 ], [ 4.0695, 44.1294 ], [ 4.0694, 44.1295 ], [ 4.0693, 44.1295 ], [ 4.0691, 44.1295 ], [ 4.069, 44.1296 ], [ 4.069, 44.1296 ], [ 4.0686, 44.1296 ], [ 4.0684, 44.1297 ], [ 4.0682, 44.1297 ], [ 4.068, 44.1297 ], [ 4.0676, 44.1298 ], [ 4.0676, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.13 ], [ 4.0674, 44.1303 ], [ 4.0674, 44.1304 ], [ 4.0674, 44.1304 ], [ 4.0675, 44.1305 ], [ 4.0676, 44.1305 ], [ 4.0676, 44.1305 ], [ 4.0677, 44.1304 ], [ 4.0679, 44.1303 ], [ 4.068, 44.1303 ], [ 4.0683, 44.1303 ], [ 4.069, 44.1304 ], [ 4.0689, 44.1304 ], [ 4.0689, 44.1305 ], [ 4.0689, 44.1306 ], [ 4.069, 44.1307 ], [ 4.069, 44.1309 ], [ 4.069, 44.1313 ], [ 4.069, 44.1318 ], [ 4.0697, 44.1318 ], [ 4.0699, 44.1318 ], [ 4.0699, 44.1318 ], [ 4.0699, 44.1329 ], [ 4.0704, 44.1329 ], [ 4.0707, 44.133 ], [ 4.0707, 44.133 ], [ 4.0707, 44.1331 ], [ 4.0708, 44.1331 ], [ 4.0708, 44.1331 ], [ 4.0708, 44.1332 ], [ 4.0709, 44.1332 ], [ 4.0712, 44.1332 ], [ 4.0713, 44.1332 ], [ 4.0715, 44.1333 ], [ 4.0717, 44.1334 ], [ 4.0719, 44.1335 ], [ 4.0717, 44.1337 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1342 ], [ 4.0716, 44.1344 ], [ 4.0717, 44.1344 ], [ 4.0717, 44.1345 ], [ 4.0716, 44.1345 ], [ 4.0716, 44.1346 ], [ 4.0715, 44.1346 ], [ 4.0714, 44.1346 ], [ 4.0711, 44.1345 ], [ 4.071, 44.1345 ], [ 4.0709, 44.1345 ], [ 4.071, 44.1347 ], [ 4.0711, 44.1348 ], [ 4.0712, 44.135 ], [ 4.0715, 44.1354 ], [ 4.0715, 44.1356 ], [ 4.0716, 44.1357 ], [ 4.0716, 44.1358 ], [ 4.0716, 44.1359 ], [ 4.0717, 44.136 ], [ 4.0718, 44.1362 ], [ 4.0719, 44.1363 ], [ 4.0721, 44.1362 ], [ 4.0723, 44.136 ], [ 4.0725, 44.1359 ], [ 4.0726, 44.1357 ], [ 4.0727, 44.1356 ], [ 4.0729, 44.1356 ], [ 4.073, 44.1353 ], [ 4.0732, 44.1352 ], [ 4.0733, 44.1352 ], [ 4.0736, 44.135 ], [ 4.0737, 44.135 ], [ 4.0737, 44.1351 ], [ 4.0737, 44.1351 ], [ 4.0737, 44.1351 ], [ 4.0738, 44.1352 ], [ 4.0738, 44.1352 ], [ 4.0742, 44.1355 ], [ 4.0743, 44.1356 ], [ 4.0745, 44.1358 ], [ 4.0745, 44.1358 ], [ 4.0747, 44.1359 ], [ 4.0744, 44.1361 ], [ 4.0742, 44.1365 ], [ 4.0741, 44.1369 ], [ 4.074, 44.1372 ], [ 4.0739, 44.1375 ], [ 4.0739, 44.1377 ], [ 4.0739, 44.1381 ], [ 4.074, 44.1385 ], [ 4.0741, 44.1394 ], [ 4.0743, 44.1401 ], [ 4.0744, 44.1407 ], [ 4.0744, 44.1409 ], [ 4.0744, 44.141 ], [ 4.0744, 44.1412 ], [ 4.0745, 44.1414 ], [ 4.0746, 44.1418 ], [ 4.0749, 44.1422 ], [ 4.0749, 44.1424 ], [ 4.0749, 44.1425 ], [ 4.0749, 44.1425 ], [ 4.0747, 44.143 ], [ 4.0744, 44.1437 ], [ 4.0743, 44.1439 ], [ 4.0742, 44.144 ], [ 4.0741, 44.1441 ], [ 4.074, 44.1442 ], [ 4.0739, 44.1443 ], [ 4.0738, 44.1444 ], [ 4.0735, 44.1445 ], [ 4.0732, 44.1447 ], [ 4.073, 44.1449 ], [ 4.0728, 44.1449 ], [ 4.0727, 44.145 ], [ 4.0725, 44.145 ], [ 4.0721, 44.145 ], [ 4.0721, 44.1451 ], [ 4.0723, 44.1451 ], [ 4.0726, 44.1451 ], [ 4.0727, 44.1451 ], [ 4.0728, 44.1451 ], [ 4.0729, 44.1451 ], [ 4.0729, 44.1451 ], [ 4.073, 44.145 ], [ 4.0731, 44.145 ], [ 4.0732, 44.145 ], [ 4.0734, 44.145 ], [ 4.0737, 44.1449 ], [ 4.0739, 44.1448 ], [ 4.0741, 44.1447 ], [ 4.0742, 44.1446 ], [ 4.0743, 44.1447 ], [ 4.0745, 44.1445 ], [ 4.0747, 44.1444 ], [ 4.0747, 44.1444 ], [ 4.0756, 44.1438 ], [ 4.0758, 44.1437 ], [ 4.076, 44.1435 ], [ 4.0762, 44.1433 ], [ 4.0763, 44.1432 ], [ 4.0766, 44.1428 ], [ 4.0769, 44.1423 ], [ 4.0771, 44.1419 ], [ 4.078, 44.1398 ], [ 4.0782, 44.1394 ], [ 4.0779, 44.1395 ], [ 4.0776, 44.1395 ], [ 4.0775, 44.1394 ], [ 4.0775, 44.1393 ], [ 4.0778, 44.1388 ], [ 4.0774, 44.1388 ], [ 4.0774, 44.1385 ], [ 4.0769, 44.1383 ], [ 4.0771, 44.138 ], [ 4.0772, 44.1377 ], [ 4.0773, 44.1375 ], [ 4.0773, 44.1373 ], [ 4.0774, 44.1369 ], [ 4.0773, 44.1365 ], [ 4.0771, 44.1364 ], [ 4.0766, 44.1362 ], [ 4.0764, 44.1362 ], [ 4.0761, 44.136 ], [ 4.0753, 44.1354 ], [ 4.0755, 44.1351 ], [ 4.0758, 44.1349 ], [ 4.0762, 44.1347 ], [ 4.0764, 44.1346 ], [ 4.077, 44.1343 ], [ 4.0783, 44.1337 ], [ 4.0786, 44.134 ], [ 4.0786, 44.1341 ], [ 4.0788, 44.1344 ], [ 4.0792, 44.135 ], [ 4.0795, 44.1355 ], [ 4.0797, 44.1357 ], [ 4.0798, 44.136 ], [ 4.08, 44.1371 ], [ 4.08, 44.1375 ], [ 4.08, 44.1383 ], [ 4.0799, 44.1385 ], [ 4.0798, 44.1389 ], [ 4.0798, 44.1391 ], [ 4.0804, 44.1392 ], [ 4.0808, 44.1396 ], [ 4.0811, 44.1395 ], [ 4.0813, 44.1393 ], [ 4.0813, 44.1393 ], [ 4.0814, 44.1393 ], [ 4.082, 44.1394 ], [ 4.0822, 44.1395 ], [ 4.0825, 44.1397 ], [ 4.0828, 44.1398 ], [ 4.0832, 44.1399 ], [ 4.0835, 44.1401 ], [ 4.0835, 44.1402 ], [ 4.0835, 44.1403 ], [ 4.0837, 44.1403 ], [ 4.084, 44.1405 ], [ 4.0842, 44.1406 ], [ 4.0847, 44.1406 ], [ 4.0847, 44.1407 ], [ 4.0846, 44.1409 ], [ 4.0841, 44.1416 ], [ 4.0838, 44.1418 ], [ 4.0837, 44.1419 ], [ 4.0836, 44.1421 ], [ 4.0833, 44.1429 ], [ 4.0833, 44.143 ], [ 4.0833, 44.1431 ], [ 4.0833, 44.1435 ], [ 4.0833, 44.1436 ], [ 4.0832, 44.1437 ], [ 4.0831, 44.1438 ], [ 4.0829, 44.1441 ], [ 4.0825, 44.1445 ], [ 4.0824, 44.1448 ], [ 4.0823, 44.1449 ], [ 4.0823, 44.1449 ], [ 4.0822, 44.1453 ], [ 4.0822, 44.1454 ], [ 4.0822, 44.1454 ], [ 4.0822, 44.1455 ], [ 4.0822, 44.1455 ], [ 4.082, 44.1458 ], [ 4.0819, 44.1459 ], [ 4.0818, 44.1459 ], [ 4.0811, 44.1462 ], [ 4.0809, 44.1463 ], [ 4.0809, 44.1464 ], [ 4.0807, 44.1471 ], [ 4.0807, 44.1473 ], [ 4.0806, 44.1477 ], [ 4.0807, 44.1477 ], [ 4.0806, 44.148 ], [ 4.0808, 44.148 ], [ 4.0807, 44.1484 ], [ 4.0802, 44.1484 ], [ 4.0801, 44.1489 ], [ 4.0799, 44.1489 ], [ 4.0794, 44.149 ], [ 4.0794, 44.1491 ], [ 4.0795, 44.1492 ], [ 4.0796, 44.1494 ], [ 4.0798, 44.1497 ], [ 4.0803, 44.1496 ], [ 4.0804, 44.1499 ], [ 4.0804, 44.15 ], [ 4.0806, 44.1504 ], [ 4.0809, 44.1504 ], [ 4.0809, 44.1504 ], [ 4.0809, 44.1506 ], [ 4.0809, 44.1509 ], [ 4.0809, 44.1509 ], [ 4.0809, 44.1511 ], [ 4.081, 44.1514 ], [ 4.081, 44.1515 ], [ 4.0813, 44.1514 ], [ 4.0816, 44.1513 ], [ 4.0817, 44.1512 ], [ 4.0817, 44.1513 ], [ 4.0821, 44.1517 ], [ 4.0826, 44.152 ], [ 4.0826, 44.1521 ], [ 4.083, 44.1524 ], [ 4.0831, 44.1524 ], [ 4.0836, 44.1532 ], [ 4.0834, 44.1533 ], [ 4.0836, 44.1537 ], [ 4.0837, 44.1538 ], [ 4.0839, 44.1536 ], [ 4.0841, 44.1535 ], [ 4.0843, 44.1534 ], [ 4.0845, 44.1532 ], [ 4.0848, 44.1531 ], [ 4.0849, 44.153 ], [ 4.0849, 44.153 ], [ 4.085, 44.1529 ], [ 4.0849, 44.1528 ], [ 4.0849, 44.1527 ], [ 4.0848, 44.1527 ], [ 4.0847, 44.1525 ], [ 4.084, 44.1521 ], [ 4.0841, 44.1516 ], [ 4.0838, 44.1515 ], [ 4.0839, 44.151 ], [ 4.0838, 44.1507 ], [ 4.0838, 44.1504 ], [ 4.0836, 44.1502 ], [ 4.0836, 44.1502 ], [ 4.0835, 44.1502 ], [ 4.0835, 44.1502 ], [ 4.0834, 44.1502 ], [ 4.0833, 44.1502 ], [ 4.0832, 44.1498 ], [ 4.0831, 44.1495 ], [ 4.0831, 44.1494 ], [ 4.083, 44.1492 ], [ 4.083, 44.1492 ], [ 4.0829, 44.1492 ], [ 4.0829, 44.1491 ], [ 4.0829, 44.1491 ], [ 4.0828, 44.149 ], [ 4.0823, 44.149 ], [ 4.0821, 44.1491 ], [ 4.0821, 44.149 ], [ 4.0822, 44.1489 ], [ 4.0818, 44.1488 ], [ 4.0816, 44.1488 ], [ 4.0817, 44.1486 ], [ 4.0819, 44.148 ], [ 4.082, 44.1479 ], [ 4.0821, 44.148 ], [ 4.0822, 44.148 ], [ 4.0824, 44.148 ], [ 4.0824, 44.1479 ], [ 4.0825, 44.1475 ], [ 4.0825, 44.1475 ], [ 4.0827, 44.1475 ], [ 4.0828, 44.1475 ], [ 4.0833, 44.1475 ], [ 4.0833, 44.1474 ], [ 4.0833, 44.1474 ], [ 4.0834, 44.1473 ], [ 4.0835, 44.1472 ], [ 4.0837, 44.147 ], [ 4.084, 44.1467 ], [ 4.0843, 44.1465 ], [ 4.0838, 44.1463 ], [ 4.0839, 44.1462 ], [ 4.0839, 44.1462 ], [ 4.0843, 44.1459 ], [ 4.0844, 44.1459 ], [ 4.0845, 44.1458 ], [ 4.0845, 44.1457 ], [ 4.0845, 44.1455 ], [ 4.0851, 44.1455 ], [ 4.0851, 44.1454 ], [ 4.085, 44.1452 ], [ 4.0851, 44.1452 ], [ 4.0851, 44.145 ], [ 4.0851, 44.1446 ], [ 4.0858, 44.1443 ], [ 4.0861, 44.1439 ], [ 4.0865, 44.1439 ], [ 4.087, 44.1439 ], [ 4.0877, 44.1439 ], [ 4.0883, 44.1439 ], [ 4.0886, 44.1439 ], [ 4.0887, 44.1439 ], [ 4.0887, 44.1441 ], [ 4.0887, 44.1445 ], [ 4.0891, 44.1445 ], [ 4.0894, 44.1443 ], [ 4.0894, 44.1442 ], [ 4.0897, 44.1441 ], [ 4.0898, 44.144 ], [ 4.0899, 44.144 ], [ 4.0901, 44.144 ], [ 4.0905, 44.1437 ], [ 4.0905, 44.1437 ], [ 4.0906, 44.1437 ], [ 4.0907, 44.1437 ], [ 4.0909, 44.1436 ], [ 4.091, 44.1436 ], [ 4.091, 44.1436 ], [ 4.0911, 44.1436 ], [ 4.0911, 44.1435 ], [ 4.0912, 44.1435 ], [ 4.0912, 44.1434 ], [ 4.0913, 44.1433 ], [ 4.0913, 44.1433 ], [ 4.0915, 44.143 ], [ 4.0917, 44.1428 ], [ 4.0918, 44.1426 ], [ 4.0918, 44.1425 ] ] ], "type": "Polygon" }, "id": "18", "properties": { "code_commune": "30007", "code_departement": "30", "code_qp": "QP030001", "commune_qp": "Alès", "nom_commune": "Alès", "nom_qp": "Près Saint Jean - Cévennes - Tamaris - Cauvel-la Royale - Rochebelle - Centre ville" }, "type": "Feature" }, { "bbox": [ 4.3733, 43.8361, 4.3789, 43.8394 ], "geometry": { "coordinates": [ [ [ 4.3741, 43.8372 ], [ 4.3741, 43.8372 ], [ 4.374, 43.8372 ], [ 4.3739, 43.8373 ], [ 4.3738, 43.8375 ], [ 4.3737, 43.8377 ], [ 4.3733, 43.8383 ], [ 4.3745, 43.8382 ], [ 4.3752, 43.8381 ], [ 4.3753, 43.838 ], [ 4.3752, 43.8381 ], [ 4.3748, 43.8384 ], [ 4.3745, 43.8387 ], [ 4.3741, 43.839 ], [ 4.3746, 43.8391 ], [ 4.375, 43.8391 ], [ 4.3756, 43.8386 ], [ 4.3757, 43.8386 ], [ 4.3756, 43.838 ], [ 4.376, 43.838 ], [ 4.3762, 43.8376 ], [ 4.3765, 43.8374 ], [ 4.3768, 43.8375 ], [ 4.3767, 43.838 ], [ 4.3768, 43.838 ], [ 4.377, 43.8385 ], [ 4.377, 43.8388 ], [ 4.3771, 43.8394 ], [ 4.3773, 43.8394 ], [ 4.3777, 43.8394 ], [ 4.3777, 43.8391 ], [ 4.3781, 43.839 ], [ 4.3777, 43.8383 ], [ 4.378, 43.8382 ], [ 4.3778, 43.8379 ], [ 4.3779, 43.8379 ], [ 4.3789, 43.8378 ], [ 4.3788, 43.8367 ], [ 4.3784, 43.8369 ], [ 4.3781, 43.8371 ], [ 4.3776, 43.8366 ], [ 4.3774, 43.8363 ], [ 4.3768, 43.8369 ], [ 4.3764, 43.8372 ], [ 4.3759, 43.837 ], [ 4.376, 43.8369 ], [ 4.3761, 43.8368 ], [ 4.3764, 43.8365 ], [ 4.3762, 43.8364 ], [ 4.3758, 43.8361 ], [ 4.3739, 43.8369 ], [ 4.3741, 43.8372 ] ] ], "type": "Polygon" }, "id": "19", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030007", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Route De Beaucaire" }, "type": "Feature" }, { "bbox": [ 1.3974, 43.592, 1.4081, 43.5977 ], "geometry": { "coordinates": [ [ [ 1.4005, 43.5923 ], [ 1.3994, 43.592 ], [ 1.3994, 43.592 ], [ 1.3993, 43.5921 ], [ 1.3992, 43.5922 ], [ 1.3991, 43.5923 ], [ 1.3989, 43.5928 ], [ 1.3984, 43.5935 ], [ 1.3983, 43.5938 ], [ 1.3982, 43.5945 ], [ 1.398, 43.5944 ], [ 1.3979, 43.5947 ], [ 1.3978, 43.5948 ], [ 1.3977, 43.5953 ], [ 1.3977, 43.5954 ], [ 1.3976, 43.5959 ], [ 1.3975, 43.596 ], [ 1.3976, 43.596 ], [ 1.3976, 43.5962 ], [ 1.3976, 43.5963 ], [ 1.3975, 43.5967 ], [ 1.3974, 43.5972 ], [ 1.3974, 43.5977 ], [ 1.3975, 43.5975 ], [ 1.3976, 43.5975 ], [ 1.3977, 43.5974 ], [ 1.3977, 43.5974 ], [ 1.3982, 43.5971 ], [ 1.3987, 43.5969 ], [ 1.3991, 43.5967 ], [ 1.3992, 43.5967 ], [ 1.3993, 43.5967 ], [ 1.4, 43.5968 ], [ 1.4002, 43.5969 ], [ 1.4002, 43.5969 ], [ 1.4004, 43.5966 ], [ 1.4005, 43.5962 ], [ 1.4006, 43.5962 ], [ 1.4006, 43.5962 ], [ 1.4007, 43.5961 ], [ 1.4011, 43.5961 ], [ 1.4012, 43.5961 ], [ 1.4013, 43.5961 ], [ 1.4023, 43.5961 ], [ 1.4025, 43.5961 ], [ 1.403, 43.5965 ], [ 1.4038, 43.5965 ], [ 1.4039, 43.5959 ], [ 1.404, 43.5954 ], [ 1.4042, 43.5954 ], [ 1.4043, 43.5952 ], [ 1.4045, 43.5951 ], [ 1.4047, 43.5949 ], [ 1.4054, 43.5945 ], [ 1.4058, 43.5944 ], [ 1.4058, 43.5944 ], [ 1.4069, 43.5939 ], [ 1.4077, 43.5938 ], [ 1.4078, 43.5937 ], [ 1.4078, 43.5937 ], [ 1.4081, 43.5936 ], [ 1.4079, 43.5936 ], [ 1.407, 43.5934 ], [ 1.4043, 43.5929 ], [ 1.402, 43.5925 ], [ 1.4019, 43.5925 ], [ 1.4016, 43.5925 ], [ 1.4005, 43.5923 ] ] ], "type": "Polygon" }, "id": "20", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031012", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Cépière Beauregard" }, "type": "Feature" }, { "bbox": [ 4.3709, 43.825, 4.3853, 43.834 ], "geometry": { "coordinates": [ [ [ 4.3811, 43.8269 ], [ 4.3805, 43.8276 ], [ 4.3816, 43.8281 ], [ 4.3818, 43.8282 ], [ 4.3826, 43.8285 ], [ 4.3822, 43.8289 ], [ 4.3813, 43.8285 ], [ 4.3809, 43.829 ], [ 4.3805, 43.8294 ], [ 4.3802, 43.8298 ], [ 4.3798, 43.8297 ], [ 4.3795, 43.8295 ], [ 4.3793, 43.8293 ], [ 4.379, 43.8292 ], [ 4.3785, 43.8288 ], [ 4.3783, 43.8286 ], [ 4.378, 43.8288 ], [ 4.3776, 43.8287 ], [ 4.3772, 43.8285 ], [ 4.3771, 43.8285 ], [ 4.3771, 43.8284 ], [ 4.3773, 43.8283 ], [ 4.3776, 43.8279 ], [ 4.3768, 43.8273 ], [ 4.3771, 43.8271 ], [ 4.3768, 43.8267 ], [ 4.3766, 43.8268 ], [ 4.3765, 43.8266 ], [ 4.3764, 43.8267 ], [ 4.3763, 43.8267 ], [ 4.3761, 43.8265 ], [ 4.376, 43.8266 ], [ 4.3752, 43.827 ], [ 4.375, 43.8273 ], [ 4.3745, 43.8273 ], [ 4.3743, 43.8272 ], [ 4.3741, 43.827 ], [ 4.3735, 43.8266 ], [ 4.3745, 43.8257 ], [ 4.3734, 43.8251 ], [ 4.3733, 43.8251 ], [ 4.3732, 43.8251 ], [ 4.3731, 43.8253 ], [ 4.3722, 43.826 ], [ 4.3721, 43.826 ], [ 4.3719, 43.8261 ], [ 4.3717, 43.8264 ], [ 4.3717, 43.8265 ], [ 4.3718, 43.8266 ], [ 4.3718, 43.8267 ], [ 4.3717, 43.8268 ], [ 4.3717, 43.8268 ], [ 4.3717, 43.8268 ], [ 4.3719, 43.8269 ], [ 4.372, 43.827 ], [ 4.3719, 43.8271 ], [ 4.3719, 43.8272 ], [ 4.3718, 43.8273 ], [ 4.3716, 43.8274 ], [ 4.3716, 43.8274 ], [ 4.3713, 43.8275 ], [ 4.3711, 43.8276 ], [ 4.3709, 43.8277 ], [ 4.3712, 43.8279 ], [ 4.3715, 43.8277 ], [ 4.3717, 43.8278 ], [ 4.3719, 43.8278 ], [ 4.3721, 43.8276 ], [ 4.3724, 43.8278 ], [ 4.3732, 43.8283 ], [ 4.3742, 43.8277 ], [ 4.3743, 43.8276 ], [ 4.3743, 43.8275 ], [ 4.3744, 43.8275 ], [ 4.3748, 43.8275 ], [ 4.3752, 43.8275 ], [ 4.3756, 43.8277 ], [ 4.376, 43.828 ], [ 4.3787, 43.8296 ], [ 4.3793, 43.8299 ], [ 4.3801, 43.8304 ], [ 4.3796, 43.8309 ], [ 4.379, 43.8306 ], [ 4.3783, 43.8312 ], [ 4.3803, 43.8323 ], [ 4.3802, 43.8325 ], [ 4.3801, 43.8326 ], [ 4.3799, 43.833 ], [ 4.3798, 43.8331 ], [ 4.3809, 43.8337 ], [ 4.3815, 43.834 ], [ 4.3828, 43.8331 ], [ 4.3837, 43.8336 ], [ 4.384, 43.8332 ], [ 4.3834, 43.8328 ], [ 4.3823, 43.8321 ], [ 4.3825, 43.8319 ], [ 4.3818, 43.8316 ], [ 4.3812, 43.8313 ], [ 4.3811, 43.8312 ], [ 4.3817, 43.8308 ], [ 4.3819, 43.8306 ], [ 4.3825, 43.8299 ], [ 4.3827, 43.8297 ], [ 4.3819, 43.8294 ], [ 4.382, 43.8293 ], [ 4.382, 43.8293 ], [ 4.3826, 43.8291 ], [ 4.3831, 43.8288 ], [ 4.3832, 43.8287 ], [ 4.3836, 43.8284 ], [ 4.384, 43.8279 ], [ 4.3844, 43.8273 ], [ 4.3849, 43.8268 ], [ 4.3853, 43.8264 ], [ 4.385, 43.8264 ], [ 4.3848, 43.8264 ], [ 4.3845, 43.8263 ], [ 4.384, 43.8261 ], [ 4.3835, 43.8259 ], [ 4.3827, 43.8255 ], [ 4.3818, 43.8251 ], [ 4.3816, 43.825 ], [ 4.3814, 43.825 ], [ 4.3813, 43.8251 ], [ 4.3813, 43.8253 ], [ 4.3814, 43.8253 ], [ 4.3821, 43.8257 ], [ 4.382, 43.8258 ], [ 4.3816, 43.8264 ], [ 4.3811, 43.8269 ] ] ], "type": "Polygon" }, "id": "21", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030008", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Némausus-Jonquilles - Haute Magaille - Oliviers" }, "type": "Feature" }, { "bbox": [ 2.3249, 43.2066, 2.3357, 43.2114 ], "geometry": { "coordinates": [ [ [ 2.3351, 43.21 ], [ 2.335, 43.2098 ], [ 2.335, 43.2095 ], [ 2.3357, 43.2094 ], [ 2.3357, 43.2092 ], [ 2.3356, 43.2089 ], [ 2.3351, 43.2089 ], [ 2.335, 43.2089 ], [ 2.335, 43.2088 ], [ 2.335, 43.2087 ], [ 2.335, 43.2085 ], [ 2.335, 43.2081 ], [ 2.3349, 43.208 ], [ 2.3339, 43.2081 ], [ 2.3332, 43.2083 ], [ 2.3324, 43.2084 ], [ 2.3321, 43.2085 ], [ 2.3321, 43.2081 ], [ 2.3317, 43.2082 ], [ 2.3305, 43.2082 ], [ 2.3303, 43.2082 ], [ 2.3302, 43.2082 ], [ 2.3296, 43.2083 ], [ 2.3289, 43.2083 ], [ 2.3289, 43.2081 ], [ 2.3287, 43.208 ], [ 2.3285, 43.208 ], [ 2.3283, 43.2079 ], [ 2.3279, 43.2076 ], [ 2.3279, 43.2075 ], [ 2.3277, 43.2075 ], [ 2.3276, 43.2075 ], [ 2.3276, 43.2074 ], [ 2.3275, 43.2074 ], [ 2.3272, 43.2072 ], [ 2.327, 43.2071 ], [ 2.3269, 43.207 ], [ 2.3268, 43.2069 ], [ 2.3268, 43.2066 ], [ 2.3264, 43.2066 ], [ 2.3265, 43.2069 ], [ 2.3265, 43.207 ], [ 2.3265, 43.2071 ], [ 2.3265, 43.2073 ], [ 2.3258, 43.2073 ], [ 2.3249, 43.2073 ], [ 2.3251, 43.2074 ], [ 2.3252, 43.2076 ], [ 2.3255, 43.2078 ], [ 2.3258, 43.208 ], [ 2.3262, 43.2083 ], [ 2.3263, 43.2084 ], [ 2.3266, 43.2087 ], [ 2.3272, 43.2092 ], [ 2.3275, 43.2094 ], [ 2.3278, 43.2096 ], [ 2.3281, 43.2099 ], [ 2.3286, 43.2104 ], [ 2.3287, 43.2104 ], [ 2.3293, 43.2109 ], [ 2.3297, 43.2112 ], [ 2.3299, 43.2114 ], [ 2.3304, 43.2113 ], [ 2.3304, 43.2113 ], [ 2.3305, 43.2113 ], [ 2.3305, 43.211 ], [ 2.3304, 43.2095 ], [ 2.3305, 43.2095 ], [ 2.3313, 43.2094 ], [ 2.332, 43.2094 ], [ 2.3324, 43.2094 ], [ 2.3324, 43.21 ], [ 2.3333, 43.2099 ], [ 2.3333, 43.2101 ], [ 2.3338, 43.2101 ], [ 2.3351, 43.21 ] ] ], "type": "Polygon" }, "id": "22", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011003", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Le Viguier - Saint-Jacques" }, "type": "Feature" }, { "bbox": [ 1.3251, 43.6093, 1.3344, 43.6178 ], "geometry": { "coordinates": [ [ [ 1.3338, 43.6133 ], [ 1.3339, 43.6133 ], [ 1.3339, 43.6132 ], [ 1.3338, 43.6131 ], [ 1.3338, 43.613 ], [ 1.3339, 43.6129 ], [ 1.3344, 43.6128 ], [ 1.3342, 43.6123 ], [ 1.3341, 43.6122 ], [ 1.334, 43.6121 ], [ 1.3338, 43.6116 ], [ 1.3337, 43.6115 ], [ 1.3336, 43.6115 ], [ 1.3333, 43.6116 ], [ 1.3333, 43.6117 ], [ 1.3328, 43.6118 ], [ 1.3326, 43.6117 ], [ 1.3324, 43.6117 ], [ 1.3319, 43.6118 ], [ 1.3319, 43.6119 ], [ 1.332, 43.6122 ], [ 1.3319, 43.6123 ], [ 1.3319, 43.6123 ], [ 1.3317, 43.6123 ], [ 1.3315, 43.6123 ], [ 1.3316, 43.6124 ], [ 1.3311, 43.6125 ], [ 1.331, 43.6125 ], [ 1.331, 43.6124 ], [ 1.3309, 43.6123 ], [ 1.3308, 43.6121 ], [ 1.3306, 43.6119 ], [ 1.3293, 43.6109 ], [ 1.3274, 43.6094 ], [ 1.3273, 43.6093 ], [ 1.3272, 43.6093 ], [ 1.3271, 43.6093 ], [ 1.3269, 43.6094 ], [ 1.3267, 43.6094 ], [ 1.3265, 43.6093 ], [ 1.3263, 43.6093 ], [ 1.3262, 43.6093 ], [ 1.3257, 43.6096 ], [ 1.3256, 43.6097 ], [ 1.3256, 43.6099 ], [ 1.3253, 43.6099 ], [ 1.3251, 43.61 ], [ 1.3254, 43.6105 ], [ 1.3256, 43.6107 ], [ 1.3254, 43.6108 ], [ 1.3256, 43.6111 ], [ 1.3256, 43.6111 ], [ 1.3258, 43.611 ], [ 1.3262, 43.6108 ], [ 1.3264, 43.6111 ], [ 1.3265, 43.6114 ], [ 1.3266, 43.6119 ], [ 1.3266, 43.6121 ], [ 1.3267, 43.6122 ], [ 1.3268, 43.6122 ], [ 1.327, 43.6129 ], [ 1.3273, 43.6129 ], [ 1.3272, 43.613 ], [ 1.3275, 43.6132 ], [ 1.3274, 43.6133 ], [ 1.3273, 43.6134 ], [ 1.3268, 43.6136 ], [ 1.3269, 43.6138 ], [ 1.3271, 43.614 ], [ 1.3272, 43.6141 ], [ 1.3274, 43.6142 ], [ 1.328, 43.6143 ], [ 1.3283, 43.6144 ], [ 1.3281, 43.6145 ], [ 1.3279, 43.6146 ], [ 1.3282, 43.615 ], [ 1.3264, 43.6158 ], [ 1.3263, 43.6159 ], [ 1.3262, 43.616 ], [ 1.3266, 43.6163 ], [ 1.3272, 43.6167 ], [ 1.3273, 43.6169 ], [ 1.3274, 43.6172 ], [ 1.3274, 43.6174 ], [ 1.3272, 43.6176 ], [ 1.3272, 43.6178 ], [ 1.3281, 43.6177 ], [ 1.3288, 43.6175 ], [ 1.3294, 43.6173 ], [ 1.3293, 43.6172 ], [ 1.3292, 43.6169 ], [ 1.3291, 43.6165 ], [ 1.3288, 43.6154 ], [ 1.3287, 43.6151 ], [ 1.3287, 43.615 ], [ 1.3285, 43.6149 ], [ 1.3288, 43.6148 ], [ 1.3309, 43.6145 ], [ 1.3315, 43.6144 ], [ 1.3314, 43.6143 ], [ 1.3312, 43.6139 ], [ 1.3311, 43.6134 ], [ 1.3314, 43.6132 ], [ 1.3316, 43.6132 ], [ 1.3318, 43.6129 ], [ 1.3319, 43.6128 ], [ 1.3321, 43.6131 ], [ 1.3323, 43.6137 ], [ 1.3323, 43.6137 ], [ 1.3327, 43.6136 ], [ 1.333, 43.6136 ], [ 1.3333, 43.6135 ], [ 1.3338, 43.6133 ] ] ], "type": "Polygon" }, "id": "23", "properties": { "code_commune": "31149", "code_departement": "31", "code_qp": "QP031005", "commune_qp": "Colomiers", "nom_commune": "Colomiers", "nom_qp": "Val D'Aran - Poitou - Pyrénées" }, "type": "Feature" }, { "bbox": [ 1.0964, 44.098, 1.1024, 44.1054 ], "geometry": { "coordinates": [ [ [ 1.1, 44.1052 ], [ 1.0996, 44.1045 ], [ 1.1001, 44.1044 ], [ 1.1, 44.1041 ], [ 1.1, 44.1041 ], [ 1.0999, 44.104 ], [ 1.1004, 44.104 ], [ 1.1016, 44.1039 ], [ 1.1017, 44.1032 ], [ 1.1017, 44.103 ], [ 1.1021, 44.1007 ], [ 1.1022, 44.1 ], [ 1.1022, 44.1 ], [ 1.1024, 44.0988 ], [ 1.1019, 44.0987 ], [ 1.1017, 44.0989 ], [ 1.1014, 44.0991 ], [ 1.1017, 44.0993 ], [ 1.1013, 44.0997 ], [ 1.1006, 44.0991 ], [ 1.1006, 44.099 ], [ 1.101, 44.0988 ], [ 1.1, 44.098 ], [ 1.0997, 44.0981 ], [ 1.0996, 44.0981 ], [ 1.0995, 44.0982 ], [ 1.0995, 44.0982 ], [ 1.0995, 44.0983 ], [ 1.1015, 44.0999 ], [ 1.1016, 44.1001 ], [ 1.1011, 44.1001 ], [ 1.1002, 44.1004 ], [ 1.0999, 44.1004 ], [ 1.0998, 44.1005 ], [ 1.0994, 44.1006 ], [ 1.0994, 44.1008 ], [ 1.0996, 44.1012 ], [ 1.099, 44.1013 ], [ 1.0986, 44.1014 ], [ 1.0984, 44.1014 ], [ 1.0983, 44.1012 ], [ 1.0983, 44.1011 ], [ 1.0978, 44.1013 ], [ 1.0977, 44.1013 ], [ 1.0967, 44.1017 ], [ 1.0969, 44.102 ], [ 1.098, 44.1018 ], [ 1.0984, 44.1027 ], [ 1.0979, 44.1028 ], [ 1.0978, 44.1029 ], [ 1.0975, 44.1036 ], [ 1.0974, 44.1036 ], [ 1.0974, 44.103 ], [ 1.0974, 44.1029 ], [ 1.0966, 44.1031 ], [ 1.0964, 44.1031 ], [ 1.0965, 44.1045 ], [ 1.0975, 44.1043 ], [ 1.0979, 44.1042 ], [ 1.0982, 44.1042 ], [ 1.0986, 44.1042 ], [ 1.0986, 44.1042 ], [ 1.0986, 44.1044 ], [ 1.0987, 44.1045 ], [ 1.0988, 44.1045 ], [ 1.0989, 44.1046 ], [ 1.099, 44.1047 ], [ 1.0992, 44.1047 ], [ 1.0993, 44.1048 ], [ 1.0994, 44.105 ], [ 1.0995, 44.1052 ], [ 1.0996, 44.1054 ], [ 1.1, 44.1052 ] ] ], "type": "Polygon" }, "id": "24", "properties": { "code_commune": "82112", "code_departement": "82", "code_qp": "QP082004", "commune_qp": "Moissac", "nom_commune": "Moissac", "nom_qp": "Sarlac" }, "type": "Feature" }, { "bbox": [ 1.4363, 43.5742, 1.4452, 43.584 ], "geometry": { "coordinates": [ [ [ 1.4389, 43.5821 ], [ 1.4392, 43.5824 ], [ 1.4394, 43.5832 ], [ 1.4396, 43.584 ], [ 1.4415, 43.5839 ], [ 1.4437, 43.5838 ], [ 1.4441, 43.5839 ], [ 1.4444, 43.5839 ], [ 1.4444, 43.5833 ], [ 1.4445, 43.5833 ], [ 1.4445, 43.5832 ], [ 1.4445, 43.5832 ], [ 1.4445, 43.5831 ], [ 1.4445, 43.5829 ], [ 1.4444, 43.5829 ], [ 1.4444, 43.5828 ], [ 1.4445, 43.5828 ], [ 1.4444, 43.5827 ], [ 1.4444, 43.5826 ], [ 1.4443, 43.5826 ], [ 1.4443, 43.5824 ], [ 1.4446, 43.5825 ], [ 1.4446, 43.5824 ], [ 1.4443, 43.5824 ], [ 1.4443, 43.5822 ], [ 1.4444, 43.5822 ], [ 1.4444, 43.5821 ], [ 1.4445, 43.5821 ], [ 1.4446, 43.5819 ], [ 1.4446, 43.5816 ], [ 1.4447, 43.5814 ], [ 1.4448, 43.5813 ], [ 1.4443, 43.5812 ], [ 1.4448, 43.5807 ], [ 1.4452, 43.5803 ], [ 1.4449, 43.5803 ], [ 1.4446, 43.5802 ], [ 1.4445, 43.5803 ], [ 1.4443, 43.5803 ], [ 1.4443, 43.5806 ], [ 1.444, 43.5806 ], [ 1.4436, 43.5806 ], [ 1.4435, 43.58 ], [ 1.4434, 43.5796 ], [ 1.4432, 43.5787 ], [ 1.4432, 43.5784 ], [ 1.4429, 43.578 ], [ 1.4431, 43.5778 ], [ 1.4435, 43.5777 ], [ 1.4441, 43.5771 ], [ 1.4446, 43.5765 ], [ 1.444, 43.576 ], [ 1.4439, 43.576 ], [ 1.443, 43.5761 ], [ 1.443, 43.5761 ], [ 1.4429, 43.5763 ], [ 1.4428, 43.5774 ], [ 1.4426, 43.5774 ], [ 1.4408, 43.5777 ], [ 1.4408, 43.5772 ], [ 1.4418, 43.5769 ], [ 1.4416, 43.5766 ], [ 1.4415, 43.5766 ], [ 1.4414, 43.5764 ], [ 1.4411, 43.5762 ], [ 1.4413, 43.5761 ], [ 1.4407, 43.5756 ], [ 1.4406, 43.5754 ], [ 1.4402, 43.5751 ], [ 1.4387, 43.5742 ], [ 1.438, 43.5744 ], [ 1.4374, 43.5746 ], [ 1.4377, 43.575 ], [ 1.4363, 43.5755 ], [ 1.4363, 43.5771 ], [ 1.4366, 43.5785 ], [ 1.4369, 43.5792 ], [ 1.4376, 43.5802 ], [ 1.4385, 43.5813 ], [ 1.4389, 43.5821 ] ] ], "type": "Polygon" }, "id": "25", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031010", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Empalot" }, "type": "Feature" }, { "bbox": [ 2.8651, 42.6886, 2.8724, 42.6985 ], "geometry": { "coordinates": [ [ [ 2.8724, 42.6973 ], [ 2.8723, 42.6972 ], [ 2.8721, 42.6972 ], [ 2.8718, 42.6972 ], [ 2.8716, 42.6972 ], [ 2.8714, 42.6972 ], [ 2.8712, 42.6971 ], [ 2.871, 42.6971 ], [ 2.871, 42.6971 ], [ 2.8709, 42.697 ], [ 2.8709, 42.6967 ], [ 2.8709, 42.6966 ], [ 2.8709, 42.6964 ], [ 2.8709, 42.6962 ], [ 2.8709, 42.696 ], [ 2.8709, 42.696 ], [ 2.8705, 42.696 ], [ 2.8705, 42.6959 ], [ 2.8704, 42.6958 ], [ 2.8704, 42.6956 ], [ 2.8704, 42.6955 ], [ 2.8703, 42.6953 ], [ 2.8703, 42.6952 ], [ 2.8702, 42.6949 ], [ 2.8703, 42.6948 ], [ 2.8703, 42.6946 ], [ 2.8703, 42.6945 ], [ 2.8704, 42.6945 ], [ 2.8705, 42.6944 ], [ 2.8706, 42.6944 ], [ 2.8707, 42.6944 ], [ 2.8707, 42.6943 ], [ 2.8708, 42.6943 ], [ 2.8709, 42.6942 ], [ 2.8709, 42.6942 ], [ 2.8709, 42.6941 ], [ 2.8708, 42.694 ], [ 2.8708, 42.694 ], [ 2.8707, 42.6938 ], [ 2.8705, 42.6935 ], [ 2.8704, 42.6933 ], [ 2.8703, 42.6932 ], [ 2.8703, 42.6932 ], [ 2.8703, 42.6932 ], [ 2.8702, 42.693 ], [ 2.8703, 42.6926 ], [ 2.8702, 42.6924 ], [ 2.8702, 42.692 ], [ 2.8703, 42.6921 ], [ 2.8706, 42.6918 ], [ 2.8705, 42.6918 ], [ 2.8697, 42.6914 ], [ 2.8693, 42.6912 ], [ 2.8695, 42.6908 ], [ 2.8698, 42.6904 ], [ 2.8702, 42.6901 ], [ 2.8702, 42.69 ], [ 2.8701, 42.69 ], [ 2.8701, 42.6899 ], [ 2.8698, 42.6897 ], [ 2.8693, 42.6894 ], [ 2.8681, 42.6889 ], [ 2.8665, 42.6886 ], [ 2.8659, 42.6892 ], [ 2.8657, 42.6891 ], [ 2.8651, 42.6897 ], [ 2.8661, 42.6902 ], [ 2.8663, 42.6902 ], [ 2.8665, 42.69 ], [ 2.8673, 42.6904 ], [ 2.8671, 42.6906 ], [ 2.867, 42.6907 ], [ 2.8667, 42.6908 ], [ 2.8664, 42.6908 ], [ 2.8669, 42.6917 ], [ 2.8668, 42.6917 ], [ 2.867, 42.6919 ], [ 2.867, 42.692 ], [ 2.8675, 42.692 ], [ 2.8676, 42.6922 ], [ 2.8677, 42.6923 ], [ 2.8679, 42.693 ], [ 2.8679, 42.693 ], [ 2.868, 42.693 ], [ 2.8681, 42.693 ], [ 2.8683, 42.6933 ], [ 2.8685, 42.6938 ], [ 2.8685, 42.6939 ], [ 2.8687, 42.6943 ], [ 2.8687, 42.6944 ], [ 2.8688, 42.6944 ], [ 2.8688, 42.6945 ], [ 2.869, 42.6944 ], [ 2.8692, 42.6949 ], [ 2.8693, 42.6951 ], [ 2.869, 42.6952 ], [ 2.8691, 42.6955 ], [ 2.8691, 42.6955 ], [ 2.8691, 42.6958 ], [ 2.869, 42.6958 ], [ 2.869, 42.696 ], [ 2.869, 42.696 ], [ 2.8684, 42.6961 ], [ 2.8685, 42.6963 ], [ 2.8685, 42.6963 ], [ 2.8685, 42.6967 ], [ 2.8685, 42.697 ], [ 2.8686, 42.6972 ], [ 2.8686, 42.6972 ], [ 2.8687, 42.6973 ], [ 2.8687, 42.6974 ], [ 2.8691, 42.6975 ], [ 2.8693, 42.6976 ], [ 2.8696, 42.6976 ], [ 2.8704, 42.6978 ], [ 2.8704, 42.6978 ], [ 2.8702, 42.6983 ], [ 2.8708, 42.6984 ], [ 2.8714, 42.6984 ], [ 2.8717, 42.6985 ], [ 2.8719, 42.6985 ], [ 2.872, 42.6982 ], [ 2.8723, 42.698 ], [ 2.8724, 42.6973 ] ] ], "type": "Polygon" }, "id": "26", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066002", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Saint Assiscle" }, "type": "Feature" }, { "bbox": [ 1.4277, 43.6221, 1.4323, 43.6243 ], "geometry": { "coordinates": [ [ [ 1.4277, 43.6222 ], [ 1.4277, 43.6225 ], [ 1.4278, 43.6233 ], [ 1.4277, 43.6235 ], [ 1.4277, 43.6236 ], [ 1.4277, 43.6237 ], [ 1.4277, 43.6238 ], [ 1.4282, 43.624 ], [ 1.4285, 43.6237 ], [ 1.4294, 43.624 ], [ 1.4295, 43.6235 ], [ 1.4305, 43.6238 ], [ 1.4305, 43.624 ], [ 1.4304, 43.6242 ], [ 1.4309, 43.6243 ], [ 1.431, 43.6242 ], [ 1.4311, 43.624 ], [ 1.4318, 43.6241 ], [ 1.432, 43.6237 ], [ 1.4322, 43.6233 ], [ 1.4323, 43.6232 ], [ 1.431, 43.6229 ], [ 1.4311, 43.6228 ], [ 1.4313, 43.6224 ], [ 1.4312, 43.6223 ], [ 1.4307, 43.6221 ], [ 1.4304, 43.6223 ], [ 1.4303, 43.6223 ], [ 1.4301, 43.6223 ], [ 1.43, 43.6223 ], [ 1.4298, 43.6223 ], [ 1.4298, 43.6223 ], [ 1.4288, 43.6223 ], [ 1.4277, 43.6222 ] ] ], "type": "Polygon" }, "id": "27", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031009", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Bourbaki" }, "type": "Feature" }, { "bbox": [ 2.8755, 42.7021, 2.8828, 42.7073 ], "geometry": { "coordinates": [ [ [ 2.8763, 42.7073 ], [ 2.8766, 42.7073 ], [ 2.8774, 42.7072 ], [ 2.8781, 42.7068 ], [ 2.8783, 42.7067 ], [ 2.8788, 42.7065 ], [ 2.879, 42.7064 ], [ 2.8803, 42.7064 ], [ 2.8804, 42.7064 ], [ 2.8803, 42.7065 ], [ 2.8803, 42.7066 ], [ 2.8814, 42.707 ], [ 2.8815, 42.7069 ], [ 2.8815, 42.7069 ], [ 2.8816, 42.7068 ], [ 2.8817, 42.7067 ], [ 2.8818, 42.7066 ], [ 2.8819, 42.7065 ], [ 2.882, 42.7064 ], [ 2.882, 42.7062 ], [ 2.8821, 42.7062 ], [ 2.8822, 42.7062 ], [ 2.8824, 42.7055 ], [ 2.8824, 42.7053 ], [ 2.8828, 42.7053 ], [ 2.8828, 42.7052 ], [ 2.8828, 42.7051 ], [ 2.8827, 42.7051 ], [ 2.8826, 42.705 ], [ 2.8825, 42.7049 ], [ 2.8825, 42.7044 ], [ 2.8823, 42.7043 ], [ 2.8822, 42.7043 ], [ 2.8821, 42.7043 ], [ 2.8821, 42.7042 ], [ 2.8819, 42.7042 ], [ 2.8816, 42.7041 ], [ 2.8815, 42.7041 ], [ 2.8813, 42.7044 ], [ 2.8812, 42.7044 ], [ 2.881, 42.7044 ], [ 2.8804, 42.7044 ], [ 2.8803, 42.7045 ], [ 2.8802, 42.7045 ], [ 2.8802, 42.7044 ], [ 2.8802, 42.7042 ], [ 2.8802, 42.7039 ], [ 2.8802, 42.7029 ], [ 2.8802, 42.7026 ], [ 2.8803, 42.7023 ], [ 2.8803, 42.7021 ], [ 2.88, 42.7021 ], [ 2.8796, 42.7022 ], [ 2.8795, 42.7022 ], [ 2.8794, 42.7023 ], [ 2.8792, 42.7024 ], [ 2.8789, 42.7026 ], [ 2.8786, 42.7027 ], [ 2.8784, 42.7028 ], [ 2.8783, 42.703 ], [ 2.8783, 42.7031 ], [ 2.8781, 42.7041 ], [ 2.8781, 42.7043 ], [ 2.8781, 42.7044 ], [ 2.8781, 42.7046 ], [ 2.8781, 42.7048 ], [ 2.878, 42.7049 ], [ 2.878, 42.7051 ], [ 2.8779, 42.7052 ], [ 2.8778, 42.7054 ], [ 2.8777, 42.7055 ], [ 2.8776, 42.7055 ], [ 2.8775, 42.7055 ], [ 2.8774, 42.7055 ], [ 2.8767, 42.7053 ], [ 2.8764, 42.7053 ], [ 2.8761, 42.7054 ], [ 2.8759, 42.7056 ], [ 2.8758, 42.7056 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7058 ], [ 2.8756, 42.7059 ], [ 2.8755, 42.7062 ], [ 2.8755, 42.7063 ], [ 2.8756, 42.7063 ], [ 2.876, 42.7069 ], [ 2.8763, 42.7073 ], [ 2.8763, 42.7073 ], [ 2.8763, 42.7073 ] ] ], "type": "Polygon" }, "id": "28", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066004", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Bas-Vernet Ancien Zus" }, "type": "Feature" }, { "bbox": [ 3.1999, 43.3319, 3.2299, 43.3509 ], "geometry": { "coordinates": [ [ [ 3.2251, 43.3387 ], [ 3.2251, 43.3386 ], [ 3.2253, 43.3386 ], [ 3.2257, 43.3386 ], [ 3.2259, 43.3385 ], [ 3.2261, 43.3384 ], [ 3.2264, 43.3383 ], [ 3.2264, 43.3382 ], [ 3.2262, 43.3378 ], [ 3.2262, 43.3377 ], [ 3.2262, 43.3377 ], [ 3.2262, 43.3377 ], [ 3.2265, 43.3375 ], [ 3.2265, 43.3375 ], [ 3.2264, 43.3373 ], [ 3.2272, 43.3368 ], [ 3.2273, 43.3368 ], [ 3.2279, 43.3364 ], [ 3.2282, 43.3366 ], [ 3.2287, 43.337 ], [ 3.2294, 43.3365 ], [ 3.2296, 43.3364 ], [ 3.2298, 43.3362 ], [ 3.2299, 43.3361 ], [ 3.2299, 43.3361 ], [ 3.2298, 43.3358 ], [ 3.2295, 43.3352 ], [ 3.2294, 43.3349 ], [ 3.2288, 43.3345 ], [ 3.2272, 43.3355 ], [ 3.227, 43.3355 ], [ 3.2269, 43.3356 ], [ 3.2265, 43.3358 ], [ 3.2264, 43.3359 ], [ 3.2262, 43.336 ], [ 3.2257, 43.3363 ], [ 3.2254, 43.3365 ], [ 3.2249, 43.3368 ], [ 3.2247, 43.3368 ], [ 3.223, 43.3378 ], [ 3.2228, 43.3379 ], [ 3.2219, 43.3384 ], [ 3.2214, 43.3387 ], [ 3.2212, 43.3389 ], [ 3.2206, 43.3392 ], [ 3.2203, 43.3394 ], [ 3.2203, 43.3393 ], [ 3.2202, 43.3391 ], [ 3.2202, 43.3391 ], [ 3.2197, 43.3391 ], [ 3.2196, 43.3391 ], [ 3.2195, 43.3392 ], [ 3.2195, 43.3392 ], [ 3.2195, 43.3392 ], [ 3.2189, 43.339 ], [ 3.2184, 43.3389 ], [ 3.2184, 43.3388 ], [ 3.2188, 43.3384 ], [ 3.2191, 43.338 ], [ 3.2191, 43.338 ], [ 3.2191, 43.3379 ], [ 3.2191, 43.3376 ], [ 3.219, 43.3374 ], [ 3.219, 43.3371 ], [ 3.2189, 43.337 ], [ 3.2189, 43.3352 ], [ 3.2219, 43.3348 ], [ 3.2221, 43.3346 ], [ 3.2222, 43.3344 ], [ 3.2228, 43.3339 ], [ 3.2235, 43.3334 ], [ 3.224, 43.3331 ], [ 3.2239, 43.3331 ], [ 3.2226, 43.3332 ], [ 3.2215, 43.3332 ], [ 3.2191, 43.3327 ], [ 3.2177, 43.3322 ], [ 3.2161, 43.3329 ], [ 3.2158, 43.333 ], [ 3.2153, 43.3335 ], [ 3.2134, 43.3351 ], [ 3.2128, 43.3355 ], [ 3.2117, 43.3349 ], [ 3.2116, 43.3348 ], [ 3.2114, 43.3347 ], [ 3.2113, 43.3346 ], [ 3.211, 43.3345 ], [ 3.2107, 43.3344 ], [ 3.2106, 43.3344 ], [ 3.2105, 43.3345 ], [ 3.2104, 43.3345 ], [ 3.2101, 43.3347 ], [ 3.2101, 43.3346 ], [ 3.2099, 43.3345 ], [ 3.2095, 43.3342 ], [ 3.2092, 43.3345 ], [ 3.2088, 43.3347 ], [ 3.2087, 43.3348 ], [ 3.2081, 43.3349 ], [ 3.2075, 43.3351 ], [ 3.2074, 43.335 ], [ 3.207, 43.3347 ], [ 3.2068, 43.3345 ], [ 3.2064, 43.3342 ], [ 3.2055, 43.3335 ], [ 3.2051, 43.3332 ], [ 3.2047, 43.333 ], [ 3.2039, 43.3325 ], [ 3.2034, 43.3322 ], [ 3.2029, 43.332 ], [ 3.2027, 43.3319 ], [ 3.2026, 43.332 ], [ 3.2027, 43.3321 ], [ 3.2027, 43.3321 ], [ 3.203, 43.3325 ], [ 3.2037, 43.3333 ], [ 3.2036, 43.3333 ], [ 3.2014, 43.3342 ], [ 3.2014, 43.3342 ], [ 3.2012, 43.3343 ], [ 3.2012, 43.3343 ], [ 3.2012, 43.3344 ], [ 3.2011, 43.3345 ], [ 3.2009, 43.3347 ], [ 3.2008, 43.3348 ], [ 3.2004, 43.3351 ], [ 3.2002, 43.3354 ], [ 3.1999, 43.3356 ], [ 3.2007, 43.336 ], [ 3.2008, 43.336 ], [ 3.201, 43.3361 ], [ 3.2023, 43.3367 ], [ 3.2025, 43.3368 ], [ 3.2023, 43.337 ], [ 3.2022, 43.3371 ], [ 3.2019, 43.3374 ], [ 3.2019, 43.3375 ], [ 3.2019, 43.3376 ], [ 3.2018, 43.3376 ], [ 3.2019, 43.3377 ], [ 3.2019, 43.3377 ], [ 3.2019, 43.3377 ], [ 3.202, 43.3378 ], [ 3.2023, 43.3378 ], [ 3.2031, 43.3378 ], [ 3.2034, 43.338 ], [ 3.2035, 43.3382 ], [ 3.2037, 43.3385 ], [ 3.2043, 43.3384 ], [ 3.2044, 43.3384 ], [ 3.2046, 43.3386 ], [ 3.2047, 43.3387 ], [ 3.2052, 43.339 ], [ 3.2053, 43.3391 ], [ 3.2053, 43.3391 ], [ 3.2056, 43.3388 ], [ 3.2058, 43.3386 ], [ 3.2059, 43.3386 ], [ 3.2061, 43.3386 ], [ 3.2063, 43.3387 ], [ 3.2072, 43.3389 ], [ 3.2074, 43.339 ], [ 3.2088, 43.3395 ], [ 3.2088, 43.3396 ], [ 3.2087, 43.3397 ], [ 3.2086, 43.3399 ], [ 3.2086, 43.34 ], [ 3.2085, 43.3401 ], [ 3.2084, 43.3403 ], [ 3.2083, 43.3405 ], [ 3.2081, 43.3408 ], [ 3.208, 43.3411 ], [ 3.2079, 43.3419 ], [ 3.2078, 43.3426 ], [ 3.2082, 43.3426 ], [ 3.2081, 43.343 ], [ 3.2081, 43.3431 ], [ 3.2081, 43.3432 ], [ 3.2082, 43.3434 ], [ 3.2084, 43.3437 ], [ 3.2092, 43.3436 ], [ 3.2092, 43.3438 ], [ 3.2092, 43.344 ], [ 3.2093, 43.3443 ], [ 3.2094, 43.3443 ], [ 3.2096, 43.3443 ], [ 3.2096, 43.3445 ], [ 3.2095, 43.3446 ], [ 3.2096, 43.3447 ], [ 3.2096, 43.3448 ], [ 3.2092, 43.345 ], [ 3.2093, 43.3451 ], [ 3.2096, 43.3454 ], [ 3.2091, 43.3458 ], [ 3.2086, 43.3462 ], [ 3.2083, 43.3464 ], [ 3.2083, 43.3464 ], [ 3.2083, 43.3465 ], [ 3.2083, 43.3466 ], [ 3.2083, 43.3467 ], [ 3.2082, 43.3468 ], [ 3.208, 43.347 ], [ 3.2079, 43.347 ], [ 3.2078, 43.3471 ], [ 3.2082, 43.3475 ], [ 3.2084, 43.3477 ], [ 3.2085, 43.3478 ], [ 3.2086, 43.3479 ], [ 3.2081, 43.348 ], [ 3.208, 43.348 ], [ 3.2077, 43.3481 ], [ 3.2078, 43.3484 ], [ 3.2079, 43.3488 ], [ 3.2079, 43.3491 ], [ 3.2079, 43.3491 ], [ 3.2078, 43.3492 ], [ 3.2077, 43.3492 ], [ 3.2076, 43.3492 ], [ 3.2076, 43.3496 ], [ 3.2076, 43.3497 ], [ 3.2076, 43.35 ], [ 3.2076, 43.3501 ], [ 3.208, 43.35 ], [ 3.2083, 43.35 ], [ 3.2083, 43.3503 ], [ 3.2084, 43.3504 ], [ 3.2084, 43.3506 ], [ 3.2084, 43.3508 ], [ 3.2087, 43.3507 ], [ 3.209, 43.3506 ], [ 3.2093, 43.3506 ], [ 3.2094, 43.3506 ], [ 3.2095, 43.3505 ], [ 3.2096, 43.3505 ], [ 3.2096, 43.3503 ], [ 3.2096, 43.3502 ], [ 3.2096, 43.35 ], [ 3.2096, 43.3498 ], [ 3.2096, 43.3497 ], [ 3.2096, 43.3497 ], [ 3.2096, 43.3494 ], [ 3.2096, 43.3493 ], [ 3.2095, 43.3493 ], [ 3.2093, 43.3493 ], [ 3.209, 43.3492 ], [ 3.209, 43.3489 ], [ 3.2089, 43.3485 ], [ 3.2092, 43.3485 ], [ 3.2094, 43.3485 ], [ 3.2096, 43.3484 ], [ 3.2096, 43.3484 ], [ 3.2096, 43.3483 ], [ 3.2096, 43.3482 ], [ 3.2096, 43.3481 ], [ 3.2096, 43.3479 ], [ 3.2095, 43.3477 ], [ 3.2095, 43.3476 ], [ 3.2098, 43.3472 ], [ 3.2098, 43.3471 ], [ 3.2105, 43.3468 ], [ 3.2107, 43.3467 ], [ 3.2107, 43.3467 ], [ 3.2111, 43.3471 ], [ 3.2113, 43.347 ], [ 3.2115, 43.347 ], [ 3.2115, 43.3471 ], [ 3.2117, 43.347 ], [ 3.2117, 43.347 ], [ 3.2118, 43.3471 ], [ 3.2119, 43.347 ], [ 3.212, 43.3469 ], [ 3.212, 43.3469 ], [ 3.2121, 43.347 ], [ 3.2123, 43.347 ], [ 3.2126, 43.3472 ], [ 3.2127, 43.3472 ], [ 3.2128, 43.3473 ], [ 3.2129, 43.3472 ], [ 3.2133, 43.3471 ], [ 3.2133, 43.3471 ], [ 3.2133, 43.3473 ], [ 3.2134, 43.3472 ], [ 3.2135, 43.3473 ], [ 3.2135, 43.3474 ], [ 3.2136, 43.3474 ], [ 3.2138, 43.3474 ], [ 3.2137, 43.3475 ], [ 3.2139, 43.3475 ], [ 3.214, 43.3476 ], [ 3.214, 43.3476 ], [ 3.214, 43.3477 ], [ 3.2141, 43.3478 ], [ 3.2142, 43.3484 ], [ 3.2148, 43.3483 ], [ 3.2149, 43.3486 ], [ 3.2149, 43.3486 ], [ 3.2149, 43.349 ], [ 3.2151, 43.3489 ], [ 3.2151, 43.349 ], [ 3.2152, 43.349 ], [ 3.2153, 43.349 ], [ 3.2162, 43.3488 ], [ 3.2163, 43.3487 ], [ 3.2163, 43.3488 ], [ 3.2165, 43.3491 ], [ 3.2166, 43.3493 ], [ 3.2167, 43.3495 ], [ 3.2168, 43.3496 ], [ 3.217, 43.3499 ], [ 3.2171, 43.3501 ], [ 3.2173, 43.3502 ], [ 3.2173, 43.3503 ], [ 3.2174, 43.3503 ], [ 3.2174, 43.3504 ], [ 3.2176, 43.3505 ], [ 3.2177, 43.3505 ], [ 3.2185, 43.3507 ], [ 3.219, 43.3509 ], [ 3.2191, 43.3508 ], [ 3.219, 43.3506 ], [ 3.219, 43.3506 ], [ 3.2187, 43.3503 ], [ 3.2189, 43.3502 ], [ 3.2193, 43.3499 ], [ 3.2197, 43.3496 ], [ 3.2198, 43.3495 ], [ 3.22, 43.3493 ], [ 3.2203, 43.3491 ], [ 3.2206, 43.3489 ], [ 3.2207, 43.3489 ], [ 3.2206, 43.3488 ], [ 3.2209, 43.3485 ], [ 3.2212, 43.3483 ], [ 3.2213, 43.3482 ], [ 3.2218, 43.3484 ], [ 3.2218, 43.3485 ], [ 3.222, 43.3485 ], [ 3.2221, 43.3485 ], [ 3.2223, 43.3487 ], [ 3.2227, 43.3489 ], [ 3.2228, 43.3489 ], [ 3.2228, 43.3489 ], [ 3.2229, 43.3488 ], [ 3.2232, 43.3487 ], [ 3.2232, 43.3486 ], [ 3.2231, 43.3486 ], [ 3.223, 43.3485 ], [ 3.2229, 43.3484 ], [ 3.2219, 43.3479 ], [ 3.2215, 43.3477 ], [ 3.221, 43.3475 ], [ 3.2205, 43.3472 ], [ 3.2203, 43.3471 ], [ 3.22, 43.3469 ], [ 3.2197, 43.3468 ], [ 3.2195, 43.3467 ], [ 3.2194, 43.3466 ], [ 3.2191, 43.3465 ], [ 3.219, 43.3464 ], [ 3.219, 43.3463 ], [ 3.2192, 43.346 ], [ 3.2194, 43.3456 ], [ 3.2199, 43.3448 ], [ 3.2201, 43.3444 ], [ 3.2204, 43.344 ], [ 3.2207, 43.3435 ], [ 3.2212, 43.3425 ], [ 3.2213, 43.3424 ], [ 3.2215, 43.3421 ], [ 3.2218, 43.3416 ], [ 3.2219, 43.3414 ], [ 3.2221, 43.3414 ], [ 3.2225, 43.3415 ], [ 3.2225, 43.3415 ], [ 3.2231, 43.3417 ], [ 3.2236, 43.3418 ], [ 3.2237, 43.3418 ], [ 3.2238, 43.3417 ], [ 3.2248, 43.3419 ], [ 3.2248, 43.3418 ], [ 3.2244, 43.3415 ], [ 3.2241, 43.3413 ], [ 3.2243, 43.341 ], [ 3.2244, 43.3407 ], [ 3.224, 43.3404 ], [ 3.2246, 43.3399 ], [ 3.2245, 43.3399 ], [ 3.2242, 43.3397 ], [ 3.2241, 43.3396 ], [ 3.224, 43.3395 ], [ 3.2246, 43.3392 ], [ 3.2247, 43.3391 ], [ 3.2247, 43.339 ], [ 3.225, 43.3388 ], [ 3.2251, 43.3387 ] ] ], "type": "Polygon" }, "id": "29", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034001", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.8106, 43.6198, 3.8251, 43.6441 ], "geometry": { "coordinates": [ [ [ 3.8116, 43.6234 ], [ 3.8115, 43.6235 ], [ 3.8114, 43.6237 ], [ 3.8114, 43.6238 ], [ 3.8114, 43.6239 ], [ 3.8121, 43.6247 ], [ 3.8129, 43.6257 ], [ 3.8137, 43.6265 ], [ 3.8138, 43.6266 ], [ 3.8139, 43.6268 ], [ 3.814, 43.6268 ], [ 3.8143, 43.6269 ], [ 3.8156, 43.627 ], [ 3.8162, 43.627 ], [ 3.8168, 43.627 ], [ 3.8175, 43.627 ], [ 3.8176, 43.6283 ], [ 3.8176, 43.629 ], [ 3.8176, 43.6291 ], [ 3.8177, 43.6292 ], [ 3.8185, 43.6301 ], [ 3.8161, 43.6303 ], [ 3.8163, 43.6307 ], [ 3.8163, 43.6308 ], [ 3.8163, 43.6308 ], [ 3.8164, 43.631 ], [ 3.8164, 43.6313 ], [ 3.8163, 43.6314 ], [ 3.8162, 43.6316 ], [ 3.8159, 43.6318 ], [ 3.8152, 43.6323 ], [ 3.8148, 43.6326 ], [ 3.8144, 43.6329 ], [ 3.8141, 43.633 ], [ 3.8138, 43.6334 ], [ 3.8138, 43.6335 ], [ 3.8136, 43.6337 ], [ 3.8136, 43.6338 ], [ 3.8136, 43.6338 ], [ 3.8134, 43.634 ], [ 3.8131, 43.6342 ], [ 3.813, 43.6343 ], [ 3.8129, 43.6344 ], [ 3.8129, 43.635 ], [ 3.8128, 43.635 ], [ 3.8124, 43.6351 ], [ 3.8122, 43.6351 ], [ 3.8121, 43.6352 ], [ 3.812, 43.6352 ], [ 3.8122, 43.6352 ], [ 3.8124, 43.6352 ], [ 3.8127, 43.6352 ], [ 3.8131, 43.6352 ], [ 3.8133, 43.6352 ], [ 3.8134, 43.6353 ], [ 3.8136, 43.6354 ], [ 3.8137, 43.6355 ], [ 3.8138, 43.6356 ], [ 3.8138, 43.6358 ], [ 3.8139, 43.6364 ], [ 3.8139, 43.6364 ], [ 3.814, 43.6365 ], [ 3.8141, 43.6367 ], [ 3.8143, 43.6373 ], [ 3.8148, 43.6378 ], [ 3.8149, 43.6381 ], [ 3.8145, 43.6384 ], [ 3.8144, 43.6385 ], [ 3.8141, 43.6385 ], [ 3.8138, 43.6386 ], [ 3.8137, 43.6387 ], [ 3.8136, 43.6388 ], [ 3.8135, 43.6389 ], [ 3.8135, 43.639 ], [ 3.8117, 43.639 ], [ 3.8117, 43.6393 ], [ 3.8117, 43.6394 ], [ 3.8115, 43.6394 ], [ 3.8115, 43.6393 ], [ 3.8106, 43.6393 ], [ 3.8106, 43.6396 ], [ 3.8106, 43.6398 ], [ 3.8107, 43.64 ], [ 3.8107, 43.64 ], [ 3.8108, 43.6401 ], [ 3.8109, 43.6403 ], [ 3.8114, 43.6407 ], [ 3.812, 43.6413 ], [ 3.8123, 43.6415 ], [ 3.8129, 43.6418 ], [ 3.8137, 43.6421 ], [ 3.8157, 43.6428 ], [ 3.8156, 43.6429 ], [ 3.8158, 43.643 ], [ 3.8183, 43.644 ], [ 3.8189, 43.6441 ], [ 3.8208, 43.6433 ], [ 3.8215, 43.6433 ], [ 3.8216, 43.6432 ], [ 3.8206, 43.6429 ], [ 3.8205, 43.6429 ], [ 3.8205, 43.6428 ], [ 3.8202, 43.6427 ], [ 3.8201, 43.6427 ], [ 3.8201, 43.6426 ], [ 3.8201, 43.6424 ], [ 3.82, 43.6423 ], [ 3.8199, 43.6422 ], [ 3.8198, 43.6421 ], [ 3.8195, 43.6419 ], [ 3.8192, 43.6421 ], [ 3.8192, 43.6408 ], [ 3.8203, 43.6408 ], [ 3.8203, 43.6387 ], [ 3.8199, 43.6382 ], [ 3.8199, 43.6373 ], [ 3.8197, 43.6373 ], [ 3.8195, 43.6371 ], [ 3.8195, 43.6371 ], [ 3.8192, 43.6368 ], [ 3.8187, 43.6364 ], [ 3.8184, 43.6361 ], [ 3.8183, 43.6361 ], [ 3.8182, 43.6359 ], [ 3.8179, 43.6358 ], [ 3.8177, 43.6358 ], [ 3.8176, 43.6358 ], [ 3.8172, 43.636 ], [ 3.817, 43.6361 ], [ 3.8168, 43.6358 ], [ 3.8167, 43.6357 ], [ 3.8164, 43.6355 ], [ 3.8164, 43.6354 ], [ 3.8163, 43.6353 ], [ 3.8162, 43.6351 ], [ 3.8162, 43.6348 ], [ 3.8163, 43.6347 ], [ 3.8165, 43.6345 ], [ 3.8166, 43.6344 ], [ 3.8168, 43.6343 ], [ 3.8172, 43.6343 ], [ 3.8176, 43.6342 ], [ 3.8192, 43.6342 ], [ 3.8199, 43.6342 ], [ 3.8226, 43.6344 ], [ 3.8232, 43.6344 ], [ 3.8236, 43.6343 ], [ 3.8238, 43.6342 ], [ 3.8243, 43.6339 ], [ 3.8246, 43.6338 ], [ 3.8247, 43.6336 ], [ 3.8247, 43.6334 ], [ 3.8245, 43.6319 ], [ 3.8251, 43.6317 ], [ 3.8251, 43.6305 ], [ 3.8224, 43.6305 ], [ 3.8224, 43.6298 ], [ 3.8221, 43.6284 ], [ 3.8221, 43.6282 ], [ 3.822, 43.6282 ], [ 3.8219, 43.6276 ], [ 3.8217, 43.6269 ], [ 3.8216, 43.6262 ], [ 3.8216, 43.6262 ], [ 3.8214, 43.6259 ], [ 3.8214, 43.6258 ], [ 3.8213, 43.6255 ], [ 3.8203, 43.6239 ], [ 3.8193, 43.6224 ], [ 3.8189, 43.6218 ], [ 3.8186, 43.6215 ], [ 3.8177, 43.6198 ], [ 3.8172, 43.6201 ], [ 3.8154, 43.6212 ], [ 3.8148, 43.6215 ], [ 3.8148, 43.6215 ], [ 3.8131, 43.6226 ], [ 3.8116, 43.6234 ] ] ], "type": "Polygon" }, "id": "30", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034005", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Mosson" }, "type": "Feature" }, { "bbox": [ 3.8217, 43.6117, 3.8279, 43.6151 ], "geometry": { "coordinates": [ [ [ 3.8258, 43.6149 ], [ 3.8259, 43.6149 ], [ 3.8259, 43.6144 ], [ 3.8266, 43.614 ], [ 3.8267, 43.614 ], [ 3.8265, 43.6137 ], [ 3.8267, 43.6136 ], [ 3.8271, 43.6135 ], [ 3.8272, 43.6135 ], [ 3.8273, 43.6135 ], [ 3.8278, 43.6133 ], [ 3.8277, 43.613 ], [ 3.8274, 43.6127 ], [ 3.8272, 43.6125 ], [ 3.8274, 43.6125 ], [ 3.8278, 43.6124 ], [ 3.8279, 43.6124 ], [ 3.8278, 43.6123 ], [ 3.8278, 43.6123 ], [ 3.8277, 43.6122 ], [ 3.8276, 43.6121 ], [ 3.8275, 43.6122 ], [ 3.8274, 43.6121 ], [ 3.8271, 43.6122 ], [ 3.827, 43.6121 ], [ 3.8268, 43.6122 ], [ 3.8266, 43.6124 ], [ 3.8261, 43.6117 ], [ 3.8256, 43.6118 ], [ 3.8252, 43.6118 ], [ 3.8248, 43.6119 ], [ 3.8244, 43.612 ], [ 3.8242, 43.6121 ], [ 3.8238, 43.6123 ], [ 3.8237, 43.6124 ], [ 3.8233, 43.6125 ], [ 3.823, 43.6128 ], [ 3.8228, 43.6129 ], [ 3.8225, 43.6132 ], [ 3.8225, 43.6134 ], [ 3.8222, 43.6138 ], [ 3.8218, 43.6146 ], [ 3.8217, 43.6147 ], [ 3.8217, 43.6148 ], [ 3.8218, 43.6149 ], [ 3.8219, 43.615 ], [ 3.822, 43.6151 ], [ 3.8221, 43.6151 ], [ 3.8222, 43.6151 ], [ 3.8229, 43.615 ], [ 3.8236, 43.615 ], [ 3.8239, 43.6149 ], [ 3.8244, 43.6149 ], [ 3.8246, 43.6148 ], [ 3.8249, 43.6148 ], [ 3.8257, 43.6148 ], [ 3.8258, 43.6149 ] ] ], "type": "Polygon" }, "id": "31", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034004", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Celleneuve" }, "type": "Feature" }, { "bbox": [ 3.8326, 43.6122, 3.841, 43.6202 ], "geometry": { "coordinates": [ [ [ 3.8373, 43.6202 ], [ 3.8374, 43.6201 ], [ 3.8375, 43.62 ], [ 3.8377, 43.6197 ], [ 3.8381, 43.6193 ], [ 3.8382, 43.6192 ], [ 3.8392, 43.6179 ], [ 3.8394, 43.6179 ], [ 3.8399, 43.6172 ], [ 3.8402, 43.6168 ], [ 3.8408, 43.6163 ], [ 3.841, 43.6162 ], [ 3.8404, 43.6158 ], [ 3.8402, 43.6156 ], [ 3.84, 43.6155 ], [ 3.8399, 43.6154 ], [ 3.8398, 43.6152 ], [ 3.8395, 43.6146 ], [ 3.839, 43.6138 ], [ 3.839, 43.6137 ], [ 3.8389, 43.6136 ], [ 3.8388, 43.6128 ], [ 3.8387, 43.6126 ], [ 3.8384, 43.6124 ], [ 3.838, 43.6122 ], [ 3.8354, 43.6137 ], [ 3.8353, 43.6134 ], [ 3.8338, 43.6135 ], [ 3.8337, 43.6135 ], [ 3.8328, 43.6135 ], [ 3.8326, 43.6134 ], [ 3.8327, 43.614 ], [ 3.8327, 43.6147 ], [ 3.8344, 43.6146 ], [ 3.8348, 43.6158 ], [ 3.8348, 43.6159 ], [ 3.8348, 43.6159 ], [ 3.8347, 43.616 ], [ 3.8346, 43.616 ], [ 3.8345, 43.6161 ], [ 3.8342, 43.6165 ], [ 3.8347, 43.6167 ], [ 3.835, 43.6169 ], [ 3.8347, 43.6172 ], [ 3.8347, 43.6173 ], [ 3.8346, 43.6173 ], [ 3.8345, 43.6173 ], [ 3.8345, 43.6173 ], [ 3.8343, 43.6172 ], [ 3.8341, 43.6174 ], [ 3.8342, 43.6175 ], [ 3.8343, 43.6175 ], [ 3.8348, 43.6178 ], [ 3.8343, 43.618 ], [ 3.8355, 43.6188 ], [ 3.8355, 43.6189 ], [ 3.8357, 43.619 ], [ 3.8356, 43.619 ], [ 3.8373, 43.6202 ] ] ], "type": "Polygon" }, "id": "32", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034006", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Petit Bard Pergola" }, "type": "Feature" }, { "bbox": [ 1.3266, 43.4645, 1.3373, 43.4715 ], "geometry": { "coordinates": [ [ [ 1.3327, 43.4714 ], [ 1.3323, 43.4708 ], [ 1.3324, 43.4707 ], [ 1.3324, 43.4707 ], [ 1.335, 43.4698 ], [ 1.3351, 43.4698 ], [ 1.3352, 43.4698 ], [ 1.3356, 43.4705 ], [ 1.3358, 43.4707 ], [ 1.336, 43.4708 ], [ 1.3361, 43.4709 ], [ 1.3365, 43.471 ], [ 1.337, 43.4711 ], [ 1.3373, 43.4711 ], [ 1.337, 43.4704 ], [ 1.3369, 43.4703 ], [ 1.3369, 43.4703 ], [ 1.3363, 43.4689 ], [ 1.3361, 43.4685 ], [ 1.3354, 43.4687 ], [ 1.3351, 43.4682 ], [ 1.335, 43.4681 ], [ 1.3345, 43.4683 ], [ 1.3339, 43.4684 ], [ 1.3337, 43.4686 ], [ 1.3325, 43.469 ], [ 1.3323, 43.4687 ], [ 1.3322, 43.4687 ], [ 1.3318, 43.4686 ], [ 1.332, 43.4679 ], [ 1.332, 43.4678 ], [ 1.3321, 43.4678 ], [ 1.3321, 43.4677 ], [ 1.3321, 43.4677 ], [ 1.3321, 43.4676 ], [ 1.3319, 43.4675 ], [ 1.3319, 43.4673 ], [ 1.3316, 43.4673 ], [ 1.3315, 43.4673 ], [ 1.3313, 43.4671 ], [ 1.3314, 43.467 ], [ 1.3315, 43.4668 ], [ 1.3317, 43.4662 ], [ 1.3317, 43.466 ], [ 1.3318, 43.4657 ], [ 1.3305, 43.4655 ], [ 1.3301, 43.4655 ], [ 1.3299, 43.4654 ], [ 1.3295, 43.4653 ], [ 1.3291, 43.4652 ], [ 1.3303, 43.4649 ], [ 1.3304, 43.4648 ], [ 1.3303, 43.4647 ], [ 1.3303, 43.4647 ], [ 1.3302, 43.4645 ], [ 1.3301, 43.4645 ], [ 1.3293, 43.4647 ], [ 1.3289, 43.4648 ], [ 1.3288, 43.4648 ], [ 1.3286, 43.4646 ], [ 1.3284, 43.4645 ], [ 1.3267, 43.465 ], [ 1.3266, 43.4651 ], [ 1.3266, 43.4652 ], [ 1.3269, 43.4656 ], [ 1.3275, 43.4654 ], [ 1.3288, 43.4651 ], [ 1.3292, 43.4653 ], [ 1.3297, 43.4654 ], [ 1.3299, 43.4656 ], [ 1.33, 43.4658 ], [ 1.3298, 43.4659 ], [ 1.3301, 43.4666 ], [ 1.3303, 43.4671 ], [ 1.3303, 43.4672 ], [ 1.3304, 43.4673 ], [ 1.3304, 43.4673 ], [ 1.3308, 43.4674 ], [ 1.3308, 43.4674 ], [ 1.3306, 43.4682 ], [ 1.3306, 43.4682 ], [ 1.3309, 43.4683 ], [ 1.3308, 43.4688 ], [ 1.3308, 43.469 ], [ 1.3307, 43.4694 ], [ 1.3295, 43.4696 ], [ 1.3294, 43.4697 ], [ 1.3288, 43.4699 ], [ 1.3278, 43.4701 ], [ 1.3278, 43.4702 ], [ 1.3282, 43.4711 ], [ 1.3283, 43.4711 ], [ 1.3288, 43.471 ], [ 1.3298, 43.4708 ], [ 1.33, 43.4707 ], [ 1.33, 43.4706 ], [ 1.3302, 43.4707 ], [ 1.3303, 43.4706 ], [ 1.3304, 43.4708 ], [ 1.3304, 43.4709 ], [ 1.3305, 43.4708 ], [ 1.3306, 43.4707 ], [ 1.3307, 43.4709 ], [ 1.3308, 43.4709 ], [ 1.3311, 43.4715 ], [ 1.3312, 43.4715 ], [ 1.3316, 43.4713 ], [ 1.3317, 43.4713 ], [ 1.3321, 43.4712 ], [ 1.3323, 43.4715 ], [ 1.3327, 43.4714 ] ] ], "type": "Polygon" }, "id": "33", "properties": { "code_commune": "31395", "code_departement": "31", "code_qp": "QP031001", "commune_qp": "Muret", "nom_commune": "Muret", "nom_qp": "Saint Jean" }, "type": "Feature" }, { "bbox": [ 2.2268, 43.5938, 2.234, 43.5983 ], "geometry": { "coordinates": [ [ [ 2.2322, 43.5969 ], [ 2.2331, 43.5963 ], [ 2.2333, 43.5964 ], [ 2.234, 43.5958 ], [ 2.2338, 43.5955 ], [ 2.2337, 43.5955 ], [ 2.2331, 43.5949 ], [ 2.2328, 43.5951 ], [ 2.232, 43.5955 ], [ 2.2306, 43.5962 ], [ 2.2304, 43.5959 ], [ 2.2303, 43.5958 ], [ 2.2306, 43.5956 ], [ 2.2307, 43.5957 ], [ 2.2314, 43.5953 ], [ 2.2313, 43.5952 ], [ 2.2324, 43.5947 ], [ 2.2316, 43.5938 ], [ 2.2305, 43.5944 ], [ 2.2304, 43.5944 ], [ 2.2295, 43.5949 ], [ 2.2278, 43.5958 ], [ 2.2274, 43.5954 ], [ 2.2273, 43.5955 ], [ 2.2276, 43.5958 ], [ 2.2276, 43.5958 ], [ 2.2269, 43.5962 ], [ 2.2268, 43.5963 ], [ 2.2268, 43.5963 ], [ 2.227, 43.5964 ], [ 2.2279, 43.5968 ], [ 2.2282, 43.597 ], [ 2.2285, 43.5971 ], [ 2.2287, 43.5972 ], [ 2.2288, 43.5972 ], [ 2.2291, 43.5975 ], [ 2.2306, 43.5983 ], [ 2.231, 43.5979 ], [ 2.2312, 43.5979 ], [ 2.2312, 43.5978 ], [ 2.2318, 43.5973 ], [ 2.2322, 43.5969 ], [ 2.2322, 43.5969 ] ] ], "type": "Polygon" }, "id": "34", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081002", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Laden Petit Train" }, "type": "Feature" }, { "bbox": [ 2.3542, 43.2246, 2.3595, 43.2285 ], "geometry": { "coordinates": [ [ [ 2.3586, 43.2264 ], [ 2.3582, 43.226 ], [ 2.3575, 43.2254 ], [ 2.3572, 43.2252 ], [ 2.3571, 43.2251 ], [ 2.3565, 43.2255 ], [ 2.3564, 43.2254 ], [ 2.3563, 43.2254 ], [ 2.3561, 43.2252 ], [ 2.3558, 43.225 ], [ 2.3557, 43.2249 ], [ 2.3561, 43.2247 ], [ 2.3557, 43.2246 ], [ 2.3557, 43.2246 ], [ 2.3554, 43.2246 ], [ 2.3554, 43.2246 ], [ 2.3552, 43.2246 ], [ 2.3551, 43.2246 ], [ 2.355, 43.2247 ], [ 2.3546, 43.2246 ], [ 2.3544, 43.2247 ], [ 2.3547, 43.225 ], [ 2.355, 43.2253 ], [ 2.3546, 43.2256 ], [ 2.3544, 43.2258 ], [ 2.3542, 43.226 ], [ 2.3544, 43.2261 ], [ 2.3543, 43.2262 ], [ 2.3542, 43.2263 ], [ 2.3545, 43.2265 ], [ 2.3546, 43.2265 ], [ 2.3545, 43.2268 ], [ 2.3548, 43.2268 ], [ 2.3548, 43.2271 ], [ 2.3547, 43.2275 ], [ 2.3547, 43.2276 ], [ 2.3549, 43.2277 ], [ 2.3552, 43.2277 ], [ 2.3554, 43.2277 ], [ 2.3559, 43.2277 ], [ 2.3568, 43.2278 ], [ 2.3569, 43.2279 ], [ 2.357, 43.2279 ], [ 2.3571, 43.2279 ], [ 2.3579, 43.2284 ], [ 2.358, 43.2284 ], [ 2.3581, 43.2284 ], [ 2.3582, 43.2285 ], [ 2.3583, 43.2285 ], [ 2.3584, 43.2285 ], [ 2.3585, 43.2285 ], [ 2.3585, 43.2285 ], [ 2.3586, 43.2285 ], [ 2.3587, 43.2285 ], [ 2.3588, 43.2285 ], [ 2.359, 43.2285 ], [ 2.3595, 43.2283 ], [ 2.3592, 43.2277 ], [ 2.3589, 43.2271 ], [ 2.3588, 43.2269 ], [ 2.3586, 43.2267 ], [ 2.3586, 43.2265 ], [ 2.3586, 43.2264 ] ] ], "type": "Polygon" }, "id": "35", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011006", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Grazailles" }, "type": "Feature" }, { "bbox": [ 3.8767, 43.6256, 3.8824, 43.6304 ], "geometry": { "coordinates": [ [ [ 3.8817, 43.6275 ], [ 3.8818, 43.6273 ], [ 3.8819, 43.6269 ], [ 3.8821, 43.6265 ], [ 3.8824, 43.626 ], [ 3.8814, 43.6258 ], [ 3.8803, 43.6257 ], [ 3.8795, 43.6256 ], [ 3.8791, 43.6256 ], [ 3.879, 43.6256 ], [ 3.8792, 43.6261 ], [ 3.8792, 43.6262 ], [ 3.8794, 43.6267 ], [ 3.8794, 43.6268 ], [ 3.8795, 43.627 ], [ 3.8795, 43.6271 ], [ 3.8797, 43.6274 ], [ 3.8798, 43.6275 ], [ 3.8799, 43.6275 ], [ 3.8799, 43.6276 ], [ 3.8799, 43.6276 ], [ 3.8797, 43.6277 ], [ 3.8792, 43.6279 ], [ 3.879, 43.628 ], [ 3.8789, 43.628 ], [ 3.8789, 43.6281 ], [ 3.8788, 43.6282 ], [ 3.8787, 43.6282 ], [ 3.8781, 43.6282 ], [ 3.8781, 43.6284 ], [ 3.8781, 43.6285 ], [ 3.878, 43.6285 ], [ 3.8774, 43.6287 ], [ 3.8767, 43.6289 ], [ 3.8768, 43.629 ], [ 3.8771, 43.6296 ], [ 3.8775, 43.6295 ], [ 3.8775, 43.6295 ], [ 3.8776, 43.6295 ], [ 3.8776, 43.6295 ], [ 3.8777, 43.6296 ], [ 3.8779, 43.6295 ], [ 3.878, 43.6299 ], [ 3.8781, 43.63 ], [ 3.8782, 43.6301 ], [ 3.8783, 43.6302 ], [ 3.8785, 43.6303 ], [ 3.8787, 43.6304 ], [ 3.8788, 43.6304 ], [ 3.8789, 43.6303 ], [ 3.8789, 43.6303 ], [ 3.879, 43.6303 ], [ 3.8792, 43.6301 ], [ 3.8794, 43.6299 ], [ 3.8797, 43.6297 ], [ 3.8801, 43.6293 ], [ 3.8802, 43.6292 ], [ 3.8807, 43.6289 ], [ 3.8811, 43.6286 ], [ 3.8812, 43.6285 ], [ 3.8813, 43.6284 ], [ 3.8814, 43.6283 ], [ 3.8815, 43.6282 ], [ 3.8816, 43.6279 ], [ 3.8816, 43.6277 ], [ 3.8817, 43.6275 ] ] ], "type": "Polygon" }, "id": "36", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034014", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Aiguelongue" }, "type": "Feature" }, { "bbox": [ 1.3822, 43.5783, 1.3906, 43.5831 ], "geometry": { "coordinates": [ [ [ 1.3896, 43.5828 ], [ 1.3896, 43.5827 ], [ 1.3895, 43.5826 ], [ 1.3893, 43.5824 ], [ 1.3894, 43.5824 ], [ 1.3906, 43.5819 ], [ 1.3903, 43.5815 ], [ 1.3902, 43.5814 ], [ 1.3898, 43.5808 ], [ 1.3895, 43.5802 ], [ 1.3886, 43.5804 ], [ 1.3885, 43.5805 ], [ 1.3884, 43.5804 ], [ 1.3881, 43.58 ], [ 1.3883, 43.5793 ], [ 1.3884, 43.5792 ], [ 1.3885, 43.5792 ], [ 1.3888, 43.5791 ], [ 1.3889, 43.5791 ], [ 1.3889, 43.579 ], [ 1.3885, 43.5783 ], [ 1.387, 43.5787 ], [ 1.3871, 43.579 ], [ 1.387, 43.579 ], [ 1.3867, 43.5791 ], [ 1.3861, 43.5792 ], [ 1.386, 43.5792 ], [ 1.3859, 43.5792 ], [ 1.3855, 43.5791 ], [ 1.3855, 43.5791 ], [ 1.3854, 43.5791 ], [ 1.3853, 43.5791 ], [ 1.3852, 43.5792 ], [ 1.3851, 43.5794 ], [ 1.3848, 43.5793 ], [ 1.3847, 43.5792 ], [ 1.3847, 43.5792 ], [ 1.3841, 43.579 ], [ 1.3838, 43.5791 ], [ 1.3837, 43.5788 ], [ 1.3834, 43.5787 ], [ 1.3822, 43.579 ], [ 1.3822, 43.5791 ], [ 1.3822, 43.5791 ], [ 1.3823, 43.5792 ], [ 1.3824, 43.5793 ], [ 1.3825, 43.5795 ], [ 1.3826, 43.5796 ], [ 1.3826, 43.5798 ], [ 1.3827, 43.5799 ], [ 1.3828, 43.5799 ], [ 1.3833, 43.5801 ], [ 1.3833, 43.5801 ], [ 1.3835, 43.5801 ], [ 1.3836, 43.5802 ], [ 1.3839, 43.5803 ], [ 1.384, 43.5803 ], [ 1.3841, 43.5804 ], [ 1.3842, 43.5806 ], [ 1.3844, 43.5807 ], [ 1.3846, 43.5808 ], [ 1.3848, 43.5808 ], [ 1.3855, 43.5811 ], [ 1.3857, 43.5811 ], [ 1.3859, 43.5812 ], [ 1.3858, 43.5813 ], [ 1.3858, 43.5814 ], [ 1.3858, 43.5815 ], [ 1.386, 43.5822 ], [ 1.3861, 43.5831 ], [ 1.3896, 43.5828 ] ] ], "type": "Polygon" }, "id": "37", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031006", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Pradettes" }, "type": "Feature" }, { "bbox": [ 1.3909, 43.5583, 1.4183, 43.5864 ], "geometry": { "coordinates": [ [ [ 1.4183, 43.5824 ], [ 1.4174, 43.5806 ], [ 1.4168, 43.5804 ], [ 1.4165, 43.5798 ], [ 1.4173, 43.5796 ], [ 1.4169, 43.5789 ], [ 1.4167, 43.5784 ], [ 1.4171, 43.5783 ], [ 1.4164, 43.5766 ], [ 1.416, 43.5767 ], [ 1.4159, 43.5764 ], [ 1.4158, 43.5764 ], [ 1.4154, 43.5757 ], [ 1.4152, 43.5757 ], [ 1.415, 43.5758 ], [ 1.4147, 43.5753 ], [ 1.4137, 43.5736 ], [ 1.4123, 43.574 ], [ 1.4122, 43.5737 ], [ 1.4116, 43.5725 ], [ 1.4142, 43.5718 ], [ 1.4134, 43.5704 ], [ 1.4155, 43.5698 ], [ 1.4165, 43.5706 ], [ 1.4171, 43.571 ], [ 1.4175, 43.5713 ], [ 1.4176, 43.5714 ], [ 1.4179, 43.5718 ], [ 1.4181, 43.5718 ], [ 1.4182, 43.5717 ], [ 1.418, 43.5712 ], [ 1.4174, 43.5699 ], [ 1.4162, 43.5692 ], [ 1.4158, 43.5691 ], [ 1.4151, 43.5691 ], [ 1.4147, 43.569 ], [ 1.4137, 43.5685 ], [ 1.4122, 43.5674 ], [ 1.4115, 43.5665 ], [ 1.4107, 43.5666 ], [ 1.4107, 43.5668 ], [ 1.4103, 43.5668 ], [ 1.4102, 43.5669 ], [ 1.4075, 43.5674 ], [ 1.4062, 43.5674 ], [ 1.4026, 43.5674 ], [ 1.4026, 43.5666 ], [ 1.4025, 43.5665 ], [ 1.4024, 43.5662 ], [ 1.4021, 43.5662 ], [ 1.4021, 43.5662 ], [ 1.4018, 43.5662 ], [ 1.4018, 43.5656 ], [ 1.4016, 43.5656 ], [ 1.4016, 43.5652 ], [ 1.4026, 43.5652 ], [ 1.4026, 43.5646 ], [ 1.4036, 43.5646 ], [ 1.403, 43.5638 ], [ 1.4027, 43.5635 ], [ 1.4018, 43.5623 ], [ 1.4018, 43.5612 ], [ 1.4017, 43.561 ], [ 1.4027, 43.5606 ], [ 1.4018, 43.5593 ], [ 1.4016, 43.5589 ], [ 1.4011, 43.5583 ], [ 1.4005, 43.5584 ], [ 1.3985, 43.5589 ], [ 1.3961, 43.5594 ], [ 1.3952, 43.5597 ], [ 1.393, 43.5607 ], [ 1.3909, 43.5619 ], [ 1.3937, 43.5658 ], [ 1.3965, 43.5659 ], [ 1.3966, 43.5661 ], [ 1.3971, 43.5668 ], [ 1.3973, 43.5675 ], [ 1.3971, 43.5679 ], [ 1.397, 43.5684 ], [ 1.3963, 43.5684 ], [ 1.3962, 43.5693 ], [ 1.3962, 43.5704 ], [ 1.3959, 43.5704 ], [ 1.3959, 43.5711 ], [ 1.3954, 43.5711 ], [ 1.3954, 43.5712 ], [ 1.3952, 43.5714 ], [ 1.3949, 43.5713 ], [ 1.3949, 43.5717 ], [ 1.3951, 43.5718 ], [ 1.3951, 43.5722 ], [ 1.395, 43.5722 ], [ 1.395, 43.5722 ], [ 1.3949, 43.5722 ], [ 1.3946, 43.5722 ], [ 1.3945, 43.5722 ], [ 1.3944, 43.5722 ], [ 1.3944, 43.5723 ], [ 1.3944, 43.5724 ], [ 1.3943, 43.5726 ], [ 1.3943, 43.573 ], [ 1.3958, 43.5743 ], [ 1.3957, 43.5744 ], [ 1.3957, 43.5746 ], [ 1.3959, 43.5747 ], [ 1.3947, 43.5779 ], [ 1.3947, 43.5787 ], [ 1.3966, 43.5812 ], [ 1.3978, 43.5827 ], [ 1.3992, 43.5838 ], [ 1.3994, 43.5838 ], [ 1.4001, 43.5838 ], [ 1.4004, 43.5837 ], [ 1.4004, 43.583 ], [ 1.4003, 43.5823 ], [ 1.4007, 43.5822 ], [ 1.4012, 43.5818 ], [ 1.401, 43.5813 ], [ 1.3999, 43.5797 ], [ 1.3994, 43.5797 ], [ 1.3997, 43.5803 ], [ 1.3996, 43.5803 ], [ 1.3995, 43.5805 ], [ 1.3992, 43.5804 ], [ 1.399, 43.5803 ], [ 1.3988, 43.5803 ], [ 1.3978, 43.5804 ], [ 1.3975, 43.5804 ], [ 1.3971, 43.5802 ], [ 1.3967, 43.58 ], [ 1.3966, 43.58 ], [ 1.3966, 43.5799 ], [ 1.3965, 43.5798 ], [ 1.3965, 43.5788 ], [ 1.3965, 43.5787 ], [ 1.3964, 43.5786 ], [ 1.3965, 43.5785 ], [ 1.3967, 43.5785 ], [ 1.3976, 43.5785 ], [ 1.397, 43.5765 ], [ 1.3971, 43.5757 ], [ 1.3966, 43.5757 ], [ 1.3959, 43.5754 ], [ 1.3959, 43.5752 ], [ 1.3962, 43.575 ], [ 1.3964, 43.5749 ], [ 1.3966, 43.5748 ], [ 1.397, 43.5747 ], [ 1.399, 43.5746 ], [ 1.401, 43.5745 ], [ 1.4011, 43.5748 ], [ 1.401, 43.5753 ], [ 1.401, 43.5756 ], [ 1.4012, 43.5756 ], [ 1.4012, 43.5761 ], [ 1.402, 43.5761 ], [ 1.402, 43.5761 ], [ 1.4025, 43.5761 ], [ 1.4025, 43.5753 ], [ 1.402, 43.5753 ], [ 1.4021, 43.575 ], [ 1.4021, 43.5749 ], [ 1.4022, 43.5748 ], [ 1.4025, 43.5746 ], [ 1.4026, 43.5745 ], [ 1.4028, 43.5743 ], [ 1.4053, 43.5742 ], [ 1.4058, 43.5738 ], [ 1.4082, 43.5717 ], [ 1.4084, 43.5714 ], [ 1.4086, 43.5713 ], [ 1.4087, 43.5709 ], [ 1.4091, 43.5709 ], [ 1.4093, 43.5708 ], [ 1.4098, 43.5707 ], [ 1.41, 43.5706 ], [ 1.4108, 43.5705 ], [ 1.4111, 43.5712 ], [ 1.4113, 43.5716 ], [ 1.4096, 43.5743 ], [ 1.4092, 43.5749 ], [ 1.4079, 43.5772 ], [ 1.4059, 43.58 ], [ 1.4037, 43.5836 ], [ 1.4052, 43.5836 ], [ 1.4061, 43.5842 ], [ 1.4055, 43.5851 ], [ 1.4062, 43.5853 ], [ 1.4067, 43.5844 ], [ 1.4067, 43.5843 ], [ 1.4067, 43.5843 ], [ 1.4062, 43.5841 ], [ 1.4063, 43.5839 ], [ 1.4067, 43.5835 ], [ 1.4074, 43.5838 ], [ 1.4074, 43.584 ], [ 1.4081, 43.5845 ], [ 1.4084, 43.5846 ], [ 1.409, 43.5848 ], [ 1.41, 43.585 ], [ 1.4097, 43.5857 ], [ 1.4097, 43.5857 ], [ 1.4097, 43.5858 ], [ 1.4099, 43.5858 ], [ 1.4114, 43.5864 ], [ 1.4115, 43.5864 ], [ 1.4116, 43.5864 ], [ 1.412, 43.5854 ], [ 1.4128, 43.5855 ], [ 1.4135, 43.5858 ], [ 1.4145, 43.5862 ], [ 1.4162, 43.5851 ], [ 1.4155, 43.5843 ], [ 1.4149, 43.5834 ], [ 1.4154, 43.5833 ], [ 1.4164, 43.583 ], [ 1.4171, 43.5827 ], [ 1.4179, 43.5825 ], [ 1.4183, 43.5824 ] ] ], "type": "Polygon" }, "id": "38", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031007", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Grand Mirail" }, "type": "Feature" }, { "bbox": [ 2.1293, 43.9124, 2.1414, 43.919 ], "geometry": { "coordinates": [ [ [ 2.1316, 43.917 ], [ 2.1331, 43.9166 ], [ 2.1328, 43.9157 ], [ 2.1332, 43.9156 ], [ 2.1333, 43.9155 ], [ 2.1337, 43.9154 ], [ 2.1338, 43.9153 ], [ 2.1339, 43.9153 ], [ 2.1349, 43.915 ], [ 2.135, 43.915 ], [ 2.1358, 43.9147 ], [ 2.1357, 43.9146 ], [ 2.1355, 43.9138 ], [ 2.1354, 43.9137 ], [ 2.1361, 43.9137 ], [ 2.1369, 43.9152 ], [ 2.137, 43.9152 ], [ 2.1372, 43.9154 ], [ 2.1377, 43.9151 ], [ 2.1383, 43.9154 ], [ 2.1377, 43.9158 ], [ 2.1383, 43.9162 ], [ 2.1387, 43.916 ], [ 2.1389, 43.9159 ], [ 2.1387, 43.9157 ], [ 2.1398, 43.9152 ], [ 2.1389, 43.9145 ], [ 2.1387, 43.9144 ], [ 2.1386, 43.9142 ], [ 2.1385, 43.9141 ], [ 2.1397, 43.9139 ], [ 2.1397, 43.9137 ], [ 2.1401, 43.9137 ], [ 2.1406, 43.9136 ], [ 2.1414, 43.9136 ], [ 2.1414, 43.9133 ], [ 2.1414, 43.9131 ], [ 2.1413, 43.9131 ], [ 2.1413, 43.913 ], [ 2.1391, 43.9124 ], [ 2.139, 43.9126 ], [ 2.139, 43.9127 ], [ 2.139, 43.9128 ], [ 2.1391, 43.9128 ], [ 2.1386, 43.9129 ], [ 2.1383, 43.913 ], [ 2.1382, 43.913 ], [ 2.1383, 43.9132 ], [ 2.138, 43.9133 ], [ 2.1379, 43.9132 ], [ 2.1378, 43.9133 ], [ 2.1378, 43.9131 ], [ 2.1373, 43.9132 ], [ 2.1373, 43.9131 ], [ 2.137, 43.9131 ], [ 2.137, 43.913 ], [ 2.1365, 43.9131 ], [ 2.1365, 43.9129 ], [ 2.1362, 43.9129 ], [ 2.1362, 43.913 ], [ 2.136, 43.9131 ], [ 2.1353, 43.9132 ], [ 2.135, 43.9128 ], [ 2.1333, 43.9135 ], [ 2.1332, 43.9136 ], [ 2.1332, 43.9137 ], [ 2.133, 43.9138 ], [ 2.1332, 43.9143 ], [ 2.1332, 43.9143 ], [ 2.1327, 43.9144 ], [ 2.1326, 43.9145 ], [ 2.1326, 43.9145 ], [ 2.1325, 43.9146 ], [ 2.1323, 43.9148 ], [ 2.1324, 43.9148 ], [ 2.1323, 43.9149 ], [ 2.1319, 43.9154 ], [ 2.1316, 43.9157 ], [ 2.1316, 43.916 ], [ 2.1316, 43.916 ], [ 2.1316, 43.9161 ], [ 2.1315, 43.9161 ], [ 2.1313, 43.9161 ], [ 2.1313, 43.916 ], [ 2.1312, 43.916 ], [ 2.131, 43.9159 ], [ 2.1298, 43.9159 ], [ 2.1298, 43.9159 ], [ 2.1296, 43.9159 ], [ 2.1296, 43.9162 ], [ 2.1295, 43.9162 ], [ 2.1293, 43.9167 ], [ 2.1293, 43.9172 ], [ 2.1293, 43.9176 ], [ 2.1294, 43.918 ], [ 2.1296, 43.9184 ], [ 2.1299, 43.9188 ], [ 2.1301, 43.9189 ], [ 2.1302, 43.919 ], [ 2.1307, 43.919 ], [ 2.1307, 43.9187 ], [ 2.1307, 43.9186 ], [ 2.1307, 43.9184 ], [ 2.1308, 43.9183 ], [ 2.1309, 43.9182 ], [ 2.1312, 43.918 ], [ 2.1313, 43.918 ], [ 2.1314, 43.9179 ], [ 2.1315, 43.9178 ], [ 2.1316, 43.9177 ], [ 2.1316, 43.9176 ], [ 2.1316, 43.9174 ], [ 2.1316, 43.9173 ], [ 2.1316, 43.9171 ], [ 2.1315, 43.9171 ], [ 2.1316, 43.917 ] ] ], "type": "Polygon" }, "id": "39", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081007", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Veyrières Rayssac" }, "type": "Feature" }, { "bbox": [ 2.2374, 43.6027, 2.2451, 43.6086 ], "geometry": { "coordinates": [ [ [ 2.2376, 43.6086 ], [ 2.2378, 43.6086 ], [ 2.2378, 43.6086 ], [ 2.2381, 43.6085 ], [ 2.2383, 43.6085 ], [ 2.2382, 43.6081 ], [ 2.2382, 43.608 ], [ 2.2389, 43.6079 ], [ 2.2389, 43.6078 ], [ 2.2388, 43.6076 ], [ 2.2391, 43.6075 ], [ 2.2391, 43.6076 ], [ 2.2393, 43.608 ], [ 2.2394, 43.6083 ], [ 2.2409, 43.6079 ], [ 2.2418, 43.6076 ], [ 2.2417, 43.6074 ], [ 2.2422, 43.6073 ], [ 2.2424, 43.6067 ], [ 2.2425, 43.6065 ], [ 2.2425, 43.6064 ], [ 2.2425, 43.6059 ], [ 2.2424, 43.6056 ], [ 2.2426, 43.6056 ], [ 2.2426, 43.6052 ], [ 2.2425, 43.6048 ], [ 2.2429, 43.6048 ], [ 2.2429, 43.6052 ], [ 2.243, 43.6054 ], [ 2.243, 43.6058 ], [ 2.243, 43.606 ], [ 2.243, 43.6061 ], [ 2.2431, 43.6061 ], [ 2.2431, 43.6063 ], [ 2.2431, 43.6065 ], [ 2.2431, 43.6064 ], [ 2.2433, 43.6064 ], [ 2.2439, 43.6062 ], [ 2.2446, 43.6059 ], [ 2.2449, 43.6058 ], [ 2.2451, 43.6057 ], [ 2.2451, 43.6056 ], [ 2.2451, 43.6055 ], [ 2.2449, 43.6054 ], [ 2.2446, 43.6043 ], [ 2.2447, 43.6043 ], [ 2.2443, 43.6039 ], [ 2.2436, 43.6033 ], [ 2.2435, 43.6032 ], [ 2.2431, 43.603 ], [ 2.2431, 43.6027 ], [ 2.2429, 43.6027 ], [ 2.243, 43.603 ], [ 2.2428, 43.603 ], [ 2.2428, 43.6032 ], [ 2.2429, 43.6033 ], [ 2.2429, 43.6035 ], [ 2.2429, 43.6047 ], [ 2.2425, 43.6047 ], [ 2.2424, 43.604 ], [ 2.2423, 43.604 ], [ 2.2422, 43.604 ], [ 2.242, 43.604 ], [ 2.2419, 43.604 ], [ 2.2414, 43.604 ], [ 2.2407, 43.6042 ], [ 2.2407, 43.6043 ], [ 2.2408, 43.6048 ], [ 2.2409, 43.6051 ], [ 2.2409, 43.6053 ], [ 2.2408, 43.6053 ], [ 2.2405, 43.6055 ], [ 2.2403, 43.6056 ], [ 2.2401, 43.6058 ], [ 2.2393, 43.6059 ], [ 2.2387, 43.6061 ], [ 2.2384, 43.6062 ], [ 2.2388, 43.607 ], [ 2.2389, 43.6073 ], [ 2.2383, 43.6074 ], [ 2.2379, 43.6075 ], [ 2.2374, 43.6077 ], [ 2.2376, 43.6086 ] ] ], "type": "Polygon" }, "id": "40", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081005", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.8545, 43.6049, 3.8625, 43.6078 ], "geometry": { "coordinates": [ [ [ 3.8551, 43.6078 ], [ 3.8559, 43.6075 ], [ 3.8564, 43.6073 ], [ 3.8565, 43.6072 ], [ 3.8568, 43.6071 ], [ 3.8573, 43.6068 ], [ 3.8568, 43.6064 ], [ 3.857, 43.6063 ], [ 3.8574, 43.606 ], [ 3.8576, 43.6059 ], [ 3.8577, 43.6058 ], [ 3.8578, 43.6058 ], [ 3.8579, 43.6058 ], [ 3.8581, 43.6059 ], [ 3.8582, 43.606 ], [ 3.8587, 43.6062 ], [ 3.8596, 43.6067 ], [ 3.8595, 43.6067 ], [ 3.8596, 43.6068 ], [ 3.8598, 43.6068 ], [ 3.8603, 43.6064 ], [ 3.8609, 43.6069 ], [ 3.8612, 43.6071 ], [ 3.8613, 43.6072 ], [ 3.8614, 43.6073 ], [ 3.8616, 43.6071 ], [ 3.8618, 43.6069 ], [ 3.8619, 43.6067 ], [ 3.8619, 43.6066 ], [ 3.8621, 43.6063 ], [ 3.8622, 43.6064 ], [ 3.8625, 43.6059 ], [ 3.8623, 43.6058 ], [ 3.8619, 43.6057 ], [ 3.8615, 43.6056 ], [ 3.8608, 43.6054 ], [ 3.8604, 43.6053 ], [ 3.8601, 43.6052 ], [ 3.8598, 43.6051 ], [ 3.8596, 43.6051 ], [ 3.8592, 43.605 ], [ 3.859, 43.605 ], [ 3.8588, 43.605 ], [ 3.8586, 43.605 ], [ 3.8585, 43.605 ], [ 3.8584, 43.605 ], [ 3.8581, 43.605 ], [ 3.8576, 43.6049 ], [ 3.8573, 43.6049 ], [ 3.8569, 43.6049 ], [ 3.8564, 43.6049 ], [ 3.8561, 43.6049 ], [ 3.8562, 43.6057 ], [ 3.8551, 43.6062 ], [ 3.855, 43.606 ], [ 3.8545, 43.6062 ], [ 3.8554, 43.6073 ], [ 3.855, 43.6075 ], [ 3.8549, 43.6076 ], [ 3.8551, 43.6078 ] ] ], "type": "Polygon" }, "id": "41", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034009", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Gély" }, "type": "Feature" }, { "bbox": [ 4.194, 44.2582, 4.203, 44.2626 ], "geometry": { "coordinates": [ [ [ 4.197, 44.2616 ], [ 4.1971, 44.2617 ], [ 4.197, 44.2617 ], [ 4.1972, 44.2617 ], [ 4.1972, 44.2617 ], [ 4.1969, 44.2619 ], [ 4.1969, 44.2619 ], [ 4.1968, 44.262 ], [ 4.1966, 44.2619 ], [ 4.1965, 44.2618 ], [ 4.1962, 44.2617 ], [ 4.1961, 44.2617 ], [ 4.1959, 44.2616 ], [ 4.1958, 44.2615 ], [ 4.1957, 44.2615 ], [ 4.1957, 44.2614 ], [ 4.1957, 44.2612 ], [ 4.1956, 44.2613 ], [ 4.1956, 44.2613 ], [ 4.1956, 44.2617 ], [ 4.1956, 44.2617 ], [ 4.1956, 44.2618 ], [ 4.1957, 44.262 ], [ 4.196, 44.2619 ], [ 4.1963, 44.2618 ], [ 4.1964, 44.2619 ], [ 4.1968, 44.2625 ], [ 4.197, 44.2626 ], [ 4.1974, 44.2624 ], [ 4.1972, 44.2623 ], [ 4.1974, 44.2622 ], [ 4.1975, 44.262 ], [ 4.1976, 44.262 ], [ 4.1977, 44.2621 ], [ 4.1978, 44.2621 ], [ 4.198, 44.2622 ], [ 4.1983, 44.2622 ], [ 4.1984, 44.2622 ], [ 4.1984, 44.2622 ], [ 4.1985, 44.2621 ], [ 4.1985, 44.262 ], [ 4.1987, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1989, 44.262 ], [ 4.199, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2622 ], [ 4.1992, 44.2623 ], [ 4.1992, 44.2622 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1995, 44.2623 ], [ 4.1995, 44.2623 ], [ 4.1996, 44.2623 ], [ 4.1997, 44.2623 ], [ 4.2, 44.2624 ], [ 4.2001, 44.2624 ], [ 4.2001, 44.2624 ], [ 4.2002, 44.2624 ], [ 4.2002, 44.2624 ], [ 4.2004, 44.2624 ], [ 4.2004, 44.2624 ], [ 4.2006, 44.2625 ], [ 4.2006, 44.2624 ], [ 4.2007, 44.2624 ], [ 4.2007, 44.2625 ], [ 4.2008, 44.2625 ], [ 4.201, 44.2624 ], [ 4.201, 44.2624 ], [ 4.2011, 44.2624 ], [ 4.2012, 44.2623 ], [ 4.2012, 44.2623 ], [ 4.2013, 44.2623 ], [ 4.2017, 44.2623 ], [ 4.2015, 44.2619 ], [ 4.2012, 44.262 ], [ 4.2011, 44.262 ], [ 4.2011, 44.262 ], [ 4.2011, 44.262 ], [ 4.201, 44.2619 ], [ 4.201, 44.2618 ], [ 4.201, 44.2617 ], [ 4.201, 44.2617 ], [ 4.2013, 44.2613 ], [ 4.2013, 44.2613 ], [ 4.2012, 44.2613 ], [ 4.201, 44.2613 ], [ 4.2004, 44.2612 ], [ 4.2001, 44.2612 ], [ 4.2001, 44.2611 ], [ 4.2002, 44.261 ], [ 4.2004, 44.2606 ], [ 4.1999, 44.2605 ], [ 4.2, 44.2603 ], [ 4.2, 44.2602 ], [ 4.2001, 44.2602 ], [ 4.2006, 44.2603 ], [ 4.2007, 44.2601 ], [ 4.2008, 44.2599 ], [ 4.2009, 44.2599 ], [ 4.2016, 44.2594 ], [ 4.2017, 44.2591 ], [ 4.2017, 44.259 ], [ 4.203, 44.2584 ], [ 4.2029, 44.2582 ], [ 4.2026, 44.2582 ], [ 4.202, 44.2582 ], [ 4.202, 44.2584 ], [ 4.2022, 44.2585 ], [ 4.2021, 44.2585 ], [ 4.202, 44.2585 ], [ 4.202, 44.2585 ], [ 4.2019, 44.2585 ], [ 4.2019, 44.2586 ], [ 4.2019, 44.2586 ], [ 4.202, 44.2586 ], [ 4.202, 44.2587 ], [ 4.2014, 44.2587 ], [ 4.2014, 44.2588 ], [ 4.2011, 44.2588 ], [ 4.2011, 44.2587 ], [ 4.201, 44.2586 ], [ 4.2005, 44.2587 ], [ 4.2004, 44.2584 ], [ 4.2, 44.2584 ], [ 4.1996, 44.2584 ], [ 4.1994, 44.2584 ], [ 4.1994, 44.2584 ], [ 4.1993, 44.2584 ], [ 4.1993, 44.2584 ], [ 4.1992, 44.2584 ], [ 4.199, 44.2584 ], [ 4.1988, 44.2584 ], [ 4.1985, 44.2586 ], [ 4.1984, 44.2586 ], [ 4.1985, 44.259 ], [ 4.1984, 44.2591 ], [ 4.1983, 44.2595 ], [ 4.1975, 44.2593 ], [ 4.1968, 44.2592 ], [ 4.1966, 44.2595 ], [ 4.1965, 44.2595 ], [ 4.1965, 44.2595 ], [ 4.1949, 44.2592 ], [ 4.1946, 44.259 ], [ 4.1944, 44.2592 ], [ 4.1943, 44.2593 ], [ 4.1944, 44.2594 ], [ 4.1943, 44.2595 ], [ 4.194, 44.2599 ], [ 4.1943, 44.26 ], [ 4.1943, 44.26 ], [ 4.1944, 44.2603 ], [ 4.1944, 44.2604 ], [ 4.1947, 44.2604 ], [ 4.1947, 44.2604 ], [ 4.1948, 44.2604 ], [ 4.1949, 44.2605 ], [ 4.1948, 44.2606 ], [ 4.1948, 44.2606 ], [ 4.1947, 44.2607 ], [ 4.1945, 44.2608 ], [ 4.1944, 44.2609 ], [ 4.1944, 44.2609 ], [ 4.1944, 44.261 ], [ 4.1946, 44.2612 ], [ 4.1947, 44.2613 ], [ 4.1952, 44.2611 ], [ 4.1952, 44.2611 ], [ 4.1957, 44.2611 ], [ 4.1957, 44.261 ], [ 4.1956, 44.2609 ], [ 4.1957, 44.2608 ], [ 4.1958, 44.2609 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.196, 44.2607 ], [ 4.1961, 44.2607 ], [ 4.196, 44.2607 ], [ 4.1962, 44.2608 ], [ 4.1963, 44.2607 ], [ 4.1963, 44.2607 ], [ 4.1964, 44.2607 ], [ 4.1965, 44.2607 ], [ 4.1966, 44.2607 ], [ 4.1966, 44.2607 ], [ 4.1966, 44.2608 ], [ 4.1967, 44.2608 ], [ 4.1966, 44.2608 ], [ 4.1967, 44.2609 ], [ 4.1968, 44.261 ], [ 4.1968, 44.2611 ], [ 4.1969, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1969, 44.2612 ], [ 4.1969, 44.2613 ], [ 4.1968, 44.2616 ], [ 4.1969, 44.2616 ], [ 4.1968, 44.2617 ], [ 4.1969, 44.2617 ], [ 4.1969, 44.2616 ], [ 4.197, 44.2616 ], [ 4.197, 44.2616 ] ] ], "type": "Polygon" }, "id": "42", "properties": { "code_commune": "30227", "code_departement": "30", "code_qp": "QP030014", "commune_qp": "Saint-Ambroix", "nom_commune": "Saint-Ambroix", "nom_qp": "L'Ecusson" }, "type": "Feature" }, { "bbox": [ 1.3507, 44.0158, 1.3577, 44.0229 ], "geometry": { "coordinates": [ [ [ 1.3511, 44.0207 ], [ 1.3513, 44.0209 ], [ 1.3508, 44.0212 ], [ 1.3511, 44.0214 ], [ 1.3519, 44.021 ], [ 1.3522, 44.0213 ], [ 1.3526, 44.0217 ], [ 1.3529, 44.022 ], [ 1.3531, 44.0223 ], [ 1.3532, 44.0229 ], [ 1.354, 44.0228 ], [ 1.354, 44.0225 ], [ 1.3543, 44.0226 ], [ 1.3543, 44.0224 ], [ 1.3547, 44.0224 ], [ 1.3548, 44.0227 ], [ 1.3555, 44.0225 ], [ 1.3555, 44.0225 ], [ 1.3555, 44.0223 ], [ 1.3572, 44.0224 ], [ 1.3573, 44.0217 ], [ 1.3566, 44.0217 ], [ 1.356, 44.0218 ], [ 1.356, 44.0215 ], [ 1.3561, 44.0215 ], [ 1.3561, 44.0214 ], [ 1.3561, 44.0212 ], [ 1.3561, 44.021 ], [ 1.3559, 44.0206 ], [ 1.3558, 44.0204 ], [ 1.356, 44.0204 ], [ 1.3558, 44.02 ], [ 1.3559, 44.0199 ], [ 1.3558, 44.0198 ], [ 1.3558, 44.0197 ], [ 1.3559, 44.0195 ], [ 1.3561, 44.0194 ], [ 1.3562, 44.0193 ], [ 1.3562, 44.0193 ], [ 1.3565, 44.019 ], [ 1.357, 44.0194 ], [ 1.3577, 44.0189 ], [ 1.3575, 44.0189 ], [ 1.3571, 44.0192 ], [ 1.3568, 44.0189 ], [ 1.3566, 44.019 ], [ 1.3564, 44.019 ], [ 1.3562, 44.0188 ], [ 1.3561, 44.0188 ], [ 1.356, 44.0188 ], [ 1.3559, 44.0186 ], [ 1.3558, 44.0185 ], [ 1.3557, 44.0184 ], [ 1.3561, 44.0183 ], [ 1.3565, 44.0183 ], [ 1.357, 44.018 ], [ 1.3569, 44.0179 ], [ 1.3569, 44.0178 ], [ 1.3568, 44.0172 ], [ 1.3566, 44.0172 ], [ 1.3565, 44.0166 ], [ 1.3563, 44.0159 ], [ 1.3562, 44.0158 ], [ 1.3557, 44.016 ], [ 1.355, 44.0162 ], [ 1.3537, 44.0168 ], [ 1.3529, 44.0173 ], [ 1.3524, 44.0175 ], [ 1.3521, 44.0173 ], [ 1.3518, 44.0171 ], [ 1.3515, 44.0174 ], [ 1.3514, 44.0174 ], [ 1.3513, 44.0175 ], [ 1.3513, 44.0177 ], [ 1.3512, 44.0179 ], [ 1.3515, 44.0181 ], [ 1.3514, 44.0182 ], [ 1.3511, 44.0185 ], [ 1.3511, 44.0186 ], [ 1.351, 44.0187 ], [ 1.3509, 44.0189 ], [ 1.3507, 44.0191 ], [ 1.351, 44.0193 ], [ 1.3514, 44.0195 ], [ 1.3513, 44.0197 ], [ 1.3519, 44.0202 ], [ 1.3516, 44.0204 ], [ 1.3511, 44.0207 ] ] ], "type": "Polygon" }, "id": "43", "properties": { "code_commune": "82121", "code_departement": "82", "code_qp": "QP082001", "commune_qp": "Montauban", "nom_commune": "Montauban", "nom_qp": "Cœur de Ville" }, "type": "Feature" }, { "bbox": [ 1.6033, 42.9636, 1.6111, 42.9686 ], "geometry": { "coordinates": [ [ [ 1.6046, 42.9644 ], [ 1.6043, 42.9644 ], [ 1.6043, 42.9645 ], [ 1.6042, 42.9645 ], [ 1.604, 42.9647 ], [ 1.6039, 42.9649 ], [ 1.6038, 42.965 ], [ 1.6039, 42.965 ], [ 1.6039, 42.965 ], [ 1.604, 42.9651 ], [ 1.6041, 42.9651 ], [ 1.6042, 42.9651 ], [ 1.6042, 42.9651 ], [ 1.6042, 42.965 ], [ 1.6042, 42.965 ], [ 1.6043, 42.9649 ], [ 1.6043, 42.9649 ], [ 1.6044, 42.9648 ], [ 1.6044, 42.9649 ], [ 1.6044, 42.9648 ], [ 1.6044, 42.9649 ], [ 1.6045, 42.9649 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6047, 42.9651 ], [ 1.6047, 42.9651 ], [ 1.6047, 42.9651 ], [ 1.6048, 42.9651 ], [ 1.6048, 42.9651 ], [ 1.6049, 42.9652 ], [ 1.6049, 42.9652 ], [ 1.6049, 42.9653 ], [ 1.605, 42.9653 ], [ 1.605, 42.9653 ], [ 1.6051, 42.9653 ], [ 1.605, 42.9654 ], [ 1.6051, 42.9655 ], [ 1.6051, 42.9656 ], [ 1.6052, 42.9656 ], [ 1.6052, 42.9656 ], [ 1.6052, 42.9657 ], [ 1.6051, 42.9659 ], [ 1.6052, 42.9659 ], [ 1.6052, 42.966 ], [ 1.6052, 42.9662 ], [ 1.6051, 42.9663 ], [ 1.6051, 42.9663 ], [ 1.6051, 42.9664 ], [ 1.6051, 42.9665 ], [ 1.6051, 42.9666 ], [ 1.6051, 42.9666 ], [ 1.605, 42.9666 ], [ 1.6049, 42.9667 ], [ 1.6049, 42.9667 ], [ 1.6049, 42.9667 ], [ 1.6047, 42.9668 ], [ 1.6047, 42.9668 ], [ 1.6047, 42.9668 ], [ 1.6046, 42.9668 ], [ 1.6046, 42.9668 ], [ 1.6045, 42.967 ], [ 1.6044, 42.967 ], [ 1.6043, 42.9669 ], [ 1.6042, 42.9668 ], [ 1.604, 42.9667 ], [ 1.6038, 42.9667 ], [ 1.6035, 42.9668 ], [ 1.6034, 42.9668 ], [ 1.6033, 42.9669 ], [ 1.6035, 42.9671 ], [ 1.6036, 42.9672 ], [ 1.6039, 42.9673 ], [ 1.604, 42.9673 ], [ 1.604, 42.9674 ], [ 1.6041, 42.9674 ], [ 1.6042, 42.9674 ], [ 1.6042, 42.9674 ], [ 1.6043, 42.9674 ], [ 1.6044, 42.9674 ], [ 1.6045, 42.9674 ], [ 1.6044, 42.9671 ], [ 1.6045, 42.967 ], [ 1.6046, 42.9671 ], [ 1.6047, 42.9671 ], [ 1.6049, 42.9672 ], [ 1.6051, 42.9672 ], [ 1.6052, 42.9672 ], [ 1.6052, 42.9671 ], [ 1.6053, 42.9671 ], [ 1.6055, 42.9672 ], [ 1.6056, 42.9671 ], [ 1.6056, 42.967 ], [ 1.6058, 42.9671 ], [ 1.6058, 42.9671 ], [ 1.606, 42.9669 ], [ 1.6061, 42.9667 ], [ 1.6062, 42.9667 ], [ 1.6063, 42.9667 ], [ 1.6069, 42.9667 ], [ 1.6073, 42.9668 ], [ 1.6072, 42.9669 ], [ 1.6073, 42.967 ], [ 1.6075, 42.9669 ], [ 1.6076, 42.9669 ], [ 1.6076, 42.9669 ], [ 1.6078, 42.9668 ], [ 1.6079, 42.9667 ], [ 1.6079, 42.9667 ], [ 1.6081, 42.9666 ], [ 1.6081, 42.9666 ], [ 1.6081, 42.9666 ], [ 1.6082, 42.9665 ], [ 1.6084, 42.9664 ], [ 1.6084, 42.9663 ], [ 1.6085, 42.9664 ], [ 1.6087, 42.9661 ], [ 1.6092, 42.9664 ], [ 1.6092, 42.9664 ], [ 1.6091, 42.9666 ], [ 1.6088, 42.9669 ], [ 1.6086, 42.9671 ], [ 1.6086, 42.9673 ], [ 1.6084, 42.9672 ], [ 1.6083, 42.9672 ], [ 1.6081, 42.9673 ], [ 1.608, 42.9675 ], [ 1.6077, 42.9677 ], [ 1.6077, 42.9677 ], [ 1.6079, 42.9678 ], [ 1.6079, 42.9678 ], [ 1.6081, 42.9679 ], [ 1.6082, 42.9679 ], [ 1.6082, 42.968 ], [ 1.6082, 42.9686 ], [ 1.6084, 42.9686 ], [ 1.6084, 42.9686 ], [ 1.6086, 42.9686 ], [ 1.6086, 42.9682 ], [ 1.6086, 42.968 ], [ 1.6085, 42.9679 ], [ 1.6086, 42.9678 ], [ 1.6086, 42.9678 ], [ 1.6086, 42.9677 ], [ 1.6087, 42.9676 ], [ 1.6094, 42.9668 ], [ 1.6095, 42.9668 ], [ 1.6095, 42.9668 ], [ 1.6097, 42.9665 ], [ 1.6098, 42.9665 ], [ 1.6098, 42.9664 ], [ 1.6098, 42.9664 ], [ 1.6098, 42.9663 ], [ 1.61, 42.9662 ], [ 1.61, 42.9662 ], [ 1.61, 42.9661 ], [ 1.61, 42.9661 ], [ 1.6101, 42.966 ], [ 1.6102, 42.9659 ], [ 1.6104, 42.9658 ], [ 1.6104, 42.9657 ], [ 1.6105, 42.9656 ], [ 1.6106, 42.9655 ], [ 1.6107, 42.9654 ], [ 1.6107, 42.9654 ], [ 1.611, 42.965 ], [ 1.6109, 42.965 ], [ 1.611, 42.9649 ], [ 1.6111, 42.9647 ], [ 1.6109, 42.9646 ], [ 1.6107, 42.9649 ], [ 1.6104, 42.9651 ], [ 1.6102, 42.9653 ], [ 1.61, 42.9655 ], [ 1.6098, 42.9657 ], [ 1.6096, 42.9661 ], [ 1.6095, 42.9662 ], [ 1.6093, 42.9664 ], [ 1.6092, 42.9663 ], [ 1.6088, 42.9661 ], [ 1.6092, 42.9658 ], [ 1.6093, 42.9656 ], [ 1.6095, 42.9654 ], [ 1.6097, 42.9652 ], [ 1.6094, 42.965 ], [ 1.6094, 42.9651 ], [ 1.609, 42.9653 ], [ 1.609, 42.9653 ], [ 1.6089, 42.9651 ], [ 1.6089, 42.9649 ], [ 1.6089, 42.9648 ], [ 1.6089, 42.9648 ], [ 1.6089, 42.9647 ], [ 1.6089, 42.9645 ], [ 1.6089, 42.9643 ], [ 1.6089, 42.9643 ], [ 1.6086, 42.9642 ], [ 1.6086, 42.9641 ], [ 1.6085, 42.964 ], [ 1.6083, 42.964 ], [ 1.6081, 42.964 ], [ 1.6074, 42.9639 ], [ 1.6072, 42.9639 ], [ 1.6068, 42.9638 ], [ 1.6066, 42.9638 ], [ 1.6064, 42.9638 ], [ 1.6058, 42.9637 ], [ 1.6054, 42.9636 ], [ 1.6046, 42.9636 ], [ 1.6046, 42.9641 ], [ 1.6046, 42.9644 ] ] ], "type": "Polygon" }, "id": "44", "properties": { "code_commune": "09122", "code_departement": "09", "code_qp": "QP009002", "commune_qp": "Foix", "nom_commune": "Foix", "nom_qp": "Centre Ancien" }, "type": "Feature" }, { "bbox": [ 2.244, 43.5904, 2.2551, 43.5952 ], "geometry": { "coordinates": [ [ [ 2.244, 43.593 ], [ 2.2441, 43.5931 ], [ 2.2442, 43.5932 ], [ 2.2446, 43.593 ], [ 2.2452, 43.5927 ], [ 2.2458, 43.5925 ], [ 2.2464, 43.5924 ], [ 2.2467, 43.5924 ], [ 2.2471, 43.5924 ], [ 2.2475, 43.5925 ], [ 2.2481, 43.5927 ], [ 2.2483, 43.5927 ], [ 2.2484, 43.5927 ], [ 2.249, 43.5927 ], [ 2.249, 43.5926 ], [ 2.2491, 43.5925 ], [ 2.2496, 43.5925 ], [ 2.2497, 43.5926 ], [ 2.2497, 43.5929 ], [ 2.2499, 43.5931 ], [ 2.2503, 43.5929 ], [ 2.2503, 43.5928 ], [ 2.2505, 43.5927 ], [ 2.2505, 43.5926 ], [ 2.2506, 43.5925 ], [ 2.2501, 43.5921 ], [ 2.2501, 43.592 ], [ 2.2502, 43.5919 ], [ 2.2516, 43.5919 ], [ 2.2517, 43.5919 ], [ 2.2519, 43.5921 ], [ 2.252, 43.5928 ], [ 2.2525, 43.5933 ], [ 2.2523, 43.5934 ], [ 2.2528, 43.5938 ], [ 2.2529, 43.5937 ], [ 2.253, 43.5937 ], [ 2.2533, 43.594 ], [ 2.2536, 43.5943 ], [ 2.2532, 43.5946 ], [ 2.2531, 43.5946 ], [ 2.2531, 43.5947 ], [ 2.2531, 43.5952 ], [ 2.2537, 43.5951 ], [ 2.2539, 43.5951 ], [ 2.2543, 43.5949 ], [ 2.2544, 43.5948 ], [ 2.2546, 43.5947 ], [ 2.2546, 43.5945 ], [ 2.2548, 43.5941 ], [ 2.2551, 43.5934 ], [ 2.2545, 43.5928 ], [ 2.2542, 43.5929 ], [ 2.2542, 43.5928 ], [ 2.2542, 43.5928 ], [ 2.254, 43.5926 ], [ 2.2536, 43.5928 ], [ 2.2533, 43.5926 ], [ 2.2535, 43.5925 ], [ 2.2532, 43.5922 ], [ 2.2528, 43.5924 ], [ 2.2527, 43.5923 ], [ 2.2527, 43.5923 ], [ 2.253, 43.5921 ], [ 2.2531, 43.592 ], [ 2.2533, 43.5919 ], [ 2.2537, 43.5916 ], [ 2.254, 43.5915 ], [ 2.2542, 43.5913 ], [ 2.2542, 43.5913 ], [ 2.2542, 43.5912 ], [ 2.2542, 43.5911 ], [ 2.2534, 43.5907 ], [ 2.2528, 43.5905 ], [ 2.2524, 43.5904 ], [ 2.2521, 43.5906 ], [ 2.2523, 43.5909 ], [ 2.2522, 43.591 ], [ 2.2521, 43.5911 ], [ 2.2518, 43.5908 ], [ 2.2517, 43.5907 ], [ 2.2517, 43.5906 ], [ 2.2509, 43.5907 ], [ 2.2508, 43.5905 ], [ 2.2497, 43.5906 ], [ 2.2497, 43.5907 ], [ 2.2494, 43.5908 ], [ 2.2488, 43.591 ], [ 2.2485, 43.5912 ], [ 2.2483, 43.5913 ], [ 2.2483, 43.5913 ], [ 2.2482, 43.5914 ], [ 2.2482, 43.5916 ], [ 2.248, 43.5916 ], [ 2.2477, 43.5916 ], [ 2.2472, 43.5916 ], [ 2.247, 43.5916 ], [ 2.247, 43.5915 ], [ 2.2468, 43.5913 ], [ 2.2464, 43.5914 ], [ 2.2464, 43.5914 ], [ 2.2457, 43.5916 ], [ 2.2458, 43.5917 ], [ 2.2452, 43.5918 ], [ 2.2448, 43.5919 ], [ 2.2447, 43.5919 ], [ 2.2446, 43.5918 ], [ 2.2443, 43.5919 ], [ 2.2442, 43.592 ], [ 2.2441, 43.5921 ], [ 2.244, 43.5923 ], [ 2.244, 43.5924 ], [ 2.244, 43.5927 ], [ 2.244, 43.593 ] ] ], "type": "Polygon" }, "id": "45", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081003", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Lameilhé" }, "type": "Feature" }, { "bbox": [ 1.4792, 43.5738, 1.4848, 43.5778 ], "geometry": { "coordinates": [ [ [ 1.4801, 43.5777 ], [ 1.4802, 43.5778 ], [ 1.4804, 43.5778 ], [ 1.4815, 43.5772 ], [ 1.4816, 43.5772 ], [ 1.4818, 43.5772 ], [ 1.4818, 43.5772 ], [ 1.482, 43.5771 ], [ 1.482, 43.5771 ], [ 1.4821, 43.5769 ], [ 1.4822, 43.5769 ], [ 1.4822, 43.5768 ], [ 1.4827, 43.5765 ], [ 1.483, 43.5764 ], [ 1.4833, 43.5764 ], [ 1.4834, 43.5764 ], [ 1.4838, 43.5761 ], [ 1.484, 43.576 ], [ 1.4842, 43.5758 ], [ 1.4844, 43.5757 ], [ 1.4845, 43.5756 ], [ 1.4846, 43.5754 ], [ 1.4846, 43.5754 ], [ 1.4847, 43.5753 ], [ 1.4848, 43.5753 ], [ 1.4848, 43.5753 ], [ 1.4845, 43.5751 ], [ 1.4843, 43.575 ], [ 1.4841, 43.5749 ], [ 1.4843, 43.5748 ], [ 1.4836, 43.5747 ], [ 1.4837, 43.5744 ], [ 1.4837, 43.5744 ], [ 1.4838, 43.574 ], [ 1.4838, 43.5739 ], [ 1.4839, 43.5738 ], [ 1.4837, 43.5738 ], [ 1.4835, 43.5738 ], [ 1.4835, 43.5738 ], [ 1.4833, 43.5738 ], [ 1.4819, 43.5747 ], [ 1.4818, 43.5748 ], [ 1.4817, 43.5749 ], [ 1.4816, 43.5749 ], [ 1.4814, 43.575 ], [ 1.4812, 43.5751 ], [ 1.4802, 43.5756 ], [ 1.4794, 43.576 ], [ 1.4793, 43.5761 ], [ 1.4792, 43.5763 ], [ 1.4792, 43.5763 ], [ 1.4792, 43.5764 ], [ 1.4793, 43.5768 ], [ 1.4794, 43.5772 ], [ 1.4798, 43.5778 ], [ 1.4798, 43.5778 ], [ 1.4801, 43.5777 ] ] ], "type": "Polygon" }, "id": "46", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031013", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Saint Exupéry" }, "type": "Feature" }, { "bbox": [ 1.073, 44.0999, 1.0904, 44.1069 ], "geometry": { "coordinates": [ [ [ 1.0777, 44.102 ], [ 1.0779, 44.1021 ], [ 1.078, 44.1022 ], [ 1.0784, 44.1024 ], [ 1.0787, 44.1025 ], [ 1.0796, 44.1028 ], [ 1.0807, 44.1032 ], [ 1.0818, 44.1036 ], [ 1.0818, 44.1037 ], [ 1.0819, 44.1037 ], [ 1.082, 44.1038 ], [ 1.0821, 44.1037 ], [ 1.0826, 44.1039 ], [ 1.0832, 44.1043 ], [ 1.0837, 44.1045 ], [ 1.0838, 44.1047 ], [ 1.0838, 44.1047 ], [ 1.0838, 44.1051 ], [ 1.0838, 44.1054 ], [ 1.0839, 44.1062 ], [ 1.084, 44.1065 ], [ 1.0844, 44.1065 ], [ 1.0844, 44.1066 ], [ 1.0844, 44.1067 ], [ 1.0846, 44.1068 ], [ 1.0847, 44.1068 ], [ 1.0849, 44.1068 ], [ 1.0851, 44.1068 ], [ 1.0853, 44.1068 ], [ 1.0854, 44.1068 ], [ 1.0858, 44.1069 ], [ 1.086, 44.1068 ], [ 1.0862, 44.1068 ], [ 1.0871, 44.1068 ], [ 1.0871, 44.1067 ], [ 1.0871, 44.1065 ], [ 1.0871, 44.1063 ], [ 1.0874, 44.1063 ], [ 1.0874, 44.1063 ], [ 1.0901, 44.1063 ], [ 1.0901, 44.1061 ], [ 1.0902, 44.106 ], [ 1.0901, 44.106 ], [ 1.0901, 44.1059 ], [ 1.0902, 44.106 ], [ 1.0902, 44.1059 ], [ 1.0902, 44.1059 ], [ 1.0902, 44.1058 ], [ 1.0903, 44.1057 ], [ 1.0902, 44.1057 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1055 ], [ 1.0902, 44.1055 ], [ 1.0902, 44.1055 ], [ 1.0904, 44.1055 ], [ 1.0904, 44.1054 ], [ 1.0903, 44.1052 ], [ 1.0902, 44.1053 ], [ 1.0899, 44.1053 ], [ 1.0893, 44.1054 ], [ 1.0895, 44.1053 ], [ 1.0897, 44.105 ], [ 1.0888, 44.1045 ], [ 1.0884, 44.1044 ], [ 1.0885, 44.1042 ], [ 1.0887, 44.1041 ], [ 1.0886, 44.1041 ], [ 1.0883, 44.1039 ], [ 1.088, 44.1039 ], [ 1.0879, 44.1039 ], [ 1.0879, 44.1039 ], [ 1.0878, 44.1037 ], [ 1.0877, 44.1036 ], [ 1.0875, 44.1035 ], [ 1.0879, 44.1034 ], [ 1.0878, 44.1029 ], [ 1.0872, 44.1031 ], [ 1.0871, 44.1032 ], [ 1.0869, 44.1029 ], [ 1.0868, 44.1028 ], [ 1.0867, 44.1026 ], [ 1.0865, 44.1024 ], [ 1.0864, 44.1023 ], [ 1.0863, 44.1022 ], [ 1.086, 44.1021 ], [ 1.0855, 44.102 ], [ 1.0853, 44.102 ], [ 1.0852, 44.1018 ], [ 1.0851, 44.1016 ], [ 1.085, 44.1015 ], [ 1.0847, 44.1009 ], [ 1.0844, 44.1004 ], [ 1.0844, 44.1003 ], [ 1.0841, 44.1 ], [ 1.084, 44.1 ], [ 1.0838, 44.1 ], [ 1.0837, 44.1 ], [ 1.0835, 44.1 ], [ 1.0835, 44.1 ], [ 1.0833, 44.1 ], [ 1.083, 44.0999 ], [ 1.0823, 44.1 ], [ 1.0818, 44.1 ], [ 1.0817, 44.1 ], [ 1.0814, 44.1001 ], [ 1.0811, 44.1002 ], [ 1.0799, 44.1004 ], [ 1.0788, 44.1006 ], [ 1.0786, 44.1006 ], [ 1.0782, 44.1006 ], [ 1.0781, 44.1007 ], [ 1.078, 44.1005 ], [ 1.0778, 44.0999 ], [ 1.0771, 44.1 ], [ 1.0751, 44.1 ], [ 1.0747, 44.1001 ], [ 1.0738, 44.1002 ], [ 1.0731, 44.1001 ], [ 1.0732, 44.1005 ], [ 1.0731, 44.1008 ], [ 1.073, 44.1014 ], [ 1.0742, 44.1016 ], [ 1.0745, 44.1015 ], [ 1.0746, 44.1015 ], [ 1.0747, 44.1015 ], [ 1.0747, 44.1014 ], [ 1.0751, 44.1014 ], [ 1.0754, 44.1014 ], [ 1.0757, 44.1014 ], [ 1.0766, 44.1013 ], [ 1.0769, 44.1013 ], [ 1.0771, 44.1013 ], [ 1.0774, 44.1014 ], [ 1.0775, 44.1015 ], [ 1.0776, 44.1019 ], [ 1.0777, 44.102 ] ] ], "type": "Polygon" }, "id": "47", "properties": { "code_commune": "82112", "code_departement": "82", "code_qp": "QP082003", "commune_qp": "Moissac", "nom_commune": "Moissac", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.4487, 44.4585, 1.4596, 44.4672 ], "geometry": { "coordinates": [ [ [ 1.4509, 44.4638 ], [ 1.4503, 44.4641 ], [ 1.4506, 44.4645 ], [ 1.4512, 44.4652 ], [ 1.452, 44.4648 ], [ 1.4514, 44.4643 ], [ 1.4521, 44.464 ], [ 1.4524, 44.4639 ], [ 1.4525, 44.4638 ], [ 1.4529, 44.4637 ], [ 1.4537, 44.4633 ], [ 1.4543, 44.4639 ], [ 1.4545, 44.4638 ], [ 1.4553, 44.4633 ], [ 1.4554, 44.4633 ], [ 1.4555, 44.4632 ], [ 1.4558, 44.4632 ], [ 1.4559, 44.4633 ], [ 1.4559, 44.4634 ], [ 1.456, 44.4635 ], [ 1.456, 44.4635 ], [ 1.4559, 44.4635 ], [ 1.4558, 44.4635 ], [ 1.4556, 44.4635 ], [ 1.4562, 44.464 ], [ 1.4565, 44.4642 ], [ 1.4568, 44.4645 ], [ 1.4567, 44.4646 ], [ 1.4565, 44.4647 ], [ 1.4566, 44.4648 ], [ 1.4566, 44.4651 ], [ 1.4568, 44.4653 ], [ 1.457, 44.4654 ], [ 1.4576, 44.4654 ], [ 1.4578, 44.4653 ], [ 1.458, 44.4658 ], [ 1.458, 44.4661 ], [ 1.4581, 44.4663 ], [ 1.4583, 44.4665 ], [ 1.4577, 44.4668 ], [ 1.458, 44.467 ], [ 1.4581, 44.4672 ], [ 1.4589, 44.4671 ], [ 1.459, 44.4671 ], [ 1.4589, 44.4667 ], [ 1.4589, 44.4667 ], [ 1.4591, 44.4667 ], [ 1.4592, 44.4667 ], [ 1.4593, 44.4666 ], [ 1.4593, 44.4666 ], [ 1.4594, 44.4666 ], [ 1.4596, 44.4666 ], [ 1.4596, 44.4664 ], [ 1.4596, 44.4662 ], [ 1.4595, 44.466 ], [ 1.4594, 44.4654 ], [ 1.4594, 44.4653 ], [ 1.459, 44.4653 ], [ 1.4589, 44.4651 ], [ 1.4589, 44.4651 ], [ 1.4585, 44.4651 ], [ 1.4584, 44.4648 ], [ 1.4584, 44.4646 ], [ 1.4584, 44.4644 ], [ 1.4584, 44.4642 ], [ 1.4584, 44.464 ], [ 1.4585, 44.4639 ], [ 1.4585, 44.4638 ], [ 1.4586, 44.4637 ], [ 1.4586, 44.4636 ], [ 1.4583, 44.4633 ], [ 1.457, 44.4622 ], [ 1.4559, 44.4614 ], [ 1.4552, 44.4608 ], [ 1.4547, 44.4604 ], [ 1.4541, 44.4607 ], [ 1.4537, 44.4608 ], [ 1.4535, 44.461 ], [ 1.4531, 44.4611 ], [ 1.4529, 44.4612 ], [ 1.4529, 44.4612 ], [ 1.4521, 44.4613 ], [ 1.4521, 44.4614 ], [ 1.452, 44.4614 ], [ 1.4519, 44.4611 ], [ 1.4518, 44.461 ], [ 1.4518, 44.4609 ], [ 1.4517, 44.4609 ], [ 1.4522, 44.4607 ], [ 1.4526, 44.4606 ], [ 1.4533, 44.4603 ], [ 1.4531, 44.46 ], [ 1.4518, 44.4605 ], [ 1.4515, 44.4607 ], [ 1.4514, 44.4607 ], [ 1.4512, 44.4608 ], [ 1.4509, 44.4609 ], [ 1.4507, 44.4605 ], [ 1.4505, 44.4601 ], [ 1.4503, 44.46 ], [ 1.4501, 44.4597 ], [ 1.4497, 44.4593 ], [ 1.4491, 44.4586 ], [ 1.4489, 44.4585 ], [ 1.4488, 44.4587 ], [ 1.4487, 44.4588 ], [ 1.4487, 44.4589 ], [ 1.4488, 44.459 ], [ 1.4489, 44.4595 ], [ 1.449, 44.4595 ], [ 1.4494, 44.46 ], [ 1.4489, 44.4601 ], [ 1.4491, 44.4603 ], [ 1.4493, 44.4607 ], [ 1.4496, 44.4611 ], [ 1.4498, 44.4615 ], [ 1.4499, 44.4619 ], [ 1.4502, 44.4628 ], [ 1.4502, 44.463 ], [ 1.4503, 44.4631 ], [ 1.4508, 44.4637 ], [ 1.4509, 44.4638 ] ] ], "type": "Polygon" }, "id": "48", "properties": { "code_commune": "46042", "code_departement": "46", "code_qp": "QP046001", "commune_qp": "Cahors", "nom_commune": "Cahors", "nom_qp": "Terre Rouge" }, "type": "Feature" }, { "bbox": [ 2.3371, 43.2234, 2.3456, 43.2272 ], "geometry": { "coordinates": [ [ [ 2.3455, 43.2244 ], [ 2.3456, 43.2242 ], [ 2.3456, 43.2241 ], [ 2.3455, 43.224 ], [ 2.3454, 43.224 ], [ 2.3452, 43.224 ], [ 2.3451, 43.224 ], [ 2.3447, 43.224 ], [ 2.3447, 43.224 ], [ 2.3448, 43.2238 ], [ 2.3441, 43.2236 ], [ 2.3439, 43.2235 ], [ 2.3437, 43.2235 ], [ 2.3432, 43.2234 ], [ 2.3432, 43.2236 ], [ 2.344, 43.2239 ], [ 2.3443, 43.224 ], [ 2.3443, 43.2243 ], [ 2.3443, 43.2243 ], [ 2.3442, 43.2247 ], [ 2.3441, 43.2247 ], [ 2.3439, 43.2253 ], [ 2.3438, 43.2253 ], [ 2.3428, 43.2252 ], [ 2.3428, 43.2252 ], [ 2.3428, 43.2251 ], [ 2.3427, 43.2251 ], [ 2.3425, 43.2251 ], [ 2.3424, 43.2251 ], [ 2.3419, 43.225 ], [ 2.3419, 43.225 ], [ 2.3418, 43.225 ], [ 2.3416, 43.225 ], [ 2.3411, 43.2249 ], [ 2.3409, 43.2248 ], [ 2.3405, 43.2247 ], [ 2.3399, 43.2246 ], [ 2.3398, 43.2246 ], [ 2.3396, 43.2245 ], [ 2.3394, 43.2246 ], [ 2.3391, 43.2245 ], [ 2.3391, 43.2246 ], [ 2.339, 43.2248 ], [ 2.339, 43.2251 ], [ 2.3389, 43.2252 ], [ 2.3389, 43.2252 ], [ 2.3388, 43.2253 ], [ 2.3388, 43.2253 ], [ 2.3385, 43.2257 ], [ 2.3384, 43.2258 ], [ 2.3381, 43.2261 ], [ 2.338, 43.2261 ], [ 2.3376, 43.2265 ], [ 2.3374, 43.2266 ], [ 2.3372, 43.2269 ], [ 2.3371, 43.2271 ], [ 2.3372, 43.2271 ], [ 2.3382, 43.2272 ], [ 2.3383, 43.2269 ], [ 2.3393, 43.2269 ], [ 2.3396, 43.2269 ], [ 2.3401, 43.2269 ], [ 2.3403, 43.2269 ], [ 2.3407, 43.2269 ], [ 2.3411, 43.2268 ], [ 2.3419, 43.2266 ], [ 2.3425, 43.2265 ], [ 2.3429, 43.2264 ], [ 2.3433, 43.2263 ], [ 2.3438, 43.2262 ], [ 2.344, 43.2262 ], [ 2.3449, 43.2263 ], [ 2.345, 43.2263 ], [ 2.345, 43.2258 ], [ 2.345, 43.2255 ], [ 2.3451, 43.2251 ], [ 2.3451, 43.225 ], [ 2.3452, 43.2249 ], [ 2.3455, 43.2244 ] ] ], "type": "Polygon" }, "id": "49", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011005", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Fleming La Reille" }, "type": "Feature" }, { "bbox": [ 2.0317, 44.3495, 2.0405, 44.3571 ], "geometry": { "coordinates": [ [ [ 2.0348, 44.3523 ], [ 2.0343, 44.3523 ], [ 2.0345, 44.3527 ], [ 2.0347, 44.3531 ], [ 2.0346, 44.3532 ], [ 2.0349, 44.3534 ], [ 2.035, 44.3534 ], [ 2.0352, 44.3535 ], [ 2.0354, 44.3536 ], [ 2.0357, 44.3537 ], [ 2.0363, 44.3538 ], [ 2.0368, 44.3539 ], [ 2.0368, 44.3539 ], [ 2.0374, 44.354 ], [ 2.0377, 44.354 ], [ 2.0379, 44.3541 ], [ 2.0378, 44.3542 ], [ 2.0374, 44.3542 ], [ 2.0372, 44.3543 ], [ 2.037, 44.3546 ], [ 2.0368, 44.3548 ], [ 2.0367, 44.355 ], [ 2.0365, 44.3552 ], [ 2.0364, 44.3555 ], [ 2.0361, 44.3554 ], [ 2.036, 44.3554 ], [ 2.0357, 44.3554 ], [ 2.0352, 44.3556 ], [ 2.0348, 44.355 ], [ 2.0337, 44.3554 ], [ 2.0331, 44.3555 ], [ 2.0329, 44.3556 ], [ 2.0323, 44.3555 ], [ 2.0321, 44.3559 ], [ 2.0319, 44.3561 ], [ 2.0319, 44.3561 ], [ 2.032, 44.3562 ], [ 2.0318, 44.3564 ], [ 2.0317, 44.3566 ], [ 2.0319, 44.3568 ], [ 2.0326, 44.3566 ], [ 2.0327, 44.3565 ], [ 2.0327, 44.3566 ], [ 2.0329, 44.3571 ], [ 2.0331, 44.3571 ], [ 2.0332, 44.3569 ], [ 2.0334, 44.3569 ], [ 2.0336, 44.357 ], [ 2.0337, 44.3568 ], [ 2.0338, 44.3566 ], [ 2.0341, 44.3566 ], [ 2.0339, 44.3563 ], [ 2.034, 44.3562 ], [ 2.0346, 44.356 ], [ 2.0348, 44.3558 ], [ 2.0351, 44.3558 ], [ 2.0352, 44.3558 ], [ 2.0357, 44.356 ], [ 2.036, 44.3557 ], [ 2.0362, 44.3558 ], [ 2.0365, 44.356 ], [ 2.0364, 44.3561 ], [ 2.0363, 44.3564 ], [ 2.0373, 44.3567 ], [ 2.0375, 44.3563 ], [ 2.0373, 44.3557 ], [ 2.038, 44.3555 ], [ 2.0379, 44.3554 ], [ 2.0377, 44.3551 ], [ 2.0375, 44.355 ], [ 2.038, 44.3548 ], [ 2.0379, 44.3545 ], [ 2.038, 44.3545 ], [ 2.0379, 44.3544 ], [ 2.0381, 44.3543 ], [ 2.0382, 44.3544 ], [ 2.0385, 44.3544 ], [ 2.0387, 44.3544 ], [ 2.0387, 44.3544 ], [ 2.0387, 44.354 ], [ 2.0387, 44.3539 ], [ 2.0388, 44.3536 ], [ 2.0391, 44.353 ], [ 2.0394, 44.3526 ], [ 2.0396, 44.3522 ], [ 2.04, 44.3517 ], [ 2.0404, 44.3513 ], [ 2.0404, 44.3512 ], [ 2.0405, 44.3509 ], [ 2.0404, 44.3508 ], [ 2.0401, 44.3507 ], [ 2.0397, 44.3503 ], [ 2.0395, 44.3501 ], [ 2.0394, 44.35 ], [ 2.0385, 44.3498 ], [ 2.0381, 44.3497 ], [ 2.0378, 44.3497 ], [ 2.0371, 44.3495 ], [ 2.0365, 44.3495 ], [ 2.0362, 44.35 ], [ 2.0361, 44.35 ], [ 2.0365, 44.35 ], [ 2.0366, 44.3501 ], [ 2.0367, 44.3502 ], [ 2.0367, 44.3505 ], [ 2.0367, 44.3506 ], [ 2.0368, 44.3509 ], [ 2.0369, 44.3511 ], [ 2.0363, 44.3513 ], [ 2.0351, 44.3519 ], [ 2.0348, 44.3521 ], [ 2.0348, 44.3521 ], [ 2.0348, 44.3522 ], [ 2.0348, 44.3523 ] ] ], "type": "Polygon" }, "id": "50", "properties": { "code_commune": "12300", "code_departement": "12", "code_qp": "QP012002", "commune_qp": "Villefranche-de-Rouergue", "nom_commune": "Villefranche-de-Rouergue", "nom_qp": "La Bastide" }, "type": "Feature" }, { "bbox": [ 1.3795, 43.6375, 1.3879, 43.6403 ], "geometry": { "coordinates": [ [ [ 1.3819, 43.6376 ], [ 1.3815, 43.6377 ], [ 1.381, 43.6379 ], [ 1.3807, 43.638 ], [ 1.3804, 43.6381 ], [ 1.3801, 43.6382 ], [ 1.38, 43.6383 ], [ 1.3795, 43.6385 ], [ 1.3801, 43.6394 ], [ 1.3801, 43.6394 ], [ 1.3799, 43.6394 ], [ 1.38, 43.6395 ], [ 1.3804, 43.6396 ], [ 1.3805, 43.6396 ], [ 1.3806, 43.6393 ], [ 1.3807, 43.6393 ], [ 1.3808, 43.6395 ], [ 1.381, 43.6399 ], [ 1.3815, 43.6399 ], [ 1.3815, 43.6398 ], [ 1.3816, 43.6397 ], [ 1.3819, 43.6398 ], [ 1.3819, 43.6398 ], [ 1.3826, 43.6397 ], [ 1.3828, 43.6398 ], [ 1.3829, 43.6395 ], [ 1.3853, 43.6397 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6402 ], [ 1.3853, 43.6402 ], [ 1.3859, 43.6403 ], [ 1.3862, 43.6403 ], [ 1.3863, 43.6403 ], [ 1.3865, 43.6401 ], [ 1.3867, 43.6399 ], [ 1.387, 43.6397 ], [ 1.387, 43.6397 ], [ 1.3872, 43.6398 ], [ 1.3879, 43.6392 ], [ 1.3866, 43.639 ], [ 1.3857, 43.6389 ], [ 1.3856, 43.6389 ], [ 1.3856, 43.6389 ], [ 1.3856, 43.639 ], [ 1.3855, 43.639 ], [ 1.3854, 43.6391 ], [ 1.3853, 43.639 ], [ 1.3831, 43.6389 ], [ 1.3836, 43.6376 ], [ 1.3835, 43.6375 ], [ 1.3833, 43.6375 ], [ 1.383, 43.6375 ], [ 1.3824, 43.6376 ], [ 1.3819, 43.6376 ] ] ], "type": "Polygon" }, "id": "51", "properties": { "code_commune": "31069", "code_departement": "31", "code_qp": "QP031004", "commune_qp": "Blagnac", "nom_commune": "Blagnac", "nom_qp": "Barradels" }, "type": "Feature" }, { "bbox": [ 1.4736, 43.608, 1.4801, 43.6149 ], "geometry": { "coordinates": [ [ [ 1.4736, 43.6126 ], [ 1.4753, 43.6133 ], [ 1.4758, 43.6136 ], [ 1.4761, 43.6138 ], [ 1.4764, 43.6135 ], [ 1.478, 43.6143 ], [ 1.4792, 43.6149 ], [ 1.4799, 43.6142 ], [ 1.48, 43.6142 ], [ 1.4801, 43.614 ], [ 1.4785, 43.6132 ], [ 1.478, 43.6129 ], [ 1.4774, 43.6126 ], [ 1.4773, 43.6123 ], [ 1.4772, 43.612 ], [ 1.4776, 43.6116 ], [ 1.4786, 43.6106 ], [ 1.4791, 43.6101 ], [ 1.4779, 43.6096 ], [ 1.4774, 43.6093 ], [ 1.4781, 43.6086 ], [ 1.4767, 43.608 ], [ 1.4762, 43.6086 ], [ 1.476, 43.6087 ], [ 1.4759, 43.6088 ], [ 1.4753, 43.6095 ], [ 1.4753, 43.6095 ], [ 1.4753, 43.6096 ], [ 1.4753, 43.6096 ], [ 1.4755, 43.6097 ], [ 1.4769, 43.6104 ], [ 1.4762, 43.6112 ], [ 1.4767, 43.6114 ], [ 1.4774, 43.6117 ], [ 1.4771, 43.612 ], [ 1.4772, 43.6125 ], [ 1.4771, 43.6125 ], [ 1.4767, 43.6123 ], [ 1.476, 43.6119 ], [ 1.4756, 43.6117 ], [ 1.4754, 43.6116 ], [ 1.4748, 43.6122 ], [ 1.4742, 43.6119 ], [ 1.4736, 43.6126 ] ] ], "type": "Polygon" }, "id": "52", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031014", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Soupetard" }, "type": "Feature" }, { "bbox": [ 2.8921, 42.6847, 2.8956, 42.6892 ], "geometry": { "coordinates": [ [ [ 2.8956, 42.6868 ], [ 2.8955, 42.6868 ], [ 2.8954, 42.6866 ], [ 2.8955, 42.6867 ], [ 2.8948, 42.6861 ], [ 2.8946, 42.6859 ], [ 2.8945, 42.6858 ], [ 2.8945, 42.6857 ], [ 2.8944, 42.6857 ], [ 2.8944, 42.6855 ], [ 2.8943, 42.6852 ], [ 2.8947, 42.6852 ], [ 2.8946, 42.6852 ], [ 2.8945, 42.685 ], [ 2.8943, 42.6847 ], [ 2.8939, 42.6848 ], [ 2.8935, 42.685 ], [ 2.8933, 42.6851 ], [ 2.8933, 42.6853 ], [ 2.8933, 42.6854 ], [ 2.8934, 42.6858 ], [ 2.8929, 42.6858 ], [ 2.8928, 42.6858 ], [ 2.8923, 42.6858 ], [ 2.8921, 42.6859 ], [ 2.8922, 42.686 ], [ 2.8922, 42.6867 ], [ 2.8923, 42.6867 ], [ 2.8923, 42.6868 ], [ 2.8923, 42.6871 ], [ 2.8924, 42.6873 ], [ 2.8925, 42.6876 ], [ 2.8927, 42.6881 ], [ 2.8928, 42.688 ], [ 2.8928, 42.688 ], [ 2.8928, 42.6881 ], [ 2.8928, 42.6883 ], [ 2.893, 42.6886 ], [ 2.893, 42.6887 ], [ 2.8931, 42.6889 ], [ 2.8931, 42.6889 ], [ 2.8932, 42.6891 ], [ 2.8932, 42.6892 ], [ 2.8935, 42.689 ], [ 2.8936, 42.6889 ], [ 2.8937, 42.6889 ], [ 2.8937, 42.6888 ], [ 2.8937, 42.6888 ], [ 2.8947, 42.6881 ], [ 2.895, 42.6878 ], [ 2.8951, 42.6878 ], [ 2.8954, 42.6873 ], [ 2.8956, 42.6869 ], [ 2.8956, 42.6868 ] ] ], "type": "Polygon" }, "id": "53", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066006", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Rois De Majorque" }, "type": "Feature" }, { "bbox": [ 2.892, 42.7241, 2.9024, 42.729 ], "geometry": { "coordinates": [ [ [ 2.8942, 42.7246 ], [ 2.8936, 42.7241 ], [ 2.8931, 42.7245 ], [ 2.8923, 42.7251 ], [ 2.8923, 42.7251 ], [ 2.892, 42.7253 ], [ 2.8932, 42.7264 ], [ 2.8945, 42.7275 ], [ 2.8949, 42.7278 ], [ 2.8952, 42.728 ], [ 2.896, 42.7285 ], [ 2.8964, 42.7288 ], [ 2.897, 42.7283 ], [ 2.897, 42.7284 ], [ 2.8975, 42.7287 ], [ 2.8977, 42.7289 ], [ 2.8979, 42.729 ], [ 2.8991, 42.7281 ], [ 2.8993, 42.728 ], [ 2.8994, 42.7281 ], [ 2.8996, 42.7279 ], [ 2.8999, 42.7278 ], [ 2.9001, 42.7276 ], [ 2.9003, 42.7279 ], [ 2.9004, 42.7279 ], [ 2.9007, 42.7282 ], [ 2.9007, 42.7282 ], [ 2.9011, 42.7286 ], [ 2.9018, 42.7281 ], [ 2.9019, 42.728 ], [ 2.9021, 42.7278 ], [ 2.9022, 42.7277 ], [ 2.9023, 42.7274 ], [ 2.9024, 42.7273 ], [ 2.9008, 42.7271 ], [ 2.9007, 42.7271 ], [ 2.9, 42.727 ], [ 2.8999, 42.7269 ], [ 2.8997, 42.7269 ], [ 2.8983, 42.7267 ], [ 2.8983, 42.7266 ], [ 2.8988, 42.7262 ], [ 2.8985, 42.726 ], [ 2.8982, 42.7258 ], [ 2.8981, 42.7257 ], [ 2.8979, 42.7256 ], [ 2.8979, 42.7255 ], [ 2.8978, 42.7255 ], [ 2.8977, 42.7255 ], [ 2.8977, 42.7255 ], [ 2.8975, 42.7255 ], [ 2.8974, 42.7254 ], [ 2.8974, 42.7254 ], [ 2.8972, 42.7253 ], [ 2.8971, 42.7253 ], [ 2.897, 42.7254 ], [ 2.8969, 42.7255 ], [ 2.8965, 42.7257 ], [ 2.8963, 42.7259 ], [ 2.8962, 42.7258 ], [ 2.896, 42.726 ], [ 2.8953, 42.7255 ], [ 2.8953, 42.7255 ], [ 2.8942, 42.7246 ] ] ], "type": "Polygon" }, "id": "54", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066009", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Nouveau Logis" }, "type": "Feature" }, { "bbox": [ 3.8654, 43.6347, 3.8703, 43.6395 ], "geometry": { "coordinates": [ [ [ 3.8667, 43.635 ], [ 3.8668, 43.635 ], [ 3.8666, 43.6353 ], [ 3.8659, 43.6351 ], [ 3.8657, 43.6357 ], [ 3.8663, 43.6358 ], [ 3.8664, 43.6359 ], [ 3.8659, 43.6363 ], [ 3.8654, 43.6367 ], [ 3.8659, 43.6369 ], [ 3.8662, 43.637 ], [ 3.8667, 43.6373 ], [ 3.8665, 43.6375 ], [ 3.8671, 43.6378 ], [ 3.8673, 43.6383 ], [ 3.8686, 43.6389 ], [ 3.8691, 43.6391 ], [ 3.87, 43.6395 ], [ 3.8695, 43.6389 ], [ 3.869, 43.6384 ], [ 3.869, 43.6383 ], [ 3.8693, 43.6381 ], [ 3.8694, 43.6379 ], [ 3.8697, 43.638 ], [ 3.8699, 43.6381 ], [ 3.8699, 43.6381 ], [ 3.8699, 43.6379 ], [ 3.8697, 43.6378 ], [ 3.8701, 43.6377 ], [ 3.8703, 43.6376 ], [ 3.8703, 43.6372 ], [ 3.8696, 43.6364 ], [ 3.8687, 43.6364 ], [ 3.8684, 43.6358 ], [ 3.8683, 43.6357 ], [ 3.8682, 43.6355 ], [ 3.8682, 43.6352 ], [ 3.8682, 43.6349 ], [ 3.8681, 43.6348 ], [ 3.8679, 43.6347 ], [ 3.8676, 43.6347 ], [ 3.867, 43.6347 ], [ 3.8668, 43.6347 ], [ 3.8667, 43.6349 ], [ 3.8667, 43.6349 ], [ 3.8667, 43.635 ] ] ], "type": "Polygon" }, "id": "55", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034015", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Vert-Bois" }, "type": "Feature" }, { "bbox": [ 1.3685, 44.0085, 1.3867, 44.0176 ], "geometry": { "coordinates": [ [ [ 1.3867, 44.0146 ], [ 1.3866, 44.0144 ], [ 1.3861, 44.0143 ], [ 1.3849, 44.0141 ], [ 1.3845, 44.014 ], [ 1.3838, 44.0139 ], [ 1.3848, 44.0127 ], [ 1.3842, 44.0122 ], [ 1.3836, 44.0117 ], [ 1.3827, 44.011 ], [ 1.3832, 44.0107 ], [ 1.384, 44.0103 ], [ 1.3841, 44.0102 ], [ 1.3841, 44.0102 ], [ 1.3839, 44.0101 ], [ 1.3836, 44.0099 ], [ 1.3833, 44.0096 ], [ 1.383, 44.0093 ], [ 1.3827, 44.009 ], [ 1.3825, 44.0088 ], [ 1.3824, 44.0088 ], [ 1.3821, 44.0088 ], [ 1.3818, 44.0091 ], [ 1.3807, 44.0098 ], [ 1.3813, 44.0103 ], [ 1.3809, 44.0105 ], [ 1.3806, 44.0106 ], [ 1.3804, 44.0108 ], [ 1.3803, 44.0108 ], [ 1.3802, 44.0108 ], [ 1.3802, 44.0108 ], [ 1.3793, 44.0111 ], [ 1.3792, 44.0109 ], [ 1.3789, 44.011 ], [ 1.3789, 44.0111 ], [ 1.3786, 44.0111 ], [ 1.3786, 44.0114 ], [ 1.3782, 44.0114 ], [ 1.3779, 44.0105 ], [ 1.3779, 44.0103 ], [ 1.3786, 44.01 ], [ 1.3787, 44.01 ], [ 1.379, 44.0098 ], [ 1.3797, 44.0097 ], [ 1.3796, 44.0094 ], [ 1.3788, 44.0095 ], [ 1.3787, 44.0085 ], [ 1.3781, 44.0085 ], [ 1.3777, 44.0086 ], [ 1.3774, 44.0086 ], [ 1.3774, 44.0086 ], [ 1.3771, 44.0087 ], [ 1.3764, 44.0087 ], [ 1.3762, 44.0088 ], [ 1.376, 44.0089 ], [ 1.3757, 44.009 ], [ 1.3756, 44.0092 ], [ 1.3747, 44.0099 ], [ 1.3737, 44.011 ], [ 1.3735, 44.0104 ], [ 1.3734, 44.0102 ], [ 1.3734, 44.0102 ], [ 1.3733, 44.0101 ], [ 1.3732, 44.01 ], [ 1.3733, 44.0099 ], [ 1.3732, 44.0097 ], [ 1.3724, 44.0098 ], [ 1.3723, 44.0098 ], [ 1.3721, 44.0098 ], [ 1.3721, 44.0099 ], [ 1.3713, 44.0101 ], [ 1.3716, 44.0107 ], [ 1.3718, 44.0109 ], [ 1.3713, 44.0111 ], [ 1.3711, 44.0112 ], [ 1.3708, 44.0107 ], [ 1.3703, 44.0108 ], [ 1.3704, 44.0109 ], [ 1.3698, 44.0111 ], [ 1.3697, 44.0112 ], [ 1.3699, 44.0116 ], [ 1.3693, 44.0116 ], [ 1.3688, 44.0117 ], [ 1.3685, 44.012 ], [ 1.3698, 44.0128 ], [ 1.3701, 44.0127 ], [ 1.3704, 44.0128 ], [ 1.371, 44.0132 ], [ 1.3718, 44.0138 ], [ 1.3719, 44.0138 ], [ 1.3729, 44.015 ], [ 1.3735, 44.0157 ], [ 1.3742, 44.0153 ], [ 1.3751, 44.0161 ], [ 1.3759, 44.0168 ], [ 1.3761, 44.017 ], [ 1.3766, 44.0172 ], [ 1.3773, 44.0166 ], [ 1.378, 44.016 ], [ 1.3779, 44.0159 ], [ 1.3774, 44.0156 ], [ 1.377, 44.0153 ], [ 1.3769, 44.0155 ], [ 1.3764, 44.0152 ], [ 1.3763, 44.0153 ], [ 1.3754, 44.0145 ], [ 1.3758, 44.0142 ], [ 1.3763, 44.014 ], [ 1.3754, 44.0129 ], [ 1.3754, 44.0128 ], [ 1.375, 44.0122 ], [ 1.3751, 44.0122 ], [ 1.3744, 44.0121 ], [ 1.374, 44.012 ], [ 1.3739, 44.0121 ], [ 1.3737, 44.0112 ], [ 1.3739, 44.0109 ], [ 1.3751, 44.0108 ], [ 1.3754, 44.0108 ], [ 1.3756, 44.0106 ], [ 1.3764, 44.0105 ], [ 1.3766, 44.0105 ], [ 1.3767, 44.0107 ], [ 1.3766, 44.0107 ], [ 1.3765, 44.0107 ], [ 1.3762, 44.0108 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.011 ], [ 1.3763, 44.0112 ], [ 1.3762, 44.0112 ], [ 1.3761, 44.0112 ], [ 1.3757, 44.0112 ], [ 1.3757, 44.0113 ], [ 1.3757, 44.0113 ], [ 1.3758, 44.0118 ], [ 1.3758, 44.0118 ], [ 1.3758, 44.012 ], [ 1.3757, 44.0122 ], [ 1.3765, 44.0122 ], [ 1.3769, 44.0122 ], [ 1.3771, 44.0122 ], [ 1.3773, 44.0123 ], [ 1.3784, 44.0124 ], [ 1.3786, 44.0125 ], [ 1.3788, 44.0124 ], [ 1.3789, 44.0124 ], [ 1.3792, 44.0124 ], [ 1.3793, 44.0125 ], [ 1.3794, 44.0126 ], [ 1.3804, 44.0128 ], [ 1.3806, 44.0128 ], [ 1.3809, 44.0129 ], [ 1.3812, 44.0131 ], [ 1.3814, 44.0132 ], [ 1.3814, 44.0133 ], [ 1.381, 44.0138 ], [ 1.3825, 44.0143 ], [ 1.3821, 44.0149 ], [ 1.3819, 44.0151 ], [ 1.3813, 44.0158 ], [ 1.3817, 44.0159 ], [ 1.3822, 44.0161 ], [ 1.3829, 44.0164 ], [ 1.3836, 44.0167 ], [ 1.3839, 44.0168 ], [ 1.3841, 44.0168 ], [ 1.3837, 44.0176 ], [ 1.384, 44.0176 ], [ 1.3843, 44.0176 ], [ 1.3847, 44.0169 ], [ 1.3848, 44.017 ], [ 1.3855, 44.0166 ], [ 1.3855, 44.0166 ], [ 1.3858, 44.0164 ], [ 1.3857, 44.016 ], [ 1.3864, 44.0156 ], [ 1.3863, 44.015 ], [ 1.3863, 44.0149 ], [ 1.3864, 44.0148 ], [ 1.3866, 44.0147 ], [ 1.3867, 44.0146 ], [ 1.3867, 44.0146 ] ] ], "type": "Polygon" }, "id": "56", "properties": { "code_commune": "82121", "code_departement": "82", "code_qp": "QP082002", "commune_qp": "Montauban", "nom_commune": "Montauban", "nom_qp": "Médiathèque - Chambord" }, "type": "Feature" }, { "bbox": [ 2.1581, 43.9249, 2.1666, 43.9301 ], "geometry": { "coordinates": [ [ [ 2.1634, 43.9298 ], [ 2.1645, 43.9293 ], [ 2.1646, 43.9292 ], [ 2.1644, 43.9291 ], [ 2.1648, 43.9287 ], [ 2.165, 43.9286 ], [ 2.1651, 43.9284 ], [ 2.1653, 43.9282 ], [ 2.1652, 43.9279 ], [ 2.1653, 43.9279 ], [ 2.1662, 43.9278 ], [ 2.1661, 43.9278 ], [ 2.1666, 43.9276 ], [ 2.1665, 43.9272 ], [ 2.166, 43.9272 ], [ 2.166, 43.9273 ], [ 2.1659, 43.9274 ], [ 2.1651, 43.9275 ], [ 2.165, 43.9274 ], [ 2.1646, 43.9274 ], [ 2.1646, 43.9273 ], [ 2.1644, 43.9274 ], [ 2.1643, 43.9271 ], [ 2.164, 43.9271 ], [ 2.1639, 43.9267 ], [ 2.1638, 43.9266 ], [ 2.1633, 43.9266 ], [ 2.1632, 43.9261 ], [ 2.1632, 43.9261 ], [ 2.1631, 43.926 ], [ 2.1629, 43.9257 ], [ 2.1623, 43.9257 ], [ 2.1622, 43.9253 ], [ 2.162, 43.9252 ], [ 2.1614, 43.9254 ], [ 2.1613, 43.925 ], [ 2.1607, 43.9252 ], [ 2.1596, 43.9255 ], [ 2.1596, 43.9254 ], [ 2.1592, 43.9249 ], [ 2.159, 43.9249 ], [ 2.1587, 43.925 ], [ 2.1584, 43.9252 ], [ 2.1581, 43.9253 ], [ 2.1587, 43.9267 ], [ 2.1598, 43.9265 ], [ 2.1597, 43.9259 ], [ 2.1603, 43.9259 ], [ 2.1606, 43.9259 ], [ 2.161, 43.9258 ], [ 2.1612, 43.9262 ], [ 2.1612, 43.9264 ], [ 2.1615, 43.9264 ], [ 2.1616, 43.9267 ], [ 2.1615, 43.9267 ], [ 2.1617, 43.9273 ], [ 2.1618, 43.9273 ], [ 2.1618, 43.9273 ], [ 2.1619, 43.9276 ], [ 2.1619, 43.9278 ], [ 2.162, 43.9283 ], [ 2.1616, 43.9284 ], [ 2.1611, 43.9283 ], [ 2.1611, 43.9287 ], [ 2.1611, 43.9288 ], [ 2.1621, 43.9287 ], [ 2.1622, 43.929 ], [ 2.1632, 43.9288 ], [ 2.1633, 43.9293 ], [ 2.1629, 43.9294 ], [ 2.1627, 43.9297 ], [ 2.1628, 43.9297 ], [ 2.1626, 43.9299 ], [ 2.1631, 43.9301 ], [ 2.1632, 43.9301 ], [ 2.1634, 43.9298 ] ] ], "type": "Polygon" }, "id": "57", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081008", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Lapanouse" }, "type": "Feature" }, { "bbox": [ 1.4619, 43.565, 1.4697, 43.5738 ], "geometry": { "coordinates": [ [ [ 1.4636, 43.5734 ], [ 1.4637, 43.5734 ], [ 1.4626, 43.5724 ], [ 1.4639, 43.5722 ], [ 1.4628, 43.5712 ], [ 1.464, 43.5705 ], [ 1.4639, 43.5705 ], [ 1.4641, 43.5704 ], [ 1.4642, 43.5704 ], [ 1.4645, 43.5702 ], [ 1.4647, 43.57 ], [ 1.4648, 43.5693 ], [ 1.4654, 43.5693 ], [ 1.4658, 43.5689 ], [ 1.4664, 43.5692 ], [ 1.4679, 43.5699 ], [ 1.4685, 43.5693 ], [ 1.4692, 43.5686 ], [ 1.4697, 43.5681 ], [ 1.4658, 43.5661 ], [ 1.4652, 43.5657 ], [ 1.4645, 43.565 ], [ 1.464, 43.5656 ], [ 1.4635, 43.5658 ], [ 1.4637, 43.566 ], [ 1.4633, 43.5663 ], [ 1.4634, 43.5677 ], [ 1.4643, 43.5676 ], [ 1.464, 43.569 ], [ 1.4634, 43.5691 ], [ 1.4633, 43.5702 ], [ 1.4619, 43.5705 ], [ 1.4626, 43.5713 ], [ 1.4623, 43.5715 ], [ 1.4627, 43.5719 ], [ 1.462, 43.5725 ], [ 1.4627, 43.5731 ], [ 1.4624, 43.5732 ], [ 1.463, 43.5738 ], [ 1.463, 43.5738 ], [ 1.4636, 43.5734 ] ] ], "type": "Polygon" }, "id": "58", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031015", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Rangueil" }, "type": "Feature" }, { "bbox": [ 2.9733, 43.1814, 2.9962, 43.19 ], "geometry": { "coordinates": [ [ [ 2.9837, 43.1842 ], [ 2.9837, 43.1836 ], [ 2.9812, 43.1837 ], [ 2.9808, 43.1838 ], [ 2.9807, 43.1827 ], [ 2.9807, 43.1827 ], [ 2.981, 43.1827 ], [ 2.9809, 43.1816 ], [ 2.98, 43.1815 ], [ 2.9786, 43.1815 ], [ 2.9779, 43.1814 ], [ 2.9779, 43.1819 ], [ 2.978, 43.1826 ], [ 2.978, 43.1827 ], [ 2.978, 43.1834 ], [ 2.978, 43.1834 ], [ 2.9778, 43.1834 ], [ 2.9776, 43.1834 ], [ 2.9768, 43.1833 ], [ 2.9762, 43.1833 ], [ 2.9761, 43.1833 ], [ 2.976, 43.1833 ], [ 2.9759, 43.1832 ], [ 2.9761, 43.1826 ], [ 2.9761, 43.1826 ], [ 2.9755, 43.1825 ], [ 2.9752, 43.1825 ], [ 2.9751, 43.1825 ], [ 2.975, 43.1825 ], [ 2.9749, 43.1825 ], [ 2.9749, 43.182 ], [ 2.9743, 43.1819 ], [ 2.9743, 43.1821 ], [ 2.9739, 43.1821 ], [ 2.9739, 43.182 ], [ 2.9739, 43.182 ], [ 2.9734, 43.182 ], [ 2.9734, 43.1827 ], [ 2.9733, 43.1831 ], [ 2.9735, 43.1831 ], [ 2.974, 43.1833 ], [ 2.9755, 43.1838 ], [ 2.9757, 43.1839 ], [ 2.9758, 43.1839 ], [ 2.9763, 43.1842 ], [ 2.9764, 43.1842 ], [ 2.9765, 43.1843 ], [ 2.9768, 43.1848 ], [ 2.9768, 43.1849 ], [ 2.9768, 43.1852 ], [ 2.9762, 43.1851 ], [ 2.9762, 43.1858 ], [ 2.9763, 43.1861 ], [ 2.9763, 43.1863 ], [ 2.9765, 43.1864 ], [ 2.9765, 43.1866 ], [ 2.9768, 43.1866 ], [ 2.9769, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9775, 43.1865 ], [ 2.9775, 43.1864 ], [ 2.9778, 43.1864 ], [ 2.9778, 43.1863 ], [ 2.9782, 43.1864 ], [ 2.9782, 43.1864 ], [ 2.9783, 43.1865 ], [ 2.9783, 43.1865 ], [ 2.9786, 43.1865 ], [ 2.9786, 43.1867 ], [ 2.9785, 43.1868 ], [ 2.9786, 43.1868 ], [ 2.9786, 43.1868 ], [ 2.979, 43.1868 ], [ 2.979, 43.1867 ], [ 2.9789, 43.1866 ], [ 2.9789, 43.1865 ], [ 2.9789, 43.1864 ], [ 2.9789, 43.1861 ], [ 2.9793, 43.1861 ], [ 2.9793, 43.1859 ], [ 2.9786, 43.1859 ], [ 2.9786, 43.1858 ], [ 2.9786, 43.1849 ], [ 2.9786, 43.1846 ], [ 2.979, 43.1847 ], [ 2.9791, 43.1847 ], [ 2.9794, 43.1847 ], [ 2.9798, 43.1847 ], [ 2.981, 43.185 ], [ 2.9811, 43.1847 ], [ 2.981, 43.1846 ], [ 2.981, 43.1841 ], [ 2.9817, 43.1841 ], [ 2.9822, 43.1842 ], [ 2.9824, 43.1841 ], [ 2.9825, 43.1841 ], [ 2.9832, 43.1841 ], [ 2.9832, 43.1841 ], [ 2.9833, 43.1842 ], [ 2.9833, 43.1843 ], [ 2.9836, 43.1855 ], [ 2.9837, 43.1856 ], [ 2.9839, 43.1864 ], [ 2.984, 43.1871 ], [ 2.9836, 43.1871 ], [ 2.984, 43.1877 ], [ 2.9842, 43.188 ], [ 2.9843, 43.1881 ], [ 2.9844, 43.1881 ], [ 2.9847, 43.1882 ], [ 2.9848, 43.1882 ], [ 2.985, 43.1885 ], [ 2.9852, 43.189 ], [ 2.9854, 43.1891 ], [ 2.9854, 43.1891 ], [ 2.9863, 43.1886 ], [ 2.9864, 43.1886 ], [ 2.9864, 43.1887 ], [ 2.9865, 43.1887 ], [ 2.9866, 43.1888 ], [ 2.9867, 43.1888 ], [ 2.9876, 43.1884 ], [ 2.9878, 43.1888 ], [ 2.9881, 43.1891 ], [ 2.9882, 43.1893 ], [ 2.9881, 43.1894 ], [ 2.9885, 43.1898 ], [ 2.9898, 43.189 ], [ 2.9901, 43.1888 ], [ 2.9903, 43.1886 ], [ 2.991, 43.1882 ], [ 2.9913, 43.1886 ], [ 2.9917, 43.1889 ], [ 2.9923, 43.189 ], [ 2.9929, 43.1887 ], [ 2.9933, 43.189 ], [ 2.9936, 43.1892 ], [ 2.9936, 43.1892 ], [ 2.9935, 43.1894 ], [ 2.9935, 43.1895 ], [ 2.9935, 43.1896 ], [ 2.9941, 43.1898 ], [ 2.9947, 43.19 ], [ 2.9949, 43.19 ], [ 2.9951, 43.1898 ], [ 2.9958, 43.1889 ], [ 2.9961, 43.1886 ], [ 2.9962, 43.1884 ], [ 2.9955, 43.1887 ], [ 2.9941, 43.1891 ], [ 2.9934, 43.1885 ], [ 2.993, 43.1881 ], [ 2.9928, 43.1879 ], [ 2.9928, 43.1877 ], [ 2.9929, 43.1877 ], [ 2.9932, 43.1877 ], [ 2.9934, 43.1877 ], [ 2.9939, 43.1878 ], [ 2.9942, 43.1878 ], [ 2.9942, 43.1878 ], [ 2.9943, 43.1877 ], [ 2.995, 43.1877 ], [ 2.9954, 43.1877 ], [ 2.9958, 43.1877 ], [ 2.9961, 43.1876 ], [ 2.9953, 43.1866 ], [ 2.995, 43.1867 ], [ 2.9945, 43.1869 ], [ 2.9946, 43.1871 ], [ 2.9944, 43.1872 ], [ 2.9944, 43.1872 ], [ 2.994, 43.1874 ], [ 2.9939, 43.1874 ], [ 2.9937, 43.1871 ], [ 2.9934, 43.1873 ], [ 2.9931, 43.1874 ], [ 2.9923, 43.1876 ], [ 2.9921, 43.1871 ], [ 2.9919, 43.1871 ], [ 2.992, 43.1871 ], [ 2.9916, 43.1873 ], [ 2.9916, 43.1874 ], [ 2.9915, 43.1874 ], [ 2.9909, 43.1877 ], [ 2.9908, 43.1873 ], [ 2.9907, 43.1871 ], [ 2.9906, 43.187 ], [ 2.9905, 43.187 ], [ 2.9895, 43.1871 ], [ 2.9888, 43.1872 ], [ 2.9877, 43.1872 ], [ 2.9871, 43.1873 ], [ 2.9866, 43.1873 ], [ 2.986, 43.1873 ], [ 2.9858, 43.1871 ], [ 2.9855, 43.187 ], [ 2.9853, 43.187 ], [ 2.9848, 43.187 ], [ 2.9848, 43.1866 ], [ 2.9849, 43.1865 ], [ 2.9848, 43.1859 ], [ 2.9843, 43.1859 ], [ 2.9843, 43.1856 ], [ 2.9843, 43.1855 ], [ 2.985, 43.1855 ], [ 2.9848, 43.1842 ], [ 2.9841, 43.1842 ], [ 2.9837, 43.1842 ] ] ], "type": "Polygon" }, "id": "59", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011007", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Ouest" }, "type": "Feature" }, { "bbox": [ 4.0105, 44.2164, 4.0202, 44.2295 ], "geometry": { "coordinates": [ [ [ 4.0202, 44.2165 ], [ 4.02, 44.2164 ], [ 4.0198, 44.2166 ], [ 4.0197, 44.2168 ], [ 4.0196, 44.2169 ], [ 4.0194, 44.2171 ], [ 4.0192, 44.2172 ], [ 4.0189, 44.2174 ], [ 4.0188, 44.2175 ], [ 4.0187, 44.2176 ], [ 4.0182, 44.2178 ], [ 4.0177, 44.2181 ], [ 4.0169, 44.2185 ], [ 4.0163, 44.2188 ], [ 4.016, 44.2191 ], [ 4.0151, 44.2198 ], [ 4.0147, 44.22 ], [ 4.0144, 44.2203 ], [ 4.0142, 44.2205 ], [ 4.014, 44.2206 ], [ 4.0139, 44.2207 ], [ 4.0139, 44.2208 ], [ 4.0139, 44.2208 ], [ 4.0137, 44.2208 ], [ 4.0136, 44.2208 ], [ 4.0134, 44.221 ], [ 4.0133, 44.2214 ], [ 4.0132, 44.2217 ], [ 4.0132, 44.2218 ], [ 4.0132, 44.2219 ], [ 4.0132, 44.222 ], [ 4.0137, 44.2222 ], [ 4.014, 44.2224 ], [ 4.0138, 44.2226 ], [ 4.0137, 44.2228 ], [ 4.0136, 44.223 ], [ 4.0135, 44.2232 ], [ 4.0134, 44.2234 ], [ 4.0134, 44.2236 ], [ 4.0133, 44.2236 ], [ 4.0132, 44.2239 ], [ 4.0132, 44.224 ], [ 4.0132, 44.2241 ], [ 4.0132, 44.2242 ], [ 4.0131, 44.2246 ], [ 4.0131, 44.2246 ], [ 4.0131, 44.2248 ], [ 4.013, 44.2252 ], [ 4.0129, 44.2255 ], [ 4.0128, 44.2256 ], [ 4.0128, 44.2258 ], [ 4.0127, 44.2259 ], [ 4.0126, 44.2261 ], [ 4.0125, 44.2263 ], [ 4.0124, 44.2265 ], [ 4.0123, 44.2266 ], [ 4.0121, 44.227 ], [ 4.0121, 44.227 ], [ 4.012, 44.227 ], [ 4.0118, 44.2274 ], [ 4.0117, 44.2276 ], [ 4.0116, 44.2277 ], [ 4.0114, 44.2279 ], [ 4.0112, 44.2281 ], [ 4.011, 44.2283 ], [ 4.0108, 44.2284 ], [ 4.0108, 44.2284 ], [ 4.0108, 44.2285 ], [ 4.0108, 44.2285 ], [ 4.0106, 44.2286 ], [ 4.0105, 44.2287 ], [ 4.0106, 44.2289 ], [ 4.0107, 44.2289 ], [ 4.0108, 44.2289 ], [ 4.0108, 44.2289 ], [ 4.011, 44.229 ], [ 4.011, 44.229 ], [ 4.0114, 44.2291 ], [ 4.0112, 44.2294 ], [ 4.0112, 44.2295 ], [ 4.0113, 44.2295 ], [ 4.0114, 44.2295 ], [ 4.0116, 44.2295 ], [ 4.0119, 44.2295 ], [ 4.0121, 44.2295 ], [ 4.0121, 44.2295 ], [ 4.0121, 44.2294 ], [ 4.0122, 44.2293 ], [ 4.0123, 44.2293 ], [ 4.0124, 44.2292 ], [ 4.0128, 44.2292 ], [ 4.0129, 44.229 ], [ 4.0128, 44.229 ], [ 4.0127, 44.229 ], [ 4.0127, 44.229 ], [ 4.0126, 44.229 ], [ 4.0125, 44.2289 ], [ 4.0126, 44.2289 ], [ 4.0125, 44.2289 ], [ 4.0127, 44.2287 ], [ 4.0127, 44.2287 ], [ 4.0127, 44.2287 ], [ 4.0124, 44.2285 ], [ 4.0122, 44.2285 ], [ 4.012, 44.2284 ], [ 4.0118, 44.2283 ], [ 4.0117, 44.2283 ], [ 4.0118, 44.2282 ], [ 4.0118, 44.2282 ], [ 4.0119, 44.2281 ], [ 4.012, 44.2281 ], [ 4.0119, 44.2281 ], [ 4.0119, 44.228 ], [ 4.012, 44.228 ], [ 4.0121, 44.228 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.228 ], [ 4.0125, 44.228 ], [ 4.0127, 44.2279 ], [ 4.013, 44.2277 ], [ 4.0131, 44.2277 ], [ 4.0131, 44.2276 ], [ 4.0131, 44.2275 ], [ 4.0131, 44.2274 ], [ 4.0131, 44.2273 ], [ 4.0131, 44.2272 ], [ 4.0131, 44.2272 ], [ 4.0136, 44.2272 ], [ 4.0141, 44.2272 ], [ 4.0141, 44.2272 ], [ 4.0142, 44.2272 ], [ 4.0144, 44.2272 ], [ 4.0144, 44.2273 ], [ 4.0144, 44.2274 ], [ 4.0146, 44.2275 ], [ 4.0147, 44.2275 ], [ 4.0147, 44.2275 ], [ 4.0148, 44.2275 ], [ 4.0149, 44.2276 ], [ 4.015, 44.2276 ], [ 4.015, 44.2276 ], [ 4.0151, 44.2277 ], [ 4.0151, 44.2277 ], [ 4.0151, 44.2278 ], [ 4.0152, 44.2278 ], [ 4.0153, 44.2278 ], [ 4.0153, 44.2279 ], [ 4.0154, 44.2279 ], [ 4.0155, 44.228 ], [ 4.0156, 44.2279 ], [ 4.0157, 44.2279 ], [ 4.0157, 44.2279 ], [ 4.0156, 44.2276 ], [ 4.0155, 44.2275 ], [ 4.0155, 44.2274 ], [ 4.0155, 44.2273 ], [ 4.0155, 44.2272 ], [ 4.0155, 44.2271 ], [ 4.0155, 44.2271 ], [ 4.0156, 44.227 ], [ 4.0156, 44.2269 ], [ 4.0157, 44.2268 ], [ 4.0161, 44.2265 ], [ 4.0157, 44.2258 ], [ 4.0152, 44.225 ], [ 4.0152, 44.2245 ], [ 4.0152, 44.2245 ], [ 4.0151, 44.2244 ], [ 4.0151, 44.2243 ], [ 4.015, 44.2242 ], [ 4.015, 44.2242 ], [ 4.0149, 44.224 ], [ 4.0149, 44.2239 ], [ 4.0151, 44.2238 ], [ 4.0154, 44.2236 ], [ 4.0156, 44.2235 ], [ 4.016, 44.2233 ], [ 4.0162, 44.2232 ], [ 4.0163, 44.2232 ], [ 4.0164, 44.2232 ], [ 4.0164, 44.2232 ], [ 4.0166, 44.2235 ], [ 4.0169, 44.224 ], [ 4.0171, 44.2239 ], [ 4.0173, 44.2239 ], [ 4.0174, 44.2238 ], [ 4.018, 44.2237 ], [ 4.018, 44.2237 ], [ 4.018, 44.2238 ], [ 4.0181, 44.224 ], [ 4.0185, 44.2239 ], [ 4.0188, 44.2237 ], [ 4.0187, 44.2236 ], [ 4.0188, 44.2234 ], [ 4.0187, 44.2233 ], [ 4.0187, 44.2231 ], [ 4.0186, 44.2229 ], [ 4.0187, 44.2229 ], [ 4.0185, 44.2228 ], [ 4.0184, 44.2228 ], [ 4.0183, 44.2228 ], [ 4.0182, 44.2227 ], [ 4.0182, 44.2225 ], [ 4.0183, 44.2224 ], [ 4.0186, 44.2223 ], [ 4.0186, 44.2223 ], [ 4.0188, 44.2222 ], [ 4.0188, 44.2222 ], [ 4.019, 44.2221 ], [ 4.0191, 44.2219 ], [ 4.0192, 44.2218 ], [ 4.0194, 44.2218 ], [ 4.0195, 44.2218 ], [ 4.0195, 44.2217 ], [ 4.0192, 44.2216 ], [ 4.0192, 44.2216 ], [ 4.019, 44.2215 ], [ 4.0191, 44.2214 ], [ 4.0189, 44.2213 ], [ 4.0189, 44.2212 ], [ 4.0189, 44.221 ], [ 4.019, 44.221 ], [ 4.019, 44.2209 ], [ 4.019, 44.2208 ], [ 4.019, 44.2208 ], [ 4.0191, 44.2207 ], [ 4.0191, 44.2207 ], [ 4.0191, 44.2206 ], [ 4.0192, 44.2205 ], [ 4.0193, 44.2205 ], [ 4.0196, 44.2202 ], [ 4.0197, 44.2201 ], [ 4.0197, 44.2199 ], [ 4.0202, 44.2196 ], [ 4.02, 44.2195 ], [ 4.0198, 44.2195 ], [ 4.0194, 44.2193 ], [ 4.0194, 44.2192 ], [ 4.0194, 44.2191 ], [ 4.0193, 44.219 ], [ 4.0196, 44.2187 ], [ 4.0197, 44.2186 ], [ 4.0196, 44.2185 ], [ 4.0196, 44.2185 ], [ 4.0196, 44.2184 ], [ 4.0196, 44.2183 ], [ 4.0196, 44.2181 ], [ 4.019, 44.218 ], [ 4.0193, 44.2176 ], [ 4.0193, 44.2175 ], [ 4.0195, 44.2173 ], [ 4.0196, 44.2171 ], [ 4.0199, 44.2167 ], [ 4.0202, 44.2165 ] ] ], "type": "Polygon" }, "id": "60", "properties": { "code_commune": "30132", "code_departement": "30", "code_qp": "QP030017", "commune_qp": "La Grand-Combe", "nom_commune": "La Grand-Combe", "nom_qp": "Trescol - La Levade" }, "type": "Feature" }, { "bbox": [ 3.8707, 43.5912, 3.874, 43.594 ], "geometry": { "coordinates": [ [ [ 3.8721, 43.594 ], [ 3.8726, 43.5937 ], [ 3.8729, 43.5936 ], [ 3.8733, 43.5934 ], [ 3.8734, 43.5933 ], [ 3.8737, 43.5932 ], [ 3.8738, 43.5931 ], [ 3.874, 43.593 ], [ 3.8732, 43.5921 ], [ 3.873, 43.5921 ], [ 3.8729, 43.5921 ], [ 3.8727, 43.5922 ], [ 3.8725, 43.5923 ], [ 3.8723, 43.5921 ], [ 3.8728, 43.5919 ], [ 3.8733, 43.5917 ], [ 3.8727, 43.5912 ], [ 3.8719, 43.5916 ], [ 3.8715, 43.5913 ], [ 3.8707, 43.5917 ], [ 3.8713, 43.5923 ], [ 3.8716, 43.5927 ], [ 3.8712, 43.5929 ], [ 3.8717, 43.5935 ], [ 3.8717, 43.5936 ], [ 3.8721, 43.594 ] ] ], "type": "Polygon" }, "id": "61", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034011", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Lemasson" }, "type": "Feature" }, { "bbox": [ 3.8982, 43.6178, 3.9038, 43.6215 ], "geometry": { "coordinates": [ [ [ 3.9006, 43.6185 ], [ 3.9002, 43.6184 ], [ 3.8991, 43.6183 ], [ 3.8988, 43.6183 ], [ 3.8986, 43.6183 ], [ 3.8982, 43.6184 ], [ 3.8983, 43.6185 ], [ 3.8986, 43.6188 ], [ 3.8988, 43.6189 ], [ 3.899, 43.619 ], [ 3.8994, 43.6192 ], [ 3.8996, 43.6193 ], [ 3.8997, 43.6193 ], [ 3.8999, 43.6194 ], [ 3.9002, 43.6194 ], [ 3.9005, 43.6194 ], [ 3.9007, 43.6195 ], [ 3.9008, 43.6196 ], [ 3.901, 43.6197 ], [ 3.901, 43.6198 ], [ 3.9011, 43.6199 ], [ 3.9011, 43.62 ], [ 3.9015, 43.6203 ], [ 3.9016, 43.6204 ], [ 3.9017, 43.6205 ], [ 3.9017, 43.6206 ], [ 3.9016, 43.621 ], [ 3.9016, 43.621 ], [ 3.9017, 43.6212 ], [ 3.9018, 43.6213 ], [ 3.9019, 43.6213 ], [ 3.9021, 43.6214 ], [ 3.9026, 43.6214 ], [ 3.9029, 43.6214 ], [ 3.9031, 43.6215 ], [ 3.9033, 43.6215 ], [ 3.9034, 43.6215 ], [ 3.9036, 43.6214 ], [ 3.9036, 43.6213 ], [ 3.9037, 43.6213 ], [ 3.9037, 43.6212 ], [ 3.9038, 43.6209 ], [ 3.9038, 43.6208 ], [ 3.9037, 43.6208 ], [ 3.9036, 43.6207 ], [ 3.9034, 43.6206 ], [ 3.9033, 43.6205 ], [ 3.9033, 43.6204 ], [ 3.9034, 43.6201 ], [ 3.9034, 43.62 ], [ 3.9037, 43.6198 ], [ 3.9038, 43.6197 ], [ 3.9033, 43.6195 ], [ 3.9032, 43.6195 ], [ 3.9033, 43.6191 ], [ 3.903, 43.6191 ], [ 3.9027, 43.6191 ], [ 3.9023, 43.6191 ], [ 3.9019, 43.6192 ], [ 3.9015, 43.6193 ], [ 3.9009, 43.6194 ], [ 3.9011, 43.6189 ], [ 3.9012, 43.6185 ], [ 3.9014, 43.618 ], [ 3.9014, 43.6179 ], [ 3.9012, 43.6178 ], [ 3.9011, 43.6178 ], [ 3.9009, 43.6178 ], [ 3.9008, 43.6178 ], [ 3.9007, 43.6178 ], [ 3.9007, 43.6179 ], [ 3.9006, 43.6185 ] ] ], "type": "Polygon" }, "id": "62", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034013", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Pompignane" }, "type": "Feature" }, { "bbox": [ 1.1403, 42.9816, 1.1485, 42.9867 ], "geometry": { "coordinates": [ [ [ 1.1438, 42.9863 ], [ 1.1441, 42.9864 ], [ 1.1443, 42.9865 ], [ 1.1445, 42.9866 ], [ 1.1447, 42.9867 ], [ 1.145, 42.9864 ], [ 1.145, 42.9863 ], [ 1.145, 42.9863 ], [ 1.1452, 42.9862 ], [ 1.1453, 42.9863 ], [ 1.1454, 42.9863 ], [ 1.1455, 42.9863 ], [ 1.1454, 42.9862 ], [ 1.1455, 42.9862 ], [ 1.1456, 42.9862 ], [ 1.1456, 42.9862 ], [ 1.1455, 42.9862 ], [ 1.1455, 42.9861 ], [ 1.1455, 42.9861 ], [ 1.1456, 42.9861 ], [ 1.1456, 42.986 ], [ 1.1455, 42.986 ], [ 1.1455, 42.9859 ], [ 1.146, 42.9858 ], [ 1.1465, 42.9857 ], [ 1.1467, 42.9856 ], [ 1.1468, 42.9856 ], [ 1.147, 42.9855 ], [ 1.1472, 42.9853 ], [ 1.1473, 42.9851 ], [ 1.1475, 42.9847 ], [ 1.1485, 42.9829 ], [ 1.1481, 42.9828 ], [ 1.1478, 42.9827 ], [ 1.1474, 42.9828 ], [ 1.1472, 42.9828 ], [ 1.147, 42.9827 ], [ 1.146, 42.9823 ], [ 1.1449, 42.9834 ], [ 1.1448, 42.9835 ], [ 1.1447, 42.9834 ], [ 1.1446, 42.9835 ], [ 1.1445, 42.9836 ], [ 1.1442, 42.9839 ], [ 1.1441, 42.9841 ], [ 1.144, 42.9842 ], [ 1.1435, 42.9844 ], [ 1.1432, 42.9846 ], [ 1.1433, 42.9848 ], [ 1.1427, 42.9857 ], [ 1.1421, 42.9855 ], [ 1.1422, 42.9853 ], [ 1.1429, 42.9842 ], [ 1.1432, 42.984 ], [ 1.1437, 42.9836 ], [ 1.1442, 42.9831 ], [ 1.1442, 42.9832 ], [ 1.1443, 42.9831 ], [ 1.1443, 42.9831 ], [ 1.1443, 42.983 ], [ 1.1442, 42.983 ], [ 1.1444, 42.9829 ], [ 1.1445, 42.9828 ], [ 1.1446, 42.9827 ], [ 1.1449, 42.9825 ], [ 1.1452, 42.9823 ], [ 1.1455, 42.9819 ], [ 1.1454, 42.9819 ], [ 1.1451, 42.9818 ], [ 1.1451, 42.9817 ], [ 1.1449, 42.9816 ], [ 1.1448, 42.9817 ], [ 1.1446, 42.9816 ], [ 1.1446, 42.9817 ], [ 1.1443, 42.9816 ], [ 1.1441, 42.9817 ], [ 1.1443, 42.9818 ], [ 1.1442, 42.9818 ], [ 1.1441, 42.9819 ], [ 1.144, 42.982 ], [ 1.1439, 42.982 ], [ 1.1438, 42.9821 ], [ 1.1439, 42.9821 ], [ 1.1436, 42.9825 ], [ 1.1435, 42.9824 ], [ 1.1434, 42.9824 ], [ 1.1433, 42.9825 ], [ 1.1432, 42.983 ], [ 1.1432, 42.9832 ], [ 1.1431, 42.9833 ], [ 1.1427, 42.9838 ], [ 1.1425, 42.984 ], [ 1.1413, 42.9852 ], [ 1.1412, 42.9851 ], [ 1.1406, 42.9849 ], [ 1.1403, 42.9854 ], [ 1.1412, 42.9858 ], [ 1.1413, 42.9859 ], [ 1.1415, 42.986 ], [ 1.1414, 42.9862 ], [ 1.1416, 42.9862 ], [ 1.142, 42.9857 ], [ 1.1426, 42.9859 ], [ 1.1438, 42.9863 ] ] ], "type": "Polygon" }, "id": "63", "properties": { "code_commune": "09261", "code_departement": "09", "code_qp": "QP009001", "commune_qp": "Saint-Girons", "nom_commune": "Saint-Girons", "nom_qp": "Coeur De Ville" }, "type": "Feature" }, { "bbox": [ 2.9697, 42.5983, 2.9755, 42.6013 ], "geometry": { "coordinates": [ [ [ 2.9716, 42.6011 ], [ 2.9718, 42.601 ], [ 2.972, 42.601 ], [ 2.9723, 42.601 ], [ 2.9725, 42.6009 ], [ 2.9727, 42.6009 ], [ 2.9733, 42.601 ], [ 2.9737, 42.6011 ], [ 2.9743, 42.6012 ], [ 2.9744, 42.6012 ], [ 2.9745, 42.6012 ], [ 2.9746, 42.6011 ], [ 2.975, 42.601 ], [ 2.975, 42.6009 ], [ 2.9751, 42.6008 ], [ 2.9751, 42.6006 ], [ 2.9751, 42.6006 ], [ 2.9755, 42.5995 ], [ 2.9755, 42.5993 ], [ 2.9755, 42.5992 ], [ 2.9753, 42.599 ], [ 2.9751, 42.5989 ], [ 2.9749, 42.5988 ], [ 2.9735, 42.5985 ], [ 2.9735, 42.5984 ], [ 2.9734, 42.5983 ], [ 2.9732, 42.5985 ], [ 2.9732, 42.5985 ], [ 2.9731, 42.5985 ], [ 2.9732, 42.5985 ], [ 2.9731, 42.5986 ], [ 2.973, 42.5987 ], [ 2.9728, 42.5987 ], [ 2.9728, 42.5987 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5987 ], [ 2.9726, 42.5986 ], [ 2.9724, 42.5986 ], [ 2.9722, 42.5987 ], [ 2.9722, 42.5987 ], [ 2.9722, 42.5988 ], [ 2.9723, 42.5989 ], [ 2.9724, 42.599 ], [ 2.9725, 42.5991 ], [ 2.9725, 42.5992 ], [ 2.9725, 42.5993 ], [ 2.9724, 42.5993 ], [ 2.9723, 42.5994 ], [ 2.9721, 42.5995 ], [ 2.9721, 42.5995 ], [ 2.972, 42.5995 ], [ 2.9719, 42.5994 ], [ 2.9718, 42.5994 ], [ 2.9716, 42.5994 ], [ 2.9716, 42.5995 ], [ 2.9715, 42.5996 ], [ 2.9715, 42.5996 ], [ 2.9714, 42.5996 ], [ 2.9711, 42.5995 ], [ 2.9711, 42.5995 ], [ 2.971, 42.5995 ], [ 2.9709, 42.5994 ], [ 2.9709, 42.5993 ], [ 2.9706, 42.5993 ], [ 2.9701, 42.5993 ], [ 2.9699, 42.5994 ], [ 2.9698, 42.5993 ], [ 2.9697, 42.5993 ], [ 2.9697, 42.5994 ], [ 2.9698, 42.5996 ], [ 2.9698, 42.5997 ], [ 2.9699, 42.5998 ], [ 2.97, 42.6 ], [ 2.97, 42.6001 ], [ 2.9701, 42.6003 ], [ 2.9702, 42.6004 ], [ 2.9702, 42.6005 ], [ 2.9703, 42.6006 ], [ 2.9704, 42.6006 ], [ 2.9704, 42.6006 ], [ 2.9703, 42.6009 ], [ 2.9703, 42.601 ], [ 2.9705, 42.601 ], [ 2.9709, 42.6011 ], [ 2.971, 42.6011 ], [ 2.971, 42.6012 ], [ 2.971, 42.6013 ], [ 2.9711, 42.6013 ], [ 2.9712, 42.6012 ], [ 2.9716, 42.6011 ] ] ], "type": "Polygon" }, "id": "64", "properties": { "code_commune": "66065", "code_departement": "66", "code_qp": "QP066001", "commune_qp": "Elne", "nom_commune": "Elne", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 2.8899, 42.6937, 2.9034, 42.7007 ], "geometry": { "coordinates": [ [ [ 2.9033, 42.6991 ], [ 2.9034, 42.6991 ], [ 2.9033, 42.699 ], [ 2.903, 42.6988 ], [ 2.9026, 42.6991 ], [ 2.9026, 42.6991 ], [ 2.9025, 42.699 ], [ 2.9023, 42.699 ], [ 2.9022, 42.6989 ], [ 2.9023, 42.6989 ], [ 2.9022, 42.6988 ], [ 2.9018, 42.6985 ], [ 2.902, 42.6984 ], [ 2.9021, 42.6983 ], [ 2.9023, 42.6982 ], [ 2.9021, 42.698 ], [ 2.9023, 42.6979 ], [ 2.9024, 42.6979 ], [ 2.9026, 42.6978 ], [ 2.9025, 42.6977 ], [ 2.9024, 42.6976 ], [ 2.9024, 42.6975 ], [ 2.9024, 42.6975 ], [ 2.9023, 42.6974 ], [ 2.9022, 42.6973 ], [ 2.9022, 42.6973 ], [ 2.9021, 42.6972 ], [ 2.9021, 42.6972 ], [ 2.902, 42.6971 ], [ 2.902, 42.697 ], [ 2.9019, 42.6969 ], [ 2.9018, 42.6966 ], [ 2.9018, 42.6965 ], [ 2.9017, 42.6964 ], [ 2.9017, 42.6962 ], [ 2.9017, 42.696 ], [ 2.9017, 42.6959 ], [ 2.9017, 42.6959 ], [ 2.9014, 42.6957 ], [ 2.9011, 42.6956 ], [ 2.901, 42.6955 ], [ 2.9006, 42.6952 ], [ 2.9002, 42.6955 ], [ 2.8995, 42.6961 ], [ 2.8992, 42.6962 ], [ 2.8989, 42.6964 ], [ 2.8988, 42.6963 ], [ 2.8988, 42.6961 ], [ 2.8988, 42.6961 ], [ 2.8983, 42.6961 ], [ 2.8982, 42.696 ], [ 2.8976, 42.6957 ], [ 2.8973, 42.6955 ], [ 2.8972, 42.6955 ], [ 2.8972, 42.6955 ], [ 2.8971, 42.6956 ], [ 2.8971, 42.6956 ], [ 2.8966, 42.6952 ], [ 2.8964, 42.6952 ], [ 2.8963, 42.6952 ], [ 2.896, 42.6953 ], [ 2.8956, 42.6951 ], [ 2.8954, 42.695 ], [ 2.8954, 42.6949 ], [ 2.8953, 42.6949 ], [ 2.895, 42.6948 ], [ 2.8947, 42.6948 ], [ 2.8946, 42.6948 ], [ 2.8936, 42.6948 ], [ 2.8929, 42.6947 ], [ 2.8928, 42.6951 ], [ 2.8927, 42.6951 ], [ 2.8926, 42.695 ], [ 2.8925, 42.6949 ], [ 2.8924, 42.6948 ], [ 2.8923, 42.6946 ], [ 2.8922, 42.6945 ], [ 2.8921, 42.6944 ], [ 2.8921, 42.6943 ], [ 2.892, 42.6942 ], [ 2.8916, 42.6939 ], [ 2.8915, 42.6939 ], [ 2.8913, 42.6937 ], [ 2.8903, 42.6944 ], [ 2.8906, 42.6946 ], [ 2.8908, 42.6947 ], [ 2.8906, 42.6949 ], [ 2.8904, 42.6951 ], [ 2.8901, 42.6952 ], [ 2.8899, 42.6954 ], [ 2.89, 42.6955 ], [ 2.8901, 42.6956 ], [ 2.8903, 42.6957 ], [ 2.8904, 42.6958 ], [ 2.8908, 42.696 ], [ 2.8913, 42.6964 ], [ 2.8911, 42.6966 ], [ 2.8913, 42.6968 ], [ 2.8917, 42.6971 ], [ 2.892, 42.6973 ], [ 2.8922, 42.6975 ], [ 2.8923, 42.6976 ], [ 2.8922, 42.6977 ], [ 2.892, 42.698 ], [ 2.8922, 42.6981 ], [ 2.8923, 42.6981 ], [ 2.8923, 42.6982 ], [ 2.8925, 42.6984 ], [ 2.8925, 42.6986 ], [ 2.8925, 42.6986 ], [ 2.8925, 42.6987 ], [ 2.8923, 42.6987 ], [ 2.8924, 42.6989 ], [ 2.8925, 42.6991 ], [ 2.8929, 42.6995 ], [ 2.8931, 42.6997 ], [ 2.8933, 42.7 ], [ 2.8935, 42.7002 ], [ 2.8936, 42.7003 ], [ 2.8937, 42.7003 ], [ 2.8938, 42.7001 ], [ 2.8941, 42.7003 ], [ 2.8941, 42.7003 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8943, 42.7004 ], [ 2.8945, 42.7004 ], [ 2.8948, 42.7005 ], [ 2.895, 42.7006 ], [ 2.8951, 42.7005 ], [ 2.8953, 42.7003 ], [ 2.8953, 42.7003 ], [ 2.8954, 42.7004 ], [ 2.8954, 42.7003 ], [ 2.8957, 42.7 ], [ 2.8958, 42.7 ], [ 2.8959, 42.6999 ], [ 2.8959, 42.6999 ], [ 2.896, 42.6998 ], [ 2.8961, 42.6997 ], [ 2.8963, 42.6996 ], [ 2.8963, 42.6996 ], [ 2.8964, 42.6995 ], [ 2.8965, 42.6995 ], [ 2.8965, 42.6995 ], [ 2.8966, 42.6994 ], [ 2.8966, 42.6994 ], [ 2.8967, 42.6995 ], [ 2.8967, 42.6995 ], [ 2.8969, 42.6995 ], [ 2.8969, 42.6995 ], [ 2.897, 42.6995 ], [ 2.8972, 42.6996 ], [ 2.8973, 42.6996 ], [ 2.8974, 42.6996 ], [ 2.8974, 42.6996 ], [ 2.8975, 42.6996 ], [ 2.8977, 42.6997 ], [ 2.8978, 42.6997 ], [ 2.8979, 42.6997 ], [ 2.8981, 42.6997 ], [ 2.8982, 42.6997 ], [ 2.8983, 42.6995 ], [ 2.8986, 42.6996 ], [ 2.8988, 42.6996 ], [ 2.8997, 42.6992 ], [ 2.8999, 42.6994 ], [ 2.9004, 42.6999 ], [ 2.9006, 42.7002 ], [ 2.9005, 42.7003 ], [ 2.9007, 42.7004 ], [ 2.9008, 42.7005 ], [ 2.9011, 42.7007 ], [ 2.9018, 42.7001 ], [ 2.9025, 42.6995 ], [ 2.9028, 42.6997 ], [ 2.9033, 42.6992 ], [ 2.9032, 42.6992 ], [ 2.9033, 42.6991 ] ] ], "type": "Polygon" }, "id": "65", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066008", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Centre Ancien" }, "type": "Feature" }, { "bbox": [ 1.4331, 43.6327, 1.4456, 43.6435 ], "geometry": { "coordinates": [ [ [ 1.4331, 43.6346 ], [ 1.4331, 43.635 ], [ 1.4331, 43.6353 ], [ 1.4333, 43.636 ], [ 1.4349, 43.6358 ], [ 1.435, 43.6359 ], [ 1.4366, 43.6357 ], [ 1.4368, 43.6362 ], [ 1.4376, 43.6361 ], [ 1.4373, 43.6364 ], [ 1.4382, 43.6367 ], [ 1.439, 43.6366 ], [ 1.4391, 43.6369 ], [ 1.4391, 43.6375 ], [ 1.4392, 43.6382 ], [ 1.4399, 43.6382 ], [ 1.4418, 43.6384 ], [ 1.4418, 43.6385 ], [ 1.4419, 43.6388 ], [ 1.4419, 43.6389 ], [ 1.4418, 43.6393 ], [ 1.4417, 43.64 ], [ 1.4416, 43.6404 ], [ 1.4392, 43.6403 ], [ 1.4391, 43.6418 ], [ 1.4391, 43.6429 ], [ 1.4406, 43.6431 ], [ 1.4413, 43.6432 ], [ 1.4419, 43.6432 ], [ 1.4422, 43.6435 ], [ 1.4434, 43.6431 ], [ 1.4445, 43.6429 ], [ 1.4444, 43.6423 ], [ 1.4444, 43.6409 ], [ 1.4444, 43.6401 ], [ 1.4451, 43.6401 ], [ 1.4451, 43.6395 ], [ 1.4453, 43.6395 ], [ 1.4452, 43.639 ], [ 1.4454, 43.6389 ], [ 1.4453, 43.6379 ], [ 1.4456, 43.6379 ], [ 1.4455, 43.6376 ], [ 1.4454, 43.6373 ], [ 1.4448, 43.6374 ], [ 1.4447, 43.6372 ], [ 1.4447, 43.6369 ], [ 1.4447, 43.6364 ], [ 1.4446, 43.636 ], [ 1.4442, 43.6361 ], [ 1.4441, 43.6356 ], [ 1.4439, 43.6356 ], [ 1.4439, 43.6354 ], [ 1.4434, 43.6356 ], [ 1.4426, 43.635 ], [ 1.4419, 43.6344 ], [ 1.4417, 43.6341 ], [ 1.4413, 43.6332 ], [ 1.4411, 43.6328 ], [ 1.441, 43.6327 ], [ 1.44, 43.6346 ], [ 1.4392, 43.6344 ], [ 1.4391, 43.6346 ], [ 1.4389, 43.6346 ], [ 1.4383, 43.6348 ], [ 1.4379, 43.6348 ], [ 1.4378, 43.6346 ], [ 1.4377, 43.6345 ], [ 1.4368, 43.6345 ], [ 1.4368, 43.6345 ], [ 1.4369, 43.6346 ], [ 1.4369, 43.6347 ], [ 1.4367, 43.6347 ], [ 1.4365, 43.6347 ], [ 1.4364, 43.6348 ], [ 1.4364, 43.6349 ], [ 1.4363, 43.6349 ], [ 1.436, 43.635 ], [ 1.4356, 43.635 ], [ 1.4356, 43.6346 ], [ 1.4356, 43.6343 ], [ 1.4342, 43.6344 ], [ 1.4342, 43.6346 ], [ 1.4341, 43.6346 ], [ 1.4335, 43.6346 ], [ 1.4331, 43.6346 ] ] ], "type": "Polygon" }, "id": "66", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031011", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Les Izards - La Vache" }, "type": "Feature" }, { "bbox": [ 0.0491, 43.2277, 0.0564, 43.2315 ], "geometry": { "coordinates": [ [ [ 0.0497, 43.2288 ], [ 0.05, 43.229 ], [ 0.0503, 43.2292 ], [ 0.0507, 43.2293 ], [ 0.0513, 43.2294 ], [ 0.0518, 43.2293 ], [ 0.0523, 43.2293 ], [ 0.0528, 43.2293 ], [ 0.0535, 43.2293 ], [ 0.0543, 43.2294 ], [ 0.0546, 43.2295 ], [ 0.0546, 43.2296 ], [ 0.0546, 43.23 ], [ 0.054, 43.23 ], [ 0.054, 43.2301 ], [ 0.054, 43.2302 ], [ 0.0539, 43.2315 ], [ 0.0546, 43.2315 ], [ 0.0546, 43.2313 ], [ 0.0547, 43.2311 ], [ 0.0548, 43.2309 ], [ 0.0549, 43.231 ], [ 0.0556, 43.231 ], [ 0.0558, 43.231 ], [ 0.0558, 43.2309 ], [ 0.0564, 43.2309 ], [ 0.0564, 43.2303 ], [ 0.0564, 43.2296 ], [ 0.0559, 43.2296 ], [ 0.0557, 43.2296 ], [ 0.0555, 43.2295 ], [ 0.0556, 43.2293 ], [ 0.0548, 43.2293 ], [ 0.0547, 43.2293 ], [ 0.0543, 43.2293 ], [ 0.0543, 43.228 ], [ 0.0539, 43.2281 ], [ 0.0534, 43.2281 ], [ 0.0534, 43.2277 ], [ 0.052, 43.2278 ], [ 0.0504, 43.2278 ], [ 0.0497, 43.2278 ], [ 0.0497, 43.2279 ], [ 0.0496, 43.2279 ], [ 0.0493, 43.2279 ], [ 0.0493, 43.228 ], [ 0.0493, 43.228 ], [ 0.0492, 43.2281 ], [ 0.0492, 43.2281 ], [ 0.0491, 43.2281 ], [ 0.0491, 43.2282 ], [ 0.0495, 43.2285 ], [ 0.0497, 43.2288 ], [ 0.0497, 43.2288 ] ] ], "type": "Polygon" }, "id": "67", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065001", "commune_qp": "Tarbes", "nom_commune": "Tarbes", "nom_qp": "Tarbes Ouest" }, "type": "Feature" }, { "bbox": [ 3.8367, 43.5925, 3.8495, 43.6013 ], "geometry": { "coordinates": [ [ [ 3.8479, 43.5999 ], [ 3.8475, 43.5997 ], [ 3.8472, 43.5994 ], [ 3.8466, 43.5987 ], [ 3.8464, 43.5985 ], [ 3.8469, 43.5984 ], [ 3.8467, 43.5979 ], [ 3.8464, 43.5974 ], [ 3.8459, 43.5977 ], [ 3.8455, 43.5972 ], [ 3.8457, 43.5971 ], [ 3.846, 43.597 ], [ 3.8458, 43.5968 ], [ 3.8463, 43.5965 ], [ 3.846, 43.5962 ], [ 3.845, 43.5966 ], [ 3.8436, 43.5972 ], [ 3.8428, 43.5976 ], [ 3.8418, 43.5966 ], [ 3.8422, 43.5965 ], [ 3.8421, 43.5964 ], [ 3.8418, 43.5961 ], [ 3.8415, 43.5959 ], [ 3.8413, 43.5956 ], [ 3.841, 43.5956 ], [ 3.8409, 43.5955 ], [ 3.8407, 43.5954 ], [ 3.8404, 43.5952 ], [ 3.8401, 43.595 ], [ 3.8398, 43.5947 ], [ 3.8401, 43.5944 ], [ 3.8404, 43.5946 ], [ 3.8405, 43.5945 ], [ 3.8408, 43.5946 ], [ 3.841, 43.5944 ], [ 3.8412, 43.5942 ], [ 3.8414, 43.5943 ], [ 3.8414, 43.5943 ], [ 3.8415, 43.5943 ], [ 3.8416, 43.5943 ], [ 3.8418, 43.5943 ], [ 3.8424, 43.5946 ], [ 3.8425, 43.5946 ], [ 3.8425, 43.5946 ], [ 3.8426, 43.5946 ], [ 3.8431, 43.5935 ], [ 3.8431, 43.5934 ], [ 3.843, 43.5934 ], [ 3.8425, 43.5935 ], [ 3.8422, 43.5929 ], [ 3.8417, 43.5926 ], [ 3.8416, 43.5925 ], [ 3.8415, 43.5925 ], [ 3.8407, 43.5932 ], [ 3.8406, 43.5932 ], [ 3.8405, 43.5933 ], [ 3.8399, 43.5931 ], [ 3.8396, 43.593 ], [ 3.8388, 43.5942 ], [ 3.8386, 43.5942 ], [ 3.8385, 43.5943 ], [ 3.8388, 43.5946 ], [ 3.8385, 43.5948 ], [ 3.8382, 43.5946 ], [ 3.8378, 43.5948 ], [ 3.8376, 43.5947 ], [ 3.8374, 43.5949 ], [ 3.8372, 43.595 ], [ 3.8369, 43.5949 ], [ 3.8367, 43.5952 ], [ 3.8369, 43.5953 ], [ 3.837, 43.5955 ], [ 3.8369, 43.5956 ], [ 3.8368, 43.5957 ], [ 3.8368, 43.5958 ], [ 3.8368, 43.5959 ], [ 3.8368, 43.5961 ], [ 3.8369, 43.5961 ], [ 3.8372, 43.5963 ], [ 3.8375, 43.5965 ], [ 3.8378, 43.5966 ], [ 3.8385, 43.5968 ], [ 3.839, 43.5963 ], [ 3.8388, 43.5961 ], [ 3.8391, 43.5958 ], [ 3.8393, 43.5956 ], [ 3.8394, 43.5956 ], [ 3.8395, 43.5957 ], [ 3.8396, 43.5957 ], [ 3.8399, 43.5961 ], [ 3.84, 43.5962 ], [ 3.8401, 43.5964 ], [ 3.8405, 43.5966 ], [ 3.8412, 43.5969 ], [ 3.8415, 43.5971 ], [ 3.8418, 43.5984 ], [ 3.8431, 43.5996 ], [ 3.8454, 43.6008 ], [ 3.8461, 43.6011 ], [ 3.8466, 43.6012 ], [ 3.8484, 43.6013 ], [ 3.8494, 43.601 ], [ 3.8495, 43.6008 ], [ 3.8484, 43.6003 ], [ 3.8479, 43.5999 ] ] ], "type": "Polygon" }, "id": "68", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034007", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Pas Du Loup - Val De Croze" }, "type": "Feature" }, { "bbox": [ 2.5906, 44.3632, 2.6018, 44.3674 ], "geometry": { "coordinates": [ [ [ 2.5926, 44.3671 ], [ 2.5927, 44.3672 ], [ 2.5929, 44.3674 ], [ 2.5933, 44.3672 ], [ 2.594, 44.367 ], [ 2.5947, 44.3668 ], [ 2.5949, 44.3667 ], [ 2.5954, 44.3666 ], [ 2.5956, 44.3665 ], [ 2.5965, 44.3661 ], [ 2.5972, 44.3656 ], [ 2.5977, 44.3652 ], [ 2.598, 44.365 ], [ 2.5988, 44.3655 ], [ 2.5996, 44.3653 ], [ 2.5998, 44.3653 ], [ 2.6001, 44.3652 ], [ 2.6005, 44.3647 ], [ 2.6006, 44.3646 ], [ 2.6006, 44.3646 ], [ 2.6009, 44.3646 ], [ 2.6013, 44.3645 ], [ 2.6014, 44.3645 ], [ 2.6016, 44.3645 ], [ 2.6017, 44.3644 ], [ 2.6018, 44.3643 ], [ 2.6016, 44.3643 ], [ 2.6015, 44.3642 ], [ 2.6013, 44.3641 ], [ 2.6011, 44.3641 ], [ 2.6016, 44.3638 ], [ 2.6018, 44.3634 ], [ 2.6015, 44.3632 ], [ 2.6011, 44.3634 ], [ 2.6009, 44.3635 ], [ 2.6003, 44.3639 ], [ 2.5994, 44.3637 ], [ 2.5991, 44.3636 ], [ 2.5974, 44.3635 ], [ 2.597, 44.3636 ], [ 2.5969, 44.3637 ], [ 2.5967, 44.3638 ], [ 2.5963, 44.3641 ], [ 2.5959, 44.3642 ], [ 2.5955, 44.3643 ], [ 2.5947, 44.3645 ], [ 2.5945, 44.3645 ], [ 2.5942, 44.3645 ], [ 2.5941, 44.3643 ], [ 2.594, 44.3641 ], [ 2.5927, 44.3642 ], [ 2.5924, 44.3642 ], [ 2.5922, 44.3642 ], [ 2.592, 44.3642 ], [ 2.5919, 44.3643 ], [ 2.5918, 44.3644 ], [ 2.5919, 44.3647 ], [ 2.5921, 44.3646 ], [ 2.5921, 44.3648 ], [ 2.5921, 44.3649 ], [ 2.5921, 44.3651 ], [ 2.592, 44.3651 ], [ 2.5919, 44.3652 ], [ 2.5919, 44.3652 ], [ 2.5919, 44.3653 ], [ 2.5919, 44.3653 ], [ 2.5919, 44.3654 ], [ 2.592, 44.3654 ], [ 2.592, 44.3655 ], [ 2.5918, 44.3656 ], [ 2.5918, 44.3657 ], [ 2.5911, 44.3657 ], [ 2.5912, 44.3658 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.366 ], [ 2.5906, 44.3661 ], [ 2.5907, 44.3663 ], [ 2.5908, 44.3663 ], [ 2.5909, 44.3663 ], [ 2.5911, 44.3662 ], [ 2.5913, 44.3664 ], [ 2.592, 44.3664 ], [ 2.5921, 44.3664 ], [ 2.5926, 44.3671 ] ] ], "type": "Polygon" }, "id": "69", "properties": { "code_commune": "12176", "code_departement": "12", "code_qp": "QP012001", "commune_qp": "Onet-le-Château", "nom_commune": "Onet-le-Château", "nom_qp": "Quatre Saisons" }, "type": "Feature" }, { "bbox": [ -0.0437, 43.0836, -0.0404, 43.0895 ], "geometry": { "coordinates": [ [ [ -0.0418, 43.0892 ], [ -0.0417, 43.0895 ], [ -0.0408, 43.0893 ], [ -0.0404, 43.0888 ], [ -0.0405, 43.0885 ], [ -0.0406, 43.0883 ], [ -0.0407, 43.088 ], [ -0.0408, 43.0879 ], [ -0.0408, 43.0878 ], [ -0.0409, 43.0877 ], [ -0.0407, 43.0872 ], [ -0.0407, 43.0869 ], [ -0.0407, 43.0868 ], [ -0.0407, 43.0867 ], [ -0.0412, 43.0865 ], [ -0.0419, 43.0865 ], [ -0.0421, 43.0865 ], [ -0.0421, 43.086 ], [ -0.0421, 43.0851 ], [ -0.0414, 43.0845 ], [ -0.0414, 43.0843 ], [ -0.0414, 43.0841 ], [ -0.0414, 43.0838 ], [ -0.0415, 43.0838 ], [ -0.0416, 43.0837 ], [ -0.0417, 43.0837 ], [ -0.0421, 43.0837 ], [ -0.0429, 43.0836 ], [ -0.0433, 43.0836 ], [ -0.0437, 43.0836 ], [ -0.0437, 43.0837 ], [ -0.0435, 43.0838 ], [ -0.0434, 43.0851 ], [ -0.0433, 43.0851 ], [ -0.0433, 43.0856 ], [ -0.0433, 43.0861 ], [ -0.0433, 43.0861 ], [ -0.0432, 43.0865 ], [ -0.0432, 43.0867 ], [ -0.0431, 43.0867 ], [ -0.043, 43.0875 ], [ -0.0429, 43.0881 ], [ -0.0427, 43.0891 ], [ -0.0427, 43.0893 ], [ -0.0418, 43.0892 ] ] ], "type": "Polygon" }, "id": "70", "properties": { "code_commune": "65286", "code_departement": "65", "code_qp": "QP065004", "commune_qp": "Lourdes", "nom_commune": "Lourdes", "nom_qp": "Ophite" }, "type": "Feature" }, { "bbox": [ 4.3577, 43.8386, 4.3726, 43.8447 ], "geometry": { "coordinates": [ [ [ 4.3726, 43.8407 ], [ 4.3721, 43.8405 ], [ 4.3712, 43.8403 ], [ 4.3707, 43.8402 ], [ 4.3701, 43.8397 ], [ 4.3695, 43.8393 ], [ 4.3691, 43.839 ], [ 4.3688, 43.8388 ], [ 4.3665, 43.8391 ], [ 4.3657, 43.8391 ], [ 4.3645, 43.8392 ], [ 4.3643, 43.8393 ], [ 4.3641, 43.8392 ], [ 4.3637, 43.839 ], [ 4.3634, 43.8392 ], [ 4.3635, 43.8396 ], [ 4.3635, 43.8398 ], [ 4.3635, 43.8398 ], [ 4.363, 43.84 ], [ 4.3629, 43.84 ], [ 4.3626, 43.8393 ], [ 4.3626, 43.8391 ], [ 4.3626, 43.8391 ], [ 4.3626, 43.839 ], [ 4.3625, 43.8389 ], [ 4.3624, 43.8388 ], [ 4.3622, 43.8387 ], [ 4.3621, 43.8387 ], [ 4.362, 43.8386 ], [ 4.3617, 43.8386 ], [ 4.3616, 43.8386 ], [ 4.3615, 43.8387 ], [ 4.3612, 43.8388 ], [ 4.3606, 43.8391 ], [ 4.3605, 43.8391 ], [ 4.3604, 43.8391 ], [ 4.3599, 43.839 ], [ 4.3599, 43.8393 ], [ 4.3599, 43.8395 ], [ 4.3602, 43.84 ], [ 4.3603, 43.8403 ], [ 4.3603, 43.8404 ], [ 4.36, 43.8404 ], [ 4.3598, 43.8405 ], [ 4.3596, 43.8405 ], [ 4.3591, 43.8405 ], [ 4.3589, 43.8405 ], [ 4.3581, 43.8404 ], [ 4.358, 43.8408 ], [ 4.3579, 43.8413 ], [ 4.3579, 43.8415 ], [ 4.3577, 43.8419 ], [ 4.3582, 43.842 ], [ 4.3583, 43.8421 ], [ 4.3582, 43.8423 ], [ 4.3579, 43.8429 ], [ 4.3577, 43.8433 ], [ 4.3582, 43.8433 ], [ 4.3582, 43.8434 ], [ 4.3587, 43.8435 ], [ 4.3587, 43.8435 ], [ 4.3595, 43.8436 ], [ 4.3597, 43.8436 ], [ 4.3602, 43.8436 ], [ 4.3607, 43.8437 ], [ 4.3607, 43.8437 ], [ 4.3615, 43.8438 ], [ 4.3623, 43.8438 ], [ 4.3624, 43.8436 ], [ 4.3625, 43.8434 ], [ 4.3626, 43.8433 ], [ 4.3625, 43.8423 ], [ 4.3624, 43.8416 ], [ 4.3623, 43.841 ], [ 4.3622, 43.8403 ], [ 4.3629, 43.8402 ], [ 4.3649, 43.8401 ], [ 4.3652, 43.8402 ], [ 4.3656, 43.8404 ], [ 4.3663, 43.841 ], [ 4.3672, 43.8417 ], [ 4.3672, 43.8417 ], [ 4.3675, 43.8426 ], [ 4.3676, 43.8428 ], [ 4.3677, 43.8435 ], [ 4.3677, 43.8437 ], [ 4.3677, 43.8442 ], [ 4.3677, 43.8447 ], [ 4.3686, 43.844 ], [ 4.3692, 43.8433 ], [ 4.3696, 43.8429 ], [ 4.3698, 43.8427 ], [ 4.3704, 43.8423 ], [ 4.3704, 43.8423 ], [ 4.3716, 43.8425 ], [ 4.3718, 43.8419 ], [ 4.372, 43.8415 ], [ 4.372, 43.8415 ], [ 4.372, 43.8415 ], [ 4.3722, 43.8415 ], [ 4.3726, 43.8407 ] ] ], "type": "Polygon" }, "id": "71", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030004", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Gambetta-Richelieu" }, "type": "Feature" }, { "bbox": [ 3.8427, 43.617, 3.8555, 43.6246 ], "geometry": { "coordinates": [ [ [ 3.8548, 43.6206 ], [ 3.8549, 43.6201 ], [ 3.8543, 43.6201 ], [ 3.8533, 43.6201 ], [ 3.8521, 43.62 ], [ 3.8505, 43.62 ], [ 3.8482, 43.6213 ], [ 3.8475, 43.6212 ], [ 3.8475, 43.6212 ], [ 3.8474, 43.6212 ], [ 3.847, 43.6213 ], [ 3.8465, 43.621 ], [ 3.8465, 43.621 ], [ 3.8465, 43.6209 ], [ 3.8465, 43.6208 ], [ 3.8459, 43.6207 ], [ 3.8459, 43.6207 ], [ 3.8458, 43.6207 ], [ 3.8458, 43.6205 ], [ 3.8459, 43.6202 ], [ 3.8461, 43.6199 ], [ 3.8462, 43.6198 ], [ 3.8462, 43.6198 ], [ 3.8462, 43.6197 ], [ 3.8463, 43.6196 ], [ 3.8464, 43.6195 ], [ 3.8464, 43.6194 ], [ 3.8465, 43.6192 ], [ 3.8466, 43.6191 ], [ 3.8466, 43.619 ], [ 3.8466, 43.6189 ], [ 3.8466, 43.6187 ], [ 3.8462, 43.6186 ], [ 3.8463, 43.6184 ], [ 3.8469, 43.6179 ], [ 3.8474, 43.618 ], [ 3.8477, 43.6174 ], [ 3.8471, 43.6174 ], [ 3.8465, 43.6175 ], [ 3.8464, 43.6175 ], [ 3.8459, 43.617 ], [ 3.8459, 43.6171 ], [ 3.8458, 43.6171 ], [ 3.8452, 43.6171 ], [ 3.8451, 43.6171 ], [ 3.8439, 43.618 ], [ 3.8442, 43.6181 ], [ 3.8435, 43.6189 ], [ 3.8427, 43.6194 ], [ 3.8436, 43.6198 ], [ 3.8432, 43.6203 ], [ 3.8437, 43.6206 ], [ 3.8435, 43.6209 ], [ 3.8432, 43.6213 ], [ 3.8434, 43.6214 ], [ 3.8435, 43.6215 ], [ 3.8437, 43.6215 ], [ 3.8438, 43.6215 ], [ 3.8443, 43.6215 ], [ 3.8444, 43.6217 ], [ 3.8444, 43.6219 ], [ 3.8446, 43.6219 ], [ 3.8447, 43.622 ], [ 3.844, 43.6225 ], [ 3.8444, 43.623 ], [ 3.8452, 43.6225 ], [ 3.8459, 43.6221 ], [ 3.8468, 43.6218 ], [ 3.8473, 43.6217 ], [ 3.8477, 43.6216 ], [ 3.8478, 43.6217 ], [ 3.8479, 43.6217 ], [ 3.8481, 43.6218 ], [ 3.8481, 43.6218 ], [ 3.8483, 43.6224 ], [ 3.8491, 43.6222 ], [ 3.8492, 43.6222 ], [ 3.8498, 43.6224 ], [ 3.8499, 43.6224 ], [ 3.85, 43.6224 ], [ 3.8504, 43.623 ], [ 3.8495, 43.6234 ], [ 3.8492, 43.6237 ], [ 3.8492, 43.6238 ], [ 3.8492, 43.6238 ], [ 3.8493, 43.6241 ], [ 3.8493, 43.6243 ], [ 3.8494, 43.6243 ], [ 3.8498, 43.6245 ], [ 3.85, 43.6246 ], [ 3.8501, 43.6245 ], [ 3.8504, 43.6244 ], [ 3.8509, 43.624 ], [ 3.8513, 43.6235 ], [ 3.8516, 43.6233 ], [ 3.8519, 43.6231 ], [ 3.852, 43.6231 ], [ 3.8525, 43.6235 ], [ 3.8529, 43.6237 ], [ 3.8537, 43.6231 ], [ 3.8536, 43.623 ], [ 3.8535, 43.6227 ], [ 3.8538, 43.6226 ], [ 3.8542, 43.6226 ], [ 3.8545, 43.6226 ], [ 3.8547, 43.6224 ], [ 3.8555, 43.6219 ], [ 3.855, 43.6217 ], [ 3.855, 43.6217 ], [ 3.8545, 43.6216 ], [ 3.8544, 43.6215 ], [ 3.855, 43.6212 ], [ 3.8551, 43.6211 ], [ 3.8552, 43.6209 ], [ 3.8549, 43.6206 ], [ 3.8548, 43.6206 ] ] ], "type": "Polygon" }, "id": "72", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034008", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Cévennes" }, "type": "Feature" }, { "bbox": [ 4.3816, 43.8369, 4.396, 43.8472 ], "geometry": { "coordinates": [ [ [ 4.3863, 43.8422 ], [ 4.3821, 43.8428 ], [ 4.3817, 43.8429 ], [ 4.3816, 43.843 ], [ 4.3816, 43.8432 ], [ 4.3829, 43.8443 ], [ 4.3826, 43.8444 ], [ 4.3825, 43.8446 ], [ 4.3824, 43.8447 ], [ 4.3821, 43.8448 ], [ 4.3822, 43.8454 ], [ 4.3849, 43.8461 ], [ 4.385, 43.846 ], [ 4.3839, 43.8451 ], [ 4.3843, 43.8449 ], [ 4.3846, 43.8447 ], [ 4.3852, 43.8444 ], [ 4.3856, 43.8445 ], [ 4.3863, 43.8449 ], [ 4.3866, 43.8451 ], [ 4.3871, 43.8453 ], [ 4.3874, 43.8454 ], [ 4.3879, 43.8456 ], [ 4.3884, 43.8458 ], [ 4.3888, 43.846 ], [ 4.3892, 43.8463 ], [ 4.3896, 43.8465 ], [ 4.3898, 43.8466 ], [ 4.39, 43.8466 ], [ 4.3901, 43.8467 ], [ 4.3903, 43.8467 ], [ 4.3905, 43.8468 ], [ 4.3907, 43.8468 ], [ 4.3916, 43.8469 ], [ 4.3929, 43.8469 ], [ 4.3942, 43.8471 ], [ 4.3949, 43.8472 ], [ 4.3959, 43.8471 ], [ 4.396, 43.8469 ], [ 4.3955, 43.8466 ], [ 4.3952, 43.8463 ], [ 4.3949, 43.8461 ], [ 4.3947, 43.8459 ], [ 4.3942, 43.8454 ], [ 4.3935, 43.8448 ], [ 4.3925, 43.8441 ], [ 4.3916, 43.8433 ], [ 4.3913, 43.8431 ], [ 4.3905, 43.8423 ], [ 4.3904, 43.8422 ], [ 4.3903, 43.8421 ], [ 4.39, 43.8418 ], [ 4.3897, 43.8415 ], [ 4.3897, 43.8412 ], [ 4.3895, 43.841 ], [ 4.389, 43.8401 ], [ 4.3885, 43.8389 ], [ 4.3881, 43.8372 ], [ 4.388, 43.837 ], [ 4.3875, 43.8369 ], [ 4.3871, 43.8369 ], [ 4.3869, 43.8375 ], [ 4.3867, 43.8383 ], [ 4.3866, 43.8388 ], [ 4.3866, 43.8389 ], [ 4.3868, 43.839 ], [ 4.3873, 43.8392 ], [ 4.3873, 43.8393 ], [ 4.3872, 43.8396 ], [ 4.3869, 43.8402 ], [ 4.3882, 43.8405 ], [ 4.388, 43.8409 ], [ 4.3885, 43.8411 ], [ 4.3886, 43.8411 ], [ 4.3885, 43.8414 ], [ 4.3874, 43.8412 ], [ 4.3873, 43.8412 ], [ 4.3872, 43.8417 ], [ 4.3867, 43.8416 ], [ 4.3865, 43.8416 ], [ 4.3862, 43.8421 ], [ 4.3863, 43.8422 ] ] ], "type": "Polygon" }, "id": "73", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030005", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Chemin-Bas D'Avignon - Clos D'Orville" }, "type": "Feature" }, { "bbox": [ 4.3932, 43.8528, 4.4027, 43.8608 ], "geometry": { "coordinates": [ [ [ 4.3977, 43.8531 ], [ 4.3975, 43.8528 ], [ 4.3972, 43.8529 ], [ 4.3973, 43.8531 ], [ 4.3969, 43.8532 ], [ 4.397, 43.8534 ], [ 4.3969, 43.8538 ], [ 4.3968, 43.8543 ], [ 4.3966, 43.8546 ], [ 4.3967, 43.8546 ], [ 4.3965, 43.8548 ], [ 4.3963, 43.8552 ], [ 4.3962, 43.8554 ], [ 4.3962, 43.8554 ], [ 4.3957, 43.8553 ], [ 4.3956, 43.8553 ], [ 4.3954, 43.8552 ], [ 4.3953, 43.8552 ], [ 4.395, 43.8556 ], [ 4.3947, 43.856 ], [ 4.3946, 43.8559 ], [ 4.3944, 43.8561 ], [ 4.3944, 43.8561 ], [ 4.3944, 43.8562 ], [ 4.3943, 43.8562 ], [ 4.3942, 43.8562 ], [ 4.3941, 43.8563 ], [ 4.394, 43.8563 ], [ 4.3936, 43.8563 ], [ 4.3934, 43.8567 ], [ 4.3935, 43.8567 ], [ 4.3933, 43.857 ], [ 4.3932, 43.857 ], [ 4.3932, 43.8571 ], [ 4.3935, 43.8573 ], [ 4.3938, 43.8575 ], [ 4.394, 43.8576 ], [ 4.3942, 43.8577 ], [ 4.3945, 43.8578 ], [ 4.3945, 43.8578 ], [ 4.3944, 43.8579 ], [ 4.3944, 43.8581 ], [ 4.3943, 43.8582 ], [ 4.3943, 43.8583 ], [ 4.3943, 43.8585 ], [ 4.3944, 43.8586 ], [ 4.3946, 43.8586 ], [ 4.3949, 43.8586 ], [ 4.395, 43.8587 ], [ 4.3949, 43.8592 ], [ 4.395, 43.8593 ], [ 4.3957, 43.8595 ], [ 4.3959, 43.8596 ], [ 4.396, 43.8596 ], [ 4.3962, 43.8596 ], [ 4.3964, 43.8593 ], [ 4.3964, 43.8589 ], [ 4.3961, 43.8589 ], [ 4.3961, 43.8589 ], [ 4.3958, 43.8588 ], [ 4.3957, 43.8586 ], [ 4.3957, 43.8584 ], [ 4.3957, 43.8583 ], [ 4.3957, 43.8582 ], [ 4.3961, 43.8582 ], [ 4.3963, 43.8583 ], [ 4.3963, 43.8582 ], [ 4.3964, 43.8582 ], [ 4.3965, 43.8583 ], [ 4.3966, 43.8583 ], [ 4.3966, 43.8585 ], [ 4.3965, 43.8586 ], [ 4.3964, 43.8589 ], [ 4.397, 43.8589 ], [ 4.3973, 43.8589 ], [ 4.3975, 43.8588 ], [ 4.3974, 43.8587 ], [ 4.3973, 43.8585 ], [ 4.3972, 43.8583 ], [ 4.3972, 43.8583 ], [ 4.3971, 43.8582 ], [ 4.3971, 43.8581 ], [ 4.3971, 43.8579 ], [ 4.3971, 43.8577 ], [ 4.3972, 43.8575 ], [ 4.3977, 43.8575 ], [ 4.3976, 43.8577 ], [ 4.3977, 43.8577 ], [ 4.3981, 43.8579 ], [ 4.3983, 43.858 ], [ 4.3984, 43.858 ], [ 4.3986, 43.8582 ], [ 4.3984, 43.8584 ], [ 4.3983, 43.8583 ], [ 4.3983, 43.8584 ], [ 4.3982, 43.8584 ], [ 4.3981, 43.8585 ], [ 4.398, 43.8586 ], [ 4.398, 43.8586 ], [ 4.3981, 43.8586 ], [ 4.3983, 43.8586 ], [ 4.3986, 43.8586 ], [ 4.3988, 43.8588 ], [ 4.399, 43.8589 ], [ 4.3993, 43.8592 ], [ 4.3987, 43.8597 ], [ 4.3989, 43.8599 ], [ 4.3997, 43.8592 ], [ 4.3998, 43.8593 ], [ 4.3998, 43.8594 ], [ 4.4, 43.8595 ], [ 4.4001, 43.8597 ], [ 4.4002, 43.8597 ], [ 4.4003, 43.8597 ], [ 4.4007, 43.8599 ], [ 4.4011, 43.8603 ], [ 4.401, 43.8603 ], [ 4.4015, 43.8608 ], [ 4.4018, 43.8607 ], [ 4.4017, 43.8606 ], [ 4.402, 43.8604 ], [ 4.4022, 43.8605 ], [ 4.4023, 43.8605 ], [ 4.4024, 43.8605 ], [ 4.4025, 43.8605 ], [ 4.4026, 43.8603 ], [ 4.4027, 43.8603 ], [ 4.4027, 43.8602 ], [ 4.4027, 43.8602 ], [ 4.4027, 43.86 ], [ 4.4024, 43.8593 ], [ 4.4023, 43.8591 ], [ 4.4021, 43.8587 ], [ 4.402, 43.8583 ], [ 4.4013, 43.8572 ], [ 4.4003, 43.8576 ], [ 4.4002, 43.8578 ], [ 4.4001, 43.8579 ], [ 4.4001, 43.8579 ], [ 4.4002, 43.8579 ], [ 4.4, 43.8582 ], [ 4.3999, 43.8581 ], [ 4.3997, 43.8581 ], [ 4.3996, 43.8581 ], [ 4.3995, 43.858 ], [ 4.3997, 43.8579 ], [ 4.3998, 43.8575 ], [ 4.3998, 43.8575 ], [ 4.3997, 43.8572 ], [ 4.3997, 43.8571 ], [ 4.3999, 43.8566 ], [ 4.4, 43.8564 ], [ 4.4001, 43.8563 ], [ 4.4001, 43.8563 ], [ 4.4002, 43.8562 ], [ 4.4004, 43.8561 ], [ 4.4005, 43.856 ], [ 4.4006, 43.8559 ], [ 4.4005, 43.8558 ], [ 4.4003, 43.8556 ], [ 4.4, 43.8554 ], [ 4.3995, 43.8551 ], [ 4.3991, 43.8548 ], [ 4.3989, 43.8546 ], [ 4.3986, 43.8544 ], [ 4.3982, 43.854 ], [ 4.3981, 43.8538 ], [ 4.398, 43.8538 ], [ 4.3979, 43.8534 ], [ 4.3979, 43.8533 ], [ 4.3977, 43.8531 ] ] ], "type": "Polygon" }, "id": "74", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030006", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Mas De Mingue" }, "type": "Feature" }, { "bbox": [ 3.8752, 43.58, 3.8901, 43.5942 ], "geometry": { "coordinates": [ [ [ 3.8763, 43.5812 ], [ 3.8766, 43.5814 ], [ 3.8762, 43.5818 ], [ 3.8766, 43.5821 ], [ 3.8769, 43.5822 ], [ 3.8773, 43.5822 ], [ 3.8776, 43.5822 ], [ 3.8779, 43.5821 ], [ 3.8782, 43.582 ], [ 3.8784, 43.5819 ], [ 3.8786, 43.5817 ], [ 3.8797, 43.5822 ], [ 3.8805, 43.5829 ], [ 3.8829, 43.5865 ], [ 3.884, 43.588 ], [ 3.8827, 43.5884 ], [ 3.8838, 43.5894 ], [ 3.8836, 43.5894 ], [ 3.8844, 43.5906 ], [ 3.8832, 43.5911 ], [ 3.8822, 43.5915 ], [ 3.883, 43.5927 ], [ 3.8824, 43.5929 ], [ 3.8826, 43.5932 ], [ 3.8839, 43.5927 ], [ 3.8845, 43.5935 ], [ 3.8848, 43.5938 ], [ 3.8852, 43.5942 ], [ 3.8854, 43.5941 ], [ 3.8856, 43.5939 ], [ 3.8859, 43.5937 ], [ 3.8861, 43.5935 ], [ 3.8863, 43.5933 ], [ 3.8861, 43.5931 ], [ 3.8861, 43.593 ], [ 3.8862, 43.5929 ], [ 3.8867, 43.5924 ], [ 3.8854, 43.5907 ], [ 3.8857, 43.5905 ], [ 3.8856, 43.5902 ], [ 3.886, 43.5901 ], [ 3.8876, 43.5896 ], [ 3.8879, 43.5895 ], [ 3.8886, 43.5894 ], [ 3.8894, 43.5894 ], [ 3.8896, 43.5894 ], [ 3.8895, 43.5891 ], [ 3.8897, 43.5889 ], [ 3.89, 43.5887 ], [ 3.8901, 43.5882 ], [ 3.89, 43.5879 ], [ 3.8895, 43.5872 ], [ 3.8892, 43.5868 ], [ 3.8887, 43.5857 ], [ 3.8883, 43.5853 ], [ 3.8882, 43.5846 ], [ 3.8881, 43.5843 ], [ 3.888, 43.5843 ], [ 3.8875, 43.5835 ], [ 3.8871, 43.5831 ], [ 3.886, 43.5821 ], [ 3.8856, 43.5819 ], [ 3.8837, 43.5812 ], [ 3.8824, 43.5808 ], [ 3.8821, 43.5807 ], [ 3.8819, 43.5808 ], [ 3.8813, 43.5811 ], [ 3.8812, 43.5813 ], [ 3.8809, 43.5815 ], [ 3.8804, 43.5818 ], [ 3.8789, 43.5815 ], [ 3.879, 43.5813 ], [ 3.879, 43.5812 ], [ 3.879, 43.581 ], [ 3.8788, 43.581 ], [ 3.8787, 43.581 ], [ 3.8786, 43.5808 ], [ 3.8784, 43.5806 ], [ 3.8782, 43.5804 ], [ 3.8778, 43.5802 ], [ 3.8776, 43.5802 ], [ 3.8775, 43.5802 ], [ 3.8771, 43.5802 ], [ 3.8767, 43.5803 ], [ 3.8765, 43.58 ], [ 3.8761, 43.5802 ], [ 3.8759, 43.58 ], [ 3.8752, 43.5804 ], [ 3.8762, 43.5806 ], [ 3.8763, 43.5807 ], [ 3.8764, 43.581 ], [ 3.8764, 43.5811 ], [ 3.8764, 43.5811 ], [ 3.8763, 43.5812 ] ] ], "type": "Polygon" }, "id": "75", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034012", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Près D'Arènes" }, "type": "Feature" }, { "bbox": [ 0.7183, 43.1062, 0.7301, 43.1123 ], "geometry": { "coordinates": [ [ [ 0.7224, 43.1089 ], [ 0.7222, 43.1095 ], [ 0.7222, 43.1098 ], [ 0.7217, 43.1097 ], [ 0.7215, 43.11 ], [ 0.7214, 43.11 ], [ 0.7213, 43.1101 ], [ 0.723, 43.1103 ], [ 0.7229, 43.1106 ], [ 0.7229, 43.1107 ], [ 0.7227, 43.111 ], [ 0.7228, 43.111 ], [ 0.7234, 43.1111 ], [ 0.7241, 43.1112 ], [ 0.7242, 43.1113 ], [ 0.7242, 43.1116 ], [ 0.7242, 43.1117 ], [ 0.7245, 43.1117 ], [ 0.7245, 43.1123 ], [ 0.7257, 43.1122 ], [ 0.7259, 43.1121 ], [ 0.7263, 43.1121 ], [ 0.7264, 43.1118 ], [ 0.7263, 43.1117 ], [ 0.7263, 43.1114 ], [ 0.7263, 43.1112 ], [ 0.7271, 43.1112 ], [ 0.7271, 43.1109 ], [ 0.7276, 43.1109 ], [ 0.7279, 43.1109 ], [ 0.7279, 43.1109 ], [ 0.728, 43.1102 ], [ 0.7283, 43.1103 ], [ 0.729, 43.1103 ], [ 0.729, 43.1105 ], [ 0.7292, 43.1105 ], [ 0.7294, 43.1105 ], [ 0.7295, 43.1106 ], [ 0.7297, 43.1106 ], [ 0.7298, 43.1107 ], [ 0.7299, 43.1107 ], [ 0.73, 43.1105 ], [ 0.7301, 43.1103 ], [ 0.7296, 43.1101 ], [ 0.729, 43.1096 ], [ 0.7286, 43.1095 ], [ 0.7286, 43.1093 ], [ 0.7286, 43.1091 ], [ 0.7298, 43.1065 ], [ 0.7295, 43.1065 ], [ 0.7292, 43.1066 ], [ 0.7286, 43.1067 ], [ 0.7283, 43.1067 ], [ 0.7278, 43.1069 ], [ 0.7277, 43.1069 ], [ 0.7276, 43.107 ], [ 0.7274, 43.1073 ], [ 0.7273, 43.1073 ], [ 0.7272, 43.1073 ], [ 0.7268, 43.1073 ], [ 0.7267, 43.1075 ], [ 0.7265, 43.1076 ], [ 0.7266, 43.1079 ], [ 0.7263, 43.1078 ], [ 0.7262, 43.1078 ], [ 0.7261, 43.1077 ], [ 0.7261, 43.1075 ], [ 0.726, 43.1075 ], [ 0.7259, 43.1074 ], [ 0.7253, 43.1071 ], [ 0.7252, 43.1071 ], [ 0.725, 43.1071 ], [ 0.7249, 43.1071 ], [ 0.7247, 43.107 ], [ 0.7238, 43.1068 ], [ 0.7229, 43.1065 ], [ 0.7221, 43.1063 ], [ 0.7217, 43.1062 ], [ 0.7215, 43.1062 ], [ 0.7215, 43.1062 ], [ 0.7212, 43.1063 ], [ 0.721, 43.1063 ], [ 0.7209, 43.1064 ], [ 0.7208, 43.1066 ], [ 0.7208, 43.1067 ], [ 0.7207, 43.1068 ], [ 0.7204, 43.1067 ], [ 0.72, 43.1066 ], [ 0.7191, 43.1063 ], [ 0.719, 43.1066 ], [ 0.7189, 43.1066 ], [ 0.7187, 43.1069 ], [ 0.7186, 43.1071 ], [ 0.7186, 43.1071 ], [ 0.7186, 43.1072 ], [ 0.7183, 43.1071 ], [ 0.7184, 43.1074 ], [ 0.7186, 43.1074 ], [ 0.7187, 43.1078 ], [ 0.7189, 43.1078 ], [ 0.719, 43.1079 ], [ 0.7191, 43.1079 ], [ 0.7191, 43.1082 ], [ 0.7191, 43.1083 ], [ 0.7191, 43.1088 ], [ 0.7189, 43.1088 ], [ 0.7191, 43.1091 ], [ 0.7201, 43.1086 ], [ 0.7202, 43.1086 ], [ 0.7207, 43.1084 ], [ 0.7208, 43.1084 ], [ 0.7209, 43.1085 ], [ 0.7209, 43.1085 ], [ 0.7217, 43.1087 ], [ 0.7224, 43.1089 ] ] ], "type": "Polygon" }, "id": "76", "properties": { "code_commune": "31483", "code_departement": "31", "code_qp": "QP031003", "commune_qp": "Saint-Gaudens", "nom_commune": "Saint-Gaudens", "nom_qp": "Coeur De Ville" }, "type": "Feature" }, { "bbox": [ 3.7479, 43.4489, 3.7537, 43.4538 ], "geometry": { "coordinates": [ [ [ 3.7501, 43.4538 ], [ 3.7503, 43.4535 ], [ 3.7504, 43.4534 ], [ 3.7506, 43.4532 ], [ 3.7509, 43.4529 ], [ 3.7509, 43.4528 ], [ 3.751, 43.4528 ], [ 3.7513, 43.4526 ], [ 3.7514, 43.4525 ], [ 3.7516, 43.4524 ], [ 3.7516, 43.4524 ], [ 3.7518, 43.4521 ], [ 3.7523, 43.4516 ], [ 3.7524, 43.4516 ], [ 3.7527, 43.4513 ], [ 3.7533, 43.451 ], [ 3.7534, 43.4509 ], [ 3.7537, 43.4505 ], [ 3.7534, 43.4503 ], [ 3.7529, 43.45 ], [ 3.7518, 43.4493 ], [ 3.7515, 43.4491 ], [ 3.7512, 43.4489 ], [ 3.7511, 43.4489 ], [ 3.7511, 43.449 ], [ 3.751, 43.4491 ], [ 3.7507, 43.4492 ], [ 3.7513, 43.4497 ], [ 3.7517, 43.45 ], [ 3.7519, 43.4502 ], [ 3.7521, 43.4503 ], [ 3.7524, 43.4504 ], [ 3.7518, 43.4508 ], [ 3.7517, 43.4508 ], [ 3.7514, 43.451 ], [ 3.7513, 43.4511 ], [ 3.7512, 43.4513 ], [ 3.751, 43.4512 ], [ 3.7507, 43.4514 ], [ 3.751, 43.4516 ], [ 3.7507, 43.4518 ], [ 3.7507, 43.4518 ], [ 3.7503, 43.4521 ], [ 3.7504, 43.4522 ], [ 3.7505, 43.4523 ], [ 3.7502, 43.4526 ], [ 3.7501, 43.4525 ], [ 3.7492, 43.4518 ], [ 3.7491, 43.4519 ], [ 3.7487, 43.4521 ], [ 3.7486, 43.4522 ], [ 3.7485, 43.4523 ], [ 3.7483, 43.4523 ], [ 3.7481, 43.4524 ], [ 3.748, 43.4525 ], [ 3.748, 43.4526 ], [ 3.7479, 43.4527 ], [ 3.7479, 43.4527 ], [ 3.748, 43.4528 ], [ 3.7481, 43.4531 ], [ 3.7483, 43.4533 ], [ 3.7484, 43.4534 ], [ 3.7485, 43.4535 ], [ 3.749, 43.4533 ], [ 3.7491, 43.4532 ], [ 3.7492, 43.4532 ], [ 3.7493, 43.4533 ], [ 3.7494, 43.4533 ], [ 3.7495, 43.4534 ], [ 3.7495, 43.4534 ], [ 3.7497, 43.4535 ], [ 3.7498, 43.4536 ], [ 3.7498, 43.4536 ], [ 3.7498, 43.4537 ], [ 3.7501, 43.4538 ] ] ], "type": "Polygon" }, "id": "77", "properties": { "code_commune": "34108", "code_departement": "34", "code_qp": "QP034016", "commune_qp": "Frontignan", "nom_commune": "Frontignan", "nom_qp": "Les Deux Pins" }, "type": "Feature" }, { "bbox": [ 3.6911, 43.3997, 3.701, 43.4078 ], "geometry": { "coordinates": [ [ [ 3.6965, 43.4013 ], [ 3.6964, 43.4009 ], [ 3.6962, 43.4002 ], [ 3.6961, 43.3998 ], [ 3.6951, 43.3998 ], [ 3.695, 43.3998 ], [ 3.695, 43.3997 ], [ 3.6946, 43.3997 ], [ 3.6943, 43.3997 ], [ 3.6941, 43.3997 ], [ 3.694, 43.3998 ], [ 3.694, 43.4 ], [ 3.6938, 43.4 ], [ 3.6935, 43.4 ], [ 3.6931, 43.3997 ], [ 3.6929, 43.4001 ], [ 3.6928, 43.4001 ], [ 3.6927, 43.4004 ], [ 3.6927, 43.4005 ], [ 3.6926, 43.4008 ], [ 3.6926, 43.4008 ], [ 3.6925, 43.4013 ], [ 3.6925, 43.4015 ], [ 3.6927, 43.4015 ], [ 3.6928, 43.4014 ], [ 3.6928, 43.4016 ], [ 3.6929, 43.4016 ], [ 3.6929, 43.4016 ], [ 3.693, 43.4016 ], [ 3.693, 43.4016 ], [ 3.6931, 43.4016 ], [ 3.6933, 43.4016 ], [ 3.6933, 43.4017 ], [ 3.6933, 43.4017 ], [ 3.6936, 43.4017 ], [ 3.6936, 43.4018 ], [ 3.6939, 43.4018 ], [ 3.6939, 43.4019 ], [ 3.6942, 43.4019 ], [ 3.6941, 43.4022 ], [ 3.6941, 43.4022 ], [ 3.6941, 43.4023 ], [ 3.6938, 43.4023 ], [ 3.6938, 43.4024 ], [ 3.6939, 43.4024 ], [ 3.6939, 43.4025 ], [ 3.6938, 43.4025 ], [ 3.6934, 43.4025 ], [ 3.6931, 43.4025 ], [ 3.6927, 43.4024 ], [ 3.6923, 43.4024 ], [ 3.6927, 43.4031 ], [ 3.6928, 43.4033 ], [ 3.6937, 43.4034 ], [ 3.6937, 43.4037 ], [ 3.6935, 43.4037 ], [ 3.6934, 43.4039 ], [ 3.6931, 43.4039 ], [ 3.6931, 43.4039 ], [ 3.693, 43.404 ], [ 3.6929, 43.4041 ], [ 3.6928, 43.4041 ], [ 3.6927, 43.4042 ], [ 3.6925, 43.4042 ], [ 3.6915, 43.4041 ], [ 3.6914, 43.4043 ], [ 3.6914, 43.4044 ], [ 3.6914, 43.4046 ], [ 3.6914, 43.4048 ], [ 3.6912, 43.4058 ], [ 3.6911, 43.4065 ], [ 3.6915, 43.4066 ], [ 3.692, 43.4066 ], [ 3.6919, 43.4067 ], [ 3.6925, 43.4067 ], [ 3.6925, 43.4068 ], [ 3.6928, 43.4068 ], [ 3.6927, 43.407 ], [ 3.693, 43.407 ], [ 3.693, 43.4067 ], [ 3.693, 43.4066 ], [ 3.6933, 43.4066 ], [ 3.6932, 43.4078 ], [ 3.6935, 43.4076 ], [ 3.6939, 43.4072 ], [ 3.6941, 43.4066 ], [ 3.6933, 43.4065 ], [ 3.6934, 43.406 ], [ 3.6935, 43.4055 ], [ 3.6935, 43.4053 ], [ 3.6935, 43.405 ], [ 3.6939, 43.4051 ], [ 3.6943, 43.4051 ], [ 3.6944, 43.404 ], [ 3.6945, 43.4037 ], [ 3.6945, 43.4036 ], [ 3.6943, 43.4036 ], [ 3.6944, 43.4033 ], [ 3.6943, 43.4033 ], [ 3.6943, 43.4033 ], [ 3.6944, 43.4032 ], [ 3.6944, 43.4032 ], [ 3.6945, 43.4032 ], [ 3.6946, 43.4029 ], [ 3.6945, 43.4029 ], [ 3.6945, 43.4027 ], [ 3.6945, 43.4026 ], [ 3.6946, 43.4026 ], [ 3.6946, 43.4025 ], [ 3.6945, 43.4024 ], [ 3.6945, 43.4019 ], [ 3.6947, 43.4019 ], [ 3.6951, 43.402 ], [ 3.6956, 43.402 ], [ 3.6956, 43.4016 ], [ 3.6959, 43.4016 ], [ 3.6959, 43.4018 ], [ 3.6959, 43.4018 ], [ 3.6958, 43.4018 ], [ 3.6958, 43.4018 ], [ 3.6959, 43.4018 ], [ 3.6959, 43.4019 ], [ 3.6958, 43.4019 ], [ 3.6958, 43.402 ], [ 3.6966, 43.402 ], [ 3.6967, 43.402 ], [ 3.6967, 43.4019 ], [ 3.697, 43.4018 ], [ 3.6977, 43.4018 ], [ 3.6977, 43.4025 ], [ 3.6981, 43.4025 ], [ 3.6981, 43.4028 ], [ 3.6984, 43.4028 ], [ 3.6986, 43.4028 ], [ 3.6986, 43.4027 ], [ 3.6987, 43.4027 ], [ 3.6991, 43.403 ], [ 3.699, 43.4031 ], [ 3.699, 43.4031 ], [ 3.6994, 43.4033 ], [ 3.6993, 43.404 ], [ 3.6994, 43.4045 ], [ 3.6994, 43.4045 ], [ 3.6993, 43.4048 ], [ 3.6993, 43.4049 ], [ 3.6992, 43.4049 ], [ 3.6992, 43.4049 ], [ 3.6991, 43.4051 ], [ 3.6991, 43.4052 ], [ 3.6991, 43.4052 ], [ 3.6991, 43.4052 ], [ 3.699, 43.4052 ], [ 3.699, 43.4054 ], [ 3.6993, 43.4054 ], [ 3.6993, 43.4055 ], [ 3.6993, 43.4055 ], [ 3.6993, 43.4056 ], [ 3.6989, 43.4055 ], [ 3.6989, 43.4056 ], [ 3.6992, 43.4056 ], [ 3.699, 43.4059 ], [ 3.6992, 43.406 ], [ 3.6995, 43.4057 ], [ 3.6996, 43.4056 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4059 ], [ 3.6999, 43.4059 ], [ 3.6999, 43.4061 ], [ 3.7001, 43.4061 ], [ 3.7001, 43.4062 ], [ 3.7002, 43.4062 ], [ 3.7004, 43.4062 ], [ 3.7004, 43.4064 ], [ 3.7003, 43.4066 ], [ 3.7001, 43.4067 ], [ 3.7003, 43.4068 ], [ 3.7006, 43.4066 ], [ 3.7005, 43.4065 ], [ 3.7006, 43.4065 ], [ 3.7007, 43.4065 ], [ 3.7007, 43.4064 ], [ 3.7006, 43.4064 ], [ 3.7006, 43.4063 ], [ 3.7008, 43.4063 ], [ 3.7008, 43.4062 ], [ 3.7006, 43.4063 ], [ 3.7006, 43.4062 ], [ 3.7006, 43.4062 ], [ 3.7008, 43.4061 ], [ 3.7007, 43.4061 ], [ 3.7005, 43.4061 ], [ 3.7005, 43.406 ], [ 3.7005, 43.4059 ], [ 3.7004, 43.4059 ], [ 3.7002, 43.4059 ], [ 3.7001, 43.4055 ], [ 3.7, 43.4054 ], [ 3.7007, 43.4054 ], [ 3.7007, 43.4053 ], [ 3.7003, 43.4052 ], [ 3.7004, 43.4052 ], [ 3.7002, 43.405 ], [ 3.7001, 43.4049 ], [ 3.7, 43.4048 ], [ 3.7001, 43.4046 ], [ 3.6998, 43.4046 ], [ 3.7, 43.4042 ], [ 3.7002, 43.4041 ], [ 3.7004, 43.4041 ], [ 3.7005, 43.4041 ], [ 3.7006, 43.4042 ], [ 3.7009, 43.404 ], [ 3.701, 43.4041 ], [ 3.701, 43.4036 ], [ 3.7004, 43.4033 ], [ 3.7005, 43.4032 ], [ 3.7004, 43.4031 ], [ 3.7003, 43.4033 ], [ 3.7002, 43.4033 ], [ 3.7003, 43.4031 ], [ 3.7001, 43.4031 ], [ 3.7001, 43.4032 ], [ 3.7, 43.4032 ], [ 3.7, 43.4031 ], [ 3.7, 43.4031 ], [ 3.6999, 43.4031 ], [ 3.6999, 43.4029 ], [ 3.6997, 43.4029 ], [ 3.6997, 43.4028 ], [ 3.6994, 43.4028 ], [ 3.6995, 43.4025 ], [ 3.6986, 43.4025 ], [ 3.6986, 43.4024 ], [ 3.6981, 43.4024 ], [ 3.6981, 43.4022 ], [ 3.6983, 43.4022 ], [ 3.6983, 43.4021 ], [ 3.6979, 43.4021 ], [ 3.698, 43.402 ], [ 3.698, 43.402 ], [ 3.698, 43.4019 ], [ 3.698, 43.4019 ], [ 3.698, 43.4019 ], [ 3.698, 43.4017 ], [ 3.6977, 43.4017 ], [ 3.697, 43.4015 ], [ 3.6966, 43.4016 ], [ 3.6965, 43.4013 ] ] ], "type": "Polygon" }, "id": "78", "properties": { "code_commune": "34301", "code_departement": "34", "code_qp": "QP034018", "commune_qp": "Sète", "nom_commune": "Sète", "nom_qp": "Centre Ville - Ile Sud" }, "type": "Feature" }, { "bbox": [ 4.6479, 44.2542, 4.6525, 44.2583 ], "geometry": { "coordinates": [ [ [ 4.6485, 44.2583 ], [ 4.6488, 44.2582 ], [ 4.649, 44.2582 ], [ 4.6492, 44.2581 ], [ 4.6493, 44.2581 ], [ 4.6498, 44.2581 ], [ 4.6499, 44.258 ], [ 4.65, 44.258 ], [ 4.65, 44.2579 ], [ 4.6501, 44.2579 ], [ 4.6501, 44.258 ], [ 4.6501, 44.2583 ], [ 4.6505, 44.2583 ], [ 4.6509, 44.2578 ], [ 4.6511, 44.2576 ], [ 4.6514, 44.2572 ], [ 4.6517, 44.2568 ], [ 4.6518, 44.2566 ], [ 4.6519, 44.2563 ], [ 4.652, 44.2561 ], [ 4.6523, 44.2554 ], [ 4.6524, 44.2551 ], [ 4.6524, 44.2551 ], [ 4.6524, 44.2547 ], [ 4.6525, 44.2543 ], [ 4.652, 44.2544 ], [ 4.6519, 44.2543 ], [ 4.6517, 44.2543 ], [ 4.6512, 44.2542 ], [ 4.6511, 44.2544 ], [ 4.6511, 44.2545 ], [ 4.6508, 44.2546 ], [ 4.6507, 44.2546 ], [ 4.6505, 44.2546 ], [ 4.6505, 44.2546 ], [ 4.6505, 44.2547 ], [ 4.6504, 44.2546 ], [ 4.6503, 44.2547 ], [ 4.6502, 44.2547 ], [ 4.6502, 44.2547 ], [ 4.6501, 44.2546 ], [ 4.6501, 44.2546 ], [ 4.65, 44.2546 ], [ 4.65, 44.2546 ], [ 4.6499, 44.2546 ], [ 4.6497, 44.2546 ], [ 4.6497, 44.2546 ], [ 4.6496, 44.2546 ], [ 4.6496, 44.2547 ], [ 4.6495, 44.2547 ], [ 4.6496, 44.2547 ], [ 4.6495, 44.2546 ], [ 4.6494, 44.2546 ], [ 4.6493, 44.2546 ], [ 4.6493, 44.2548 ], [ 4.6491, 44.2548 ], [ 4.649, 44.2548 ], [ 4.6485, 44.2549 ], [ 4.6483, 44.2548 ], [ 4.6482, 44.255 ], [ 4.6482, 44.2551 ], [ 4.6483, 44.2552 ], [ 4.6484, 44.2555 ], [ 4.6481, 44.2555 ], [ 4.648, 44.2555 ], [ 4.648, 44.2556 ], [ 4.6479, 44.2557 ], [ 4.6481, 44.2557 ], [ 4.6481, 44.2558 ], [ 4.6481, 44.2558 ], [ 4.6482, 44.2559 ], [ 4.6481, 44.2559 ], [ 4.6481, 44.256 ], [ 4.648, 44.256 ], [ 4.648, 44.2561 ], [ 4.6481, 44.2561 ], [ 4.6481, 44.2562 ], [ 4.648, 44.2562 ], [ 4.648, 44.2563 ], [ 4.648, 44.2563 ], [ 4.648, 44.2564 ], [ 4.648, 44.2565 ], [ 4.6479, 44.2565 ], [ 4.6479, 44.2566 ], [ 4.6479, 44.2566 ], [ 4.6479, 44.2568 ], [ 4.648, 44.2568 ], [ 4.648, 44.2568 ], [ 4.648, 44.2568 ], [ 4.6481, 44.2569 ], [ 4.6481, 44.257 ], [ 4.6481, 44.257 ], [ 4.6481, 44.2571 ], [ 4.6481, 44.2571 ], [ 4.6481, 44.2571 ], [ 4.6482, 44.2571 ], [ 4.6482, 44.2572 ], [ 4.6483, 44.2572 ], [ 4.6483, 44.2572 ], [ 4.6481, 44.2572 ], [ 4.6481, 44.2573 ], [ 4.6482, 44.2573 ], [ 4.6481, 44.2573 ], [ 4.6481, 44.2573 ], [ 4.6481, 44.2574 ], [ 4.6482, 44.2574 ], [ 4.6482, 44.2574 ], [ 4.6481, 44.2574 ], [ 4.6481, 44.2574 ], [ 4.6482, 44.2575 ], [ 4.6482, 44.2575 ], [ 4.6483, 44.2576 ], [ 4.6483, 44.2576 ], [ 4.6482, 44.2576 ], [ 4.6482, 44.2577 ], [ 4.6481, 44.2577 ], [ 4.6481, 44.2578 ], [ 4.6482, 44.258 ], [ 4.6482, 44.2581 ], [ 4.6482, 44.2582 ], [ 4.6483, 44.2582 ], [ 4.6484, 44.2583 ], [ 4.6485, 44.2583 ] ] ], "type": "Polygon" }, "id": "79", "properties": { "code_commune": "30202", "code_departement": "30", "code_qp": "QP030011", "commune_qp": "Pont-Saint-Esprit", "nom_commune": "Pont-Saint-Esprit", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.9763, 43.76, 2.0026, 43.7681 ], "geometry": { "coordinates": [ [ [ 2.0023, 43.7645 ], [ 2.0025, 43.7645 ], [ 2.0026, 43.7642 ], [ 2.0026, 43.764 ], [ 2.0025, 43.7639 ], [ 2.0017, 43.7639 ], [ 2.0013, 43.7624 ], [ 2.0012, 43.7624 ], [ 1.9999, 43.7624 ], [ 1.9988, 43.7624 ], [ 1.9977, 43.7625 ], [ 1.9977, 43.7625 ], [ 1.997, 43.7625 ], [ 1.9969, 43.7627 ], [ 1.9966, 43.7629 ], [ 1.9965, 43.763 ], [ 1.9964, 43.7631 ], [ 1.9963, 43.7631 ], [ 1.9963, 43.763 ], [ 1.996, 43.7627 ], [ 1.9959, 43.7626 ], [ 1.9958, 43.7626 ], [ 1.9957, 43.7625 ], [ 1.9954, 43.7626 ], [ 1.9919, 43.7628 ], [ 1.9914, 43.7629 ], [ 1.9907, 43.7629 ], [ 1.9905, 43.7628 ], [ 1.9903, 43.7625 ], [ 1.9912, 43.7623 ], [ 1.9915, 43.7621 ], [ 1.9931, 43.7615 ], [ 1.9944, 43.7611 ], [ 1.9948, 43.7611 ], [ 1.9943, 43.7602 ], [ 1.9939, 43.7601 ], [ 1.9929, 43.76 ], [ 1.9889, 43.76 ], [ 1.9878, 43.7601 ], [ 1.9876, 43.7602 ], [ 1.9873, 43.7604 ], [ 1.9869, 43.7607 ], [ 1.9867, 43.7608 ], [ 1.9866, 43.7608 ], [ 1.9851, 43.7608 ], [ 1.9851, 43.7622 ], [ 1.985, 43.7622 ], [ 1.9832, 43.7622 ], [ 1.982, 43.7622 ], [ 1.9813, 43.7622 ], [ 1.981, 43.7621 ], [ 1.9792, 43.7614 ], [ 1.979, 43.7615 ], [ 1.9784, 43.7615 ], [ 1.9781, 43.7618 ], [ 1.9763, 43.7618 ], [ 1.9766, 43.7636 ], [ 1.977, 43.7641 ], [ 1.9779, 43.7645 ], [ 1.9778, 43.7643 ], [ 1.9785, 43.764 ], [ 1.9794, 43.7636 ], [ 1.9796, 43.7636 ], [ 1.9806, 43.7634 ], [ 1.9815, 43.7647 ], [ 1.9824, 43.7643 ], [ 1.983, 43.764 ], [ 1.9838, 43.7637 ], [ 1.9843, 43.7635 ], [ 1.9853, 43.7633 ], [ 1.9855, 43.7642 ], [ 1.9875, 43.764 ], [ 1.9874, 43.7638 ], [ 1.988, 43.7637 ], [ 1.988, 43.7638 ], [ 1.9884, 43.7637 ], [ 1.9884, 43.7637 ], [ 1.9889, 43.7636 ], [ 1.989, 43.7638 ], [ 1.9892, 43.7639 ], [ 1.9894, 43.7634 ], [ 1.9898, 43.7628 ], [ 1.9903, 43.763 ], [ 1.9902, 43.7631 ], [ 1.99, 43.7635 ], [ 1.99, 43.7636 ], [ 1.9903, 43.7637 ], [ 1.9903, 43.7636 ], [ 1.9904, 43.7635 ], [ 1.9907, 43.7635 ], [ 1.9909, 43.7637 ], [ 1.991, 43.7638 ], [ 1.9913, 43.7642 ], [ 1.9916, 43.7646 ], [ 1.9917, 43.7647 ], [ 1.9919, 43.7648 ], [ 1.9923, 43.7649 ], [ 1.9931, 43.7652 ], [ 1.9932, 43.7652 ], [ 1.9947, 43.7649 ], [ 1.9971, 43.7646 ], [ 1.9974, 43.7645 ], [ 1.9979, 43.7661 ], [ 1.9967, 43.7663 ], [ 1.9968, 43.7667 ], [ 1.9989, 43.768 ], [ 1.999, 43.7679 ], [ 1.9991, 43.7681 ], [ 2.0003, 43.7679 ], [ 2.0004, 43.7679 ], [ 2.0005, 43.7679 ], [ 2.0012, 43.7662 ], [ 2.0017, 43.7648 ], [ 2.0019, 43.7645 ], [ 2.0023, 43.7645 ] ] ], "type": "Polygon" }, "id": "80", "properties": { "code_commune": "81105", "code_departement": "81", "code_qp": "QP081011", "commune_qp": "Graulhet", "nom_commune": "Graulhet", "nom_qp": "Crins - En Gach" }, "type": "Feature" }, { "bbox": [ 2.1471, 44.0485, 2.1615, 44.0577 ], "geometry": { "coordinates": [ [ [ 2.1605, 44.0528 ], [ 2.1608, 44.0525 ], [ 2.1609, 44.0522 ], [ 2.161, 44.0514 ], [ 2.1609, 44.0513 ], [ 2.1608, 44.0511 ], [ 2.161, 44.0511 ], [ 2.1614, 44.0509 ], [ 2.1612, 44.0505 ], [ 2.1615, 44.0504 ], [ 2.1615, 44.0502 ], [ 2.1612, 44.0499 ], [ 2.1609, 44.0498 ], [ 2.1606, 44.0497 ], [ 2.1603, 44.0498 ], [ 2.1592, 44.05 ], [ 2.1584, 44.0499 ], [ 2.1584, 44.0497 ], [ 2.1583, 44.0496 ], [ 2.158, 44.0497 ], [ 2.1581, 44.0507 ], [ 2.1582, 44.0517 ], [ 2.1582, 44.0518 ], [ 2.1579, 44.0519 ], [ 2.1564, 44.0525 ], [ 2.1558, 44.0518 ], [ 2.1539, 44.0519 ], [ 2.1538, 44.0508 ], [ 2.1537, 44.0504 ], [ 2.1537, 44.0498 ], [ 2.1533, 44.0499 ], [ 2.1532, 44.0497 ], [ 2.1532, 44.0495 ], [ 2.1533, 44.0492 ], [ 2.1535, 44.0491 ], [ 2.1536, 44.0491 ], [ 2.1537, 44.049 ], [ 2.1534, 44.0488 ], [ 2.1536, 44.0486 ], [ 2.1533, 44.0485 ], [ 2.1529, 44.0489 ], [ 2.1527, 44.049 ], [ 2.1525, 44.049 ], [ 2.1521, 44.0491 ], [ 2.1519, 44.0491 ], [ 2.1513, 44.0498 ], [ 2.151, 44.05 ], [ 2.1509, 44.05 ], [ 2.1494, 44.0501 ], [ 2.1492, 44.0501 ], [ 2.1492, 44.0501 ], [ 2.1471, 44.0502 ], [ 2.1473, 44.0507 ], [ 2.1475, 44.051 ], [ 2.1477, 44.0512 ], [ 2.1482, 44.0514 ], [ 2.1483, 44.0515 ], [ 2.1486, 44.0515 ], [ 2.1488, 44.0515 ], [ 2.1508, 44.0519 ], [ 2.1516, 44.0521 ], [ 2.1522, 44.0521 ], [ 2.1534, 44.052 ], [ 2.1535, 44.052 ], [ 2.1535, 44.0521 ], [ 2.1539, 44.0526 ], [ 2.1539, 44.0526 ], [ 2.154, 44.0528 ], [ 2.1541, 44.0528 ], [ 2.154, 44.0529 ], [ 2.1541, 44.053 ], [ 2.1542, 44.0531 ], [ 2.1542, 44.0531 ], [ 2.1543, 44.0532 ], [ 2.1544, 44.0533 ], [ 2.154, 44.0534 ], [ 2.1549, 44.054 ], [ 2.155, 44.0539 ], [ 2.1567, 44.0531 ], [ 2.1571, 44.0529 ], [ 2.1576, 44.0535 ], [ 2.1573, 44.0536 ], [ 2.1572, 44.0536 ], [ 2.157, 44.0536 ], [ 2.1563, 44.0538 ], [ 2.1562, 44.0538 ], [ 2.1559, 44.054 ], [ 2.1558, 44.054 ], [ 2.1555, 44.054 ], [ 2.155, 44.054 ], [ 2.1547, 44.0543 ], [ 2.1546, 44.0545 ], [ 2.1547, 44.0547 ], [ 2.1547, 44.0548 ], [ 2.1541, 44.0548 ], [ 2.1535, 44.0544 ], [ 2.1535, 44.0544 ], [ 2.1533, 44.0544 ], [ 2.1526, 44.0545 ], [ 2.1524, 44.0546 ], [ 2.1522, 44.0543 ], [ 2.1519, 44.0544 ], [ 2.151, 44.0535 ], [ 2.1502, 44.054 ], [ 2.1501, 44.0542 ], [ 2.1502, 44.0543 ], [ 2.1503, 44.0545 ], [ 2.1504, 44.0546 ], [ 2.1501, 44.0551 ], [ 2.15, 44.0552 ], [ 2.1501, 44.0554 ], [ 2.1498, 44.0555 ], [ 2.1482, 44.056 ], [ 2.1487, 44.0561 ], [ 2.1492, 44.0561 ], [ 2.1492, 44.0571 ], [ 2.15, 44.057 ], [ 2.151, 44.0571 ], [ 2.1513, 44.0572 ], [ 2.1515, 44.0572 ], [ 2.1518, 44.0574 ], [ 2.1522, 44.0575 ], [ 2.1525, 44.0576 ], [ 2.1527, 44.0577 ], [ 2.153, 44.0576 ], [ 2.1532, 44.0576 ], [ 2.154, 44.0573 ], [ 2.1546, 44.0571 ], [ 2.1549, 44.0571 ], [ 2.1552, 44.057 ], [ 2.1555, 44.0568 ], [ 2.1558, 44.0564 ], [ 2.156, 44.0562 ], [ 2.1561, 44.0562 ], [ 2.1564, 44.0559 ], [ 2.1573, 44.0552 ], [ 2.1578, 44.0557 ], [ 2.1586, 44.0553 ], [ 2.1589, 44.0552 ], [ 2.1598, 44.0552 ], [ 2.1599, 44.0552 ], [ 2.1603, 44.055 ], [ 2.1611, 44.0545 ], [ 2.1596, 44.0535 ], [ 2.1595, 44.0535 ], [ 2.16, 44.0531 ], [ 2.1605, 44.0528 ] ] ], "type": "Polygon" }, "id": "81", "properties": { "code_commune": "81060", "code_departement": "81", "code_qp": "QP081009", "commune_qp": "Carmaux", "nom_commune": "Carmaux", "nom_qp": "Rajol - Cérou - Gourgatieux - Bouloc - Verrerie" }, "type": "Feature" }, { "bbox": [ 3.312, 43.7269, 3.3249, 43.7361 ], "geometry": { "coordinates": [ [ [ 3.3249, 43.731 ], [ 3.3246, 43.731 ], [ 3.3246, 43.731 ], [ 3.3244, 43.731 ], [ 3.3244, 43.7308 ], [ 3.3244, 43.7307 ], [ 3.3244, 43.7305 ], [ 3.3243, 43.7305 ], [ 3.3244, 43.7303 ], [ 3.3244, 43.7303 ], [ 3.3244, 43.7299 ], [ 3.3243, 43.7298 ], [ 3.3242, 43.7298 ], [ 3.3243, 43.7297 ], [ 3.3243, 43.7296 ], [ 3.3241, 43.7295 ], [ 3.3238, 43.7292 ], [ 3.3241, 43.7289 ], [ 3.3241, 43.7289 ], [ 3.3242, 43.7288 ], [ 3.3241, 43.7287 ], [ 3.324, 43.7285 ], [ 3.3238, 43.7283 ], [ 3.3237, 43.7281 ], [ 3.3232, 43.7278 ], [ 3.3231, 43.7279 ], [ 3.3233, 43.728 ], [ 3.3232, 43.7281 ], [ 3.3232, 43.7282 ], [ 3.3232, 43.7283 ], [ 3.3233, 43.7285 ], [ 3.3234, 43.7286 ], [ 3.3235, 43.7286 ], [ 3.3235, 43.7286 ], [ 3.3235, 43.7288 ], [ 3.3234, 43.729 ], [ 3.3231, 43.7291 ], [ 3.3229, 43.7291 ], [ 3.3227, 43.7291 ], [ 3.3224, 43.7291 ], [ 3.3223, 43.729 ], [ 3.3221, 43.729 ], [ 3.3221, 43.7289 ], [ 3.322, 43.7289 ], [ 3.3219, 43.7288 ], [ 3.3217, 43.7288 ], [ 3.3213, 43.7287 ], [ 3.3211, 43.7286 ], [ 3.321, 43.7287 ], [ 3.3208, 43.7287 ], [ 3.3205, 43.7287 ], [ 3.3202, 43.7288 ], [ 3.3202, 43.7289 ], [ 3.3201, 43.7289 ], [ 3.3197, 43.7287 ], [ 3.3197, 43.7286 ], [ 3.3197, 43.7285 ], [ 3.3196, 43.7283 ], [ 3.3195, 43.7282 ], [ 3.3194, 43.7282 ], [ 3.3193, 43.7281 ], [ 3.3187, 43.7281 ], [ 3.3182, 43.7278 ], [ 3.3181, 43.7277 ], [ 3.318, 43.7276 ], [ 3.3179, 43.7274 ], [ 3.3178, 43.7273 ], [ 3.3174, 43.7271 ], [ 3.3172, 43.727 ], [ 3.3167, 43.727 ], [ 3.3163, 43.727 ], [ 3.3161, 43.727 ], [ 3.3158, 43.7269 ], [ 3.3158, 43.7269 ], [ 3.3161, 43.7272 ], [ 3.3162, 43.7273 ], [ 3.3162, 43.7274 ], [ 3.316, 43.7278 ], [ 3.316, 43.7278 ], [ 3.3161, 43.728 ], [ 3.3163, 43.728 ], [ 3.3161, 43.7281 ], [ 3.3159, 43.7283 ], [ 3.316, 43.7284 ], [ 3.3161, 43.7288 ], [ 3.3161, 43.7288 ], [ 3.3163, 43.7291 ], [ 3.3163, 43.7292 ], [ 3.3162, 43.7294 ], [ 3.3167, 43.7295 ], [ 3.3166, 43.7297 ], [ 3.3168, 43.73 ], [ 3.3169, 43.7303 ], [ 3.3164, 43.7303 ], [ 3.3165, 43.7305 ], [ 3.3166, 43.7307 ], [ 3.3164, 43.7307 ], [ 3.3165, 43.7309 ], [ 3.3165, 43.7309 ], [ 3.316, 43.7312 ], [ 3.3149, 43.7318 ], [ 3.3147, 43.7319 ], [ 3.3146, 43.732 ], [ 3.3136, 43.7324 ], [ 3.313, 43.7327 ], [ 3.3125, 43.7329 ], [ 3.312, 43.7332 ], [ 3.3121, 43.7334 ], [ 3.3122, 43.7335 ], [ 3.3122, 43.7336 ], [ 3.3129, 43.7334 ], [ 3.3132, 43.7333 ], [ 3.3142, 43.7328 ], [ 3.3148, 43.7326 ], [ 3.3157, 43.7322 ], [ 3.3162, 43.7324 ], [ 3.3163, 43.7323 ], [ 3.3161, 43.7322 ], [ 3.3163, 43.7321 ], [ 3.3165, 43.732 ], [ 3.3166, 43.7318 ], [ 3.3168, 43.7316 ], [ 3.3171, 43.7313 ], [ 3.3174, 43.7315 ], [ 3.3175, 43.7315 ], [ 3.3176, 43.7317 ], [ 3.3177, 43.7318 ], [ 3.3177, 43.732 ], [ 3.3177, 43.7322 ], [ 3.3177, 43.7323 ], [ 3.3181, 43.7325 ], [ 3.3182, 43.7326 ], [ 3.3184, 43.7329 ], [ 3.3187, 43.7331 ], [ 3.319, 43.7329 ], [ 3.3191, 43.7329 ], [ 3.3193, 43.733 ], [ 3.3195, 43.7333 ], [ 3.3176, 43.7349 ], [ 3.3179, 43.735 ], [ 3.3174, 43.7354 ], [ 3.3176, 43.7355 ], [ 3.3176, 43.7355 ], [ 3.3177, 43.7356 ], [ 3.3176, 43.7357 ], [ 3.3175, 43.7357 ], [ 3.3175, 43.7358 ], [ 3.3176, 43.7359 ], [ 3.3176, 43.7359 ], [ 3.3183, 43.7361 ], [ 3.3184, 43.7361 ], [ 3.3187, 43.736 ], [ 3.3188, 43.7358 ], [ 3.3188, 43.7358 ], [ 3.3189, 43.7357 ], [ 3.319, 43.7358 ], [ 3.3194, 43.7356 ], [ 3.3195, 43.7355 ], [ 3.3198, 43.7355 ], [ 3.3206, 43.7354 ], [ 3.3205, 43.7351 ], [ 3.3194, 43.7352 ], [ 3.3197, 43.7349 ], [ 3.32, 43.7346 ], [ 3.3205, 43.7341 ], [ 3.3198, 43.7334 ], [ 3.3203, 43.733 ], [ 3.3205, 43.7329 ], [ 3.3207, 43.7327 ], [ 3.3208, 43.7328 ], [ 3.3212, 43.7325 ], [ 3.3215, 43.7322 ], [ 3.322, 43.7321 ], [ 3.3223, 43.732 ], [ 3.3227, 43.7322 ], [ 3.3233, 43.7323 ], [ 3.3236, 43.7323 ], [ 3.3236, 43.7325 ], [ 3.3236, 43.7327 ], [ 3.3237, 43.7332 ], [ 3.3239, 43.7337 ], [ 3.3249, 43.7338 ], [ 3.3249, 43.7334 ], [ 3.3246, 43.7335 ], [ 3.3245, 43.7331 ], [ 3.3245, 43.7329 ], [ 3.3244, 43.7324 ], [ 3.3244, 43.7324 ], [ 3.3245, 43.7324 ], [ 3.3246, 43.7321 ], [ 3.3246, 43.732 ], [ 3.3248, 43.7318 ], [ 3.3247, 43.7318 ], [ 3.3248, 43.7315 ], [ 3.3248, 43.7315 ], [ 3.3248, 43.7314 ], [ 3.3248, 43.7314 ], [ 3.3248, 43.7313 ], [ 3.3249, 43.7312 ], [ 3.3249, 43.731 ] ] ], "type": "Polygon" }, "id": "82", "properties": { "code_commune": "34142", "code_departement": "34", "code_qp": "QP034022", "commune_qp": "Lodève", "nom_commune": "Lodève", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.153, 43.6131, 3.1621, 43.6187 ], "geometry": { "coordinates": [ [ [ 3.1553, 43.6173 ], [ 3.1553, 43.6176 ], [ 3.1559, 43.6174 ], [ 3.1558, 43.6174 ], [ 3.1561, 43.6173 ], [ 3.1561, 43.6172 ], [ 3.1562, 43.6167 ], [ 3.1562, 43.6164 ], [ 3.1562, 43.6163 ], [ 3.1562, 43.6162 ], [ 3.157, 43.6162 ], [ 3.157, 43.6166 ], [ 3.157, 43.6173 ], [ 3.1568, 43.6175 ], [ 3.1568, 43.6175 ], [ 3.1567, 43.6176 ], [ 3.1567, 43.6176 ], [ 3.1566, 43.6177 ], [ 3.1575, 43.6182 ], [ 3.1578, 43.6179 ], [ 3.1585, 43.6183 ], [ 3.1589, 43.6185 ], [ 3.1593, 43.6187 ], [ 3.1601, 43.6181 ], [ 3.1605, 43.6177 ], [ 3.1608, 43.6175 ], [ 3.161, 43.6176 ], [ 3.1611, 43.6175 ], [ 3.1613, 43.6176 ], [ 3.1615, 43.6177 ], [ 3.1617, 43.6179 ], [ 3.1617, 43.6179 ], [ 3.1621, 43.6177 ], [ 3.1618, 43.6175 ], [ 3.162, 43.6174 ], [ 3.1615, 43.6169 ], [ 3.1614, 43.6168 ], [ 3.1614, 43.6168 ], [ 3.1613, 43.6167 ], [ 3.1613, 43.6167 ], [ 3.1611, 43.6163 ], [ 3.1609, 43.6161 ], [ 3.1609, 43.6161 ], [ 3.1608, 43.6161 ], [ 3.1608, 43.616 ], [ 3.1607, 43.6159 ], [ 3.1608, 43.6158 ], [ 3.1608, 43.6157 ], [ 3.1609, 43.6156 ], [ 3.1609, 43.6156 ], [ 3.1611, 43.6155 ], [ 3.1605, 43.615 ], [ 3.1597, 43.6145 ], [ 3.1596, 43.6144 ], [ 3.1595, 43.6142 ], [ 3.1595, 43.6142 ], [ 3.1593, 43.6141 ], [ 3.1595, 43.614 ], [ 3.1594, 43.6139 ], [ 3.1594, 43.6139 ], [ 3.1594, 43.6139 ], [ 3.1592, 43.6139 ], [ 3.1596, 43.6135 ], [ 3.1592, 43.6132 ], [ 3.159, 43.6131 ], [ 3.1589, 43.6131 ], [ 3.1585, 43.6133 ], [ 3.1583, 43.6134 ], [ 3.1582, 43.6134 ], [ 3.158, 43.6135 ], [ 3.158, 43.6135 ], [ 3.1575, 43.6137 ], [ 3.1576, 43.6139 ], [ 3.1576, 43.6139 ], [ 3.1576, 43.6139 ], [ 3.1577, 43.614 ], [ 3.1571, 43.6143 ], [ 3.1571, 43.6143 ], [ 3.157, 43.6144 ], [ 3.1569, 43.6143 ], [ 3.1569, 43.6143 ], [ 3.1568, 43.6142 ], [ 3.1567, 43.6143 ], [ 3.1566, 43.6142 ], [ 3.1563, 43.6144 ], [ 3.1564, 43.6145 ], [ 3.1565, 43.6147 ], [ 3.1568, 43.6149 ], [ 3.1569, 43.6149 ], [ 3.1569, 43.615 ], [ 3.1569, 43.615 ], [ 3.1569, 43.615 ], [ 3.157, 43.615 ], [ 3.1571, 43.6151 ], [ 3.1573, 43.6151 ], [ 3.1574, 43.6152 ], [ 3.1572, 43.6153 ], [ 3.1572, 43.6156 ], [ 3.1571, 43.6159 ], [ 3.1571, 43.6161 ], [ 3.1562, 43.6161 ], [ 3.1562, 43.6159 ], [ 3.1559, 43.6154 ], [ 3.1557, 43.6154 ], [ 3.1553, 43.6153 ], [ 3.1551, 43.6153 ], [ 3.1547, 43.6152 ], [ 3.1544, 43.6152 ], [ 3.1544, 43.6151 ], [ 3.1536, 43.6154 ], [ 3.1535, 43.6154 ], [ 3.1535, 43.6154 ], [ 3.1537, 43.6156 ], [ 3.1538, 43.6158 ], [ 3.1537, 43.6158 ], [ 3.1535, 43.6159 ], [ 3.1534, 43.6159 ], [ 3.153, 43.6161 ], [ 3.153, 43.6162 ], [ 3.1535, 43.6169 ], [ 3.1536, 43.6168 ], [ 3.1537, 43.617 ], [ 3.1537, 43.6171 ], [ 3.1537, 43.6172 ], [ 3.1539, 43.6173 ], [ 3.1541, 43.6176 ], [ 3.1541, 43.6176 ], [ 3.1543, 43.6175 ], [ 3.1543, 43.6176 ], [ 3.1553, 43.6173 ] ] ], "type": "Polygon" }, "id": "83", "properties": { "code_commune": "34028", "code_departement": "34", "code_qp": "QP034020", "commune_qp": "Bédarieux", "nom_commune": "Bédarieux", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.6053, 43.107, 1.6151, 43.1218 ], "geometry": { "coordinates": [ [ [ 1.6151, 43.108 ], [ 1.6148, 43.108 ], [ 1.6148, 43.1079 ], [ 1.6141, 43.1079 ], [ 1.6144, 43.1073 ], [ 1.6143, 43.1073 ], [ 1.6142, 43.1073 ], [ 1.6141, 43.1073 ], [ 1.614, 43.1072 ], [ 1.6138, 43.1071 ], [ 1.6137, 43.1071 ], [ 1.6135, 43.1071 ], [ 1.6134, 43.107 ], [ 1.6129, 43.1071 ], [ 1.6125, 43.1072 ], [ 1.6123, 43.1073 ], [ 1.6121, 43.1073 ], [ 1.612, 43.1074 ], [ 1.6115, 43.1075 ], [ 1.6109, 43.1077 ], [ 1.6108, 43.1077 ], [ 1.6106, 43.1077 ], [ 1.6099, 43.1077 ], [ 1.6097, 43.1077 ], [ 1.6094, 43.1077 ], [ 1.6089, 43.1077 ], [ 1.6084, 43.1077 ], [ 1.6081, 43.1077 ], [ 1.608, 43.1078 ], [ 1.6078, 43.108 ], [ 1.6073, 43.1085 ], [ 1.6074, 43.109 ], [ 1.6075, 43.1093 ], [ 1.6082, 43.109 ], [ 1.6083, 43.1091 ], [ 1.6089, 43.1088 ], [ 1.6093, 43.1093 ], [ 1.6102, 43.109 ], [ 1.611, 43.1095 ], [ 1.6112, 43.1097 ], [ 1.6116, 43.1102 ], [ 1.6117, 43.1104 ], [ 1.6121, 43.1109 ], [ 1.612, 43.111 ], [ 1.6115, 43.1111 ], [ 1.6114, 43.111 ], [ 1.6113, 43.111 ], [ 1.6113, 43.111 ], [ 1.6109, 43.1111 ], [ 1.6109, 43.1111 ], [ 1.6105, 43.111 ], [ 1.6097, 43.1107 ], [ 1.6096, 43.1107 ], [ 1.6095, 43.1107 ], [ 1.6093, 43.1108 ], [ 1.609, 43.1111 ], [ 1.6092, 43.1111 ], [ 1.6093, 43.1112 ], [ 1.6095, 43.1115 ], [ 1.6096, 43.1115 ], [ 1.6097, 43.1116 ], [ 1.6097, 43.1117 ], [ 1.6097, 43.1118 ], [ 1.6096, 43.112 ], [ 1.6096, 43.1124 ], [ 1.6095, 43.1126 ], [ 1.6085, 43.1126 ], [ 1.6085, 43.1128 ], [ 1.6085, 43.1129 ], [ 1.6085, 43.1131 ], [ 1.6085, 43.1131 ], [ 1.6086, 43.1131 ], [ 1.6087, 43.1131 ], [ 1.6089, 43.1131 ], [ 1.609, 43.113 ], [ 1.6091, 43.1131 ], [ 1.6093, 43.1131 ], [ 1.6094, 43.1131 ], [ 1.6094, 43.1131 ], [ 1.6095, 43.1131 ], [ 1.6095, 43.1132 ], [ 1.6096, 43.1132 ], [ 1.6096, 43.1132 ], [ 1.6097, 43.1132 ], [ 1.6099, 43.1133 ], [ 1.61, 43.1133 ], [ 1.6102, 43.1134 ], [ 1.6104, 43.1134 ], [ 1.6107, 43.1136 ], [ 1.6105, 43.1138 ], [ 1.6102, 43.1139 ], [ 1.6105, 43.1142 ], [ 1.6106, 43.1143 ], [ 1.6106, 43.1144 ], [ 1.6106, 43.1144 ], [ 1.6109, 43.1146 ], [ 1.6108, 43.1147 ], [ 1.6104, 43.1148 ], [ 1.6098, 43.115 ], [ 1.6095, 43.1151 ], [ 1.6097, 43.1153 ], [ 1.6095, 43.1154 ], [ 1.6094, 43.1155 ], [ 1.6094, 43.1156 ], [ 1.6093, 43.1156 ], [ 1.6089, 43.1157 ], [ 1.6087, 43.1153 ], [ 1.6081, 43.1154 ], [ 1.6076, 43.1147 ], [ 1.6072, 43.1145 ], [ 1.607, 43.1144 ], [ 1.6069, 43.1144 ], [ 1.6068, 43.1143 ], [ 1.6068, 43.1143 ], [ 1.6068, 43.1143 ], [ 1.6069, 43.1141 ], [ 1.6066, 43.1139 ], [ 1.6065, 43.1139 ], [ 1.6065, 43.1138 ], [ 1.6064, 43.1137 ], [ 1.6063, 43.1137 ], [ 1.6062, 43.1137 ], [ 1.6061, 43.1137 ], [ 1.6062, 43.1137 ], [ 1.6059, 43.1135 ], [ 1.6057, 43.1135 ], [ 1.6055, 43.1138 ], [ 1.6054, 43.114 ], [ 1.6053, 43.1143 ], [ 1.6054, 43.1144 ], [ 1.6054, 43.1144 ], [ 1.6055, 43.1145 ], [ 1.6055, 43.1145 ], [ 1.6056, 43.1145 ], [ 1.6064, 43.115 ], [ 1.6066, 43.115 ], [ 1.6067, 43.1152 ], [ 1.6069, 43.1154 ], [ 1.607, 43.1156 ], [ 1.6071, 43.1157 ], [ 1.6073, 43.1161 ], [ 1.6074, 43.1164 ], [ 1.6075, 43.1165 ], [ 1.6078, 43.1166 ], [ 1.608, 43.1167 ], [ 1.608, 43.1167 ], [ 1.6082, 43.1166 ], [ 1.6089, 43.1173 ], [ 1.6092, 43.1177 ], [ 1.6094, 43.1178 ], [ 1.6094, 43.1179 ], [ 1.6095, 43.1181 ], [ 1.6095, 43.1182 ], [ 1.6094, 43.1182 ], [ 1.609, 43.1182 ], [ 1.609, 43.1188 ], [ 1.6089, 43.1191 ], [ 1.6088, 43.1193 ], [ 1.6087, 43.1195 ], [ 1.6087, 43.1197 ], [ 1.6088, 43.1198 ], [ 1.609, 43.12 ], [ 1.6098, 43.1206 ], [ 1.6099, 43.1207 ], [ 1.61, 43.1206 ], [ 1.6105, 43.1204 ], [ 1.6109, 43.1203 ], [ 1.6111, 43.1202 ], [ 1.6113, 43.1202 ], [ 1.6115, 43.1203 ], [ 1.6115, 43.1204 ], [ 1.6116, 43.1204 ], [ 1.6116, 43.1207 ], [ 1.6117, 43.1213 ], [ 1.6124, 43.1214 ], [ 1.6125, 43.1215 ], [ 1.6128, 43.1217 ], [ 1.613, 43.1217 ], [ 1.6134, 43.1218 ], [ 1.6133, 43.1217 ], [ 1.6131, 43.1214 ], [ 1.6128, 43.1213 ], [ 1.6131, 43.1209 ], [ 1.6134, 43.1211 ], [ 1.6137, 43.1209 ], [ 1.6141, 43.1207 ], [ 1.614, 43.1207 ], [ 1.6134, 43.1206 ], [ 1.613, 43.1205 ], [ 1.6127, 43.1206 ], [ 1.6125, 43.1206 ], [ 1.6124, 43.1205 ], [ 1.6125, 43.1203 ], [ 1.6125, 43.12 ], [ 1.6129, 43.12 ], [ 1.6124, 43.1194 ], [ 1.6122, 43.1193 ], [ 1.6125, 43.1192 ], [ 1.6125, 43.1191 ], [ 1.6127, 43.119 ], [ 1.613, 43.1188 ], [ 1.6131, 43.1187 ], [ 1.6135, 43.1185 ], [ 1.6136, 43.1185 ], [ 1.6138, 43.1184 ], [ 1.614, 43.1184 ], [ 1.6142, 43.1182 ], [ 1.6145, 43.118 ], [ 1.6147, 43.1178 ], [ 1.6148, 43.1177 ], [ 1.6149, 43.1175 ], [ 1.6149, 43.1174 ], [ 1.6149, 43.1172 ], [ 1.6149, 43.1169 ], [ 1.6148, 43.1165 ], [ 1.6148, 43.1163 ], [ 1.6147, 43.116 ], [ 1.6146, 43.1155 ], [ 1.6145, 43.1151 ], [ 1.6141, 43.1152 ], [ 1.614, 43.1152 ], [ 1.6139, 43.1153 ], [ 1.6138, 43.1153 ], [ 1.6138, 43.1152 ], [ 1.6137, 43.1152 ], [ 1.6134, 43.1153 ], [ 1.6134, 43.1152 ], [ 1.6132, 43.1152 ], [ 1.6132, 43.1152 ], [ 1.6131, 43.1152 ], [ 1.6131, 43.1153 ], [ 1.6129, 43.1153 ], [ 1.6129, 43.1152 ], [ 1.6127, 43.1153 ], [ 1.6127, 43.1151 ], [ 1.6125, 43.1152 ], [ 1.6124, 43.1151 ], [ 1.6124, 43.1151 ], [ 1.6123, 43.1151 ], [ 1.6121, 43.1149 ], [ 1.6119, 43.1146 ], [ 1.6119, 43.1145 ], [ 1.6116, 43.1142 ], [ 1.6117, 43.1142 ], [ 1.6115, 43.1141 ], [ 1.6115, 43.1141 ], [ 1.6115, 43.114 ], [ 1.6114, 43.114 ], [ 1.6115, 43.114 ], [ 1.6112, 43.1138 ], [ 1.6116, 43.1135 ], [ 1.6121, 43.1137 ], [ 1.6122, 43.1135 ], [ 1.6116, 43.1131 ], [ 1.611, 43.1127 ], [ 1.6113, 43.1125 ], [ 1.6116, 43.1124 ], [ 1.612, 43.1121 ], [ 1.612, 43.112 ], [ 1.6125, 43.1118 ], [ 1.6124, 43.1117 ], [ 1.6123, 43.1117 ], [ 1.6122, 43.1117 ], [ 1.6122, 43.1116 ], [ 1.6122, 43.1116 ], [ 1.612, 43.1115 ], [ 1.6123, 43.1113 ], [ 1.613, 43.111 ], [ 1.6132, 43.1109 ], [ 1.6134, 43.1108 ], [ 1.614, 43.1106 ], [ 1.6147, 43.1102 ], [ 1.6147, 43.1102 ], [ 1.6147, 43.1101 ], [ 1.6146, 43.1099 ], [ 1.6145, 43.1098 ], [ 1.6144, 43.1097 ], [ 1.6141, 43.1094 ], [ 1.6138, 43.1091 ], [ 1.6138, 43.1087 ], [ 1.6138, 43.1084 ], [ 1.6139, 43.1084 ], [ 1.6142, 43.1084 ], [ 1.6147, 43.1084 ], [ 1.6148, 43.1084 ], [ 1.6151, 43.108 ] ] ], "type": "Polygon" }, "id": "84", "properties": { "code_commune": "09225", "code_departement": "09", "code_qp": "QP009003", "commune_qp": "Pamiers", "nom_commune": "Pamiers", "nom_qp": "Centre Ancien - La Gloriette" }, "type": "Feature" }, { "bbox": [ 3.4658, 43.3088, 3.4746, 43.3166 ], "geometry": { "coordinates": [ [ [ 3.4736, 43.316 ], [ 3.4736, 43.3158 ], [ 3.4736, 43.3155 ], [ 3.4735, 43.3151 ], [ 3.4734, 43.3147 ], [ 3.4733, 43.3145 ], [ 3.4733, 43.3143 ], [ 3.4732, 43.314 ], [ 3.4735, 43.3139 ], [ 3.4739, 43.3137 ], [ 3.4741, 43.3132 ], [ 3.4741, 43.3131 ], [ 3.474, 43.3131 ], [ 3.474, 43.3131 ], [ 3.4739, 43.3127 ], [ 3.4737, 43.3117 ], [ 3.4746, 43.3116 ], [ 3.4745, 43.3112 ], [ 3.4735, 43.3111 ], [ 3.4739, 43.3107 ], [ 3.4742, 43.3105 ], [ 3.4746, 43.3102 ], [ 3.4745, 43.3102 ], [ 3.4745, 43.3101 ], [ 3.4745, 43.3101 ], [ 3.4741, 43.3102 ], [ 3.4737, 43.3102 ], [ 3.4733, 43.3103 ], [ 3.4733, 43.3102 ], [ 3.4731, 43.3099 ], [ 3.4729, 43.3099 ], [ 3.4725, 43.31 ], [ 3.4721, 43.31 ], [ 3.4718, 43.31 ], [ 3.4718, 43.31 ], [ 3.4718, 43.3091 ], [ 3.4715, 43.3091 ], [ 3.4715, 43.3091 ], [ 3.471, 43.3089 ], [ 3.471, 43.3089 ], [ 3.4708, 43.3088 ], [ 3.4704, 43.3088 ], [ 3.4703, 43.3088 ], [ 3.4702, 43.3088 ], [ 3.4702, 43.3089 ], [ 3.4701, 43.3089 ], [ 3.4701, 43.3089 ], [ 3.47, 43.3089 ], [ 3.47, 43.309 ], [ 3.4699, 43.309 ], [ 3.4699, 43.309 ], [ 3.4699, 43.309 ], [ 3.4698, 43.309 ], [ 3.4697, 43.309 ], [ 3.4696, 43.3089 ], [ 3.4693, 43.3089 ], [ 3.4692, 43.3088 ], [ 3.4691, 43.3088 ], [ 3.469, 43.3088 ], [ 3.4685, 43.309 ], [ 3.4685, 43.309 ], [ 3.4686, 43.3092 ], [ 3.4687, 43.3093 ], [ 3.4687, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4682, 43.3096 ], [ 3.4681, 43.3097 ], [ 3.4681, 43.3097 ], [ 3.4682, 43.3099 ], [ 3.468, 43.3099 ], [ 3.4681, 43.3101 ], [ 3.4681, 43.3102 ], [ 3.4682, 43.3104 ], [ 3.4682, 43.3104 ], [ 3.4682, 43.3105 ], [ 3.4682, 43.3106 ], [ 3.4659, 43.3109 ], [ 3.466, 43.3111 ], [ 3.4658, 43.3112 ], [ 3.4659, 43.3114 ], [ 3.4661, 43.3114 ], [ 3.4661, 43.3116 ], [ 3.4662, 43.3117 ], [ 3.4663, 43.3119 ], [ 3.4666, 43.3122 ], [ 3.4668, 43.3124 ], [ 3.4669, 43.3126 ], [ 3.4669, 43.3126 ], [ 3.4669, 43.3126 ], [ 3.4674, 43.3133 ], [ 3.4675, 43.3134 ], [ 3.4676, 43.3135 ], [ 3.4678, 43.3136 ], [ 3.4682, 43.3138 ], [ 3.4686, 43.314 ], [ 3.4689, 43.3142 ], [ 3.4692, 43.3144 ], [ 3.4694, 43.3145 ], [ 3.4696, 43.3147 ], [ 3.469, 43.3148 ], [ 3.4682, 43.315 ], [ 3.4677, 43.3146 ], [ 3.4668, 43.315 ], [ 3.4666, 43.3151 ], [ 3.4663, 43.3153 ], [ 3.4662, 43.3153 ], [ 3.4664, 43.3154 ], [ 3.4664, 43.3154 ], [ 3.4665, 43.3154 ], [ 3.467, 43.3156 ], [ 3.4672, 43.3155 ], [ 3.4677, 43.3159 ], [ 3.4683, 43.3153 ], [ 3.47, 43.3148 ], [ 3.4704, 43.315 ], [ 3.4706, 43.3151 ], [ 3.4708, 43.3152 ], [ 3.4724, 43.3161 ], [ 3.4726, 43.3164 ], [ 3.4733, 43.3166 ], [ 3.4734, 43.3165 ], [ 3.4734, 43.316 ], [ 3.4736, 43.316 ] ] ], "type": "Polygon" }, "id": "85", "properties": { "code_commune": "34003", "code_departement": "34", "code_qp": "QP034019", "commune_qp": "Agde", "nom_commune": "Agde", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 0.0545, 43.2405, 0.0703, 43.2469 ], "geometry": { "coordinates": [ [ [ 0.0611, 43.2419 ], [ 0.0611, 43.2425 ], [ 0.061, 43.2425 ], [ 0.061, 43.2431 ], [ 0.0614, 43.2431 ], [ 0.0616, 43.2431 ], [ 0.0616, 43.2431 ], [ 0.0615, 43.2433 ], [ 0.0612, 43.2435 ], [ 0.0601, 43.2436 ], [ 0.0595, 43.2436 ], [ 0.0595, 43.2436 ], [ 0.059, 43.2436 ], [ 0.059, 43.2438 ], [ 0.059, 43.2444 ], [ 0.059, 43.2445 ], [ 0.0589, 43.2447 ], [ 0.0589, 43.2449 ], [ 0.0588, 43.2449 ], [ 0.0588, 43.2449 ], [ 0.0582, 43.2449 ], [ 0.0578, 43.2449 ], [ 0.0568, 43.2449 ], [ 0.0568, 43.245 ], [ 0.0565, 43.2449 ], [ 0.0559, 43.2449 ], [ 0.0559, 43.245 ], [ 0.0559, 43.2453 ], [ 0.0559, 43.2454 ], [ 0.0558, 43.2455 ], [ 0.0557, 43.2455 ], [ 0.0556, 43.2455 ], [ 0.0555, 43.2455 ], [ 0.0553, 43.2454 ], [ 0.0553, 43.2454 ], [ 0.0553, 43.2453 ], [ 0.0553, 43.2451 ], [ 0.0553, 43.245 ], [ 0.0553, 43.2449 ], [ 0.0552, 43.2449 ], [ 0.0552, 43.2448 ], [ 0.0551, 43.2447 ], [ 0.0548, 43.2446 ], [ 0.0547, 43.2446 ], [ 0.0546, 43.2458 ], [ 0.0546, 43.2459 ], [ 0.0545, 43.2459 ], [ 0.0545, 43.2461 ], [ 0.0545, 43.2463 ], [ 0.0546, 43.2466 ], [ 0.055, 43.2469 ], [ 0.0557, 43.2468 ], [ 0.0558, 43.2461 ], [ 0.0558, 43.2461 ], [ 0.0558, 43.2456 ], [ 0.0559, 43.2455 ], [ 0.0559, 43.2455 ], [ 0.056, 43.2455 ], [ 0.0561, 43.2457 ], [ 0.0562, 43.2459 ], [ 0.0563, 43.2459 ], [ 0.0565, 43.246 ], [ 0.057, 43.246 ], [ 0.0574, 43.2461 ], [ 0.0576, 43.2459 ], [ 0.0577, 43.2458 ], [ 0.058, 43.2456 ], [ 0.0583, 43.2454 ], [ 0.0586, 43.2452 ], [ 0.059, 43.2449 ], [ 0.0591, 43.245 ], [ 0.0595, 43.2452 ], [ 0.0602, 43.2445 ], [ 0.0609, 43.2438 ], [ 0.061, 43.2439 ], [ 0.0611, 43.2439 ], [ 0.0614, 43.2439 ], [ 0.0614, 43.244 ], [ 0.0615, 43.244 ], [ 0.0615, 43.2442 ], [ 0.0614, 43.2456 ], [ 0.0613, 43.2459 ], [ 0.0614, 43.2459 ], [ 0.0625, 43.2465 ], [ 0.0627, 43.2466 ], [ 0.0628, 43.2466 ], [ 0.0633, 43.2466 ], [ 0.0646, 43.2466 ], [ 0.0651, 43.2467 ], [ 0.0656, 43.2456 ], [ 0.0657, 43.2456 ], [ 0.0667, 43.2458 ], [ 0.0667, 43.2457 ], [ 0.0668, 43.2458 ], [ 0.0674, 43.2458 ], [ 0.0679, 43.2459 ], [ 0.0684, 43.2459 ], [ 0.0684, 43.2459 ], [ 0.0684, 43.2458 ], [ 0.0684, 43.2458 ], [ 0.0685, 43.2457 ], [ 0.0687, 43.2457 ], [ 0.0689, 43.2456 ], [ 0.0691, 43.2454 ], [ 0.0686, 43.245 ], [ 0.0686, 43.245 ], [ 0.0683, 43.2449 ], [ 0.0684, 43.2449 ], [ 0.0684, 43.2447 ], [ 0.0685, 43.2446 ], [ 0.0685, 43.2445 ], [ 0.0685, 43.2442 ], [ 0.0685, 43.2441 ], [ 0.0693, 43.2442 ], [ 0.07, 43.2442 ], [ 0.0701, 43.2437 ], [ 0.0701, 43.2436 ], [ 0.0702, 43.2434 ], [ 0.0703, 43.243 ], [ 0.0703, 43.2429 ], [ 0.0703, 43.2426 ], [ 0.0697, 43.2426 ], [ 0.0696, 43.2425 ], [ 0.0696, 43.2426 ], [ 0.0695, 43.2426 ], [ 0.0694, 43.2426 ], [ 0.0694, 43.2427 ], [ 0.0694, 43.2427 ], [ 0.0692, 43.243 ], [ 0.069, 43.2431 ], [ 0.069, 43.2432 ], [ 0.069, 43.2432 ], [ 0.069, 43.2432 ], [ 0.069, 43.2433 ], [ 0.069, 43.2434 ], [ 0.0682, 43.2433 ], [ 0.0683, 43.243 ], [ 0.0683, 43.2425 ], [ 0.0683, 43.2425 ], [ 0.0683, 43.2424 ], [ 0.0683, 43.2419 ], [ 0.0674, 43.2419 ], [ 0.0674, 43.2415 ], [ 0.0672, 43.2415 ], [ 0.0671, 43.2417 ], [ 0.0667, 43.2422 ], [ 0.0667, 43.2423 ], [ 0.0659, 43.2423 ], [ 0.0657, 43.2423 ], [ 0.0656, 43.2425 ], [ 0.0641, 43.2424 ], [ 0.064, 43.2424 ], [ 0.0639, 43.2425 ], [ 0.0638, 43.2425 ], [ 0.0635, 43.2428 ], [ 0.063, 43.2426 ], [ 0.0625, 43.2423 ], [ 0.0627, 43.2421 ], [ 0.0626, 43.242 ], [ 0.0626, 43.2421 ], [ 0.0621, 43.2421 ], [ 0.0621, 43.242 ], [ 0.062, 43.242 ], [ 0.0619, 43.242 ], [ 0.0617, 43.242 ], [ 0.0616, 43.242 ], [ 0.0616, 43.2405 ], [ 0.0612, 43.2405 ], [ 0.0609, 43.2405 ], [ 0.0603, 43.2406 ], [ 0.0597, 43.2407 ], [ 0.0591, 43.2408 ], [ 0.0588, 43.2408 ], [ 0.0587, 43.2409 ], [ 0.059, 43.2416 ], [ 0.0591, 43.2418 ], [ 0.0591, 43.242 ], [ 0.0591, 43.242 ], [ 0.0595, 43.2419 ], [ 0.0597, 43.2419 ], [ 0.0601, 43.2419 ], [ 0.0611, 43.2418 ], [ 0.0611, 43.2419 ] ] ], "type": "Polygon" }, "id": "86", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065002", "commune_qp": "Tarbes", "nom_commune": "Tarbes", "nom_qp": "Tarbes Nord" }, "type": "Feature" }, { "bbox": [ 1.8884, 43.8981, 1.9055, 43.91 ], "geometry": { "coordinates": [ [ [ 1.8974, 43.9039 ], [ 1.8973, 43.9038 ], [ 1.8973, 43.9038 ], [ 1.8972, 43.9038 ], [ 1.8972, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8972, 43.9035 ], [ 1.8972, 43.9034 ], [ 1.8965, 43.9033 ], [ 1.8963, 43.9033 ], [ 1.8962, 43.9032 ], [ 1.8961, 43.9031 ], [ 1.8959, 43.903 ], [ 1.8957, 43.9029 ], [ 1.8956, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8954, 43.9029 ], [ 1.8953, 43.9029 ], [ 1.8952, 43.9028 ], [ 1.8951, 43.9028 ], [ 1.8951, 43.9028 ], [ 1.895, 43.9028 ], [ 1.8949, 43.9028 ], [ 1.8948, 43.903 ], [ 1.8946, 43.9029 ], [ 1.8944, 43.9028 ], [ 1.8945, 43.9027 ], [ 1.8941, 43.9025 ], [ 1.8939, 43.9024 ], [ 1.8936, 43.9024 ], [ 1.8934, 43.9023 ], [ 1.8933, 43.9023 ], [ 1.8934, 43.9021 ], [ 1.8932, 43.9021 ], [ 1.8927, 43.9022 ], [ 1.8923, 43.9023 ], [ 1.8923, 43.902 ], [ 1.8922, 43.902 ], [ 1.8922, 43.9018 ], [ 1.8922, 43.9015 ], [ 1.8921, 43.9014 ], [ 1.8921, 43.9012 ], [ 1.8922, 43.9008 ], [ 1.8922, 43.9007 ], [ 1.8923, 43.9005 ], [ 1.8924, 43.9004 ], [ 1.8922, 43.9002 ], [ 1.8919, 43.9 ], [ 1.8918, 43.9001 ], [ 1.8916, 43.9002 ], [ 1.8914, 43.9003 ], [ 1.8912, 43.9004 ], [ 1.891, 43.9006 ], [ 1.8909, 43.9006 ], [ 1.8908, 43.9006 ], [ 1.8906, 43.9006 ], [ 1.8905, 43.9006 ], [ 1.8906, 43.9005 ], [ 1.8907, 43.9005 ], [ 1.8909, 43.9003 ], [ 1.8911, 43.9002 ], [ 1.8912, 43.9001 ], [ 1.8912, 43.9 ], [ 1.8912, 43.8999 ], [ 1.8912, 43.8998 ], [ 1.8913, 43.8997 ], [ 1.8913, 43.8996 ], [ 1.8915, 43.8994 ], [ 1.8915, 43.8994 ], [ 1.8916, 43.8993 ], [ 1.8917, 43.8993 ], [ 1.8919, 43.8992 ], [ 1.8921, 43.899 ], [ 1.8925, 43.8987 ], [ 1.8919, 43.8987 ], [ 1.8915, 43.8986 ], [ 1.8913, 43.8985 ], [ 1.8911, 43.8985 ], [ 1.8907, 43.8984 ], [ 1.8906, 43.8982 ], [ 1.8905, 43.8982 ], [ 1.8903, 43.8981 ], [ 1.89, 43.8981 ], [ 1.8899, 43.8983 ], [ 1.8897, 43.8986 ], [ 1.8894, 43.8989 ], [ 1.8892, 43.899 ], [ 1.889, 43.8992 ], [ 1.889, 43.8992 ], [ 1.8887, 43.8996 ], [ 1.8889, 43.8998 ], [ 1.8884, 43.9003 ], [ 1.8898, 43.9015 ], [ 1.8902, 43.9018 ], [ 1.8906, 43.9022 ], [ 1.8906, 43.9022 ], [ 1.8907, 43.9024 ], [ 1.8909, 43.9026 ], [ 1.8909, 43.9026 ], [ 1.8911, 43.9027 ], [ 1.8912, 43.9027 ], [ 1.8913, 43.9028 ], [ 1.8913, 43.9029 ], [ 1.8914, 43.903 ], [ 1.8915, 43.9032 ], [ 1.8916, 43.9033 ], [ 1.8917, 43.9034 ], [ 1.8918, 43.9035 ], [ 1.8921, 43.9035 ], [ 1.8927, 43.9037 ], [ 1.8928, 43.9037 ], [ 1.893, 43.9038 ], [ 1.893, 43.9039 ], [ 1.8931, 43.904 ], [ 1.8931, 43.9041 ], [ 1.8931, 43.9042 ], [ 1.8931, 43.9043 ], [ 1.893, 43.9046 ], [ 1.893, 43.9047 ], [ 1.8931, 43.9049 ], [ 1.8939, 43.9049 ], [ 1.8942, 43.9049 ], [ 1.8946, 43.9048 ], [ 1.8949, 43.9048 ], [ 1.8956, 43.9048 ], [ 1.8957, 43.9048 ], [ 1.8959, 43.9048 ], [ 1.896, 43.9049 ], [ 1.8961, 43.9049 ], [ 1.896, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8968, 43.9049 ], [ 1.8968, 43.9049 ], [ 1.8969, 43.9049 ], [ 1.8969, 43.9046 ], [ 1.8969, 43.9046 ], [ 1.8971, 43.9046 ], [ 1.8973, 43.9046 ], [ 1.8973, 43.9047 ], [ 1.8975, 43.9047 ], [ 1.8977, 43.9047 ], [ 1.8978, 43.9048 ], [ 1.8979, 43.9048 ], [ 1.8979, 43.9049 ], [ 1.8981, 43.9051 ], [ 1.8981, 43.9052 ], [ 1.8987, 43.9063 ], [ 1.9006, 43.9058 ], [ 1.9008, 43.906 ], [ 1.9014, 43.9068 ], [ 1.9016, 43.9072 ], [ 1.9019, 43.9075 ], [ 1.902, 43.9076 ], [ 1.9021, 43.9078 ], [ 1.9023, 43.9083 ], [ 1.9027, 43.9089 ], [ 1.9031, 43.9094 ], [ 1.9035, 43.9099 ], [ 1.9036, 43.91 ], [ 1.9036, 43.91 ], [ 1.9037, 43.91 ], [ 1.9043, 43.9094 ], [ 1.9052, 43.9087 ], [ 1.9055, 43.9084 ], [ 1.9042, 43.9062 ], [ 1.9041, 43.9061 ], [ 1.904, 43.9061 ], [ 1.9038, 43.9061 ], [ 1.9037, 43.9061 ], [ 1.9035, 43.9061 ], [ 1.9033, 43.9061 ], [ 1.9032, 43.9061 ], [ 1.9031, 43.9061 ], [ 1.9028, 43.906 ], [ 1.9022, 43.9058 ], [ 1.9016, 43.9056 ], [ 1.9012, 43.9055 ], [ 1.9008, 43.9054 ], [ 1.9004, 43.9053 ], [ 1.9001, 43.9052 ], [ 1.8993, 43.9051 ], [ 1.8992, 43.9051 ], [ 1.8987, 43.905 ], [ 1.8984, 43.905 ], [ 1.8983, 43.9049 ], [ 1.8982, 43.9049 ], [ 1.898, 43.9049 ], [ 1.898, 43.9049 ], [ 1.898, 43.9048 ], [ 1.8979, 43.9048 ], [ 1.8978, 43.9047 ], [ 1.8978, 43.9046 ], [ 1.8977, 43.9045 ], [ 1.8974, 43.9039 ] ] ], "type": "Polygon" }, "id": "87", "properties": { "code_commune": "81099", "code_departement": "81", "code_qp": "QP081010", "commune_qp": "Gaillac", "nom_commune": "Gaillac", "nom_qp": "Lentajou - Catalanis" }, "type": "Feature" }, { "bbox": [ 0.5908, 43.6323, 0.5997, 43.6392 ], "geometry": { "coordinates": [ [ [ 0.5963, 43.6372 ], [ 0.5963, 43.6371 ], [ 0.5964, 43.637 ], [ 0.5963, 43.6369 ], [ 0.5961, 43.6356 ], [ 0.5959, 43.6349 ], [ 0.5959, 43.6347 ], [ 0.5959, 43.6345 ], [ 0.5958, 43.6344 ], [ 0.5956, 43.6342 ], [ 0.5953, 43.6337 ], [ 0.595, 43.6333 ], [ 0.5948, 43.633 ], [ 0.5947, 43.6329 ], [ 0.5944, 43.6326 ], [ 0.5942, 43.6325 ], [ 0.5938, 43.6324 ], [ 0.5932, 43.6323 ], [ 0.593, 43.6323 ], [ 0.5928, 43.6323 ], [ 0.5926, 43.6323 ], [ 0.5924, 43.6323 ], [ 0.5921, 43.6324 ], [ 0.5922, 43.6327 ], [ 0.5921, 43.6327 ], [ 0.592, 43.6328 ], [ 0.5923, 43.6339 ], [ 0.5921, 43.6339 ], [ 0.5921, 43.6342 ], [ 0.5922, 43.6342 ], [ 0.5914, 43.6343 ], [ 0.5915, 43.6347 ], [ 0.5914, 43.6347 ], [ 0.5915, 43.6349 ], [ 0.5914, 43.6349 ], [ 0.5915, 43.6352 ], [ 0.5909, 43.6353 ], [ 0.5908, 43.6353 ], [ 0.5908, 43.6353 ], [ 0.5911, 43.636 ], [ 0.5911, 43.6361 ], [ 0.5913, 43.636 ], [ 0.5916, 43.636 ], [ 0.5919, 43.6359 ], [ 0.592, 43.6363 ], [ 0.5925, 43.6363 ], [ 0.5925, 43.6363 ], [ 0.5929, 43.6362 ], [ 0.5931, 43.6367 ], [ 0.5931, 43.6367 ], [ 0.5933, 43.6372 ], [ 0.5932, 43.6373 ], [ 0.5933, 43.6375 ], [ 0.5934, 43.6376 ], [ 0.5939, 43.6375 ], [ 0.5941, 43.6381 ], [ 0.5941, 43.6382 ], [ 0.5946, 43.6381 ], [ 0.5949, 43.6379 ], [ 0.5957, 43.6375 ], [ 0.5961, 43.6373 ], [ 0.5964, 43.6376 ], [ 0.5966, 43.6375 ], [ 0.5967, 43.6375 ], [ 0.5968, 43.6376 ], [ 0.5967, 43.6377 ], [ 0.5972, 43.6381 ], [ 0.596, 43.6386 ], [ 0.5961, 43.6386 ], [ 0.5962, 43.6387 ], [ 0.5966, 43.639 ], [ 0.5968, 43.6391 ], [ 0.5969, 43.6392 ], [ 0.5975, 43.6389 ], [ 0.5977, 43.6389 ], [ 0.5982, 43.6386 ], [ 0.598, 43.6381 ], [ 0.5981, 43.6381 ], [ 0.5983, 43.6381 ], [ 0.5983, 43.6379 ], [ 0.5985, 43.6378 ], [ 0.5989, 43.6376 ], [ 0.5991, 43.6374 ], [ 0.5993, 43.6373 ], [ 0.5994, 43.6371 ], [ 0.5995, 43.6369 ], [ 0.5996, 43.6366 ], [ 0.5997, 43.6366 ], [ 0.5997, 43.6365 ], [ 0.5997, 43.6364 ], [ 0.5997, 43.6363 ], [ 0.5994, 43.6364 ], [ 0.5994, 43.6364 ], [ 0.5992, 43.6363 ], [ 0.5989, 43.6361 ], [ 0.5988, 43.6362 ], [ 0.5985, 43.6363 ], [ 0.5981, 43.6365 ], [ 0.5978, 43.6366 ], [ 0.5974, 43.6367 ], [ 0.5971, 43.6368 ], [ 0.5969, 43.6369 ], [ 0.5967, 43.6371 ], [ 0.5966, 43.6371 ], [ 0.5964, 43.6372 ], [ 0.5964, 43.6372 ], [ 0.5963, 43.6372 ] ] ], "type": "Polygon" }, "id": "88", "properties": { "code_commune": "32013", "code_departement": "32", "code_qp": "QP032001", "commune_qp": "Auch", "nom_commune": "Auch", "nom_qp": "Grand Garros" }, "type": "Feature" }, { "bbox": [ 3.2468, 43.3314, 3.2605, 43.3417 ], "geometry": { "coordinates": [ [ [ 3.259, 43.3402 ], [ 3.2587, 43.34 ], [ 3.2587, 43.34 ], [ 3.2586, 43.34 ], [ 3.2584, 43.3401 ], [ 3.2583, 43.3402 ], [ 3.2583, 43.3401 ], [ 3.2583, 43.3399 ], [ 3.2582, 43.3396 ], [ 3.2581, 43.3391 ], [ 3.2573, 43.3393 ], [ 3.257, 43.3389 ], [ 3.257, 43.3388 ], [ 3.2568, 43.3384 ], [ 3.2567, 43.3383 ], [ 3.2569, 43.3379 ], [ 3.2571, 43.338 ], [ 3.2574, 43.3377 ], [ 3.2578, 43.3378 ], [ 3.2579, 43.3379 ], [ 3.258, 43.3379 ], [ 3.2579, 43.3378 ], [ 3.2583, 43.3373 ], [ 3.2583, 43.3373 ], [ 3.2584, 43.3372 ], [ 3.2584, 43.3372 ], [ 3.2587, 43.3369 ], [ 3.2589, 43.3366 ], [ 3.2589, 43.3366 ], [ 3.2589, 43.3364 ], [ 3.2588, 43.336 ], [ 3.2596, 43.3359 ], [ 3.2599, 43.3358 ], [ 3.26, 43.3357 ], [ 3.2602, 43.3356 ], [ 3.2603, 43.3355 ], [ 3.2604, 43.3354 ], [ 3.2604, 43.3353 ], [ 3.2605, 43.3351 ], [ 3.2595, 43.3351 ], [ 3.2595, 43.3348 ], [ 3.2589, 43.3348 ], [ 3.2586, 43.3348 ], [ 3.2586, 43.3348 ], [ 3.2585, 43.335 ], [ 3.2585, 43.3352 ], [ 3.2584, 43.3352 ], [ 3.2578, 43.3352 ], [ 3.2575, 43.3353 ], [ 3.2574, 43.3352 ], [ 3.2573, 43.3352 ], [ 3.2569, 43.3352 ], [ 3.2567, 43.3352 ], [ 3.2567, 43.3353 ], [ 3.2566, 43.3349 ], [ 3.2567, 43.3348 ], [ 3.2567, 43.334 ], [ 3.2566, 43.3336 ], [ 3.2565, 43.3336 ], [ 3.2561, 43.3336 ], [ 3.2557, 43.3336 ], [ 3.2554, 43.3336 ], [ 3.2552, 43.3336 ], [ 3.2549, 43.3336 ], [ 3.2542, 43.3336 ], [ 3.2537, 43.3336 ], [ 3.2528, 43.3336 ], [ 3.2524, 43.3336 ], [ 3.2522, 43.3336 ], [ 3.252, 43.3336 ], [ 3.2519, 43.3336 ], [ 3.2514, 43.3336 ], [ 3.2513, 43.3336 ], [ 3.2512, 43.3336 ], [ 3.2508, 43.3336 ], [ 3.2506, 43.3333 ], [ 3.2506, 43.3333 ], [ 3.2506, 43.3332 ], [ 3.2506, 43.3331 ], [ 3.2506, 43.3329 ], [ 3.2506, 43.3328 ], [ 3.2506, 43.3326 ], [ 3.2506, 43.3325 ], [ 3.2506, 43.3321 ], [ 3.2506, 43.3318 ], [ 3.2506, 43.3317 ], [ 3.2506, 43.3315 ], [ 3.2506, 43.3315 ], [ 3.2505, 43.3315 ], [ 3.2505, 43.3314 ], [ 3.2498, 43.3314 ], [ 3.2495, 43.3314 ], [ 3.2493, 43.3314 ], [ 3.2491, 43.3315 ], [ 3.2491, 43.3317 ], [ 3.2488, 43.3318 ], [ 3.2488, 43.3319 ], [ 3.2487, 43.3319 ], [ 3.2487, 43.332 ], [ 3.2487, 43.3321 ], [ 3.2487, 43.3321 ], [ 3.2487, 43.3322 ], [ 3.2488, 43.3323 ], [ 3.2488, 43.3323 ], [ 3.2487, 43.3323 ], [ 3.2485, 43.3325 ], [ 3.2485, 43.3326 ], [ 3.2486, 43.3327 ], [ 3.2485, 43.3328 ], [ 3.2485, 43.3328 ], [ 3.2484, 43.3328 ], [ 3.2484, 43.3329 ], [ 3.2483, 43.3329 ], [ 3.2482, 43.3328 ], [ 3.2482, 43.3328 ], [ 3.2479, 43.3328 ], [ 3.2474, 43.3328 ], [ 3.2474, 43.3328 ], [ 3.2473, 43.3329 ], [ 3.2473, 43.333 ], [ 3.2472, 43.333 ], [ 3.2472, 43.3331 ], [ 3.2472, 43.3332 ], [ 3.2472, 43.3333 ], [ 3.2472, 43.3333 ], [ 3.2471, 43.3336 ], [ 3.2471, 43.3338 ], [ 3.2471, 43.334 ], [ 3.2471, 43.3342 ], [ 3.2471, 43.3343 ], [ 3.247, 43.3345 ], [ 3.247, 43.3346 ], [ 3.247, 43.3347 ], [ 3.247, 43.3348 ], [ 3.2471, 43.3349 ], [ 3.2471, 43.3349 ], [ 3.2472, 43.335 ], [ 3.2471, 43.335 ], [ 3.2472, 43.3351 ], [ 3.2468, 43.3352 ], [ 3.2468, 43.3352 ], [ 3.2468, 43.3357 ], [ 3.247, 43.3357 ], [ 3.247, 43.3357 ], [ 3.247, 43.3359 ], [ 3.2475, 43.3359 ], [ 3.2477, 43.3359 ], [ 3.2478, 43.3359 ], [ 3.2478, 43.3358 ], [ 3.2477, 43.3357 ], [ 3.2476, 43.3355 ], [ 3.2475, 43.3353 ], [ 3.2474, 43.3351 ], [ 3.2473, 43.3349 ], [ 3.2472, 43.3349 ], [ 3.2478, 43.3347 ], [ 3.2481, 43.3346 ], [ 3.2484, 43.3345 ], [ 3.2484, 43.3344 ], [ 3.2484, 43.3342 ], [ 3.249, 43.3342 ], [ 3.2493, 43.3341 ], [ 3.2494, 43.334 ], [ 3.2496, 43.334 ], [ 3.2497, 43.3339 ], [ 3.2498, 43.3339 ], [ 3.2499, 43.3339 ], [ 3.25, 43.3339 ], [ 3.2501, 43.3339 ], [ 3.2502, 43.3341 ], [ 3.2502, 43.3342 ], [ 3.2502, 43.3343 ], [ 3.2502, 43.3348 ], [ 3.2502, 43.3352 ], [ 3.2502, 43.3354 ], [ 3.2502, 43.3356 ], [ 3.2502, 43.3356 ], [ 3.2501, 43.3357 ], [ 3.2501, 43.3359 ], [ 3.2501, 43.3365 ], [ 3.2501, 43.3365 ], [ 3.2501, 43.3366 ], [ 3.2502, 43.3366 ], [ 3.2503, 43.3366 ], [ 3.2504, 43.3366 ], [ 3.2504, 43.337 ], [ 3.2502, 43.3371 ], [ 3.2502, 43.337 ], [ 3.2502, 43.3371 ], [ 3.2502, 43.3372 ], [ 3.2496, 43.3374 ], [ 3.2492, 43.3376 ], [ 3.2494, 43.3378 ], [ 3.2495, 43.3379 ], [ 3.2495, 43.3379 ], [ 3.2496, 43.3379 ], [ 3.25, 43.3379 ], [ 3.2501, 43.3379 ], [ 3.2502, 43.3379 ], [ 3.2502, 43.3379 ], [ 3.2503, 43.3379 ], [ 3.2505, 43.3379 ], [ 3.2507, 43.338 ], [ 3.2509, 43.338 ], [ 3.251, 43.338 ], [ 3.251, 43.338 ], [ 3.2511, 43.3381 ], [ 3.2516, 43.3387 ], [ 3.2521, 43.3393 ], [ 3.2523, 43.3392 ], [ 3.2527, 43.3391 ], [ 3.2527, 43.3391 ], [ 3.2527, 43.339 ], [ 3.2529, 43.339 ], [ 3.253, 43.339 ], [ 3.2532, 43.3389 ], [ 3.2533, 43.3388 ], [ 3.2534, 43.3387 ], [ 3.2534, 43.3387 ], [ 3.2536, 43.3386 ], [ 3.2537, 43.3384 ], [ 3.2538, 43.3384 ], [ 3.2539, 43.3382 ], [ 3.2541, 43.338 ], [ 3.2542, 43.338 ], [ 3.2542, 43.3379 ], [ 3.2547, 43.3374 ], [ 3.2547, 43.3374 ], [ 3.2549, 43.3374 ], [ 3.2556, 43.3378 ], [ 3.2556, 43.3381 ], [ 3.2557, 43.3392 ], [ 3.2557, 43.3393 ], [ 3.2557, 43.3394 ], [ 3.2557, 43.3395 ], [ 3.2558, 43.3399 ], [ 3.2559, 43.3411 ], [ 3.2559, 43.3414 ], [ 3.2559, 43.3415 ], [ 3.2563, 43.3415 ], [ 3.2569, 43.3415 ], [ 3.2574, 43.3416 ], [ 3.258, 43.3417 ], [ 3.2584, 43.3417 ], [ 3.2585, 43.3417 ], [ 3.2586, 43.3415 ], [ 3.2586, 43.3414 ], [ 3.2587, 43.3411 ], [ 3.2588, 43.3408 ], [ 3.2591, 43.3403 ], [ 3.259, 43.3402 ] ] ], "type": "Polygon" }, "id": "89", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034003", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Devèze" }, "type": "Feature" }, { "bbox": [ 1.3182, 43.4559, 1.3307, 43.4649 ], "geometry": { "coordinates": [ [ [ 1.321, 43.464 ], [ 1.3214, 43.4638 ], [ 1.3218, 43.4638 ], [ 1.3214, 43.4627 ], [ 1.3218, 43.4626 ], [ 1.3221, 43.4624 ], [ 1.3227, 43.4622 ], [ 1.3229, 43.4625 ], [ 1.3234, 43.4628 ], [ 1.3246, 43.4624 ], [ 1.3248, 43.4624 ], [ 1.3252, 43.4622 ], [ 1.3254, 43.4622 ], [ 1.3256, 43.4622 ], [ 1.326, 43.4621 ], [ 1.3262, 43.4621 ], [ 1.3263, 43.4621 ], [ 1.3263, 43.4618 ], [ 1.3262, 43.4614 ], [ 1.3262, 43.4614 ], [ 1.3265, 43.4614 ], [ 1.3265, 43.4614 ], [ 1.327, 43.4613 ], [ 1.3272, 43.4613 ], [ 1.3276, 43.4612 ], [ 1.3283, 43.4611 ], [ 1.3289, 43.461 ], [ 1.3289, 43.461 ], [ 1.3291, 43.4611 ], [ 1.3292, 43.4611 ], [ 1.3294, 43.4612 ], [ 1.33, 43.4614 ], [ 1.3301, 43.4612 ], [ 1.3303, 43.4612 ], [ 1.3304, 43.4612 ], [ 1.3305, 43.4612 ], [ 1.3305, 43.4612 ], [ 1.3307, 43.4611 ], [ 1.3301, 43.4608 ], [ 1.3299, 43.4607 ], [ 1.3296, 43.4606 ], [ 1.3292, 43.4605 ], [ 1.329, 43.4605 ], [ 1.3288, 43.4603 ], [ 1.3287, 43.4602 ], [ 1.3286, 43.4601 ], [ 1.3285, 43.4601 ], [ 1.3281, 43.4598 ], [ 1.3277, 43.4595 ], [ 1.3275, 43.4594 ], [ 1.3275, 43.4594 ], [ 1.3275, 43.4593 ], [ 1.3275, 43.4593 ], [ 1.3274, 43.4592 ], [ 1.3275, 43.4592 ], [ 1.327, 43.4587 ], [ 1.3266, 43.4586 ], [ 1.3262, 43.458 ], [ 1.3262, 43.4579 ], [ 1.3261, 43.4578 ], [ 1.3259, 43.4575 ], [ 1.3258, 43.4573 ], [ 1.3257, 43.4573 ], [ 1.3256, 43.4573 ], [ 1.3254, 43.4573 ], [ 1.3253, 43.457 ], [ 1.3253, 43.4568 ], [ 1.3252, 43.4567 ], [ 1.3252, 43.4565 ], [ 1.3252, 43.4564 ], [ 1.325, 43.4562 ], [ 1.3249, 43.4561 ], [ 1.3249, 43.456 ], [ 1.3247, 43.4559 ], [ 1.3234, 43.4563 ], [ 1.3236, 43.4566 ], [ 1.3238, 43.4568 ], [ 1.3241, 43.4572 ], [ 1.3246, 43.4576 ], [ 1.3255, 43.4583 ], [ 1.3262, 43.4589 ], [ 1.3262, 43.459 ], [ 1.3262, 43.459 ], [ 1.3257, 43.4594 ], [ 1.3254, 43.4597 ], [ 1.325, 43.46 ], [ 1.3246, 43.4603 ], [ 1.3246, 43.4605 ], [ 1.3245, 43.4606 ], [ 1.3247, 43.4607 ], [ 1.3246, 43.4609 ], [ 1.3246, 43.4609 ], [ 1.3245, 43.461 ], [ 1.3245, 43.461 ], [ 1.3244, 43.4611 ], [ 1.3244, 43.4612 ], [ 1.3242, 43.4614 ], [ 1.3241, 43.4614 ], [ 1.3241, 43.4614 ], [ 1.324, 43.4614 ], [ 1.3239, 43.4615 ], [ 1.3236, 43.4615 ], [ 1.3233, 43.4615 ], [ 1.3232, 43.4615 ], [ 1.323, 43.4616 ], [ 1.323, 43.4616 ], [ 1.3226, 43.4618 ], [ 1.3226, 43.4617 ], [ 1.3223, 43.4618 ], [ 1.3216, 43.462 ], [ 1.3215, 43.4623 ], [ 1.3212, 43.4622 ], [ 1.3208, 43.4621 ], [ 1.3201, 43.4619 ], [ 1.32, 43.4618 ], [ 1.3202, 43.4613 ], [ 1.3202, 43.4613 ], [ 1.3201, 43.4613 ], [ 1.3201, 43.4612 ], [ 1.3202, 43.461 ], [ 1.3198, 43.4609 ], [ 1.3192, 43.4613 ], [ 1.319, 43.4616 ], [ 1.3194, 43.4617 ], [ 1.3199, 43.4618 ], [ 1.32, 43.4619 ], [ 1.3201, 43.4624 ], [ 1.3201, 43.4628 ], [ 1.3209, 43.4628 ], [ 1.321, 43.4628 ], [ 1.3207, 43.4629 ], [ 1.3201, 43.4632 ], [ 1.3193, 43.4636 ], [ 1.3192, 43.4637 ], [ 1.3187, 43.4638 ], [ 1.3182, 43.4639 ], [ 1.3185, 43.4646 ], [ 1.3198, 43.4649 ], [ 1.3203, 43.4647 ], [ 1.3203, 43.4647 ], [ 1.3203, 43.4646 ], [ 1.3212, 43.4644 ], [ 1.321, 43.464 ] ] ], "type": "Polygon" }, "id": "90", "properties": { "code_commune": "31395", "code_departement": "31", "code_qp": "QP031002", "commune_qp": "Muret", "nom_commune": "Muret", "nom_qp": "Centre Ouest" }, "type": "Feature" }, { "bbox": [ 2.9064, 42.6896, 2.9104, 42.6948 ], "geometry": { "coordinates": [ [ [ 2.9104, 42.6943 ], [ 2.9102, 42.6942 ], [ 2.9089, 42.6926 ], [ 2.908, 42.6915 ], [ 2.9077, 42.6912 ], [ 2.9078, 42.6912 ], [ 2.908, 42.691 ], [ 2.909, 42.6906 ], [ 2.9089, 42.6906 ], [ 2.9088, 42.6905 ], [ 2.9073, 42.6896 ], [ 2.907, 42.6899 ], [ 2.9075, 42.6904 ], [ 2.9077, 42.6905 ], [ 2.908, 42.6909 ], [ 2.9077, 42.6911 ], [ 2.9075, 42.6912 ], [ 2.9069, 42.6915 ], [ 2.9065, 42.6917 ], [ 2.9064, 42.6919 ], [ 2.9064, 42.6921 ], [ 2.9065, 42.6927 ], [ 2.9066, 42.6928 ], [ 2.9066, 42.6929 ], [ 2.9066, 42.6929 ], [ 2.9072, 42.6936 ], [ 2.9072, 42.6937 ], [ 2.9073, 42.6938 ], [ 2.9073, 42.6938 ], [ 2.9073, 42.6938 ], [ 2.9072, 42.6938 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9071, 42.694 ], [ 2.907, 42.694 ], [ 2.9069, 42.6941 ], [ 2.9068, 42.6941 ], [ 2.9068, 42.6942 ], [ 2.9068, 42.6942 ], [ 2.9067, 42.6942 ], [ 2.9067, 42.6945 ], [ 2.9066, 42.6947 ], [ 2.9067, 42.6948 ], [ 2.9069, 42.6948 ], [ 2.9069, 42.6948 ], [ 2.907, 42.6948 ], [ 2.9071, 42.6948 ], [ 2.9079, 42.6948 ], [ 2.908, 42.6948 ], [ 2.9082, 42.6948 ], [ 2.9084, 42.6946 ], [ 2.9085, 42.6946 ], [ 2.9091, 42.6943 ], [ 2.9091, 42.6943 ], [ 2.9091, 42.6943 ], [ 2.9092, 42.6943 ], [ 2.9097, 42.6945 ], [ 2.9099, 42.6945 ], [ 2.9099, 42.6945 ], [ 2.91, 42.6945 ], [ 2.91, 42.6945 ], [ 2.9104, 42.6943 ] ] ], "type": "Polygon" }, "id": "91", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066010", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Champs De Mars" }, "type": "Feature" }, { "bbox": [ 3.8632, 43.6049, 3.8725, 43.609 ], "geometry": { "coordinates": [ [ [ 3.8669, 43.609 ], [ 3.8671, 43.6089 ], [ 3.8676, 43.6086 ], [ 3.8684, 43.6082 ], [ 3.8686, 43.6081 ], [ 3.8687, 43.6082 ], [ 3.8688, 43.6082 ], [ 3.869, 43.6085 ], [ 3.8685, 43.6086 ], [ 3.8687, 43.6088 ], [ 3.8689, 43.6088 ], [ 3.8688, 43.6087 ], [ 3.869, 43.6087 ], [ 3.8692, 43.6087 ], [ 3.8692, 43.6087 ], [ 3.8694, 43.6087 ], [ 3.8694, 43.6086 ], [ 3.8694, 43.6086 ], [ 3.8695, 43.6089 ], [ 3.8696, 43.6089 ], [ 3.8696, 43.609 ], [ 3.8697, 43.6089 ], [ 3.8696, 43.6088 ], [ 3.8696, 43.6088 ], [ 3.8698, 43.6087 ], [ 3.8698, 43.6087 ], [ 3.8699, 43.6087 ], [ 3.8698, 43.6087 ], [ 3.8701, 43.6086 ], [ 3.8701, 43.6086 ], [ 3.8701, 43.6085 ], [ 3.8703, 43.6085 ], [ 3.8703, 43.6085 ], [ 3.8704, 43.6085 ], [ 3.8705, 43.6085 ], [ 3.8706, 43.6085 ], [ 3.8707, 43.6085 ], [ 3.8707, 43.6085 ], [ 3.8709, 43.6085 ], [ 3.8709, 43.6085 ], [ 3.8713, 43.6085 ], [ 3.8713, 43.6084 ], [ 3.8716, 43.6084 ], [ 3.8716, 43.6085 ], [ 3.872, 43.6086 ], [ 3.8721, 43.6085 ], [ 3.8724, 43.6086 ], [ 3.8725, 43.6084 ], [ 3.8722, 43.6083 ], [ 3.8722, 43.6083 ], [ 3.8723, 43.6081 ], [ 3.8722, 43.6081 ], [ 3.872, 43.6082 ], [ 3.872, 43.6082 ], [ 3.8716, 43.6079 ], [ 3.8714, 43.6077 ], [ 3.8711, 43.6075 ], [ 3.8708, 43.6072 ], [ 3.8699, 43.6077 ], [ 3.8691, 43.6069 ], [ 3.8685, 43.6062 ], [ 3.868, 43.6064 ], [ 3.8679, 43.6063 ], [ 3.8677, 43.6062 ], [ 3.8677, 43.6062 ], [ 3.8676, 43.6061 ], [ 3.8675, 43.6061 ], [ 3.8674, 43.6061 ], [ 3.8673, 43.6062 ], [ 3.8672, 43.6059 ], [ 3.8671, 43.6058 ], [ 3.8661, 43.6052 ], [ 3.866, 43.6051 ], [ 3.8656, 43.605 ], [ 3.8654, 43.6049 ], [ 3.8653, 43.6049 ], [ 3.8652, 43.605 ], [ 3.8651, 43.605 ], [ 3.865, 43.605 ], [ 3.865, 43.6051 ], [ 3.8649, 43.6052 ], [ 3.8649, 43.6053 ], [ 3.8649, 43.6054 ], [ 3.8648, 43.6056 ], [ 3.8647, 43.6058 ], [ 3.8638, 43.6055 ], [ 3.8635, 43.6061 ], [ 3.8636, 43.6061 ], [ 3.8634, 43.6066 ], [ 3.8633, 43.6068 ], [ 3.8632, 43.6071 ], [ 3.8635, 43.6073 ], [ 3.8636, 43.6074 ], [ 3.8638, 43.6078 ], [ 3.8636, 43.6083 ], [ 3.8639, 43.6083 ], [ 3.864, 43.6085 ], [ 3.8642, 43.6085 ], [ 3.8661, 43.6085 ], [ 3.8667, 43.6085 ], [ 3.8667, 43.6086 ], [ 3.8667, 43.6086 ], [ 3.8667, 43.6087 ], [ 3.8668, 43.6087 ], [ 3.8668, 43.6087 ], [ 3.8669, 43.6087 ], [ 3.8669, 43.609 ] ] ], "type": "Polygon" }, "id": "92", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034010", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Figuerolles" }, "type": "Feature" }, { "bbox": [ 2.2124, 43.0514, 2.2229, 43.0613 ], "geometry": { "coordinates": [ [ [ 2.2203, 43.0524 ], [ 2.2201, 43.0523 ], [ 2.2202, 43.052 ], [ 2.22, 43.0519 ], [ 2.2201, 43.0517 ], [ 2.2203, 43.0515 ], [ 2.2203, 43.0514 ], [ 2.2203, 43.0514 ], [ 2.2202, 43.0514 ], [ 2.22, 43.0514 ], [ 2.2198, 43.0515 ], [ 2.2196, 43.0516 ], [ 2.2194, 43.0518 ], [ 2.2192, 43.052 ], [ 2.2188, 43.0523 ], [ 2.2185, 43.0521 ], [ 2.2184, 43.0521 ], [ 2.2183, 43.0521 ], [ 2.2182, 43.0521 ], [ 2.2182, 43.0521 ], [ 2.2181, 43.0521 ], [ 2.218, 43.0521 ], [ 2.218, 43.0521 ], [ 2.2179, 43.0525 ], [ 2.2178, 43.0527 ], [ 2.2173, 43.0526 ], [ 2.2168, 43.0524 ], [ 2.2165, 43.0522 ], [ 2.2165, 43.0523 ], [ 2.2161, 43.0521 ], [ 2.2157, 43.0523 ], [ 2.2153, 43.0526 ], [ 2.2156, 43.0528 ], [ 2.2147, 43.0534 ], [ 2.2145, 43.0536 ], [ 2.2143, 43.0538 ], [ 2.2139, 43.0542 ], [ 2.2135, 43.0546 ], [ 2.2145, 43.0546 ], [ 2.2144, 43.0549 ], [ 2.2147, 43.055 ], [ 2.2148, 43.0549 ], [ 2.2151, 43.055 ], [ 2.2151, 43.0549 ], [ 2.2153, 43.055 ], [ 2.2155, 43.0547 ], [ 2.216, 43.0547 ], [ 2.2158, 43.055 ], [ 2.2157, 43.0551 ], [ 2.2154, 43.0555 ], [ 2.2153, 43.0559 ], [ 2.2147, 43.0563 ], [ 2.2137, 43.0561 ], [ 2.2141, 43.0554 ], [ 2.2134, 43.0551 ], [ 2.213, 43.0551 ], [ 2.2129, 43.0552 ], [ 2.2127, 43.0557 ], [ 2.2125, 43.056 ], [ 2.2124, 43.0563 ], [ 2.2124, 43.0565 ], [ 2.2129, 43.0564 ], [ 2.2134, 43.0562 ], [ 2.2135, 43.0567 ], [ 2.2137, 43.0569 ], [ 2.2138, 43.057 ], [ 2.2139, 43.057 ], [ 2.2141, 43.057 ], [ 2.2155, 43.0575 ], [ 2.2156, 43.0574 ], [ 2.2157, 43.0573 ], [ 2.2157, 43.0573 ], [ 2.2167, 43.0564 ], [ 2.217, 43.0561 ], [ 2.2177, 43.0554 ], [ 2.2187, 43.0558 ], [ 2.219, 43.0558 ], [ 2.2192, 43.0559 ], [ 2.2193, 43.0559 ], [ 2.2199, 43.0559 ], [ 2.2201, 43.0559 ], [ 2.2201, 43.0561 ], [ 2.22, 43.0567 ], [ 2.2205, 43.0567 ], [ 2.2205, 43.0569 ], [ 2.2205, 43.057 ], [ 2.2205, 43.057 ], [ 2.2207, 43.057 ], [ 2.2208, 43.0571 ], [ 2.221, 43.0571 ], [ 2.221, 43.0572 ], [ 2.2211, 43.0572 ], [ 2.2212, 43.0573 ], [ 2.2213, 43.0575 ], [ 2.2213, 43.0577 ], [ 2.2214, 43.0578 ], [ 2.2213, 43.0579 ], [ 2.2213, 43.0579 ], [ 2.2207, 43.0579 ], [ 2.2206, 43.0584 ], [ 2.22, 43.0584 ], [ 2.22, 43.0586 ], [ 2.2205, 43.0587 ], [ 2.2205, 43.0587 ], [ 2.2207, 43.0589 ], [ 2.2207, 43.059 ], [ 2.2206, 43.0592 ], [ 2.2206, 43.0592 ], [ 2.2207, 43.0593 ], [ 2.2208, 43.0593 ], [ 2.2208, 43.0596 ], [ 2.2207, 43.0596 ], [ 2.2203, 43.0596 ], [ 2.2197, 43.0597 ], [ 2.2186, 43.0598 ], [ 2.2178, 43.0599 ], [ 2.218, 43.0607 ], [ 2.2181, 43.0613 ], [ 2.2184, 43.0613 ], [ 2.2186, 43.0612 ], [ 2.219, 43.0611 ], [ 2.2193, 43.0611 ], [ 2.2198, 43.061 ], [ 2.2198, 43.0604 ], [ 2.2201, 43.0604 ], [ 2.22, 43.0601 ], [ 2.2212, 43.06 ], [ 2.2211, 43.0597 ], [ 2.2211, 43.0597 ], [ 2.2211, 43.0596 ], [ 2.2211, 43.0595 ], [ 2.2212, 43.0592 ], [ 2.2213, 43.0587 ], [ 2.2214, 43.0582 ], [ 2.2214, 43.058 ], [ 2.2214, 43.0579 ], [ 2.2215, 43.0578 ], [ 2.2219, 43.0578 ], [ 2.2223, 43.0578 ], [ 2.2223, 43.058 ], [ 2.2228, 43.0579 ], [ 2.2228, 43.0577 ], [ 2.2228, 43.0569 ], [ 2.2229, 43.0561 ], [ 2.2227, 43.0561 ], [ 2.2227, 43.0562 ], [ 2.2226, 43.0562 ], [ 2.2225, 43.0562 ], [ 2.2224, 43.0563 ], [ 2.2224, 43.0564 ], [ 2.2223, 43.0574 ], [ 2.2213, 43.0575 ], [ 2.2212, 43.0573 ], [ 2.2211, 43.0571 ], [ 2.2209, 43.057 ], [ 2.2209, 43.0569 ], [ 2.2209, 43.0568 ], [ 2.2208, 43.0567 ], [ 2.2205, 43.0562 ], [ 2.2203, 43.0559 ], [ 2.2201, 43.0557 ], [ 2.2202, 43.0553 ], [ 2.2203, 43.055 ], [ 2.2205, 43.055 ], [ 2.2207, 43.055 ], [ 2.2207, 43.055 ], [ 2.221, 43.0551 ], [ 2.2211, 43.0548 ], [ 2.2212, 43.0547 ], [ 2.2213, 43.0545 ], [ 2.2213, 43.0544 ], [ 2.2213, 43.0544 ], [ 2.2209, 43.0544 ], [ 2.2207, 43.0543 ], [ 2.2201, 43.0542 ], [ 2.219, 43.054 ], [ 2.2193, 43.0538 ], [ 2.2194, 43.0536 ], [ 2.2197, 43.0532 ], [ 2.22, 43.0529 ], [ 2.2203, 43.0524 ] ] ], "type": "Polygon" }, "id": "93", "properties": { "code_commune": "11206", "code_departement": "11", "code_qp": "QP011001", "commune_qp": "Limoux", "nom_commune": "Limoux", "nom_qp": "Quartier Aude" }, "type": "Feature" }, { "bbox": [ 4.6115, 44.1552, 4.6259, 44.1628 ], "geometry": { "coordinates": [ [ [ 4.6258, 44.1607 ], [ 4.6257, 44.1605 ], [ 4.6254, 44.1602 ], [ 4.6254, 44.1601 ], [ 4.6252, 44.16 ], [ 4.6251, 44.1599 ], [ 4.625, 44.1598 ], [ 4.6248, 44.1597 ], [ 4.6246, 44.1593 ], [ 4.6225, 44.1564 ], [ 4.6223, 44.1563 ], [ 4.6221, 44.156 ], [ 4.6219, 44.1559 ], [ 4.6218, 44.1558 ], [ 4.6216, 44.1557 ], [ 4.6208, 44.1557 ], [ 4.6192, 44.1556 ], [ 4.619, 44.1555 ], [ 4.618, 44.1555 ], [ 4.6177, 44.1554 ], [ 4.6175, 44.1554 ], [ 4.6173, 44.1554 ], [ 4.6171, 44.1553 ], [ 4.617, 44.1552 ], [ 4.6169, 44.1553 ], [ 4.6169, 44.1554 ], [ 4.6168, 44.1554 ], [ 4.6168, 44.1555 ], [ 4.6167, 44.1556 ], [ 4.6168, 44.1558 ], [ 4.6169, 44.1559 ], [ 4.617, 44.1561 ], [ 4.6172, 44.1564 ], [ 4.6169, 44.1565 ], [ 4.6165, 44.1566 ], [ 4.6161, 44.1566 ], [ 4.6157, 44.1561 ], [ 4.6154, 44.1557 ], [ 4.6153, 44.1556 ], [ 4.6153, 44.1556 ], [ 4.6153, 44.1555 ], [ 4.6144, 44.1557 ], [ 4.6145, 44.156 ], [ 4.6147, 44.1565 ], [ 4.6143, 44.1566 ], [ 4.614, 44.1566 ], [ 4.614, 44.1566 ], [ 4.614, 44.1567 ], [ 4.6141, 44.1568 ], [ 4.6145, 44.157 ], [ 4.6146, 44.1571 ], [ 4.6147, 44.1572 ], [ 4.6151, 44.1577 ], [ 4.6152, 44.1579 ], [ 4.6151, 44.1579 ], [ 4.6152, 44.1582 ], [ 4.6152, 44.1582 ], [ 4.6134, 44.1585 ], [ 4.6133, 44.1585 ], [ 4.6133, 44.1585 ], [ 4.6134, 44.1587 ], [ 4.6136, 44.159 ], [ 4.6139, 44.1597 ], [ 4.6137, 44.1598 ], [ 4.6129, 44.1598 ], [ 4.612, 44.16 ], [ 4.6116, 44.1601 ], [ 4.6116, 44.1601 ], [ 4.6115, 44.1602 ], [ 4.6115, 44.1604 ], [ 4.6116, 44.161 ], [ 4.6117, 44.1628 ], [ 4.6125, 44.1627 ], [ 4.6123, 44.1612 ], [ 4.6123, 44.16 ], [ 4.6124, 44.1599 ], [ 4.6129, 44.1599 ], [ 4.6138, 44.1598 ], [ 4.6139, 44.1597 ], [ 4.6136, 44.159 ], [ 4.6146, 44.159 ], [ 4.6147, 44.159 ], [ 4.6156, 44.1589 ], [ 4.6157, 44.1588 ], [ 4.6179, 44.1581 ], [ 4.618, 44.158 ], [ 4.618, 44.1582 ], [ 4.6181, 44.1583 ], [ 4.6182, 44.1585 ], [ 4.6184, 44.1587 ], [ 4.6186, 44.1589 ], [ 4.6189, 44.1594 ], [ 4.6194, 44.1592 ], [ 4.6195, 44.1595 ], [ 4.6196, 44.1595 ], [ 4.6197, 44.1595 ], [ 4.6198, 44.1598 ], [ 4.6197, 44.1598 ], [ 4.6197, 44.1602 ], [ 4.6206, 44.1602 ], [ 4.6208, 44.1602 ], [ 4.621, 44.1601 ], [ 4.6211, 44.1602 ], [ 4.6211, 44.1602 ], [ 4.6212, 44.1604 ], [ 4.6215, 44.1603 ], [ 4.6215, 44.1604 ], [ 4.6225, 44.1603 ], [ 4.6226, 44.1603 ], [ 4.6226, 44.1601 ], [ 4.6226, 44.1598 ], [ 4.623, 44.1598 ], [ 4.6234, 44.1598 ], [ 4.6235, 44.16 ], [ 4.6238, 44.1599 ], [ 4.624, 44.1602 ], [ 4.624, 44.1602 ], [ 4.6243, 44.1602 ], [ 4.6243, 44.1604 ], [ 4.6242, 44.1606 ], [ 4.6243, 44.1607 ], [ 4.6243, 44.1609 ], [ 4.6252, 44.1607 ], [ 4.6252, 44.1608 ], [ 4.6254, 44.1607 ], [ 4.6255, 44.161 ], [ 4.6256, 44.161 ], [ 4.6257, 44.1609 ], [ 4.6258, 44.1609 ], [ 4.6258, 44.1608 ], [ 4.6259, 44.1608 ], [ 4.6258, 44.1607 ] ] ], "type": "Polygon" }, "id": "94", "properties": { "code_commune": "30028", "code_departement": "30", "code_qp": "QP030010", "commune_qp": "Bagnols-sur-Cèze", "nom_commune": "Bagnols-sur-Cèze", "nom_qp": "Escanaux - Coronelle - Citadelle - Vigan Braquet" }, "type": "Feature" }, { "bbox": [ 4.4107, 44.0178, 4.4182, 44.0292 ], "geometry": { "coordinates": [ [ [ 4.4182, 44.0186 ], [ 4.418, 44.018 ], [ 4.4179, 44.0178 ], [ 4.4176, 44.0179 ], [ 4.4174, 44.0179 ], [ 4.4165, 44.0182 ], [ 4.4163, 44.0182 ], [ 4.4162, 44.0183 ], [ 4.416, 44.0183 ], [ 4.4159, 44.0183 ], [ 4.4159, 44.0183 ], [ 4.4158, 44.0183 ], [ 4.4155, 44.0184 ], [ 4.4152, 44.0186 ], [ 4.4146, 44.0187 ], [ 4.4145, 44.0188 ], [ 4.4144, 44.0188 ], [ 4.4138, 44.019 ], [ 4.4136, 44.0191 ], [ 4.4133, 44.0192 ], [ 4.4131, 44.0193 ], [ 4.4129, 44.0194 ], [ 4.4125, 44.0195 ], [ 4.4122, 44.0196 ], [ 4.4118, 44.0197 ], [ 4.4111, 44.02 ], [ 4.4113, 44.0204 ], [ 4.4115, 44.0208 ], [ 4.4117, 44.0212 ], [ 4.4122, 44.022 ], [ 4.4119, 44.0222 ], [ 4.4116, 44.0224 ], [ 4.4116, 44.0224 ], [ 4.4113, 44.0227 ], [ 4.4112, 44.0228 ], [ 4.411, 44.0229 ], [ 4.4108, 44.0233 ], [ 4.4108, 44.0234 ], [ 4.4107, 44.0239 ], [ 4.4107, 44.024 ], [ 4.4107, 44.0242 ], [ 4.4108, 44.0243 ], [ 4.4109, 44.0245 ], [ 4.4111, 44.0247 ], [ 4.4112, 44.0248 ], [ 4.4113, 44.0248 ], [ 4.412, 44.0251 ], [ 4.4121, 44.0252 ], [ 4.4122, 44.0252 ], [ 4.4123, 44.0253 ], [ 4.4126, 44.0253 ], [ 4.4126, 44.0254 ], [ 4.4126, 44.0254 ], [ 4.4126, 44.0254 ], [ 4.413, 44.0255 ], [ 4.4131, 44.0256 ], [ 4.4133, 44.0256 ], [ 4.4138, 44.0256 ], [ 4.4137, 44.0257 ], [ 4.4137, 44.0259 ], [ 4.4136, 44.0261 ], [ 4.4135, 44.0262 ], [ 4.4135, 44.0263 ], [ 4.4135, 44.0264 ], [ 4.4136, 44.0265 ], [ 4.4136, 44.0265 ], [ 4.4137, 44.0266 ], [ 4.4138, 44.0267 ], [ 4.4139, 44.0268 ], [ 4.4141, 44.0269 ], [ 4.4145, 44.027 ], [ 4.4144, 44.0271 ], [ 4.4145, 44.0272 ], [ 4.4147, 44.0274 ], [ 4.4149, 44.0276 ], [ 4.4151, 44.0278 ], [ 4.4157, 44.0287 ], [ 4.4158, 44.0288 ], [ 4.4159, 44.0288 ], [ 4.4161, 44.029 ], [ 4.4162, 44.0291 ], [ 4.4163, 44.0292 ], [ 4.417, 44.029 ], [ 4.4175, 44.0288 ], [ 4.4175, 44.0288 ], [ 4.4175, 44.0287 ], [ 4.4176, 44.0286 ], [ 4.4176, 44.0282 ], [ 4.4176, 44.0276 ], [ 4.4176, 44.0274 ], [ 4.4175, 44.0271 ], [ 4.4175, 44.027 ], [ 4.4175, 44.0268 ], [ 4.4174, 44.0267 ], [ 4.4173, 44.0263 ], [ 4.4173, 44.0262 ], [ 4.4173, 44.0261 ], [ 4.4172, 44.026 ], [ 4.4172, 44.0257 ], [ 4.4171, 44.0252 ], [ 4.4171, 44.0251 ], [ 4.417, 44.0249 ], [ 4.417, 44.0248 ], [ 4.4169, 44.0247 ], [ 4.4169, 44.0247 ], [ 4.4168, 44.0246 ], [ 4.4167, 44.0246 ], [ 4.4166, 44.0245 ], [ 4.4158, 44.0243 ], [ 4.4155, 44.024 ], [ 4.4153, 44.0239 ], [ 4.415, 44.0237 ], [ 4.4146, 44.0234 ], [ 4.4142, 44.0231 ], [ 4.4141, 44.023 ], [ 4.4147, 44.0215 ], [ 4.4149, 44.0211 ], [ 4.4152, 44.0202 ], [ 4.4155, 44.0194 ], [ 4.416, 44.0196 ], [ 4.4164, 44.0198 ], [ 4.4168, 44.0196 ], [ 4.4172, 44.0194 ], [ 4.4174, 44.0193 ], [ 4.4174, 44.0193 ], [ 4.4175, 44.0193 ], [ 4.4175, 44.0192 ], [ 4.4176, 44.0192 ], [ 4.4177, 44.0191 ], [ 4.4179, 44.0189 ], [ 4.4181, 44.0187 ], [ 4.4182, 44.0186 ] ] ], "type": "Polygon" }, "id": "95", "properties": { "code_commune": "30334", "code_departement": "30", "code_qp": "QP030018", "commune_qp": "Uzès", "nom_commune": "Uzès", "nom_qp": "Quartier Prioritaire D'Uzès" }, "type": "Feature" }, { "bbox": [ 2.1515, 43.9406, 2.1586, 43.9467 ], "geometry": { "coordinates": [ [ [ 2.1567, 43.9451 ], [ 2.1558, 43.9446 ], [ 2.1559, 43.9446 ], [ 2.1556, 43.9445 ], [ 2.1558, 43.9443 ], [ 2.1558, 43.9441 ], [ 2.1555, 43.9439 ], [ 2.156, 43.9436 ], [ 2.1562, 43.9436 ], [ 2.1564, 43.9437 ], [ 2.1565, 43.9438 ], [ 2.1566, 43.9438 ], [ 2.1567, 43.9438 ], [ 2.1569, 43.9438 ], [ 2.1571, 43.9439 ], [ 2.1573, 43.9439 ], [ 2.1575, 43.9438 ], [ 2.1576, 43.9438 ], [ 2.1579, 43.9438 ], [ 2.158, 43.9438 ], [ 2.1581, 43.9438 ], [ 2.1581, 43.9438 ], [ 2.1582, 43.9438 ], [ 2.1582, 43.9437 ], [ 2.1583, 43.9436 ], [ 2.1585, 43.9435 ], [ 2.1586, 43.9433 ], [ 2.1586, 43.9432 ], [ 2.1586, 43.9431 ], [ 2.1586, 43.943 ], [ 2.1586, 43.9428 ], [ 2.1586, 43.9426 ], [ 2.1585, 43.9422 ], [ 2.1584, 43.9419 ], [ 2.158, 43.9418 ], [ 2.1571, 43.9413 ], [ 2.157, 43.9413 ], [ 2.1569, 43.9413 ], [ 2.1569, 43.9413 ], [ 2.1565, 43.9411 ], [ 2.1564, 43.9411 ], [ 2.1563, 43.941 ], [ 2.1564, 43.941 ], [ 2.1562, 43.9409 ], [ 2.156, 43.9412 ], [ 2.1558, 43.9411 ], [ 2.1557, 43.9411 ], [ 2.1557, 43.9411 ], [ 2.1556, 43.9409 ], [ 2.1555, 43.9406 ], [ 2.1554, 43.9406 ], [ 2.1554, 43.9407 ], [ 2.1552, 43.9407 ], [ 2.1551, 43.9407 ], [ 2.155, 43.9407 ], [ 2.1542, 43.9407 ], [ 2.1542, 43.941 ], [ 2.1539, 43.941 ], [ 2.1537, 43.941 ], [ 2.1535, 43.941 ], [ 2.1533, 43.9411 ], [ 2.1532, 43.9412 ], [ 2.1531, 43.9413 ], [ 2.153, 43.9414 ], [ 2.1529, 43.9415 ], [ 2.1529, 43.9416 ], [ 2.1529, 43.9417 ], [ 2.1529, 43.9417 ], [ 2.1529, 43.9418 ], [ 2.1526, 43.942 ], [ 2.1523, 43.9423 ], [ 2.1521, 43.9423 ], [ 2.1521, 43.9424 ], [ 2.1519, 43.9424 ], [ 2.1518, 43.9425 ], [ 2.1517, 43.9425 ], [ 2.1515, 43.9425 ], [ 2.1517, 43.943 ], [ 2.1517, 43.9431 ], [ 2.1519, 43.9431 ], [ 2.153, 43.943 ], [ 2.1532, 43.943 ], [ 2.154, 43.9434 ], [ 2.1541, 43.9434 ], [ 2.1543, 43.9435 ], [ 2.154, 43.9438 ], [ 2.1543, 43.9439 ], [ 2.1541, 43.944 ], [ 2.154, 43.9441 ], [ 2.1539, 43.9442 ], [ 2.1538, 43.9444 ], [ 2.1538, 43.9445 ], [ 2.1537, 43.9446 ], [ 2.1537, 43.9447 ], [ 2.1536, 43.9448 ], [ 2.1536, 43.9452 ], [ 2.1535, 43.9455 ], [ 2.1535, 43.9456 ], [ 2.1535, 43.9457 ], [ 2.1536, 43.9458 ], [ 2.1536, 43.9459 ], [ 2.1537, 43.9461 ], [ 2.1538, 43.9462 ], [ 2.1539, 43.9463 ], [ 2.1541, 43.9463 ], [ 2.1546, 43.9466 ], [ 2.1549, 43.9467 ], [ 2.1552, 43.9464 ], [ 2.1553, 43.9464 ], [ 2.1554, 43.9465 ], [ 2.1554, 43.9462 ], [ 2.1556, 43.9462 ], [ 2.1556, 43.9462 ], [ 2.1557, 43.9462 ], [ 2.1558, 43.9462 ], [ 2.1559, 43.9462 ], [ 2.1559, 43.9461 ], [ 2.1562, 43.9458 ], [ 2.1564, 43.9458 ], [ 2.1565, 43.9456 ], [ 2.1563, 43.9456 ], [ 2.1564, 43.9455 ], [ 2.1565, 43.9453 ], [ 2.1567, 43.9451 ] ] ], "type": "Polygon" }, "id": "96", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081006", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Cantepau" }, "type": "Feature" }, { "bbox": [ 2.2488, 43.6026, 2.2616, 43.6152 ], "geometry": { "coordinates": [ [ [ 2.255, 43.6138 ], [ 2.2548, 43.6142 ], [ 2.2547, 43.6144 ], [ 2.2546, 43.6145 ], [ 2.2544, 43.6147 ], [ 2.2543, 43.6148 ], [ 2.254, 43.615 ], [ 2.2543, 43.6152 ], [ 2.2545, 43.6151 ], [ 2.2549, 43.6149 ], [ 2.2552, 43.6148 ], [ 2.2551, 43.6145 ], [ 2.2558, 43.6144 ], [ 2.2562, 43.6135 ], [ 2.2563, 43.6135 ], [ 2.2565, 43.6133 ], [ 2.2562, 43.6132 ], [ 2.2563, 43.6131 ], [ 2.2562, 43.6131 ], [ 2.2563, 43.6129 ], [ 2.2566, 43.6129 ], [ 2.2567, 43.6129 ], [ 2.2568, 43.6129 ], [ 2.2569, 43.6129 ], [ 2.257, 43.6129 ], [ 2.257, 43.6128 ], [ 2.2571, 43.6128 ], [ 2.2571, 43.6127 ], [ 2.2571, 43.6127 ], [ 2.2572, 43.6125 ], [ 2.2573, 43.6124 ], [ 2.2574, 43.6123 ], [ 2.2575, 43.6122 ], [ 2.2577, 43.6121 ], [ 2.2579, 43.612 ], [ 2.2579, 43.6119 ], [ 2.2579, 43.6118 ], [ 2.258, 43.6107 ], [ 2.258, 43.6104 ], [ 2.258, 43.6103 ], [ 2.2579, 43.6103 ], [ 2.2567, 43.6103 ], [ 2.2567, 43.6103 ], [ 2.2565, 43.6103 ], [ 2.2564, 43.6103 ], [ 2.2563, 43.6102 ], [ 2.2562, 43.6102 ], [ 2.256, 43.6102 ], [ 2.2559, 43.6102 ], [ 2.256, 43.6097 ], [ 2.2561, 43.6089 ], [ 2.2561, 43.6089 ], [ 2.2564, 43.6088 ], [ 2.2565, 43.6088 ], [ 2.2564, 43.6087 ], [ 2.2564, 43.6086 ], [ 2.2565, 43.6086 ], [ 2.2565, 43.6085 ], [ 2.2568, 43.6084 ], [ 2.2569, 43.6084 ], [ 2.257, 43.6084 ], [ 2.2571, 43.6085 ], [ 2.2573, 43.6085 ], [ 2.2574, 43.6085 ], [ 2.2576, 43.6085 ], [ 2.2577, 43.6085 ], [ 2.2579, 43.6084 ], [ 2.258, 43.6081 ], [ 2.258, 43.6079 ], [ 2.2579, 43.6078 ], [ 2.2577, 43.6077 ], [ 2.2576, 43.6076 ], [ 2.2576, 43.6075 ], [ 2.2576, 43.6075 ], [ 2.2576, 43.6074 ], [ 2.2586, 43.6068 ], [ 2.2601, 43.606 ], [ 2.2605, 43.6058 ], [ 2.2611, 43.6054 ], [ 2.2613, 43.6052 ], [ 2.2614, 43.6052 ], [ 2.2615, 43.6051 ], [ 2.2616, 43.605 ], [ 2.2616, 43.6049 ], [ 2.2615, 43.6049 ], [ 2.2613, 43.6047 ], [ 2.2611, 43.6044 ], [ 2.2603, 43.6035 ], [ 2.2595, 43.6026 ], [ 2.259, 43.6029 ], [ 2.2583, 43.6032 ], [ 2.2589, 43.6038 ], [ 2.258, 43.6044 ], [ 2.2582, 43.6045 ], [ 2.257, 43.6049 ], [ 2.2556, 43.6053 ], [ 2.2558, 43.6058 ], [ 2.256, 43.6063 ], [ 2.2561, 43.6063 ], [ 2.2547, 43.6067 ], [ 2.254, 43.6061 ], [ 2.2537, 43.6063 ], [ 2.252, 43.6073 ], [ 2.2523, 43.6073 ], [ 2.2528, 43.6075 ], [ 2.2552, 43.608 ], [ 2.2551, 43.6082 ], [ 2.2551, 43.6082 ], [ 2.2551, 43.6082 ], [ 2.2554, 43.6084 ], [ 2.2554, 43.6086 ], [ 2.2553, 43.6086 ], [ 2.2549, 43.6087 ], [ 2.2547, 43.6087 ], [ 2.2545, 43.6087 ], [ 2.2539, 43.6087 ], [ 2.2538, 43.6096 ], [ 2.2538, 43.6098 ], [ 2.2531, 43.6096 ], [ 2.2529, 43.6098 ], [ 2.2512, 43.6096 ], [ 2.2515, 43.6099 ], [ 2.2505, 43.6104 ], [ 2.251, 43.611 ], [ 2.2525, 43.6102 ], [ 2.2526, 43.6101 ], [ 2.2529, 43.6099 ], [ 2.253, 43.6099 ], [ 2.2534, 43.6103 ], [ 2.2538, 43.6103 ], [ 2.2538, 43.6105 ], [ 2.2538, 43.6107 ], [ 2.2538, 43.6109 ], [ 2.2536, 43.611 ], [ 2.2524, 43.6116 ], [ 2.2536, 43.6119 ], [ 2.2536, 43.6119 ], [ 2.2534, 43.6123 ], [ 2.2535, 43.6123 ], [ 2.2533, 43.6127 ], [ 2.2533, 43.6128 ], [ 2.2522, 43.6131 ], [ 2.2523, 43.6134 ], [ 2.2517, 43.6135 ], [ 2.2513, 43.6136 ], [ 2.2513, 43.6137 ], [ 2.2514, 43.6138 ], [ 2.2504, 43.6141 ], [ 2.2502, 43.6139 ], [ 2.2502, 43.614 ], [ 2.2498, 43.6141 ], [ 2.2495, 43.6136 ], [ 2.2488, 43.6138 ], [ 2.2491, 43.6143 ], [ 2.2492, 43.6145 ], [ 2.2492, 43.6146 ], [ 2.2492, 43.6147 ], [ 2.2493, 43.6147 ], [ 2.2495, 43.6148 ], [ 2.2495, 43.6148 ], [ 2.2498, 43.6147 ], [ 2.2499, 43.6147 ], [ 2.2502, 43.6145 ], [ 2.2508, 43.6144 ], [ 2.2516, 43.6141 ], [ 2.2524, 43.6138 ], [ 2.2528, 43.6137 ], [ 2.2531, 43.6136 ], [ 2.2534, 43.6135 ], [ 2.2536, 43.6135 ], [ 2.2537, 43.6135 ], [ 2.255, 43.6138 ] ] ], "type": "Polygon" }, "id": "97", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081004", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Aillot Bisséous Lardaillé" }, "type": "Feature" }, { "bbox": [ 1.4126, 43.5904, 1.4202, 43.595 ], "geometry": { "coordinates": [ [ [ 1.4184, 43.591 ], [ 1.4183, 43.5909 ], [ 1.4177, 43.5907 ], [ 1.4174, 43.5906 ], [ 1.4169, 43.5904 ], [ 1.4164, 43.5915 ], [ 1.4169, 43.5916 ], [ 1.4165, 43.5922 ], [ 1.4165, 43.5922 ], [ 1.416, 43.5931 ], [ 1.4159, 43.5931 ], [ 1.415, 43.593 ], [ 1.4151, 43.5927 ], [ 1.4153, 43.5924 ], [ 1.4151, 43.5923 ], [ 1.4142, 43.5921 ], [ 1.4141, 43.5929 ], [ 1.4141, 43.593 ], [ 1.414, 43.593 ], [ 1.414, 43.5934 ], [ 1.4135, 43.5933 ], [ 1.4131, 43.5933 ], [ 1.4128, 43.5939 ], [ 1.4128, 43.5939 ], [ 1.4126, 43.5944 ], [ 1.4128, 43.5945 ], [ 1.4129, 43.5945 ], [ 1.4153, 43.5949 ], [ 1.4153, 43.5949 ], [ 1.4155, 43.5949 ], [ 1.4155, 43.5949 ], [ 1.4156, 43.5949 ], [ 1.4158, 43.5941 ], [ 1.4163, 43.5942 ], [ 1.4163, 43.5943 ], [ 1.4178, 43.5944 ], [ 1.4179, 43.5941 ], [ 1.4192, 43.5942 ], [ 1.4193, 43.5949 ], [ 1.4199, 43.595 ], [ 1.4199, 43.5948 ], [ 1.42, 43.5948 ], [ 1.4202, 43.594 ], [ 1.4202, 43.594 ], [ 1.4196, 43.5941 ], [ 1.4199, 43.5932 ], [ 1.4197, 43.5931 ], [ 1.4197, 43.5931 ], [ 1.4195, 43.593 ], [ 1.4196, 43.593 ], [ 1.4196, 43.5929 ], [ 1.4194, 43.5928 ], [ 1.4194, 43.5928 ], [ 1.4193, 43.5927 ], [ 1.4193, 43.5927 ], [ 1.4189, 43.5927 ], [ 1.4188, 43.5927 ], [ 1.4187, 43.5927 ], [ 1.4187, 43.5927 ], [ 1.4178, 43.5929 ], [ 1.4175, 43.5928 ], [ 1.4176, 43.5925 ], [ 1.4176, 43.5924 ], [ 1.4175, 43.5924 ], [ 1.4176, 43.5922 ], [ 1.4177, 43.5915 ], [ 1.4178, 43.5915 ], [ 1.4185, 43.5914 ], [ 1.4185, 43.5911 ], [ 1.4184, 43.591 ] ] ], "type": "Polygon" }, "id": "98", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031008", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Arènes" }, "type": "Feature" }, { "bbox": [ 2.3607, 43.502, 2.3691, 43.5087 ], "geometry": { "coordinates": [ [ [ 2.3622, 43.5087 ], [ 2.3624, 43.5085 ], [ 2.3627, 43.5087 ], [ 2.3634, 43.508 ], [ 2.3639, 43.5075 ], [ 2.364, 43.5073 ], [ 2.3643, 43.507 ], [ 2.3643, 43.5069 ], [ 2.3646, 43.5068 ], [ 2.3647, 43.5069 ], [ 2.3653, 43.5069 ], [ 2.3668, 43.5069 ], [ 2.3668, 43.5072 ], [ 2.3668, 43.5083 ], [ 2.3673, 43.5083 ], [ 2.3673, 43.508 ], [ 2.3672, 43.508 ], [ 2.3673, 43.5069 ], [ 2.3675, 43.507 ], [ 2.3676, 43.507 ], [ 2.3677, 43.5064 ], [ 2.3677, 43.5059 ], [ 2.3669, 43.5059 ], [ 2.3669, 43.5054 ], [ 2.3669, 43.5054 ], [ 2.3669, 43.5053 ], [ 2.367, 43.5052 ], [ 2.3671, 43.5048 ], [ 2.3672, 43.5042 ], [ 2.3673, 43.5041 ], [ 2.3673, 43.5041 ], [ 2.3674, 43.504 ], [ 2.3676, 43.504 ], [ 2.3677, 43.5041 ], [ 2.3678, 43.5044 ], [ 2.3679, 43.5045 ], [ 2.3681, 43.5045 ], [ 2.3682, 43.5044 ], [ 2.3682, 43.5044 ], [ 2.3681, 43.5043 ], [ 2.3681, 43.5042 ], [ 2.3681, 43.5042 ], [ 2.3681, 43.504 ], [ 2.3682, 43.5039 ], [ 2.3683, 43.5038 ], [ 2.3684, 43.5037 ], [ 2.3683, 43.5037 ], [ 2.3681, 43.5036 ], [ 2.3686, 43.5032 ], [ 2.3691, 43.5028 ], [ 2.3686, 43.502 ], [ 2.3673, 43.5035 ], [ 2.3672, 43.5036 ], [ 2.3669, 43.5039 ], [ 2.3668, 43.5042 ], [ 2.3667, 43.5045 ], [ 2.3667, 43.5044 ], [ 2.3665, 43.5043 ], [ 2.3663, 43.5044 ], [ 2.366, 43.5042 ], [ 2.366, 43.5042 ], [ 2.3662, 43.5039 ], [ 2.3668, 43.5034 ], [ 2.3668, 43.5033 ], [ 2.3666, 43.5031 ], [ 2.3665, 43.5031 ], [ 2.3662, 43.5031 ], [ 2.3647, 43.5033 ], [ 2.3647, 43.5033 ], [ 2.3639, 43.5035 ], [ 2.3637, 43.5036 ], [ 2.3637, 43.5036 ], [ 2.3636, 43.5034 ], [ 2.3634, 43.5034 ], [ 2.3634, 43.5034 ], [ 2.3631, 43.5034 ], [ 2.363, 43.5033 ], [ 2.3629, 43.5034 ], [ 2.3626, 43.5035 ], [ 2.3626, 43.5034 ], [ 2.3625, 43.5034 ], [ 2.3624, 43.5034 ], [ 2.3622, 43.5033 ], [ 2.3608, 43.5042 ], [ 2.361, 43.5045 ], [ 2.363, 43.5051 ], [ 2.3632, 43.5048 ], [ 2.3635, 43.5048 ], [ 2.3636, 43.5048 ], [ 2.3638, 43.5053 ], [ 2.3639, 43.5055 ], [ 2.3632, 43.5056 ], [ 2.3623, 43.506 ], [ 2.3623, 43.506 ], [ 2.3623, 43.506 ], [ 2.3623, 43.5061 ], [ 2.3624, 43.5064 ], [ 2.3613, 43.5066 ], [ 2.3613, 43.5066 ], [ 2.3611, 43.5067 ], [ 2.3611, 43.5068 ], [ 2.3613, 43.507 ], [ 2.3607, 43.5077 ], [ 2.3611, 43.5079 ], [ 2.3618, 43.5082 ], [ 2.3617, 43.5084 ], [ 2.3622, 43.5087 ] ] ], "type": "Polygon" }, "id": "99", "properties": { "code_commune": "81021", "code_departement": "81", "code_qp": "QP081001", "commune_qp": "Aussillon", "nom_commune": "Aussillon", "nom_qp": "La Falgalarié" }, "type": "Feature" }, { "bbox": [ 0.0774, 43.2212, 0.0918, 43.2328 ], "geometry": { "coordinates": [ [ [ 0.0818, 43.2324 ], [ 0.0818, 43.2323 ], [ 0.0816, 43.2321 ], [ 0.0816, 43.2319 ], [ 0.0816, 43.2318 ], [ 0.0822, 43.2317 ], [ 0.0822, 43.2316 ], [ 0.0823, 43.2314 ], [ 0.0825, 43.2315 ], [ 0.0826, 43.2315 ], [ 0.083, 43.2306 ], [ 0.0828, 43.2305 ], [ 0.083, 43.23 ], [ 0.0834, 43.2301 ], [ 0.0843, 43.2304 ], [ 0.0847, 43.2305 ], [ 0.085, 43.2306 ], [ 0.0852, 43.2306 ], [ 0.0868, 43.231 ], [ 0.087, 43.2313 ], [ 0.0873, 43.2316 ], [ 0.0874, 43.2319 ], [ 0.0874, 43.232 ], [ 0.0875, 43.2322 ], [ 0.0904, 43.2328 ], [ 0.0905, 43.2328 ], [ 0.0906, 43.2327 ], [ 0.0908, 43.2322 ], [ 0.0912, 43.2317 ], [ 0.0915, 43.2311 ], [ 0.0894, 43.2309 ], [ 0.0895, 43.2307 ], [ 0.0892, 43.2307 ], [ 0.0892, 43.2309 ], [ 0.0876, 43.2306 ], [ 0.0878, 43.2298 ], [ 0.088, 43.2295 ], [ 0.088, 43.2293 ], [ 0.088, 43.2292 ], [ 0.0881, 43.2287 ], [ 0.0883, 43.2285 ], [ 0.0885, 43.2284 ], [ 0.0886, 43.2283 ], [ 0.0888, 43.228 ], [ 0.0892, 43.2273 ], [ 0.0895, 43.2268 ], [ 0.0897, 43.2263 ], [ 0.0898, 43.2261 ], [ 0.0898, 43.226 ], [ 0.09, 43.2255 ], [ 0.0901, 43.2253 ], [ 0.0903, 43.2251 ], [ 0.0904, 43.2248 ], [ 0.0905, 43.2245 ], [ 0.0906, 43.2243 ], [ 0.0906, 43.2243 ], [ 0.0908, 43.2239 ], [ 0.0908, 43.2239 ], [ 0.0909, 43.2238 ], [ 0.0909, 43.2238 ], [ 0.0909, 43.2237 ], [ 0.091, 43.2236 ], [ 0.0911, 43.2236 ], [ 0.0911, 43.2234 ], [ 0.0912, 43.2231 ], [ 0.0911, 43.223 ], [ 0.0911, 43.223 ], [ 0.091, 43.2229 ], [ 0.091, 43.2228 ], [ 0.0911, 43.2227 ], [ 0.0911, 43.2227 ], [ 0.0912, 43.2227 ], [ 0.0914, 43.2226 ], [ 0.0915, 43.2224 ], [ 0.0917, 43.2219 ], [ 0.0918, 43.2216 ], [ 0.0918, 43.2214 ], [ 0.0918, 43.2212 ], [ 0.0915, 43.2213 ], [ 0.0915, 43.2213 ], [ 0.091, 43.2214 ], [ 0.091, 43.2215 ], [ 0.0909, 43.2217 ], [ 0.0907, 43.2223 ], [ 0.0905, 43.2227 ], [ 0.0905, 43.2228 ], [ 0.0904, 43.2233 ], [ 0.0902, 43.2235 ], [ 0.0902, 43.2235 ], [ 0.0902, 43.2235 ], [ 0.09, 43.2239 ], [ 0.0897, 43.2245 ], [ 0.0897, 43.2245 ], [ 0.0894, 43.2251 ], [ 0.0891, 43.2257 ], [ 0.0889, 43.2264 ], [ 0.0888, 43.2267 ], [ 0.0884, 43.2267 ], [ 0.088, 43.2266 ], [ 0.0879, 43.2272 ], [ 0.0879, 43.2275 ], [ 0.0879, 43.2275 ], [ 0.0875, 43.2276 ], [ 0.0872, 43.2276 ], [ 0.0872, 43.2277 ], [ 0.0869, 43.2279 ], [ 0.0868, 43.2281 ], [ 0.0867, 43.2281 ], [ 0.0866, 43.2281 ], [ 0.0851, 43.228 ], [ 0.0844, 43.2283 ], [ 0.0841, 43.2279 ], [ 0.084, 43.2279 ], [ 0.0835, 43.2278 ], [ 0.083, 43.2288 ], [ 0.0827, 43.2288 ], [ 0.0821, 43.2289 ], [ 0.0811, 43.2289 ], [ 0.0804, 43.2289 ], [ 0.0804, 43.2279 ], [ 0.0804, 43.2279 ], [ 0.0804, 43.2276 ], [ 0.0803, 43.2276 ], [ 0.0799, 43.2276 ], [ 0.0799, 43.2275 ], [ 0.0799, 43.2274 ], [ 0.0799, 43.227 ], [ 0.0799, 43.2264 ], [ 0.0799, 43.2262 ], [ 0.0799, 43.2258 ], [ 0.0798, 43.2256 ], [ 0.0798, 43.2255 ], [ 0.0797, 43.2255 ], [ 0.0797, 43.2254 ], [ 0.0798, 43.2253 ], [ 0.0799, 43.2253 ], [ 0.08, 43.2253 ], [ 0.0802, 43.2251 ], [ 0.0804, 43.2249 ], [ 0.0809, 43.2244 ], [ 0.0811, 43.2242 ], [ 0.0812, 43.2243 ], [ 0.0813, 43.2242 ], [ 0.0813, 43.224 ], [ 0.0815, 43.2239 ], [ 0.0816, 43.2238 ], [ 0.0814, 43.2237 ], [ 0.0815, 43.2235 ], [ 0.0813, 43.2234 ], [ 0.0811, 43.2234 ], [ 0.0811, 43.2232 ], [ 0.0812, 43.223 ], [ 0.0812, 43.2229 ], [ 0.0802, 43.2227 ], [ 0.0797, 43.2229 ], [ 0.0796, 43.223 ], [ 0.0795, 43.223 ], [ 0.0794, 43.2231 ], [ 0.0792, 43.2236 ], [ 0.0789, 43.2235 ], [ 0.0786, 43.2236 ], [ 0.0782, 43.2235 ], [ 0.0781, 43.2239 ], [ 0.0782, 43.2239 ], [ 0.078, 43.2243 ], [ 0.078, 43.2244 ], [ 0.078, 43.2244 ], [ 0.078, 43.2246 ], [ 0.0779, 43.2246 ], [ 0.078, 43.2246 ], [ 0.078, 43.2247 ], [ 0.0782, 43.2247 ], [ 0.0782, 43.2249 ], [ 0.0784, 43.2249 ], [ 0.0786, 43.2249 ], [ 0.0784, 43.2252 ], [ 0.0784, 43.2252 ], [ 0.0784, 43.2253 ], [ 0.0783, 43.2254 ], [ 0.0779, 43.2257 ], [ 0.0777, 43.2259 ], [ 0.0776, 43.2263 ], [ 0.0778, 43.2263 ], [ 0.0776, 43.227 ], [ 0.0775, 43.2278 ], [ 0.0775, 43.2278 ], [ 0.0774, 43.2284 ], [ 0.0775, 43.2284 ], [ 0.0779, 43.2284 ], [ 0.0784, 43.2285 ], [ 0.0785, 43.2285 ], [ 0.0793, 43.2289 ], [ 0.0795, 43.2289 ], [ 0.0794, 43.2291 ], [ 0.0793, 43.2293 ], [ 0.0788, 43.2302 ], [ 0.0795, 43.2303 ], [ 0.0806, 43.2305 ], [ 0.0818, 43.2307 ], [ 0.0816, 43.2308 ], [ 0.0815, 43.2309 ], [ 0.0811, 43.2311 ], [ 0.0811, 43.2311 ], [ 0.081, 43.2311 ], [ 0.0809, 43.2311 ], [ 0.0808, 43.2318 ], [ 0.0807, 43.2318 ], [ 0.0797, 43.2319 ], [ 0.0798, 43.2326 ], [ 0.0807, 43.2325 ], [ 0.0813, 43.2325 ], [ 0.0817, 43.2324 ], [ 0.0818, 43.2324 ] ] ], "type": "Polygon" }, "id": "100", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065003", "commune_qp": "Tarbes", "nom_commune": "Séméac, Tarbes", "nom_qp": "Tarbes Est" }, "type": "Feature" }, { "bbox": [ 1.3353, 43.5363, 1.3406, 43.5391 ], "geometry": { "coordinates": [ [ [ 1.3353, 43.5369 ], [ 1.3354, 43.537 ], [ 1.3363, 43.5379 ], [ 1.3361, 43.538 ], [ 1.336, 43.5381 ], [ 1.3365, 43.5386 ], [ 1.3366, 43.5387 ], [ 1.3367, 43.5388 ], [ 1.3371, 43.5391 ], [ 1.3374, 43.5391 ], [ 1.3374, 43.5391 ], [ 1.3376, 43.5391 ], [ 1.3376, 43.5391 ], [ 1.3376, 43.539 ], [ 1.3381, 43.5391 ], [ 1.3383, 43.5391 ], [ 1.3387, 43.5389 ], [ 1.3386, 43.5388 ], [ 1.3388, 43.5388 ], [ 1.3391, 43.5386 ], [ 1.3392, 43.5388 ], [ 1.3394, 43.5388 ], [ 1.3395, 43.5388 ], [ 1.3397, 43.5387 ], [ 1.34, 43.5385 ], [ 1.3403, 43.5384 ], [ 1.3406, 43.5382 ], [ 1.3403, 43.5381 ], [ 1.3391, 43.5375 ], [ 1.3366, 43.5363 ], [ 1.3355, 43.5369 ], [ 1.3354, 43.5369 ], [ 1.3353, 43.5369 ] ] ], "type": "Polygon" }, "id": "101", "properties": { "code_commune": "31157", "code_departement": "31", "code_qp": "QP031017", "commune_qp": "Cugnaux", "nom_commune": "Cugnaux", "nom_qp": "Vivier Maçon" }, "type": "Feature" }, { "bbox": [ 1.3134, 43.6043, 1.3237, 43.6067 ], "geometry": { "coordinates": [ [ [ 1.3236, 43.6052 ], [ 1.3233, 43.6051 ], [ 1.3231, 43.6051 ], [ 1.3226, 43.6051 ], [ 1.3214, 43.605 ], [ 1.3196, 43.6048 ], [ 1.3174, 43.6046 ], [ 1.3162, 43.6045 ], [ 1.3153, 43.6045 ], [ 1.3134, 43.6043 ], [ 1.3137, 43.6046 ], [ 1.314, 43.605 ], [ 1.3147, 43.6047 ], [ 1.3149, 43.6047 ], [ 1.315, 43.6047 ], [ 1.3151, 43.6047 ], [ 1.3154, 43.6047 ], [ 1.3156, 43.605 ], [ 1.3162, 43.6048 ], [ 1.3162, 43.605 ], [ 1.3161, 43.6057 ], [ 1.3161, 43.6059 ], [ 1.3161, 43.6061 ], [ 1.3162, 43.6062 ], [ 1.3168, 43.6063 ], [ 1.3195, 43.6065 ], [ 1.3212, 43.6066 ], [ 1.322, 43.6067 ], [ 1.3224, 43.6067 ], [ 1.3233, 43.6067 ], [ 1.3234, 43.6067 ], [ 1.3235, 43.6067 ], [ 1.3235, 43.6066 ], [ 1.3235, 43.6065 ], [ 1.3235, 43.6062 ], [ 1.3236, 43.6058 ], [ 1.3236, 43.6056 ], [ 1.3237, 43.6054 ], [ 1.3236, 43.6052 ] ] ], "type": "Polygon" }, "id": "102", "properties": { "code_commune": "31149", "code_departement": "31", "code_qp": "QP031016", "commune_qp": "Colomiers", "nom_commune": "Colomiers", "nom_qp": "En Jacca" }, "type": "Feature" }, { "bbox": [ 1.4387, 43.6182, 1.446, 43.6219 ], "geometry": { "coordinates": [ [ [ 1.4416, 43.6184 ], [ 1.4409, 43.6185 ], [ 1.441, 43.6196 ], [ 1.4411, 43.62 ], [ 1.4411, 43.6201 ], [ 1.4401, 43.6205 ], [ 1.4399, 43.62 ], [ 1.4394, 43.6201 ], [ 1.4394, 43.62 ], [ 1.4387, 43.6201 ], [ 1.4388, 43.6204 ], [ 1.4388, 43.6204 ], [ 1.439, 43.621 ], [ 1.4397, 43.6208 ], [ 1.4397, 43.6208 ], [ 1.4401, 43.6219 ], [ 1.4406, 43.6217 ], [ 1.4401, 43.6206 ], [ 1.4412, 43.6202 ], [ 1.4413, 43.6201 ], [ 1.4421, 43.62 ], [ 1.4437, 43.6195 ], [ 1.446, 43.6188 ], [ 1.446, 43.6188 ], [ 1.4458, 43.6187 ], [ 1.4456, 43.6187 ], [ 1.4453, 43.6186 ], [ 1.4451, 43.6185 ], [ 1.4447, 43.6184 ], [ 1.4447, 43.6184 ], [ 1.4428, 43.6188 ], [ 1.4427, 43.6186 ], [ 1.4425, 43.6182 ], [ 1.4423, 43.6182 ], [ 1.4416, 43.6184 ] ] ], "type": "Polygon" }, "id": "103", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031018", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Négreneys" }, "type": "Feature" }, { "bbox": [ 1.4672, 43.607, 1.4729, 43.6102 ], "geometry": { "coordinates": [ [ [ 1.4729, 43.6074 ], [ 1.4727, 43.6073 ], [ 1.4727, 43.6073 ], [ 1.4724, 43.6071 ], [ 1.4722, 43.607 ], [ 1.4712, 43.6072 ], [ 1.471, 43.6073 ], [ 1.4706, 43.6073 ], [ 1.4692, 43.6073 ], [ 1.4681, 43.6072 ], [ 1.4672, 43.6072 ], [ 1.4675, 43.6073 ], [ 1.4676, 43.6074 ], [ 1.4679, 43.6076 ], [ 1.4681, 43.6077 ], [ 1.4686, 43.6079 ], [ 1.4698, 43.6086 ], [ 1.4686, 43.6096 ], [ 1.4694, 43.6102 ], [ 1.4701, 43.6096 ], [ 1.4724, 43.6079 ], [ 1.4725, 43.6078 ], [ 1.4728, 43.6076 ], [ 1.4729, 43.6074 ] ] ], "type": "Polygon" }, "id": "104", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031019", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "La Gloire" }, "type": "Feature" } ], "type": "FeatureCollection" }, "hovertemplate": "%{hovertext}

Quartier Prioritaire=%{location}
Taux d'Activité des Femmes=%{customdata[0]}
Taux Total en Emploi Précaire=%{customdata[1]}
Taux d'Etrangers en Emploi Précaire=%{z}", "hovertext": [ "Pradettes", "Grand Mirail", "Arènes", "Bourbaki", "Empalot", "Les Izards - La Vache", "Cépière Beauregard", "Saint Exupéry", "Soupetard", "Rangueil", "Négreneys", "La Gloire" ], "locations": [ "Pradettes", "Grand Mirail", "Arènes", "Bourbaki", "Empalot", "Les Izards - La Vache", "Cépière Beauregard", "Saint Exupéry", "Soupetard", "Rangueil", "Négreneys", "La Gloire" ], "name": "", "subplot": "mapbox", "type": "choroplethmapbox", "z": [ 46.4, 33.5, 26.2, null, 38.9, null, null, null, null, 29.3, null, 36.9 ] } ], "layout": { "autosize": true, "coloraxis": { "colorbar": { "title": { "text": "Taux d'Etrangers en Emploi Précaire" } }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ] }, "legend": { "tracegroupgap": 0 }, "mapbox": { "center": { "lat": 43.6, "lon": 1.433333 }, "domain": { "x": [ 0, 1 ], "y": [ 0, 1 ] }, "style": "carto-positron", "zoom": 11.5 }, "margin": { "b": 0, "l": 0, "r": 0, "t": 25 }, "template": { "data": { "bar": [ { "error_x": { "color": "#2a3f5f" }, "error_y": { "color": "#2a3f5f" }, "marker": { "line": { "color": "#E5ECF6", "width": 0.5 }, "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "bar" } ], "barpolar": [ { "marker": { "line": { "color": "#E5ECF6", "width": 0.5 }, "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "barpolar" } ], "carpet": [ { "aaxis": { "endlinecolor": "#2a3f5f", "gridcolor": "white", "linecolor": "white", "minorgridcolor": "white", "startlinecolor": "#2a3f5f" }, "baxis": { "endlinecolor": "#2a3f5f", "gridcolor": "white", "linecolor": "white", "minorgridcolor": "white", "startlinecolor": "#2a3f5f" }, "type": "carpet" } ], "choropleth": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "choropleth" } ], "contour": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "contour" } ], "contourcarpet": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "contourcarpet" } ], "heatmap": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "heatmap" } ], "heatmapgl": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "heatmapgl" } ], "histogram": [ { "marker": { "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "histogram" } ], "histogram2d": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "histogram2d" } ], "histogram2dcontour": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "histogram2dcontour" } ], "mesh3d": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "mesh3d" } ], "parcoords": [ { "line": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "parcoords" } ], "pie": [ { "automargin": true, "type": "pie" } ], "scatter": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatter" } ], "scatter3d": [ { "line": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatter3d" } ], "scattercarpet": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattercarpet" } ], "scattergeo": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattergeo" } ], "scattergl": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattergl" } ], "scattermapbox": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattermapbox" } ], "scatterpolar": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterpolar" } ], "scatterpolargl": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterpolargl" } ], "scatterternary": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterternary" } ], "surface": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "surface" } ], "table": [ { "cells": { "fill": { "color": "#EBF0F8" }, "line": { "color": "white" } }, "header": { "fill": { "color": "#C8D4E3" }, "line": { "color": "white" } }, "type": "table" } ] }, "layout": { "annotationdefaults": { "arrowcolor": "#2a3f5f", "arrowhead": 0, "arrowwidth": 1 }, "autotypenumbers": "strict", "coloraxis": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "colorscale": { "diverging": [ [ 0, "#8e0152" ], [ 0.1, "#c51b7d" ], [ 0.2, "#de77ae" ], [ 0.3, "#f1b6da" ], [ 0.4, "#fde0ef" ], [ 0.5, "#f7f7f7" ], [ 0.6, "#e6f5d0" ], [ 0.7, "#b8e186" ], [ 0.8, "#7fbc41" ], [ 0.9, "#4d9221" ], [ 1, "#276419" ] ], "sequential": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "sequentialminus": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ] }, "colorway": [ "#636efa", "#EF553B", "#00cc96", "#ab63fa", "#FFA15A", "#19d3f3", "#FF6692", "#B6E880", "#FF97FF", "#FECB52" ], "font": { "color": "#2a3f5f" }, "geo": { "bgcolor": "white", "lakecolor": "white", "landcolor": "#E5ECF6", "showlakes": true, "showland": true, "subunitcolor": "white" }, "hoverlabel": { "align": "left" }, "hovermode": "closest", "mapbox": { "style": "light" }, "paper_bgcolor": "white", "plot_bgcolor": "#E5ECF6", "polar": { "angularaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "bgcolor": "#E5ECF6", "radialaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" } }, "scene": { "xaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" }, "yaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" }, "zaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" } }, "shapedefaults": { "line": { "color": "#2a3f5f" } }, "ternary": { "aaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "baxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "bgcolor": "#E5ECF6", "caxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" } }, "title": { "x": 0.05 }, "xaxis": { "automargin": true, "gridcolor": "white", "linecolor": "white", "ticks": "", "title": { "standoff": 15 }, "zerolinecolor": "white", "zerolinewidth": 2 }, "yaxis": { "automargin": true, "gridcolor": "white", "linecolor": "white", "ticks": "", "title": { "standoff": 15 }, "zerolinecolor": "white", "zerolinewidth": 2 } } }, "title": { "text": "Taux d'Etrangers en Emploi Précaire selon le Q.P - Commune de Toulouse" } } }, "image/png": "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", "text/html": [ "
" ] }, "metadata": {}, "output_type": "display_data" }, { "name": "stdout", "output_type": "stream", "text": [ "\n" ] }, { "data": { "application/vnd.plotly.v1+json": { "config": { "plotlyServerURL": "https://plot.ly" }, "data": [ { "coloraxis": "coloraxis", "customdata": [ [ 44.8, 30 ], [ 32.5, 25.7 ], [ 38, 24.7 ], [ 41.1, null ], [ 38.2, 28.5 ], [ 42.1, 20.9 ], [ 34.1, null ], [ 58.5, 19.8 ], [ 56.1, 15.9 ], [ 25.2, 38.7 ], [ 53.6, 24 ], [ 52.6, 22.3 ] ], "featureidkey": "properties.nom_qp", "geojson": { "bbox": [ -0.0437, 42.5983, 4.6525, 44.4672 ], "features": [ { "bbox": [ 2.8882, 42.7035, 2.9005, 42.7101 ], "geometry": { "coordinates": [ [ [ 2.9005, 42.7081 ], [ 2.9004, 42.7077 ], [ 2.9004, 42.7075 ], [ 2.9003, 42.7074 ], [ 2.9003, 42.7069 ], [ 2.9, 42.7069 ], [ 2.9001, 42.7067 ], [ 2.9002, 42.7065 ], [ 2.9002, 42.7064 ], [ 2.9002, 42.7063 ], [ 2.9002, 42.7062 ], [ 2.9001, 42.7062 ], [ 2.9001, 42.7061 ], [ 2.8994, 42.7059 ], [ 2.8979, 42.7055 ], [ 2.8976, 42.7054 ], [ 2.8972, 42.7053 ], [ 2.8964, 42.7051 ], [ 2.8961, 42.705 ], [ 2.8957, 42.7049 ], [ 2.8957, 42.7049 ], [ 2.8953, 42.7047 ], [ 2.8949, 42.7046 ], [ 2.8948, 42.7045 ], [ 2.8946, 42.7045 ], [ 2.8944, 42.7044 ], [ 2.8941, 42.7044 ], [ 2.8938, 42.7043 ], [ 2.8934, 42.7042 ], [ 2.8933, 42.7042 ], [ 2.8932, 42.7042 ], [ 2.8931, 42.7041 ], [ 2.8927, 42.7042 ], [ 2.8926, 42.7043 ], [ 2.8923, 42.7043 ], [ 2.8916, 42.7041 ], [ 2.8915, 42.7041 ], [ 2.8906, 42.7039 ], [ 2.8905, 42.7039 ], [ 2.8896, 42.7037 ], [ 2.8889, 42.7035 ], [ 2.8887, 42.7039 ], [ 2.8886, 42.7042 ], [ 2.8891, 42.7044 ], [ 2.8898, 42.7046 ], [ 2.8904, 42.7049 ], [ 2.8904, 42.705 ], [ 2.8905, 42.7049 ], [ 2.8907, 42.705 ], [ 2.8908, 42.705 ], [ 2.8914, 42.7053 ], [ 2.8916, 42.7053 ], [ 2.8914, 42.7056 ], [ 2.8912, 42.7056 ], [ 2.891, 42.7056 ], [ 2.8905, 42.7056 ], [ 2.8898, 42.7056 ], [ 2.8893, 42.7056 ], [ 2.8892, 42.7056 ], [ 2.889, 42.7057 ], [ 2.8888, 42.7059 ], [ 2.8887, 42.7059 ], [ 2.8887, 42.706 ], [ 2.8885, 42.706 ], [ 2.8884, 42.706 ], [ 2.8884, 42.706 ], [ 2.8883, 42.7061 ], [ 2.8882, 42.7064 ], [ 2.8887, 42.7065 ], [ 2.8888, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8889, 42.7065 ], [ 2.8893, 42.7062 ], [ 2.8893, 42.7061 ], [ 2.8893, 42.7061 ], [ 2.8905, 42.7062 ], [ 2.891, 42.7062 ], [ 2.8911, 42.7063 ], [ 2.8918, 42.7064 ], [ 2.8918, 42.7065 ], [ 2.892, 42.7065 ], [ 2.8925, 42.7066 ], [ 2.8925, 42.7067 ], [ 2.8926, 42.7067 ], [ 2.8928, 42.7069 ], [ 2.8932, 42.7072 ], [ 2.8931, 42.7073 ], [ 2.893, 42.7076 ], [ 2.8929, 42.7079 ], [ 2.8923, 42.7077 ], [ 2.892, 42.7077 ], [ 2.8919, 42.7077 ], [ 2.8919, 42.7077 ], [ 2.8918, 42.7077 ], [ 2.8918, 42.7077 ], [ 2.8916, 42.7077 ], [ 2.8916, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8915, 42.7077 ], [ 2.8914, 42.7076 ], [ 2.8913, 42.7075 ], [ 2.8912, 42.7078 ], [ 2.8911, 42.7081 ], [ 2.8911, 42.7082 ], [ 2.8909, 42.7086 ], [ 2.8907, 42.7092 ], [ 2.8906, 42.7093 ], [ 2.8906, 42.7095 ], [ 2.8905, 42.7096 ], [ 2.8908, 42.7096 ], [ 2.8909, 42.7096 ], [ 2.891, 42.7095 ], [ 2.8913, 42.7097 ], [ 2.8916, 42.7098 ], [ 2.8917, 42.7099 ], [ 2.8921, 42.71 ], [ 2.8921, 42.71 ], [ 2.8921, 42.7101 ], [ 2.8924, 42.7101 ], [ 2.8924, 42.71 ], [ 2.8924, 42.71 ], [ 2.8925, 42.7097 ], [ 2.8926, 42.7095 ], [ 2.8926, 42.7094 ], [ 2.8926, 42.7094 ], [ 2.8927, 42.7093 ], [ 2.8929, 42.7093 ], [ 2.893, 42.7094 ], [ 2.893, 42.7094 ], [ 2.893, 42.7094 ], [ 2.8933, 42.7088 ], [ 2.8936, 42.7082 ], [ 2.8938, 42.7081 ], [ 2.8937, 42.7081 ], [ 2.894, 42.7079 ], [ 2.894, 42.7079 ], [ 2.8946, 42.7083 ], [ 2.8946, 42.7083 ], [ 2.8948, 42.7083 ], [ 2.8952, 42.7084 ], [ 2.8955, 42.7084 ], [ 2.8958, 42.7085 ], [ 2.8958, 42.7085 ], [ 2.8959, 42.7084 ], [ 2.8964, 42.7082 ], [ 2.8967, 42.7081 ], [ 2.8965, 42.7078 ], [ 2.8965, 42.7078 ], [ 2.8963, 42.7076 ], [ 2.8962, 42.7075 ], [ 2.896, 42.7072 ], [ 2.8958, 42.707 ], [ 2.8957, 42.7068 ], [ 2.8959, 42.7068 ], [ 2.8959, 42.7068 ], [ 2.8957, 42.7066 ], [ 2.8957, 42.7065 ], [ 2.8958, 42.7065 ], [ 2.8962, 42.7063 ], [ 2.8963, 42.7063 ], [ 2.8964, 42.7062 ], [ 2.8965, 42.7062 ], [ 2.8967, 42.7062 ], [ 2.8968, 42.7063 ], [ 2.8968, 42.7063 ], [ 2.8969, 42.7066 ], [ 2.897, 42.7069 ], [ 2.8973, 42.7071 ], [ 2.8973, 42.7072 ], [ 2.8977, 42.7073 ], [ 2.898, 42.707 ], [ 2.899, 42.7074 ], [ 2.8992, 42.7075 ], [ 2.8992, 42.7075 ], [ 2.8992, 42.7076 ], [ 2.8995, 42.7077 ], [ 2.8995, 42.7077 ], [ 2.8999, 42.7079 ], [ 2.9005, 42.7081 ] ] ], "type": "Polygon" }, "id": "0", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066007", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Bas-Vernet Nouveau QPV" }, "type": "Feature" }, { "bbox": [ 4.0233, 44.2076, 4.0343, 44.2164 ], "geometry": { "coordinates": [ [ [ 4.0343, 44.2092 ], [ 4.0343, 44.2091 ], [ 4.0343, 44.209 ], [ 4.0342, 44.209 ], [ 4.0328, 44.2087 ], [ 4.0319, 44.2084 ], [ 4.0303, 44.208 ], [ 4.0298, 44.2079 ], [ 4.0294, 44.2077 ], [ 4.0288, 44.2076 ], [ 4.0285, 44.2076 ], [ 4.0282, 44.2076 ], [ 4.028, 44.2076 ], [ 4.0278, 44.2076 ], [ 4.0276, 44.2076 ], [ 4.0274, 44.2076 ], [ 4.027, 44.2077 ], [ 4.0267, 44.2078 ], [ 4.0265, 44.2079 ], [ 4.026, 44.2081 ], [ 4.0255, 44.2084 ], [ 4.0254, 44.2085 ], [ 4.0256, 44.2089 ], [ 4.0258, 44.2092 ], [ 4.0258, 44.2093 ], [ 4.0258, 44.2095 ], [ 4.0258, 44.2095 ], [ 4.0257, 44.2096 ], [ 4.0255, 44.2098 ], [ 4.0252, 44.21 ], [ 4.0251, 44.2102 ], [ 4.0245, 44.2103 ], [ 4.0247, 44.2105 ], [ 4.0247, 44.2105 ], [ 4.0246, 44.2106 ], [ 4.0245, 44.2106 ], [ 4.0243, 44.2107 ], [ 4.0245, 44.2108 ], [ 4.0245, 44.2108 ], [ 4.0249, 44.2111 ], [ 4.0249, 44.2111 ], [ 4.0251, 44.2114 ], [ 4.0248, 44.2115 ], [ 4.0245, 44.2117 ], [ 4.0242, 44.2119 ], [ 4.0238, 44.2122 ], [ 4.0237, 44.2123 ], [ 4.0233, 44.2126 ], [ 4.0239, 44.213 ], [ 4.0244, 44.2125 ], [ 4.0241, 44.2123 ], [ 4.024, 44.2123 ], [ 4.024, 44.2123 ], [ 4.0241, 44.2121 ], [ 4.0241, 44.2122 ], [ 4.0242, 44.2121 ], [ 4.0243, 44.212 ], [ 4.0244, 44.212 ], [ 4.0244, 44.212 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0245, 44.2119 ], [ 4.0246, 44.2118 ], [ 4.0246, 44.2118 ], [ 4.0246, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0247, 44.2118 ], [ 4.0248, 44.2118 ], [ 4.025, 44.2118 ], [ 4.0251, 44.2119 ], [ 4.0252, 44.212 ], [ 4.0252, 44.212 ], [ 4.0253, 44.212 ], [ 4.0253, 44.2119 ], [ 4.0254, 44.2119 ], [ 4.0255, 44.212 ], [ 4.0257, 44.2118 ], [ 4.0257, 44.2118 ], [ 4.0258, 44.2118 ], [ 4.0258, 44.2118 ], [ 4.0259, 44.2118 ], [ 4.026, 44.2119 ], [ 4.0261, 44.2119 ], [ 4.0262, 44.2119 ], [ 4.0262, 44.2119 ], [ 4.0263, 44.2118 ], [ 4.0264, 44.2118 ], [ 4.0265, 44.2118 ], [ 4.0266, 44.2118 ], [ 4.0267, 44.2118 ], [ 4.0269, 44.2118 ], [ 4.027, 44.2119 ], [ 4.0276, 44.212 ], [ 4.028, 44.2121 ], [ 4.0282, 44.2121 ], [ 4.0284, 44.2125 ], [ 4.0284, 44.2126 ], [ 4.0284, 44.2128 ], [ 4.0284, 44.2128 ], [ 4.0284, 44.2132 ], [ 4.0285, 44.2134 ], [ 4.0286, 44.2136 ], [ 4.0288, 44.2136 ], [ 4.0288, 44.2136 ], [ 4.0288, 44.2137 ], [ 4.0289, 44.2137 ], [ 4.029, 44.2139 ], [ 4.0291, 44.2141 ], [ 4.0292, 44.2142 ], [ 4.0292, 44.2142 ], [ 4.0291, 44.2143 ], [ 4.029, 44.2144 ], [ 4.029, 44.2144 ], [ 4.0289, 44.2145 ], [ 4.0289, 44.2146 ], [ 4.0286, 44.2146 ], [ 4.0281, 44.2147 ], [ 4.0278, 44.2147 ], [ 4.0278, 44.2148 ], [ 4.0278, 44.2148 ], [ 4.0278, 44.2151 ], [ 4.0278, 44.2153 ], [ 4.0278, 44.2154 ], [ 4.0276, 44.2154 ], [ 4.0276, 44.2156 ], [ 4.0273, 44.2156 ], [ 4.0273, 44.216 ], [ 4.0273, 44.216 ], [ 4.0275, 44.216 ], [ 4.0283, 44.216 ], [ 4.0283, 44.216 ], [ 4.0284, 44.216 ], [ 4.0284, 44.216 ], [ 4.0285, 44.2161 ], [ 4.0286, 44.2161 ], [ 4.0287, 44.2162 ], [ 4.0288, 44.2162 ], [ 4.0295, 44.2162 ], [ 4.0296, 44.2162 ], [ 4.0299, 44.2162 ], [ 4.0305, 44.216 ], [ 4.0306, 44.2159 ], [ 4.031, 44.2158 ], [ 4.0311, 44.2158 ], [ 4.0312, 44.216 ], [ 4.0312, 44.216 ], [ 4.0315, 44.2164 ], [ 4.0318, 44.2164 ], [ 4.0321, 44.2163 ], [ 4.0325, 44.2161 ], [ 4.0321, 44.2157 ], [ 4.0331, 44.2154 ], [ 4.0331, 44.2152 ], [ 4.0331, 44.2152 ], [ 4.033, 44.215 ], [ 4.033, 44.2146 ], [ 4.0329, 44.2144 ], [ 4.0336, 44.2145 ], [ 4.034, 44.2143 ], [ 4.0336, 44.2139 ], [ 4.0336, 44.2139 ], [ 4.0337, 44.2139 ], [ 4.0339, 44.2138 ], [ 4.0339, 44.2138 ], [ 4.034, 44.2135 ], [ 4.034, 44.2135 ], [ 4.0341, 44.2135 ], [ 4.0342, 44.2135 ], [ 4.0342, 44.2135 ], [ 4.0343, 44.2135 ], [ 4.0343, 44.2135 ], [ 4.0343, 44.2134 ], [ 4.0343, 44.2134 ], [ 4.0342, 44.2133 ], [ 4.034, 44.2131 ], [ 4.0339, 44.2131 ], [ 4.0339, 44.213 ], [ 4.0338, 44.2128 ], [ 4.0337, 44.2127 ], [ 4.0336, 44.2127 ], [ 4.0334, 44.2126 ], [ 4.0332, 44.2124 ], [ 4.0327, 44.2121 ], [ 4.0326, 44.212 ], [ 4.0325, 44.2119 ], [ 4.0323, 44.2119 ], [ 4.0316, 44.2114 ], [ 4.0315, 44.2113 ], [ 4.0315, 44.2112 ], [ 4.0314, 44.2109 ], [ 4.0317, 44.2109 ], [ 4.032, 44.2105 ], [ 4.0323, 44.2104 ], [ 4.0325, 44.2103 ], [ 4.033, 44.2101 ], [ 4.0331, 44.2101 ], [ 4.0333, 44.21 ], [ 4.0334, 44.2097 ], [ 4.0336, 44.2097 ], [ 4.0337, 44.2096 ], [ 4.0339, 44.2095 ], [ 4.0339, 44.2095 ], [ 4.0342, 44.2093 ], [ 4.0343, 44.2092 ] ] ], "type": "Polygon" }, "id": "1", "properties": { "code_commune": "30132", "code_departement": "30", "code_qp": "QP030016", "commune_qp": "La Grand-Combe", "nom_commune": "La Grand-Combe", "nom_qp": "Centre Ville - Arboux" }, "type": "Feature" }, { "bbox": [ 4.4296, 43.6741, 4.438, 43.6845 ], "geometry": { "coordinates": [ [ [ 4.438, 43.6827 ], [ 4.438, 43.6826 ], [ 4.438, 43.6826 ], [ 4.4376, 43.6824 ], [ 4.4375, 43.6823 ], [ 4.4374, 43.6823 ], [ 4.4373, 43.6823 ], [ 4.4371, 43.6819 ], [ 4.4367, 43.6817 ], [ 4.4362, 43.6815 ], [ 4.4353, 43.6813 ], [ 4.4351, 43.6809 ], [ 4.4351, 43.6804 ], [ 4.4353, 43.6801 ], [ 4.4363, 43.68 ], [ 4.4362, 43.6799 ], [ 4.4361, 43.6796 ], [ 4.436, 43.6794 ], [ 4.4359, 43.6794 ], [ 4.4359, 43.6793 ], [ 4.4359, 43.6792 ], [ 4.4358, 43.6791 ], [ 4.4358, 43.6791 ], [ 4.4356, 43.679 ], [ 4.4355, 43.679 ], [ 4.4353, 43.679 ], [ 4.4349, 43.679 ], [ 4.4343, 43.6791 ], [ 4.4341, 43.6791 ], [ 4.4336, 43.679 ], [ 4.4337, 43.6789 ], [ 4.4336, 43.6788 ], [ 4.4336, 43.6787 ], [ 4.4336, 43.6786 ], [ 4.4336, 43.6786 ], [ 4.4335, 43.6784 ], [ 4.4335, 43.6783 ], [ 4.4335, 43.6782 ], [ 4.4335, 43.6781 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6779 ], [ 4.4335, 43.6777 ], [ 4.4336, 43.6776 ], [ 4.4336, 43.6776 ], [ 4.4335, 43.6775 ], [ 4.4335, 43.6774 ], [ 4.4334, 43.6772 ], [ 4.4334, 43.6772 ], [ 4.4336, 43.6771 ], [ 4.4338, 43.6771 ], [ 4.4338, 43.677 ], [ 4.4337, 43.6766 ], [ 4.4336, 43.6765 ], [ 4.4336, 43.6763 ], [ 4.4336, 43.6761 ], [ 4.4336, 43.6761 ], [ 4.4333, 43.6757 ], [ 4.4332, 43.6756 ], [ 4.4326, 43.6752 ], [ 4.4324, 43.6751 ], [ 4.4325, 43.6748 ], [ 4.4325, 43.6748 ], [ 4.4324, 43.6747 ], [ 4.4324, 43.6746 ], [ 4.4325, 43.6746 ], [ 4.4325, 43.6744 ], [ 4.4324, 43.6743 ], [ 4.4324, 43.6742 ], [ 4.4324, 43.6741 ], [ 4.4322, 43.6743 ], [ 4.4317, 43.6748 ], [ 4.4312, 43.6752 ], [ 4.4309, 43.6755 ], [ 4.4306, 43.6759 ], [ 4.4304, 43.6761 ], [ 4.4299, 43.6765 ], [ 4.4298, 43.6766 ], [ 4.4297, 43.6768 ], [ 4.4297, 43.6771 ], [ 4.4296, 43.6772 ], [ 4.4296, 43.6779 ], [ 4.4298, 43.6779 ], [ 4.4299, 43.678 ], [ 4.4299, 43.678 ], [ 4.4299, 43.6781 ], [ 4.43, 43.6781 ], [ 4.4301, 43.6782 ], [ 4.4303, 43.6783 ], [ 4.4305, 43.6784 ], [ 4.4306, 43.6784 ], [ 4.4307, 43.6785 ], [ 4.4309, 43.6785 ], [ 4.4309, 43.6786 ], [ 4.431, 43.6786 ], [ 4.4311, 43.6788 ], [ 4.4311, 43.6788 ], [ 4.4312, 43.6788 ], [ 4.4312, 43.679 ], [ 4.4312, 43.679 ], [ 4.4314, 43.6791 ], [ 4.4318, 43.6791 ], [ 4.432, 43.6792 ], [ 4.4322, 43.6792 ], [ 4.4326, 43.6792 ], [ 4.4327, 43.6792 ], [ 4.4331, 43.6801 ], [ 4.4332, 43.6801 ], [ 4.4332, 43.6802 ], [ 4.4333, 43.6804 ], [ 4.4334, 43.6805 ], [ 4.4326, 43.6811 ], [ 4.433, 43.6812 ], [ 4.4327, 43.6813 ], [ 4.4326, 43.6814 ], [ 4.4325, 43.6815 ], [ 4.4325, 43.6815 ], [ 4.4322, 43.6816 ], [ 4.4321, 43.6815 ], [ 4.4319, 43.6815 ], [ 4.4318, 43.6816 ], [ 4.4318, 43.6816 ], [ 4.4318, 43.6816 ], [ 4.4319, 43.6817 ], [ 4.432, 43.6818 ], [ 4.4319, 43.6818 ], [ 4.4319, 43.6819 ], [ 4.4315, 43.6821 ], [ 4.4315, 43.6821 ], [ 4.4315, 43.6822 ], [ 4.4316, 43.6822 ], [ 4.4313, 43.6825 ], [ 4.4331, 43.6825 ], [ 4.4336, 43.6825 ], [ 4.4336, 43.6825 ], [ 4.4337, 43.6826 ], [ 4.4339, 43.6826 ], [ 4.4342, 43.6826 ], [ 4.4342, 43.6826 ], [ 4.4343, 43.6827 ], [ 4.4346, 43.6828 ], [ 4.4349, 43.6828 ], [ 4.4354, 43.6831 ], [ 4.4356, 43.6832 ], [ 4.4359, 43.6833 ], [ 4.4361, 43.6835 ], [ 4.4362, 43.6836 ], [ 4.4366, 43.6839 ], [ 4.4369, 43.6841 ], [ 4.4372, 43.6842 ], [ 4.4376, 43.6845 ], [ 4.4378, 43.6844 ], [ 4.4376, 43.6841 ], [ 4.4376, 43.6841 ], [ 4.4378, 43.684 ], [ 4.4379, 43.6839 ], [ 4.4379, 43.6835 ], [ 4.438, 43.6827 ] ] ], "type": "Polygon" }, "id": "2", "properties": { "code_commune": "30258", "code_departement": "30", "code_qp": "QP030009", "commune_qp": "Saint-Gilles", "nom_commune": "Saint-Gilles", "nom_qp": "Sabatot - Centre Ancien" }, "type": "Feature" }, { "bbox": [ 2.3637, 43.2054, 2.3794, 43.2191 ], "geometry": { "coordinates": [ [ [ 2.3743, 43.218 ], [ 2.3742, 43.2177 ], [ 2.3741, 43.2174 ], [ 2.3741, 43.2174 ], [ 2.374, 43.2175 ], [ 2.3738, 43.2173 ], [ 2.3732, 43.2176 ], [ 2.3725, 43.2179 ], [ 2.3723, 43.218 ], [ 2.3717, 43.2173 ], [ 2.3714, 43.2171 ], [ 2.3713, 43.2171 ], [ 2.3712, 43.217 ], [ 2.3708, 43.2165 ], [ 2.3704, 43.2162 ], [ 2.3702, 43.2163 ], [ 2.3702, 43.2163 ], [ 2.3699, 43.2165 ], [ 2.3693, 43.2156 ], [ 2.3697, 43.2155 ], [ 2.37, 43.2153 ], [ 2.3689, 43.2141 ], [ 2.3688, 43.214 ], [ 2.3693, 43.2138 ], [ 2.3697, 43.2136 ], [ 2.3702, 43.2133 ], [ 2.3705, 43.2132 ], [ 2.3709, 43.213 ], [ 2.3711, 43.2129 ], [ 2.3716, 43.213 ], [ 2.3721, 43.2131 ], [ 2.3736, 43.2144 ], [ 2.3753, 43.2136 ], [ 2.3778, 43.2125 ], [ 2.3782, 43.2123 ], [ 2.3788, 43.212 ], [ 2.379, 43.2118 ], [ 2.3789, 43.2116 ], [ 2.3794, 43.2114 ], [ 2.3792, 43.2112 ], [ 2.3792, 43.2111 ], [ 2.3792, 43.2105 ], [ 2.3791, 43.2099 ], [ 2.3788, 43.21 ], [ 2.3786, 43.2097 ], [ 2.3783, 43.2088 ], [ 2.3782, 43.2088 ], [ 2.3781, 43.2082 ], [ 2.3777, 43.2083 ], [ 2.3776, 43.2079 ], [ 2.3776, 43.2079 ], [ 2.3776, 43.2075 ], [ 2.3774, 43.2075 ], [ 2.3774, 43.2073 ], [ 2.3774, 43.2073 ], [ 2.3774, 43.2072 ], [ 2.3776, 43.2072 ], [ 2.3775, 43.2069 ], [ 2.3775, 43.2068 ], [ 2.3783, 43.2068 ], [ 2.3783, 43.2068 ], [ 2.3786, 43.2068 ], [ 2.3787, 43.2067 ], [ 2.3788, 43.2062 ], [ 2.379, 43.2055 ], [ 2.3786, 43.2055 ], [ 2.3784, 43.2055 ], [ 2.3764, 43.2057 ], [ 2.3757, 43.2058 ], [ 2.3752, 43.2057 ], [ 2.3747, 43.2057 ], [ 2.3739, 43.2056 ], [ 2.373, 43.2054 ], [ 2.3728, 43.2054 ], [ 2.3724, 43.2061 ], [ 2.3723, 43.2064 ], [ 2.372, 43.2071 ], [ 2.3727, 43.207 ], [ 2.3734, 43.2069 ], [ 2.374, 43.2068 ], [ 2.3744, 43.2067 ], [ 2.3745, 43.2067 ], [ 2.3749, 43.2065 ], [ 2.3751, 43.2073 ], [ 2.3758, 43.2072 ], [ 2.3758, 43.2072 ], [ 2.3763, 43.2071 ], [ 2.3765, 43.2071 ], [ 2.3769, 43.207 ], [ 2.3768, 43.2072 ], [ 2.3769, 43.2075 ], [ 2.3767, 43.2076 ], [ 2.3768, 43.2082 ], [ 2.377, 43.2082 ], [ 2.377, 43.2087 ], [ 2.377, 43.2088 ], [ 2.3778, 43.2088 ], [ 2.3781, 43.2095 ], [ 2.378, 43.2096 ], [ 2.3782, 43.2098 ], [ 2.3781, 43.2098 ], [ 2.3784, 43.2102 ], [ 2.3776, 43.2105 ], [ 2.3773, 43.2106 ], [ 2.3768, 43.2108 ], [ 2.3757, 43.2112 ], [ 2.3721, 43.2126 ], [ 2.3718, 43.2126 ], [ 2.3717, 43.2126 ], [ 2.3713, 43.2124 ], [ 2.3712, 43.2124 ], [ 2.3717, 43.212 ], [ 2.3711, 43.2114 ], [ 2.3711, 43.2114 ], [ 2.3709, 43.2112 ], [ 2.3709, 43.2112 ], [ 2.3706, 43.211 ], [ 2.3701, 43.2113 ], [ 2.3701, 43.2113 ], [ 2.37, 43.2113 ], [ 2.3692, 43.2117 ], [ 2.3691, 43.2117 ], [ 2.3693, 43.2119 ], [ 2.3694, 43.212 ], [ 2.3691, 43.2121 ], [ 2.3686, 43.2123 ], [ 2.3685, 43.2124 ], [ 2.3685, 43.2124 ], [ 2.3683, 43.2123 ], [ 2.3683, 43.2123 ], [ 2.3683, 43.2123 ], [ 2.3681, 43.2123 ], [ 2.3678, 43.2124 ], [ 2.3676, 43.2124 ], [ 2.3669, 43.2126 ], [ 2.3668, 43.2126 ], [ 2.3664, 43.2127 ], [ 2.3666, 43.2131 ], [ 2.3667, 43.2133 ], [ 2.3662, 43.2136 ], [ 2.3661, 43.2136 ], [ 2.3665, 43.2144 ], [ 2.3665, 43.2145 ], [ 2.3666, 43.2147 ], [ 2.3668, 43.2149 ], [ 2.3664, 43.215 ], [ 2.3654, 43.2152 ], [ 2.3654, 43.2155 ], [ 2.3653, 43.2156 ], [ 2.3651, 43.2157 ], [ 2.365, 43.2157 ], [ 2.3646, 43.2158 ], [ 2.3645, 43.2158 ], [ 2.3645, 43.2158 ], [ 2.3644, 43.2158 ], [ 2.3644, 43.2159 ], [ 2.3644, 43.2159 ], [ 2.3644, 43.216 ], [ 2.3644, 43.2161 ], [ 2.3637, 43.2161 ], [ 2.3638, 43.2162 ], [ 2.3639, 43.2167 ], [ 2.3642, 43.2165 ], [ 2.3646, 43.2164 ], [ 2.3647, 43.2163 ], [ 2.3652, 43.2162 ], [ 2.3654, 43.2164 ], [ 2.3656, 43.2165 ], [ 2.3659, 43.2163 ], [ 2.3661, 43.2164 ], [ 2.3663, 43.2164 ], [ 2.3669, 43.2161 ], [ 2.3672, 43.2168 ], [ 2.3675, 43.2175 ], [ 2.3676, 43.2177 ], [ 2.3676, 43.2178 ], [ 2.368, 43.2184 ], [ 2.3681, 43.2185 ], [ 2.3679, 43.2188 ], [ 2.3678, 43.2188 ], [ 2.368, 43.2188 ], [ 2.3683, 43.2189 ], [ 2.3688, 43.2189 ], [ 2.3697, 43.2189 ], [ 2.3701, 43.219 ], [ 2.3709, 43.219 ], [ 2.3713, 43.219 ], [ 2.3719, 43.2191 ], [ 2.3722, 43.2191 ], [ 2.3722, 43.219 ], [ 2.3725, 43.2188 ], [ 2.3735, 43.2184 ], [ 2.3743, 43.218 ] ] ], "type": "Polygon" }, "id": "3", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011002", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "La Conte - Ozanam" }, "type": "Feature" }, { "bbox": [ 4.2702, 43.6938, 4.2823, 43.701 ], "geometry": { "coordinates": [ [ [ 4.2819, 43.7001 ], [ 4.2818, 43.7 ], [ 4.2818, 43.6999 ], [ 4.2817, 43.6999 ], [ 4.2817, 43.6998 ], [ 4.2818, 43.6996 ], [ 4.2818, 43.6996 ], [ 4.2818, 43.6996 ], [ 4.2819, 43.6995 ], [ 4.2823, 43.6994 ], [ 4.2822, 43.6994 ], [ 4.2821, 43.6993 ], [ 4.282, 43.6993 ], [ 4.2815, 43.6992 ], [ 4.2818, 43.6986 ], [ 4.2815, 43.6985 ], [ 4.2813, 43.6985 ], [ 4.2813, 43.6984 ], [ 4.2817, 43.6974 ], [ 4.2817, 43.6974 ], [ 4.281, 43.6972 ], [ 4.2808, 43.6972 ], [ 4.2806, 43.6971 ], [ 4.2804, 43.6971 ], [ 4.2802, 43.697 ], [ 4.28, 43.697 ], [ 4.2793, 43.6971 ], [ 4.2786, 43.6972 ], [ 4.2785, 43.6974 ], [ 4.2785, 43.6975 ], [ 4.2783, 43.6974 ], [ 4.2782, 43.6974 ], [ 4.2782, 43.6974 ], [ 4.2782, 43.6972 ], [ 4.2782, 43.6971 ], [ 4.2782, 43.6969 ], [ 4.2782, 43.6969 ], [ 4.2782, 43.6968 ], [ 4.2772, 43.6966 ], [ 4.2771, 43.6968 ], [ 4.2769, 43.6973 ], [ 4.2759, 43.6971 ], [ 4.2758, 43.6971 ], [ 4.2759, 43.6969 ], [ 4.2759, 43.6968 ], [ 4.2756, 43.6967 ], [ 4.2757, 43.6964 ], [ 4.2758, 43.6963 ], [ 4.2752, 43.6962 ], [ 4.2753, 43.6961 ], [ 4.2754, 43.696 ], [ 4.2748, 43.6958 ], [ 4.2745, 43.6963 ], [ 4.2742, 43.6967 ], [ 4.2741, 43.697 ], [ 4.274, 43.6971 ], [ 4.2739, 43.697 ], [ 4.2737, 43.697 ], [ 4.2734, 43.6969 ], [ 4.2735, 43.6966 ], [ 4.2736, 43.6965 ], [ 4.2737, 43.6964 ], [ 4.2739, 43.696 ], [ 4.2738, 43.696 ], [ 4.2739, 43.6959 ], [ 4.2737, 43.6956 ], [ 4.2738, 43.6956 ], [ 4.2734, 43.695 ], [ 4.273, 43.6951 ], [ 4.2728, 43.6947 ], [ 4.2731, 43.6946 ], [ 4.273, 43.6946 ], [ 4.2729, 43.6943 ], [ 4.2731, 43.6942 ], [ 4.2729, 43.6938 ], [ 4.2722, 43.6941 ], [ 4.2721, 43.6942 ], [ 4.2707, 43.6947 ], [ 4.2702, 43.695 ], [ 4.2703, 43.6953 ], [ 4.2702, 43.6953 ], [ 4.2705, 43.696 ], [ 4.2705, 43.6961 ], [ 4.2707, 43.6965 ], [ 4.271, 43.697 ], [ 4.2711, 43.6974 ], [ 4.2715, 43.6975 ], [ 4.2716, 43.6976 ], [ 4.272, 43.6976 ], [ 4.2725, 43.6977 ], [ 4.2726, 43.6977 ], [ 4.2728, 43.6978 ], [ 4.2729, 43.6978 ], [ 4.2732, 43.6979 ], [ 4.2733, 43.698 ], [ 4.2733, 43.698 ], [ 4.2734, 43.698 ], [ 4.2734, 43.698 ], [ 4.2735, 43.698 ], [ 4.2735, 43.698 ], [ 4.2737, 43.6976 ], [ 4.2753, 43.6981 ], [ 4.2755, 43.6982 ], [ 4.2765, 43.6985 ], [ 4.2763, 43.6988 ], [ 4.2763, 43.6989 ], [ 4.2763, 43.699 ], [ 4.2772, 43.6992 ], [ 4.2772, 43.6993 ], [ 4.2775, 43.6993 ], [ 4.2775, 43.6994 ], [ 4.2775, 43.6994 ], [ 4.2775, 43.6995 ], [ 4.2777, 43.6995 ], [ 4.278, 43.6996 ], [ 4.2783, 43.6996 ], [ 4.2783, 43.6997 ], [ 4.2797, 43.7 ], [ 4.2798, 43.7001 ], [ 4.2798, 43.7001 ], [ 4.2798, 43.7001 ], [ 4.2797, 43.7004 ], [ 4.2802, 43.7005 ], [ 4.2803, 43.7005 ], [ 4.2805, 43.7007 ], [ 4.2809, 43.7009 ], [ 4.2811, 43.701 ], [ 4.2811, 43.701 ], [ 4.2812, 43.701 ], [ 4.2814, 43.701 ], [ 4.2817, 43.7009 ], [ 4.2818, 43.7009 ], [ 4.2818, 43.7007 ], [ 4.2818, 43.7006 ], [ 4.2818, 43.7006 ], [ 4.2819, 43.7004 ], [ 4.282, 43.7003 ], [ 4.282, 43.7001 ], [ 4.2819, 43.7001 ] ] ], "type": "Polygon" }, "id": "4", "properties": { "code_commune": "30341", "code_departement": "30", "code_qp": "QP030015", "commune_qp": "Vauvert", "nom_commune": "Vauvert", "nom_qp": "Les Costières" }, "type": "Feature" }, { "bbox": [ 3.6599, 43.4106, 3.667, 43.4154 ], "geometry": { "coordinates": [ [ [ 3.667, 43.4154 ], [ 3.667, 43.4145 ], [ 3.667, 43.4143 ], [ 3.6669, 43.4141 ], [ 3.6668, 43.4139 ], [ 3.6665, 43.4137 ], [ 3.666, 43.4133 ], [ 3.6653, 43.4128 ], [ 3.6652, 43.4127 ], [ 3.6653, 43.4126 ], [ 3.6654, 43.4124 ], [ 3.6653, 43.4122 ], [ 3.6653, 43.4121 ], [ 3.6653, 43.412 ], [ 3.6644, 43.4114 ], [ 3.6638, 43.4118 ], [ 3.6635, 43.4115 ], [ 3.664, 43.4111 ], [ 3.6637, 43.4109 ], [ 3.6631, 43.4113 ], [ 3.6623, 43.4106 ], [ 3.6619, 43.4109 ], [ 3.6613, 43.4114 ], [ 3.6606, 43.4119 ], [ 3.6606, 43.4119 ], [ 3.6602, 43.4121 ], [ 3.6601, 43.4121 ], [ 3.66, 43.4121 ], [ 3.66, 43.4122 ], [ 3.6599, 43.4124 ], [ 3.6599, 43.4125 ], [ 3.6608, 43.4131 ], [ 3.661, 43.4132 ], [ 3.6623, 43.4141 ], [ 3.6624, 43.4141 ], [ 3.6625, 43.4142 ], [ 3.6626, 43.4142 ], [ 3.6627, 43.4143 ], [ 3.6628, 43.4145 ], [ 3.6632, 43.4144 ], [ 3.6635, 43.4142 ], [ 3.6636, 43.4142 ], [ 3.6637, 43.4143 ], [ 3.6642, 43.4146 ], [ 3.6644, 43.4145 ], [ 3.6648, 43.4143 ], [ 3.665, 43.4144 ], [ 3.6652, 43.4142 ], [ 3.6669, 43.4154 ], [ 3.667, 43.4154 ], [ 3.667, 43.4154 ] ] ], "type": "Polygon" }, "id": "5", "properties": { "code_commune": "34301", "code_departement": "34", "code_qp": "QP034017", "commune_qp": "Sète", "nom_commune": "Sète", "nom_qp": "Ile De Thau" }, "type": "Feature" }, { "bbox": [ 2.8805, 42.7129, 2.902, 42.7278 ], "geometry": { "coordinates": [ [ [ 2.902, 42.7151 ], [ 2.902, 42.7149 ], [ 2.902, 42.7148 ], [ 2.9019, 42.7146 ], [ 2.9019, 42.7145 ], [ 2.9018, 42.7144 ], [ 2.9018, 42.7143 ], [ 2.9016, 42.7141 ], [ 2.9016, 42.7139 ], [ 2.9014, 42.7137 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9013, 42.7135 ], [ 2.9012, 42.7135 ], [ 2.9011, 42.7134 ], [ 2.9009, 42.7133 ], [ 2.9008, 42.7132 ], [ 2.9006, 42.713 ], [ 2.9005, 42.713 ], [ 2.9005, 42.7129 ], [ 2.9005, 42.7129 ], [ 2.9004, 42.713 ], [ 2.9002, 42.7131 ], [ 2.8998, 42.7135 ], [ 2.8993, 42.714 ], [ 2.8993, 42.714 ], [ 2.8991, 42.7144 ], [ 2.8987, 42.7143 ], [ 2.8984, 42.7142 ], [ 2.8983, 42.7142 ], [ 2.898, 42.7141 ], [ 2.8978, 42.714 ], [ 2.8974, 42.7139 ], [ 2.8972, 42.7139 ], [ 2.897, 42.7138 ], [ 2.8967, 42.7138 ], [ 2.8966, 42.7138 ], [ 2.8965, 42.7137 ], [ 2.8963, 42.7137 ], [ 2.8961, 42.7137 ], [ 2.8959, 42.7137 ], [ 2.8958, 42.7138 ], [ 2.8958, 42.7139 ], [ 2.8958, 42.714 ], [ 2.8957, 42.7142 ], [ 2.8957, 42.7145 ], [ 2.8956, 42.7146 ], [ 2.8956, 42.715 ], [ 2.8955, 42.7153 ], [ 2.8955, 42.7155 ], [ 2.8955, 42.7157 ], [ 2.8955, 42.7159 ], [ 2.8956, 42.7162 ], [ 2.8956, 42.7164 ], [ 2.8957, 42.7165 ], [ 2.8957, 42.7167 ], [ 2.8953, 42.7167 ], [ 2.8951, 42.7168 ], [ 2.8948, 42.7169 ], [ 2.8946, 42.7168 ], [ 2.8943, 42.7168 ], [ 2.8939, 42.7169 ], [ 2.8934, 42.7171 ], [ 2.8931, 42.7172 ], [ 2.8927, 42.7173 ], [ 2.8924, 42.7174 ], [ 2.8918, 42.7174 ], [ 2.8913, 42.7175 ], [ 2.8909, 42.7175 ], [ 2.8908, 42.7174 ], [ 2.8909, 42.7173 ], [ 2.8908, 42.7173 ], [ 2.8908, 42.7173 ], [ 2.8906, 42.7173 ], [ 2.8902, 42.7174 ], [ 2.8893, 42.7175 ], [ 2.8881, 42.7176 ], [ 2.8881, 42.7178 ], [ 2.8881, 42.718 ], [ 2.888, 42.7182 ], [ 2.8881, 42.7183 ], [ 2.8882, 42.7184 ], [ 2.8882, 42.7185 ], [ 2.8882, 42.7185 ], [ 2.8882, 42.7186 ], [ 2.8883, 42.7188 ], [ 2.8882, 42.7188 ], [ 2.8882, 42.7189 ], [ 2.8882, 42.7189 ], [ 2.8881, 42.719 ], [ 2.888, 42.7198 ], [ 2.8875, 42.7198 ], [ 2.8874, 42.7198 ], [ 2.8873, 42.7198 ], [ 2.8873, 42.7198 ], [ 2.8872, 42.7199 ], [ 2.8868, 42.7198 ], [ 2.8865, 42.7197 ], [ 2.8863, 42.7204 ], [ 2.8861, 42.7208 ], [ 2.886, 42.7208 ], [ 2.8858, 42.7208 ], [ 2.8857, 42.7208 ], [ 2.8857, 42.7208 ], [ 2.8856, 42.7207 ], [ 2.8853, 42.7205 ], [ 2.8852, 42.7206 ], [ 2.8849, 42.7209 ], [ 2.8848, 42.721 ], [ 2.8842, 42.721 ], [ 2.8843, 42.721 ], [ 2.8842, 42.721 ], [ 2.8836, 42.7212 ], [ 2.8834, 42.7213 ], [ 2.8831, 42.7213 ], [ 2.8834, 42.7213 ], [ 2.8835, 42.7213 ], [ 2.8837, 42.7214 ], [ 2.8837, 42.7215 ], [ 2.8836, 42.7219 ], [ 2.8835, 42.7219 ], [ 2.8835, 42.7221 ], [ 2.8834, 42.7222 ], [ 2.8834, 42.7224 ], [ 2.8827, 42.7224 ], [ 2.8825, 42.7224 ], [ 2.8823, 42.7224 ], [ 2.8818, 42.7224 ], [ 2.8817, 42.7224 ], [ 2.8815, 42.7224 ], [ 2.8811, 42.7224 ], [ 2.8811, 42.7227 ], [ 2.8811, 42.7229 ], [ 2.8811, 42.7231 ], [ 2.8811, 42.7231 ], [ 2.881, 42.7231 ], [ 2.881, 42.7233 ], [ 2.8809, 42.7234 ], [ 2.8811, 42.7234 ], [ 2.881, 42.7237 ], [ 2.8811, 42.7237 ], [ 2.8813, 42.7237 ], [ 2.8814, 42.7237 ], [ 2.8813, 42.7238 ], [ 2.8813, 42.724 ], [ 2.8815, 42.724 ], [ 2.8813, 42.7245 ], [ 2.8812, 42.7246 ], [ 2.8819, 42.7247 ], [ 2.8816, 42.725 ], [ 2.881, 42.7255 ], [ 2.8806, 42.7258 ], [ 2.8807, 42.7259 ], [ 2.8807, 42.7259 ], [ 2.8806, 42.726 ], [ 2.8806, 42.7261 ], [ 2.8805, 42.7261 ], [ 2.8805, 42.7262 ], [ 2.8805, 42.7262 ], [ 2.8805, 42.7263 ], [ 2.8806, 42.7264 ], [ 2.8806, 42.7265 ], [ 2.8806, 42.7266 ], [ 2.8806, 42.7267 ], [ 2.8807, 42.727 ], [ 2.8807, 42.7273 ], [ 2.8813, 42.7272 ], [ 2.8814, 42.7272 ], [ 2.8817, 42.7272 ], [ 2.8818, 42.7272 ], [ 2.8822, 42.7271 ], [ 2.8823, 42.7271 ], [ 2.8825, 42.727 ], [ 2.8827, 42.727 ], [ 2.8827, 42.727 ], [ 2.8829, 42.7271 ], [ 2.883, 42.727 ], [ 2.8831, 42.7271 ], [ 2.8836, 42.7274 ], [ 2.8836, 42.7274 ], [ 2.8838, 42.7275 ], [ 2.8841, 42.7277 ], [ 2.8842, 42.7277 ], [ 2.8844, 42.7277 ], [ 2.8849, 42.7278 ], [ 2.885, 42.7278 ], [ 2.8851, 42.7278 ], [ 2.8854, 42.7277 ], [ 2.8854, 42.7276 ], [ 2.8854, 42.7275 ], [ 2.8854, 42.7269 ], [ 2.8861, 42.7268 ], [ 2.8859, 42.7267 ], [ 2.8858, 42.7266 ], [ 2.8859, 42.7264 ], [ 2.886, 42.7261 ], [ 2.886, 42.7261 ], [ 2.8861, 42.7261 ], [ 2.886, 42.7259 ], [ 2.886, 42.7258 ], [ 2.886, 42.7258 ], [ 2.886, 42.7258 ], [ 2.8859, 42.7257 ], [ 2.8858, 42.7254 ], [ 2.8858, 42.7252 ], [ 2.8858, 42.7252 ], [ 2.8857, 42.7249 ], [ 2.8857, 42.7247 ], [ 2.8856, 42.7244 ], [ 2.8856, 42.7242 ], [ 2.8855, 42.7241 ], [ 2.8855, 42.7241 ], [ 2.8853, 42.7242 ], [ 2.8849, 42.7242 ], [ 2.8841, 42.7243 ], [ 2.884, 42.7243 ], [ 2.884, 42.7243 ], [ 2.8838, 42.7231 ], [ 2.8837, 42.723 ], [ 2.884, 42.7228 ], [ 2.8843, 42.7225 ], [ 2.8848, 42.7221 ], [ 2.885, 42.7219 ], [ 2.8851, 42.7219 ], [ 2.8853, 42.722 ], [ 2.8853, 42.722 ], [ 2.8854, 42.722 ], [ 2.8855, 42.7221 ], [ 2.8855, 42.7221 ], [ 2.8856, 42.7221 ], [ 2.8856, 42.7221 ], [ 2.8857, 42.7222 ], [ 2.8858, 42.7222 ], [ 2.886, 42.7222 ], [ 2.8861, 42.7222 ], [ 2.8862, 42.7222 ], [ 2.8863, 42.7223 ], [ 2.8866, 42.7222 ], [ 2.8866, 42.7222 ], [ 2.8869, 42.7222 ], [ 2.8871, 42.7223 ], [ 2.8871, 42.7224 ], [ 2.8875, 42.7224 ], [ 2.8877, 42.7224 ], [ 2.888, 42.7224 ], [ 2.8883, 42.7225 ], [ 2.8883, 42.7223 ], [ 2.8884, 42.7222 ], [ 2.8885, 42.722 ], [ 2.8886, 42.7219 ], [ 2.8888, 42.7216 ], [ 2.8888, 42.7216 ], [ 2.8886, 42.7215 ], [ 2.8885, 42.7214 ], [ 2.8883, 42.7214 ], [ 2.8882, 42.7213 ], [ 2.8879, 42.7212 ], [ 2.8879, 42.7211 ], [ 2.8881, 42.721 ], [ 2.8882, 42.7209 ], [ 2.8883, 42.7209 ], [ 2.8885, 42.7209 ], [ 2.8888, 42.7208 ], [ 2.889, 42.7208 ], [ 2.8891, 42.7208 ], [ 2.8892, 42.7207 ], [ 2.8892, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8894, 42.7207 ], [ 2.8895, 42.7207 ], [ 2.8895, 42.7206 ], [ 2.8897, 42.7205 ], [ 2.8897, 42.7204 ], [ 2.8898, 42.7204 ], [ 2.89, 42.7204 ], [ 2.8901, 42.7203 ], [ 2.8904, 42.7202 ], [ 2.8907, 42.7201 ], [ 2.8909, 42.7201 ], [ 2.891, 42.7201 ], [ 2.8911, 42.7201 ], [ 2.8911, 42.72 ], [ 2.8912, 42.72 ], [ 2.8913, 42.72 ], [ 2.8918, 42.7198 ], [ 2.8919, 42.7197 ], [ 2.8923, 42.7196 ], [ 2.8923, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8924, 42.7196 ], [ 2.8925, 42.7196 ], [ 2.8928, 42.7194 ], [ 2.893, 42.7192 ], [ 2.8924, 42.7189 ], [ 2.8924, 42.7188 ], [ 2.8923, 42.7188 ], [ 2.8922, 42.7188 ], [ 2.892, 42.7188 ], [ 2.8918, 42.7188 ], [ 2.8918, 42.7187 ], [ 2.8917, 42.7184 ], [ 2.8918, 42.7184 ], [ 2.8921, 42.7183 ], [ 2.8925, 42.7182 ], [ 2.8933, 42.7181 ], [ 2.8933, 42.7182 ], [ 2.8942, 42.7184 ], [ 2.8953, 42.7186 ], [ 2.8953, 42.7184 ], [ 2.8955, 42.718 ], [ 2.8956, 42.7176 ], [ 2.8956, 42.7176 ], [ 2.8956, 42.7173 ], [ 2.8956, 42.7173 ], [ 2.8957, 42.7173 ], [ 2.8959, 42.7174 ], [ 2.8961, 42.7174 ], [ 2.8963, 42.7175 ], [ 2.8967, 42.7176 ], [ 2.8972, 42.7177 ], [ 2.8975, 42.7178 ], [ 2.8978, 42.7178 ], [ 2.898, 42.7179 ], [ 2.8984, 42.7179 ], [ 2.8987, 42.718 ], [ 2.8988, 42.7175 ], [ 2.8993, 42.7177 ], [ 2.8995, 42.7174 ], [ 2.8997, 42.7172 ], [ 2.9, 42.7169 ], [ 2.9001, 42.7168 ], [ 2.9002, 42.7167 ], [ 2.9003, 42.7166 ], [ 2.9011, 42.7167 ], [ 2.9011, 42.7165 ], [ 2.901, 42.7165 ], [ 2.9011, 42.7164 ], [ 2.9011, 42.7162 ], [ 2.9011, 42.716 ], [ 2.901, 42.7159 ], [ 2.9007, 42.7156 ], [ 2.9004, 42.7153 ], [ 2.9005, 42.7151 ], [ 2.9006, 42.7152 ], [ 2.9008, 42.7153 ], [ 2.9011, 42.7154 ], [ 2.9015, 42.7153 ], [ 2.9016, 42.7153 ], [ 2.9018, 42.7152 ], [ 2.902, 42.7152 ], [ 2.902, 42.7151 ] ] ], "type": "Polygon" }, "id": "6", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066005", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Diagonale Du Haut - Moyen-Vernet" }, "type": "Feature" }, { "bbox": [ 2.8756, 42.6876, 2.8837, 42.7006 ], "geometry": { "coordinates": [ [ [ 2.8837, 42.6899 ], [ 2.8836, 42.6899 ], [ 2.8831, 42.6897 ], [ 2.8827, 42.6896 ], [ 2.8826, 42.6896 ], [ 2.8825, 42.6895 ], [ 2.8824, 42.6896 ], [ 2.8818, 42.6896 ], [ 2.8816, 42.6895 ], [ 2.8816, 42.6894 ], [ 2.8816, 42.6893 ], [ 2.8816, 42.6893 ], [ 2.8817, 42.6893 ], [ 2.8816, 42.6891 ], [ 2.8816, 42.689 ], [ 2.8816, 42.6889 ], [ 2.8816, 42.6888 ], [ 2.8816, 42.6888 ], [ 2.8816, 42.6885 ], [ 2.8816, 42.6884 ], [ 2.8816, 42.6883 ], [ 2.8818, 42.6882 ], [ 2.8818, 42.6881 ], [ 2.8818, 42.6878 ], [ 2.8814, 42.6878 ], [ 2.8813, 42.6878 ], [ 2.8813, 42.6876 ], [ 2.8809, 42.6876 ], [ 2.8809, 42.6877 ], [ 2.8809, 42.6881 ], [ 2.8806, 42.688 ], [ 2.8805, 42.688 ], [ 2.8804, 42.6883 ], [ 2.8804, 42.6884 ], [ 2.8794, 42.6881 ], [ 2.8794, 42.6882 ], [ 2.879, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6881 ], [ 2.8789, 42.6882 ], [ 2.8789, 42.6883 ], [ 2.8786, 42.6882 ], [ 2.8782, 42.6881 ], [ 2.8781, 42.6883 ], [ 2.878, 42.6885 ], [ 2.8779, 42.6888 ], [ 2.8777, 42.6891 ], [ 2.8777, 42.6891 ], [ 2.8782, 42.6893 ], [ 2.8787, 42.6896 ], [ 2.8792, 42.6898 ], [ 2.8797, 42.6901 ], [ 2.88, 42.6902 ], [ 2.8804, 42.6904 ], [ 2.8808, 42.6906 ], [ 2.881, 42.6908 ], [ 2.8812, 42.6909 ], [ 2.8815, 42.691 ], [ 2.8815, 42.6911 ], [ 2.8813, 42.6915 ], [ 2.8813, 42.6916 ], [ 2.8812, 42.6916 ], [ 2.8808, 42.6917 ], [ 2.8806, 42.6917 ], [ 2.8804, 42.6918 ], [ 2.8803, 42.6919 ], [ 2.8802, 42.692 ], [ 2.8801, 42.6921 ], [ 2.8799, 42.6924 ], [ 2.8796, 42.6926 ], [ 2.8794, 42.6927 ], [ 2.8791, 42.6927 ], [ 2.8789, 42.6928 ], [ 2.8789, 42.6928 ], [ 2.8788, 42.6928 ], [ 2.8788, 42.6928 ], [ 2.8787, 42.6929 ], [ 2.8786, 42.6929 ], [ 2.8788, 42.6931 ], [ 2.8787, 42.6932 ], [ 2.8785, 42.6935 ], [ 2.878, 42.6934 ], [ 2.8771, 42.6931 ], [ 2.8769, 42.693 ], [ 2.8768, 42.6931 ], [ 2.8767, 42.6931 ], [ 2.8767, 42.6932 ], [ 2.8766, 42.6933 ], [ 2.8765, 42.6934 ], [ 2.8765, 42.6934 ], [ 2.8765, 42.6935 ], [ 2.8765, 42.6938 ], [ 2.8765, 42.694 ], [ 2.8765, 42.6941 ], [ 2.8765, 42.6944 ], [ 2.8763, 42.6943 ], [ 2.8763, 42.6944 ], [ 2.8762, 42.6946 ], [ 2.8761, 42.6949 ], [ 2.876, 42.6953 ], [ 2.876, 42.6955 ], [ 2.876, 42.6956 ], [ 2.8761, 42.6956 ], [ 2.8763, 42.6956 ], [ 2.8764, 42.6956 ], [ 2.8764, 42.6956 ], [ 2.8765, 42.6957 ], [ 2.8766, 42.6957 ], [ 2.8767, 42.6958 ], [ 2.8769, 42.6959 ], [ 2.8768, 42.696 ], [ 2.8768, 42.6964 ], [ 2.8768, 42.6968 ], [ 2.8768, 42.6969 ], [ 2.8768, 42.697 ], [ 2.8767, 42.6972 ], [ 2.8766, 42.6973 ], [ 2.8766, 42.6973 ], [ 2.8765, 42.6974 ], [ 2.8763, 42.6974 ], [ 2.876, 42.6974 ], [ 2.876, 42.6977 ], [ 2.876, 42.698 ], [ 2.8759, 42.6983 ], [ 2.8759, 42.6985 ], [ 2.8759, 42.6986 ], [ 2.8758, 42.6986 ], [ 2.8757, 42.699 ], [ 2.8756, 42.6991 ], [ 2.8761, 42.6991 ], [ 2.8766, 42.6992 ], [ 2.8771, 42.6993 ], [ 2.8772, 42.6993 ], [ 2.8774, 42.6993 ], [ 2.8778, 42.6994 ], [ 2.8778, 42.6994 ], [ 2.878, 42.6995 ], [ 2.8782, 42.6996 ], [ 2.8785, 42.6996 ], [ 2.8789, 42.6998 ], [ 2.8791, 42.6999 ], [ 2.8794, 42.7 ], [ 2.8799, 42.7001 ], [ 2.8808, 42.7004 ], [ 2.8815, 42.7006 ], [ 2.8817, 42.7006 ], [ 2.8817, 42.7003 ], [ 2.8814, 42.7003 ], [ 2.8814, 42.7003 ], [ 2.8809, 42.7001 ], [ 2.881, 42.6996 ], [ 2.8811, 42.6993 ], [ 2.8811, 42.6992 ], [ 2.8803, 42.6991 ], [ 2.8798, 42.6991 ], [ 2.8794, 42.699 ], [ 2.8789, 42.6989 ], [ 2.8785, 42.6989 ], [ 2.8781, 42.6988 ], [ 2.878, 42.6988 ], [ 2.8778, 42.6988 ], [ 2.8778, 42.6987 ], [ 2.8778, 42.6985 ], [ 2.8778, 42.6982 ], [ 2.8779, 42.698 ], [ 2.8779, 42.6976 ], [ 2.878, 42.6977 ], [ 2.8783, 42.6977 ], [ 2.8784, 42.6972 ], [ 2.8787, 42.6967 ], [ 2.8798, 42.6968 ], [ 2.8798, 42.6968 ], [ 2.8799, 42.6968 ], [ 2.8801, 42.6968 ], [ 2.8804, 42.6968 ], [ 2.8805, 42.6968 ], [ 2.881, 42.6969 ], [ 2.8812, 42.6969 ], [ 2.8812, 42.6969 ], [ 2.8814, 42.6969 ], [ 2.8815, 42.6969 ], [ 2.8815, 42.6969 ], [ 2.8815, 42.6971 ], [ 2.8816, 42.6971 ], [ 2.8816, 42.6972 ], [ 2.8822, 42.6973 ], [ 2.8822, 42.6972 ], [ 2.8823, 42.6969 ], [ 2.8823, 42.6969 ], [ 2.8826, 42.697 ], [ 2.8829, 42.6965 ], [ 2.8831, 42.6963 ], [ 2.8831, 42.6962 ], [ 2.8833, 42.696 ], [ 2.8832, 42.6959 ], [ 2.8828, 42.6958 ], [ 2.8829, 42.6956 ], [ 2.8832, 42.6957 ], [ 2.8833, 42.6955 ], [ 2.8832, 42.6955 ], [ 2.8832, 42.6954 ], [ 2.883, 42.6953 ], [ 2.8823, 42.6952 ], [ 2.8823, 42.6952 ], [ 2.8821, 42.6951 ], [ 2.882, 42.6953 ], [ 2.8813, 42.6952 ], [ 2.8811, 42.6951 ], [ 2.8812, 42.6946 ], [ 2.8813, 42.6942 ], [ 2.8814, 42.6939 ], [ 2.8815, 42.6937 ], [ 2.8808, 42.6936 ], [ 2.8805, 42.6935 ], [ 2.881, 42.6922 ], [ 2.8816, 42.6921 ], [ 2.8817, 42.6921 ], [ 2.8817, 42.692 ], [ 2.8818, 42.6919 ], [ 2.8824, 42.6917 ], [ 2.8826, 42.6917 ], [ 2.8827, 42.6915 ], [ 2.8827, 42.6916 ], [ 2.8831, 42.691 ], [ 2.883, 42.691 ], [ 2.8833, 42.6905 ], [ 2.8835, 42.6901 ], [ 2.8836, 42.69 ], [ 2.8837, 42.6899 ] ] ], "type": "Polygon" }, "id": "7", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066003", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Gare" }, "type": "Feature" }, { "bbox": [ 2.3465, 43.2102, 2.3579, 43.2164 ], "geometry": { "coordinates": [ [ [ 2.3579, 43.2105 ], [ 2.3578, 43.2103 ], [ 2.3577, 43.2102 ], [ 2.3571, 43.2102 ], [ 2.3567, 43.2102 ], [ 2.3562, 43.2102 ], [ 2.356, 43.2103 ], [ 2.3558, 43.2103 ], [ 2.3552, 43.2104 ], [ 2.3552, 43.2105 ], [ 2.3473, 43.2105 ], [ 2.3472, 43.2105 ], [ 2.347, 43.211 ], [ 2.3468, 43.2118 ], [ 2.3466, 43.2118 ], [ 2.3465, 43.2124 ], [ 2.3466, 43.2125 ], [ 2.3465, 43.2126 ], [ 2.3465, 43.2127 ], [ 2.3466, 43.2128 ], [ 2.3468, 43.2128 ], [ 2.3471, 43.2134 ], [ 2.3471, 43.2134 ], [ 2.3475, 43.2142 ], [ 2.3474, 43.2142 ], [ 2.348, 43.2151 ], [ 2.348, 43.2151 ], [ 2.3479, 43.2151 ], [ 2.3483, 43.2157 ], [ 2.3487, 43.2164 ], [ 2.3489, 43.2164 ], [ 2.3489, 43.2164 ], [ 2.353, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3535, 43.2163 ], [ 2.3536, 43.2163 ], [ 2.3539, 43.2156 ], [ 2.3544, 43.2148 ], [ 2.3544, 43.2148 ], [ 2.3548, 43.2141 ], [ 2.355, 43.2138 ], [ 2.3554, 43.213 ], [ 2.3554, 43.2126 ], [ 2.3555, 43.2126 ], [ 2.3554, 43.2126 ], [ 2.3552, 43.2118 ], [ 2.3555, 43.2119 ], [ 2.3556, 43.2119 ], [ 2.3558, 43.2118 ], [ 2.3573, 43.2116 ], [ 2.3575, 43.2116 ], [ 2.3575, 43.2117 ], [ 2.3576, 43.2116 ], [ 2.3576, 43.2114 ], [ 2.3579, 43.2105 ] ] ], "type": "Polygon" }, "id": "8", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011004", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Bastide Pont-Vieux" }, "type": "Feature" }, { "bbox": [ 2.9955, 43.1804, 3.0095, 43.1877 ], "geometry": { "coordinates": [ [ [ 3.0095, 43.1855 ], [ 3.0095, 43.1854 ], [ 3.0095, 43.1853 ], [ 3.0095, 43.1853 ], [ 3.0094, 43.1852 ], [ 3.0094, 43.1851 ], [ 3.0093, 43.185 ], [ 3.0091, 43.1848 ], [ 3.009, 43.1846 ], [ 3.0089, 43.1845 ], [ 3.0082, 43.1847 ], [ 3.0082, 43.1847 ], [ 3.0078, 43.1848 ], [ 3.0077, 43.1848 ], [ 3.0076, 43.1847 ], [ 3.0075, 43.1846 ], [ 3.0075, 43.1845 ], [ 3.0074, 43.1844 ], [ 3.0076, 43.1844 ], [ 3.0075, 43.1843 ], [ 3.0075, 43.1842 ], [ 3.0074, 43.1841 ], [ 3.0073, 43.1841 ], [ 3.0072, 43.184 ], [ 3.0072, 43.1839 ], [ 3.007, 43.1838 ], [ 3.007, 43.1837 ], [ 3.0068, 43.1837 ], [ 3.0067, 43.1835 ], [ 3.0066, 43.1834 ], [ 3.0066, 43.1834 ], [ 3.0065, 43.1833 ], [ 3.0065, 43.1833 ], [ 3.0064, 43.1833 ], [ 3.0059, 43.1834 ], [ 3.0058, 43.1834 ], [ 3.0057, 43.1835 ], [ 3.0056, 43.1833 ], [ 3.0056, 43.1833 ], [ 3.0055, 43.1833 ], [ 3.0055, 43.1833 ], [ 3.0054, 43.1832 ], [ 3.0054, 43.1832 ], [ 3.0054, 43.1832 ], [ 3.0053, 43.1831 ], [ 3.0053, 43.1832 ], [ 3.0053, 43.1831 ], [ 3.0052, 43.1831 ], [ 3.0051, 43.1831 ], [ 3.005, 43.1829 ], [ 3.004, 43.1823 ], [ 3.0039, 43.1822 ], [ 3.0037, 43.1819 ], [ 3.0036, 43.1819 ], [ 3.0036, 43.1819 ], [ 3.0035, 43.1819 ], [ 3.0034, 43.1819 ], [ 3.0032, 43.1817 ], [ 3.0032, 43.1817 ], [ 3.0031, 43.1818 ], [ 3.003, 43.1817 ], [ 3.0029, 43.1817 ], [ 3.0029, 43.1817 ], [ 3.0028, 43.1816 ], [ 3.0027, 43.1815 ], [ 3.0026, 43.1816 ], [ 3.0023, 43.1817 ], [ 3.0023, 43.1816 ], [ 3.0021, 43.1813 ], [ 3.0018, 43.181 ], [ 3.0015, 43.1808 ], [ 3.0014, 43.1807 ], [ 3.0013, 43.1807 ], [ 3.001, 43.1807 ], [ 3.001, 43.1808 ], [ 3.0011, 43.1812 ], [ 3.0008, 43.1813 ], [ 3.0004, 43.1813 ], [ 3.0001, 43.1814 ], [ 2.9999, 43.1814 ], [ 2.9996, 43.1813 ], [ 2.9995, 43.1814 ], [ 2.9993, 43.1814 ], [ 2.9993, 43.1814 ], [ 2.9992, 43.1814 ], [ 2.9992, 43.1813 ], [ 2.9992, 43.1812 ], [ 2.9991, 43.1812 ], [ 2.999, 43.1808 ], [ 2.9987, 43.1809 ], [ 2.9983, 43.181 ], [ 2.9977, 43.1812 ], [ 2.9976, 43.181 ], [ 2.9975, 43.1807 ], [ 2.9973, 43.1804 ], [ 2.997, 43.1804 ], [ 2.9966, 43.1804 ], [ 2.9968, 43.1808 ], [ 2.9971, 43.1812 ], [ 2.997, 43.1813 ], [ 2.9968, 43.1813 ], [ 2.9961, 43.1814 ], [ 2.9955, 43.1815 ], [ 2.9956, 43.1818 ], [ 2.9955, 43.1819 ], [ 2.9955, 43.1823 ], [ 2.9957, 43.1823 ], [ 2.9957, 43.1828 ], [ 2.9957, 43.183 ], [ 2.9958, 43.183 ], [ 2.9959, 43.183 ], [ 2.9959, 43.1832 ], [ 2.9959, 43.1832 ], [ 2.9959, 43.1832 ], [ 2.9963, 43.1833 ], [ 2.9965, 43.1834 ], [ 2.9967, 43.1835 ], [ 2.9968, 43.1836 ], [ 2.9969, 43.1836 ], [ 2.9971, 43.1836 ], [ 2.9971, 43.1836 ], [ 2.9972, 43.1836 ], [ 2.9977, 43.1835 ], [ 2.9978, 43.1836 ], [ 2.9989, 43.1844 ], [ 2.9992, 43.1847 ], [ 2.9995, 43.1849 ], [ 2.9996, 43.1848 ], [ 2.9997, 43.1847 ], [ 2.9998, 43.1847 ], [ 2.9999, 43.1847 ], [ 3.0001, 43.1846 ], [ 3.0002, 43.1846 ], [ 3.0005, 43.1844 ], [ 3.0008, 43.1843 ], [ 3.0012, 43.1841 ], [ 3.0016, 43.184 ], [ 3.0017, 43.1839 ], [ 3.0019, 43.1839 ], [ 3.0023, 43.1837 ], [ 3.0026, 43.1839 ], [ 3.0027, 43.184 ], [ 3.0028, 43.1841 ], [ 3.0028, 43.1842 ], [ 3.0032, 43.1852 ], [ 3.0033, 43.1852 ], [ 3.0033, 43.1853 ], [ 3.0037, 43.1851 ], [ 3.0037, 43.1852 ], [ 3.0038, 43.1854 ], [ 3.0039, 43.1855 ], [ 3.004, 43.1857 ], [ 3.004, 43.1858 ], [ 3.0041, 43.1858 ], [ 3.0042, 43.1859 ], [ 3.0043, 43.1859 ], [ 3.0044, 43.1859 ], [ 3.0045, 43.1859 ], [ 3.0045, 43.186 ], [ 3.0045, 43.1862 ], [ 3.0045, 43.1863 ], [ 3.0046, 43.1864 ], [ 3.0046, 43.1864 ], [ 3.0047, 43.1865 ], [ 3.0048, 43.1866 ], [ 3.0049, 43.1867 ], [ 3.0049, 43.1868 ], [ 3.005, 43.1869 ], [ 3.0051, 43.187 ], [ 3.0052, 43.1871 ], [ 3.0053, 43.1873 ], [ 3.0056, 43.187 ], [ 3.0064, 43.1873 ], [ 3.0072, 43.1877 ], [ 3.0073, 43.1877 ], [ 3.0074, 43.1876 ], [ 3.0075, 43.1873 ], [ 3.0076, 43.1872 ], [ 3.0078, 43.1871 ], [ 3.0079, 43.1871 ], [ 3.008, 43.1871 ], [ 3.008, 43.1871 ], [ 3.0082, 43.1871 ], [ 3.0087, 43.1864 ], [ 3.0093, 43.1858 ], [ 3.0094, 43.1856 ], [ 3.0095, 43.1855 ] ] ], "type": "Polygon" }, "id": "9", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011008", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Centre" }, "type": "Feature" }, { "bbox": [ 3.0116, 43.192, 3.0172, 43.1962 ], "geometry": { "coordinates": [ [ [ 3.0167, 43.1938 ], [ 3.0165, 43.1936 ], [ 3.0165, 43.1934 ], [ 3.0163, 43.1933 ], [ 3.0159, 43.1928 ], [ 3.0157, 43.1927 ], [ 3.0155, 43.1924 ], [ 3.0152, 43.192 ], [ 3.0141, 43.1924 ], [ 3.014, 43.1925 ], [ 3.0139, 43.1924 ], [ 3.0137, 43.1921 ], [ 3.013, 43.1924 ], [ 3.0123, 43.1926 ], [ 3.0129, 43.1937 ], [ 3.0126, 43.1938 ], [ 3.0126, 43.1938 ], [ 3.0128, 43.1944 ], [ 3.0131, 43.195 ], [ 3.0126, 43.1952 ], [ 3.0126, 43.1952 ], [ 3.0126, 43.1954 ], [ 3.0116, 43.1956 ], [ 3.0123, 43.1962 ], [ 3.0123, 43.1962 ], [ 3.0133, 43.196 ], [ 3.0131, 43.1954 ], [ 3.0135, 43.1953 ], [ 3.0143, 43.1952 ], [ 3.0144, 43.1952 ], [ 3.0145, 43.1952 ], [ 3.0149, 43.1951 ], [ 3.0149, 43.1951 ], [ 3.0149, 43.1954 ], [ 3.015, 43.1957 ], [ 3.015, 43.1957 ], [ 3.0158, 43.1952 ], [ 3.0159, 43.1952 ], [ 3.0162, 43.195 ], [ 3.0166, 43.1947 ], [ 3.017, 43.1945 ], [ 3.0171, 43.1944 ], [ 3.0172, 43.1943 ], [ 3.0172, 43.1941 ], [ 3.0171, 43.194 ], [ 3.017, 43.1939 ], [ 3.0169, 43.1938 ], [ 3.0167, 43.1938 ] ] ], "type": "Polygon" }, "id": "10", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011009", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Est" }, "type": "Feature" }, { "bbox": [ 4.3233, 43.8189, 4.342, 43.8338 ], "geometry": { "coordinates": [ [ [ 4.3277, 43.8276 ], [ 4.3268, 43.8273 ], [ 4.3267, 43.8274 ], [ 4.3259, 43.8287 ], [ 4.3256, 43.8292 ], [ 4.3252, 43.8299 ], [ 4.3251, 43.8301 ], [ 4.3249, 43.8301 ], [ 4.3245, 43.8303 ], [ 4.3242, 43.8303 ], [ 4.3238, 43.8305 ], [ 4.3235, 43.8307 ], [ 4.3233, 43.8308 ], [ 4.3233, 43.8311 ], [ 4.3234, 43.8312 ], [ 4.3239, 43.8319 ], [ 4.324, 43.8321 ], [ 4.324, 43.8323 ], [ 4.3242, 43.8324 ], [ 4.3244, 43.8325 ], [ 4.3246, 43.8326 ], [ 4.3251, 43.8329 ], [ 4.3253, 43.8329 ], [ 4.3254, 43.8329 ], [ 4.3256, 43.8329 ], [ 4.3257, 43.8328 ], [ 4.3258, 43.8327 ], [ 4.326, 43.8325 ], [ 4.3263, 43.8321 ], [ 4.3263, 43.832 ], [ 4.3264, 43.8321 ], [ 4.3268, 43.8322 ], [ 4.3269, 43.832 ], [ 4.327, 43.832 ], [ 4.3273, 43.832 ], [ 4.3273, 43.832 ], [ 4.3278, 43.8322 ], [ 4.3283, 43.8324 ], [ 4.3283, 43.8323 ], [ 4.3285, 43.8324 ], [ 4.3287, 43.8329 ], [ 4.3284, 43.833 ], [ 4.3289, 43.8333 ], [ 4.3286, 43.8336 ], [ 4.3291, 43.8338 ], [ 4.3293, 43.8336 ], [ 4.3301, 43.8334 ], [ 4.3308, 43.8331 ], [ 4.3306, 43.8329 ], [ 4.3307, 43.8325 ], [ 4.3308, 43.8325 ], [ 4.3309, 43.8324 ], [ 4.331, 43.8323 ], [ 4.3317, 43.8326 ], [ 4.3317, 43.8325 ], [ 4.3317, 43.8325 ], [ 4.3317, 43.8324 ], [ 4.3316, 43.8323 ], [ 4.3316, 43.8322 ], [ 4.3319, 43.8322 ], [ 4.332, 43.8322 ], [ 4.3321, 43.8322 ], [ 4.3323, 43.8322 ], [ 4.3329, 43.8321 ], [ 4.3329, 43.8321 ], [ 4.3329, 43.832 ], [ 4.3329, 43.8319 ], [ 4.3332, 43.8315 ], [ 4.3333, 43.8314 ], [ 4.3334, 43.8312 ], [ 4.3337, 43.8307 ], [ 4.3332, 43.8306 ], [ 4.3333, 43.8305 ], [ 4.333, 43.8304 ], [ 4.3323, 43.8301 ], [ 4.333, 43.8291 ], [ 4.3331, 43.8288 ], [ 4.3332, 43.8286 ], [ 4.3332, 43.8285 ], [ 4.3334, 43.8288 ], [ 4.3335, 43.8289 ], [ 4.3335, 43.8289 ], [ 4.3336, 43.829 ], [ 4.3337, 43.8291 ], [ 4.3339, 43.8291 ], [ 4.334, 43.8292 ], [ 4.3341, 43.8292 ], [ 4.3344, 43.8292 ], [ 4.3345, 43.8292 ], [ 4.335, 43.8291 ], [ 4.3356, 43.8289 ], [ 4.3356, 43.8288 ], [ 4.3356, 43.8287 ], [ 4.3358, 43.8284 ], [ 4.3365, 43.8285 ], [ 4.3367, 43.8285 ], [ 4.3368, 43.8286 ], [ 4.3369, 43.8287 ], [ 4.3377, 43.8292 ], [ 4.338, 43.8289 ], [ 4.338, 43.8288 ], [ 4.3381, 43.8287 ], [ 4.3382, 43.8288 ], [ 4.3383, 43.8286 ], [ 4.3384, 43.8287 ], [ 4.3384, 43.8287 ], [ 4.3379, 43.8284 ], [ 4.338, 43.828 ], [ 4.3383, 43.828 ], [ 4.3386, 43.8281 ], [ 4.3387, 43.8282 ], [ 4.3387, 43.8281 ], [ 4.3386, 43.8278 ], [ 4.3386, 43.8278 ], [ 4.3387, 43.8275 ], [ 4.3388, 43.8275 ], [ 4.3388, 43.8272 ], [ 4.3384, 43.8274 ], [ 4.3381, 43.8275 ], [ 4.3379, 43.8275 ], [ 4.3378, 43.8274 ], [ 4.3381, 43.8268 ], [ 4.3382, 43.8265 ], [ 4.3372, 43.8262 ], [ 4.3363, 43.8259 ], [ 4.3363, 43.8258 ], [ 4.337, 43.8246 ], [ 4.3375, 43.8247 ], [ 4.3377, 43.8249 ], [ 4.3387, 43.8252 ], [ 4.3389, 43.8253 ], [ 4.3391, 43.8252 ], [ 4.3395, 43.8251 ], [ 4.3398, 43.8251 ], [ 4.3401, 43.8251 ], [ 4.3403, 43.8251 ], [ 4.3404, 43.8252 ], [ 4.3407, 43.8253 ], [ 4.3413, 43.8252 ], [ 4.3419, 43.8251 ], [ 4.342, 43.825 ], [ 4.3419, 43.8248 ], [ 4.3414, 43.8247 ], [ 4.3418, 43.8243 ], [ 4.3414, 43.8242 ], [ 4.3413, 43.8241 ], [ 4.341, 43.824 ], [ 4.3414, 43.8235 ], [ 4.341, 43.8234 ], [ 4.3406, 43.8233 ], [ 4.3402, 43.8232 ], [ 4.3404, 43.8229 ], [ 4.3407, 43.8225 ], [ 4.3408, 43.8221 ], [ 4.3411, 43.8217 ], [ 4.3413, 43.8214 ], [ 4.3417, 43.821 ], [ 4.3417, 43.8209 ], [ 4.3412, 43.8207 ], [ 4.3406, 43.8205 ], [ 4.3403, 43.8203 ], [ 4.34, 43.8202 ], [ 4.3394, 43.8199 ], [ 4.3388, 43.8196 ], [ 4.3385, 43.8195 ], [ 4.3382, 43.8193 ], [ 4.3379, 43.8191 ], [ 4.3375, 43.8189 ], [ 4.337, 43.8193 ], [ 4.3368, 43.8195 ], [ 4.3364, 43.8198 ], [ 4.3362, 43.82 ], [ 4.3361, 43.8202 ], [ 4.3359, 43.8203 ], [ 4.3356, 43.8202 ], [ 4.3353, 43.8202 ], [ 4.3347, 43.8202 ], [ 4.3342, 43.8203 ], [ 4.3327, 43.8205 ], [ 4.3322, 43.8206 ], [ 4.3316, 43.8208 ], [ 4.331, 43.821 ], [ 4.3306, 43.8211 ], [ 4.3303, 43.8212 ], [ 4.3299, 43.8215 ], [ 4.3295, 43.8218 ], [ 4.3289, 43.8223 ], [ 4.3285, 43.8228 ], [ 4.3282, 43.8233 ], [ 4.3283, 43.8235 ], [ 4.3284, 43.8236 ], [ 4.3289, 43.8238 ], [ 4.3295, 43.8241 ], [ 4.3305, 43.8248 ], [ 4.3313, 43.8255 ], [ 4.3321, 43.826 ], [ 4.3323, 43.8261 ], [ 4.3326, 43.8263 ], [ 4.3328, 43.8265 ], [ 4.333, 43.8267 ], [ 4.3332, 43.8268 ], [ 4.3336, 43.8271 ], [ 4.334, 43.8265 ], [ 4.3343, 43.8259 ], [ 4.3346, 43.826 ], [ 4.3347, 43.826 ], [ 4.3349, 43.8258 ], [ 4.335, 43.8257 ], [ 4.335, 43.8257 ], [ 4.3352, 43.8256 ], [ 4.3358, 43.8258 ], [ 4.3361, 43.8259 ], [ 4.3362, 43.826 ], [ 4.3362, 43.8261 ], [ 4.3358, 43.8268 ], [ 4.3356, 43.8267 ], [ 4.3355, 43.8268 ], [ 4.3357, 43.8269 ], [ 4.3358, 43.827 ], [ 4.3358, 43.8271 ], [ 4.3351, 43.8273 ], [ 4.3352, 43.8274 ], [ 4.3353, 43.8276 ], [ 4.3355, 43.8278 ], [ 4.3356, 43.828 ], [ 4.3356, 43.8282 ], [ 4.3352, 43.8283 ], [ 4.3349, 43.8281 ], [ 4.3347, 43.8279 ], [ 4.3335, 43.8272 ], [ 4.3337, 43.8276 ], [ 4.3338, 43.8278 ], [ 4.3339, 43.8278 ], [ 4.3339, 43.8279 ], [ 4.3339, 43.8279 ], [ 4.3338, 43.828 ], [ 4.3334, 43.8279 ], [ 4.3332, 43.8278 ], [ 4.3331, 43.8279 ], [ 4.333, 43.828 ], [ 4.3329, 43.828 ], [ 4.3331, 43.8282 ], [ 4.3329, 43.8283 ], [ 4.3327, 43.8282 ], [ 4.3325, 43.8281 ], [ 4.3321, 43.8279 ], [ 4.3319, 43.8286 ], [ 4.3317, 43.8289 ], [ 4.3316, 43.829 ], [ 4.3315, 43.8289 ], [ 4.3314, 43.8289 ], [ 4.3314, 43.829 ], [ 4.3313, 43.8292 ], [ 4.3313, 43.8292 ], [ 4.3313, 43.8293 ], [ 4.3312, 43.8293 ], [ 4.3312, 43.8293 ], [ 4.3311, 43.8293 ], [ 4.331, 43.8293 ], [ 4.3309, 43.8294 ], [ 4.3308, 43.8294 ], [ 4.3308, 43.8294 ], [ 4.3308, 43.8295 ], [ 4.3307, 43.8295 ], [ 4.3306, 43.8295 ], [ 4.3305, 43.8296 ], [ 4.3304, 43.8296 ], [ 4.3304, 43.8296 ], [ 4.3309, 43.8298 ], [ 4.3309, 43.8299 ], [ 4.3308, 43.83 ], [ 4.3307, 43.8301 ], [ 4.3307, 43.8304 ], [ 4.3306, 43.8306 ], [ 4.3304, 43.8308 ], [ 4.3304, 43.8309 ], [ 4.3303, 43.8309 ], [ 4.3292, 43.8305 ], [ 4.3293, 43.8303 ], [ 4.3287, 43.8291 ], [ 4.33, 43.8287 ], [ 4.3301, 43.8287 ], [ 4.3303, 43.8288 ], [ 4.3304, 43.8285 ], [ 4.3304, 43.8285 ], [ 4.3305, 43.8284 ], [ 4.3307, 43.8281 ], [ 4.3307, 43.828 ], [ 4.3307, 43.8278 ], [ 4.331, 43.8274 ], [ 4.3308, 43.8273 ], [ 4.3304, 43.8275 ], [ 4.3301, 43.8276 ], [ 4.3299, 43.8276 ], [ 4.3298, 43.8279 ], [ 4.3292, 43.8279 ], [ 4.3292, 43.8274 ], [ 4.3281, 43.827 ], [ 4.3277, 43.8276 ] ] ], "type": "Polygon" }, "id": "11", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030003", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Pissevin - Valdegour" }, "type": "Feature" }, { "bbox": [ 3.9824, 44.0535, 3.9873, 44.0594 ], "geometry": { "coordinates": [ [ [ 3.9824, 44.0536 ], [ 3.9825, 44.0537 ], [ 3.9828, 44.0539 ], [ 3.9829, 44.054 ], [ 3.983, 44.0541 ], [ 3.9831, 44.0543 ], [ 3.9833, 44.0544 ], [ 3.9833, 44.0544 ], [ 3.9833, 44.0545 ], [ 3.9834, 44.0545 ], [ 3.9836, 44.0548 ], [ 3.9835, 44.0548 ], [ 3.9836, 44.0549 ], [ 3.9834, 44.055 ], [ 3.9836, 44.0552 ], [ 3.9838, 44.0551 ], [ 3.9838, 44.0553 ], [ 3.9839, 44.0554 ], [ 3.9839, 44.0554 ], [ 3.9838, 44.0555 ], [ 3.9838, 44.0556 ], [ 3.9838, 44.0556 ], [ 3.9839, 44.0558 ], [ 3.984, 44.0558 ], [ 3.9841, 44.0559 ], [ 3.9843, 44.0559 ], [ 3.9843, 44.056 ], [ 3.9843, 44.056 ], [ 3.9842, 44.0561 ], [ 3.9844, 44.0562 ], [ 3.9845, 44.0564 ], [ 3.9846, 44.0565 ], [ 3.9846, 44.0566 ], [ 3.9846, 44.0567 ], [ 3.9846, 44.0568 ], [ 3.9847, 44.0569 ], [ 3.9847, 44.0569 ], [ 3.9849, 44.0568 ], [ 3.9849, 44.0568 ], [ 3.985, 44.0568 ], [ 3.985, 44.0569 ], [ 3.985, 44.0569 ], [ 3.985, 44.057 ], [ 3.9851, 44.057 ], [ 3.9851, 44.0571 ], [ 3.9852, 44.0572 ], [ 3.9852, 44.0573 ], [ 3.9853, 44.0574 ], [ 3.9853, 44.0574 ], [ 3.9853, 44.0575 ], [ 3.9853, 44.0575 ], [ 3.9848, 44.0575 ], [ 3.9848, 44.0576 ], [ 3.9848, 44.0577 ], [ 3.985, 44.0578 ], [ 3.9851, 44.0578 ], [ 3.9853, 44.0578 ], [ 3.9851, 44.0582 ], [ 3.985, 44.0583 ], [ 3.9849, 44.0584 ], [ 3.9849, 44.0585 ], [ 3.9848, 44.0585 ], [ 3.9847, 44.0587 ], [ 3.9845, 44.0589 ], [ 3.9845, 44.0593 ], [ 3.9847, 44.0594 ], [ 3.9851, 44.0591 ], [ 3.9852, 44.059 ], [ 3.9853, 44.0589 ], [ 3.9852, 44.0588 ], [ 3.9854, 44.0587 ], [ 3.9856, 44.0584 ], [ 3.9858, 44.0583 ], [ 3.9859, 44.0581 ], [ 3.986, 44.058 ], [ 3.9861, 44.0578 ], [ 3.9862, 44.0576 ], [ 3.9863, 44.0574 ], [ 3.9865, 44.057 ], [ 3.9867, 44.0564 ], [ 3.9868, 44.0562 ], [ 3.9869, 44.056 ], [ 3.9869, 44.0559 ], [ 3.987, 44.0557 ], [ 3.987, 44.0556 ], [ 3.987, 44.0554 ], [ 3.9872, 44.0554 ], [ 3.9872, 44.0551 ], [ 3.9871, 44.055 ], [ 3.9871, 44.0548 ], [ 3.9871, 44.0546 ], [ 3.9871, 44.0546 ], [ 3.9872, 44.0545 ], [ 3.9873, 44.0542 ], [ 3.9873, 44.054 ], [ 3.9873, 44.054 ], [ 3.987, 44.0538 ], [ 3.9863, 44.0536 ], [ 3.9859, 44.0535 ], [ 3.9861, 44.0536 ], [ 3.9859, 44.0536 ], [ 3.9856, 44.0536 ], [ 3.9854, 44.0536 ], [ 3.9853, 44.0536 ], [ 3.9851, 44.0536 ], [ 3.9849, 44.0537 ], [ 3.9848, 44.0537 ], [ 3.9847, 44.0536 ], [ 3.9846, 44.0535 ], [ 3.9846, 44.0535 ], [ 3.9845, 44.0535 ], [ 3.984, 44.0537 ], [ 3.9839, 44.0537 ], [ 3.9839, 44.0537 ], [ 3.9837, 44.0537 ], [ 3.983, 44.0537 ], [ 3.983, 44.0537 ], [ 3.9829, 44.0537 ], [ 3.9824, 44.0535 ], [ 3.9824, 44.0536 ] ] ], "type": "Polygon" }, "id": "12", "properties": { "code_commune": "30010", "code_departement": "30", "code_qp": "QP030002", "commune_qp": "Anduze", "nom_commune": "Anduze", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 4.1241, 43.6696, 4.1407, 43.6799 ], "geometry": { "coordinates": [ [ [ 4.1386, 43.6762 ], [ 4.1385, 43.676 ], [ 4.1383, 43.6759 ], [ 4.1382, 43.6759 ], [ 4.1379, 43.6755 ], [ 4.138, 43.6751 ], [ 4.138, 43.6749 ], [ 4.138, 43.6745 ], [ 4.1378, 43.6741 ], [ 4.1374, 43.6734 ], [ 4.1373, 43.6732 ], [ 4.1369, 43.6728 ], [ 4.1367, 43.6726 ], [ 4.1366, 43.6725 ], [ 4.1366, 43.6725 ], [ 4.1366, 43.6722 ], [ 4.1371, 43.6721 ], [ 4.1373, 43.6721 ], [ 4.1383, 43.6722 ], [ 4.1396, 43.6723 ], [ 4.1404, 43.6724 ], [ 4.1405, 43.6715 ], [ 4.1407, 43.6705 ], [ 4.1402, 43.6705 ], [ 4.1402, 43.6706 ], [ 4.1391, 43.6705 ], [ 4.1391, 43.6705 ], [ 4.1383, 43.6704 ], [ 4.1383, 43.6704 ], [ 4.1379, 43.6704 ], [ 4.1378, 43.6705 ], [ 4.1378, 43.6709 ], [ 4.1379, 43.6709 ], [ 4.1379, 43.6709 ], [ 4.1378, 43.671 ], [ 4.1377, 43.671 ], [ 4.1376, 43.6709 ], [ 4.1376, 43.6709 ], [ 4.1375, 43.6709 ], [ 4.1375, 43.6709 ], [ 4.1368, 43.6708 ], [ 4.1367, 43.671 ], [ 4.1367, 43.6711 ], [ 4.1367, 43.6713 ], [ 4.1367, 43.6715 ], [ 4.1367, 43.6716 ], [ 4.1367, 43.6717 ], [ 4.1367, 43.672 ], [ 4.1367, 43.6721 ], [ 4.1366, 43.6722 ], [ 4.1365, 43.6722 ], [ 4.1365, 43.6722 ], [ 4.1363, 43.6722 ], [ 4.1363, 43.6724 ], [ 4.1361, 43.6726 ], [ 4.136, 43.6726 ], [ 4.136, 43.6727 ], [ 4.136, 43.6728 ], [ 4.1359, 43.6737 ], [ 4.1356, 43.6737 ], [ 4.1356, 43.6736 ], [ 4.1356, 43.6736 ], [ 4.1356, 43.6736 ], [ 4.1354, 43.6734 ], [ 4.1347, 43.6734 ], [ 4.1342, 43.6734 ], [ 4.1342, 43.6734 ], [ 4.1342, 43.6732 ], [ 4.1339, 43.6732 ], [ 4.1337, 43.6732 ], [ 4.1334, 43.6732 ], [ 4.1334, 43.6732 ], [ 4.1332, 43.6733 ], [ 4.1332, 43.6732 ], [ 4.133, 43.6734 ], [ 4.1328, 43.6733 ], [ 4.133, 43.6728 ], [ 4.1327, 43.6727 ], [ 4.1325, 43.6731 ], [ 4.1323, 43.6732 ], [ 4.1322, 43.6732 ], [ 4.1322, 43.6733 ], [ 4.1321, 43.6735 ], [ 4.1321, 43.6736 ], [ 4.132, 43.6737 ], [ 4.132, 43.674 ], [ 4.1321, 43.674 ], [ 4.1321, 43.674 ], [ 4.1325, 43.674 ], [ 4.1325, 43.6741 ], [ 4.1325, 43.6743 ], [ 4.1324, 43.6744 ], [ 4.1324, 43.6745 ], [ 4.1324, 43.6746 ], [ 4.1323, 43.6747 ], [ 4.1323, 43.6748 ], [ 4.1321, 43.6748 ], [ 4.1318, 43.6747 ], [ 4.1315, 43.6747 ], [ 4.1314, 43.6746 ], [ 4.1312, 43.6746 ], [ 4.1313, 43.6742 ], [ 4.1299, 43.6743 ], [ 4.1298, 43.6743 ], [ 4.1298, 43.6744 ], [ 4.1299, 43.6744 ], [ 4.13, 43.6744 ], [ 4.1299, 43.6746 ], [ 4.1297, 43.6751 ], [ 4.1294, 43.6749 ], [ 4.1294, 43.6752 ], [ 4.1288, 43.6753 ], [ 4.1287, 43.6751 ], [ 4.1281, 43.6752 ], [ 4.1278, 43.6754 ], [ 4.1273, 43.675 ], [ 4.1273, 43.6749 ], [ 4.1278, 43.6745 ], [ 4.1281, 43.6743 ], [ 4.1282, 43.6743 ], [ 4.1282, 43.6742 ], [ 4.1284, 43.6739 ], [ 4.1282, 43.6738 ], [ 4.1284, 43.6738 ], [ 4.1285, 43.6737 ], [ 4.1288, 43.6733 ], [ 4.129, 43.6729 ], [ 4.1291, 43.6727 ], [ 4.1293, 43.6724 ], [ 4.1296, 43.672 ], [ 4.1295, 43.672 ], [ 4.1294, 43.672 ], [ 4.129, 43.6718 ], [ 4.1286, 43.6716 ], [ 4.1284, 43.6716 ], [ 4.1277, 43.6714 ], [ 4.1276, 43.6713 ], [ 4.1272, 43.6713 ], [ 4.127, 43.6712 ], [ 4.1271, 43.671 ], [ 4.1271, 43.6709 ], [ 4.1273, 43.6708 ], [ 4.1275, 43.6708 ], [ 4.1276, 43.6708 ], [ 4.1278, 43.6704 ], [ 4.1281, 43.6701 ], [ 4.1282, 43.67 ], [ 4.1272, 43.6698 ], [ 4.1258, 43.6696 ], [ 4.1254, 43.671 ], [ 4.1254, 43.6711 ], [ 4.1253, 43.6711 ], [ 4.1251, 43.6711 ], [ 4.1249, 43.6711 ], [ 4.1246, 43.6711 ], [ 4.1243, 43.671 ], [ 4.1243, 43.6712 ], [ 4.1242, 43.6715 ], [ 4.1242, 43.6719 ], [ 4.1243, 43.6721 ], [ 4.1244, 43.6721 ], [ 4.1244, 43.6721 ], [ 4.1251, 43.672 ], [ 4.1263, 43.6724 ], [ 4.1262, 43.6726 ], [ 4.1265, 43.6727 ], [ 4.1276, 43.673 ], [ 4.1281, 43.6731 ], [ 4.1279, 43.6736 ], [ 4.1278, 43.6739 ], [ 4.1276, 43.674 ], [ 4.1274, 43.674 ], [ 4.1271, 43.6739 ], [ 4.1269, 43.674 ], [ 4.1267, 43.6741 ], [ 4.1263, 43.6743 ], [ 4.1262, 43.6744 ], [ 4.1266, 43.6746 ], [ 4.1261, 43.675 ], [ 4.1256, 43.6754 ], [ 4.1252, 43.6757 ], [ 4.1252, 43.6758 ], [ 4.1247, 43.6756 ], [ 4.1244, 43.6754 ], [ 4.1241, 43.6755 ], [ 4.1243, 43.6757 ], [ 4.1241, 43.6758 ], [ 4.1244, 43.6761 ], [ 4.1246, 43.676 ], [ 4.1251, 43.6764 ], [ 4.1252, 43.6764 ], [ 4.1265, 43.6761 ], [ 4.1283, 43.6758 ], [ 4.1285, 43.6758 ], [ 4.1291, 43.6757 ], [ 4.1301, 43.6754 ], [ 4.1303, 43.6754 ], [ 4.1315, 43.6755 ], [ 4.1317, 43.6756 ], [ 4.1319, 43.6758 ], [ 4.1322, 43.676 ], [ 4.1324, 43.6762 ], [ 4.1329, 43.6764 ], [ 4.1333, 43.6766 ], [ 4.1337, 43.6769 ], [ 4.1335, 43.6772 ], [ 4.1333, 43.6774 ], [ 4.1332, 43.6776 ], [ 4.1331, 43.6779 ], [ 4.1342, 43.6781 ], [ 4.1342, 43.6781 ], [ 4.1344, 43.6781 ], [ 4.1342, 43.6784 ], [ 4.1341, 43.6787 ], [ 4.1339, 43.6786 ], [ 4.1338, 43.6787 ], [ 4.1337, 43.6787 ], [ 4.1336, 43.6789 ], [ 4.1335, 43.6788 ], [ 4.1332, 43.6791 ], [ 4.133, 43.6792 ], [ 4.1328, 43.6791 ], [ 4.1327, 43.6794 ], [ 4.1326, 43.6794 ], [ 4.1326, 43.6794 ], [ 4.1324, 43.6797 ], [ 4.1334, 43.6799 ], [ 4.1334, 43.6797 ], [ 4.1334, 43.6797 ], [ 4.1335, 43.6795 ], [ 4.1339, 43.6796 ], [ 4.134, 43.6794 ], [ 4.1341, 43.6791 ], [ 4.1343, 43.6792 ], [ 4.1344, 43.679 ], [ 4.1348, 43.6792 ], [ 4.1349, 43.6789 ], [ 4.1351, 43.679 ], [ 4.1354, 43.6782 ], [ 4.1355, 43.6778 ], [ 4.1365, 43.678 ], [ 4.1365, 43.6779 ], [ 4.1366, 43.6779 ], [ 4.1367, 43.6773 ], [ 4.1369, 43.6774 ], [ 4.1371, 43.6774 ], [ 4.1375, 43.6776 ], [ 4.1379, 43.6777 ], [ 4.1378, 43.6776 ], [ 4.1378, 43.6776 ], [ 4.1382, 43.677 ], [ 4.1382, 43.677 ], [ 4.1386, 43.6762 ] ] ], "type": "Polygon" }, "id": "13", "properties": { "code_commune": "34145", "code_departement": "34", "code_qp": "QP034021", "commune_qp": "Lunel", "nom_commune": "Lunel", "nom_qp": "Centre Et Périphérie" }, "type": "Feature" }, { "bbox": [ 4.6254, 43.8078, 4.6319, 43.8124 ], "geometry": { "coordinates": [ [ [ 4.6319, 43.8112 ], [ 4.6319, 43.8111 ], [ 4.6318, 43.8107 ], [ 4.6317, 43.8107 ], [ 4.6317, 43.8107 ], [ 4.6317, 43.8106 ], [ 4.6313, 43.8103 ], [ 4.6311, 43.8094 ], [ 4.6311, 43.8093 ], [ 4.6311, 43.8085 ], [ 4.6304, 43.8084 ], [ 4.6304, 43.8084 ], [ 4.6296, 43.8082 ], [ 4.6297, 43.8079 ], [ 4.6293, 43.8078 ], [ 4.6287, 43.8078 ], [ 4.6286, 43.8078 ], [ 4.6278, 43.8078 ], [ 4.6274, 43.8078 ], [ 4.6273, 43.8078 ], [ 4.6273, 43.8079 ], [ 4.6272, 43.8079 ], [ 4.6272, 43.808 ], [ 4.6271, 43.8081 ], [ 4.627, 43.8083 ], [ 4.6269, 43.8085 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8086 ], [ 4.6269, 43.8087 ], [ 4.6271, 43.8088 ], [ 4.6272, 43.8088 ], [ 4.6274, 43.8089 ], [ 4.6275, 43.809 ], [ 4.6278, 43.809 ], [ 4.6279, 43.8091 ], [ 4.628, 43.809 ], [ 4.6281, 43.8093 ], [ 4.6279, 43.8093 ], [ 4.6277, 43.8094 ], [ 4.6274, 43.8095 ], [ 4.6268, 43.8095 ], [ 4.6268, 43.8096 ], [ 4.6267, 43.8096 ], [ 4.6267, 43.8097 ], [ 4.6266, 43.8098 ], [ 4.6266, 43.8098 ], [ 4.6266, 43.8098 ], [ 4.6265, 43.8098 ], [ 4.6265, 43.8098 ], [ 4.6264, 43.8098 ], [ 4.6263, 43.8098 ], [ 4.6261, 43.8098 ], [ 4.6259, 43.8098 ], [ 4.6254, 43.8098 ], [ 4.6254, 43.8105 ], [ 4.6255, 43.811 ], [ 4.6255, 43.811 ], [ 4.6256, 43.811 ], [ 4.6266, 43.811 ], [ 4.6271, 43.811 ], [ 4.6275, 43.8109 ], [ 4.6275, 43.8111 ], [ 4.6276, 43.8116 ], [ 4.6276, 43.8119 ], [ 4.6283, 43.8118 ], [ 4.6286, 43.8118 ], [ 4.6288, 43.8119 ], [ 4.6289, 43.8124 ], [ 4.6295, 43.8122 ], [ 4.6294, 43.8122 ], [ 4.6298, 43.8121 ], [ 4.6305, 43.8119 ], [ 4.6318, 43.8116 ], [ 4.6318, 43.8116 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8115 ], [ 4.6319, 43.8112 ] ] ], "type": "Polygon" }, "id": "14", "properties": { "code_commune": "30032", "code_departement": "30", "code_qp": "QP030012", "commune_qp": "Beaucaire", "nom_commune": "Beaucaire", "nom_qp": "La Moulinelle" }, "type": "Feature" }, { "bbox": [ 2.7551, 43.1974, 2.7711, 43.2053 ], "geometry": { "coordinates": [ [ [ 2.7564, 43.2037 ], [ 2.7557, 43.2044 ], [ 2.7554, 43.2049 ], [ 2.7551, 43.2052 ], [ 2.7557, 43.2053 ], [ 2.7559, 43.2052 ], [ 2.7567, 43.2051 ], [ 2.7571, 43.205 ], [ 2.7586, 43.2044 ], [ 2.7599, 43.204 ], [ 2.7605, 43.2038 ], [ 2.7615, 43.2034 ], [ 2.7621, 43.2032 ], [ 2.7625, 43.2031 ], [ 2.7631, 43.203 ], [ 2.7638, 43.2029 ], [ 2.7642, 43.2029 ], [ 2.765, 43.2027 ], [ 2.7659, 43.2025 ], [ 2.7658, 43.2023 ], [ 2.7655, 43.2023 ], [ 2.7647, 43.2014 ], [ 2.7654, 43.201 ], [ 2.766, 43.2005 ], [ 2.7666, 43.2008 ], [ 2.7671, 43.2005 ], [ 2.7677, 43.201 ], [ 2.7681, 43.2008 ], [ 2.7683, 43.2009 ], [ 2.7685, 43.201 ], [ 2.7688, 43.2007 ], [ 2.7696, 43.2011 ], [ 2.7703, 43.2014 ], [ 2.7709, 43.2015 ], [ 2.7711, 43.2014 ], [ 2.7711, 43.2013 ], [ 2.7709, 43.2009 ], [ 2.7709, 43.2007 ], [ 2.77, 43.2005 ], [ 2.7689, 43.2002 ], [ 2.7686, 43.2001 ], [ 2.7687, 43.1999 ], [ 2.7681, 43.1997 ], [ 2.768, 43.1996 ], [ 2.767, 43.1994 ], [ 2.767, 43.1994 ], [ 2.7667, 43.1993 ], [ 2.7647, 43.199 ], [ 2.7634, 43.1987 ], [ 2.7632, 43.1986 ], [ 2.7609, 43.1981 ], [ 2.7604, 43.198 ], [ 2.7577, 43.1974 ], [ 2.758, 43.1982 ], [ 2.7581, 43.1983 ], [ 2.7586, 43.1994 ], [ 2.7578, 43.1997 ], [ 2.7569, 43.2001 ], [ 2.7566, 43.2002 ], [ 2.7558, 43.2006 ], [ 2.7558, 43.2005 ], [ 2.7556, 43.2006 ], [ 2.7555, 43.2006 ], [ 2.7552, 43.2008 ], [ 2.7551, 43.2009 ], [ 2.7553, 43.201 ], [ 2.7552, 43.2019 ], [ 2.7552, 43.202 ], [ 2.7552, 43.202 ], [ 2.7552, 43.2021 ], [ 2.7551, 43.2027 ], [ 2.7551, 43.2028 ], [ 2.7551, 43.2029 ], [ 2.7558, 43.2027 ], [ 2.7564, 43.2037 ] ] ], "type": "Polygon" }, "id": "15", "properties": { "code_commune": "11203", "code_departement": "11", "code_qp": "QP011010", "commune_qp": "Lézignan-Corbières", "nom_commune": "Lézignan-Corbières", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.2331, 43.3431, 3.2394, 43.3527 ], "geometry": { "coordinates": [ [ [ 3.2393, 43.3502 ], [ 3.2394, 43.3501 ], [ 3.2393, 43.3495 ], [ 3.239, 43.3494 ], [ 3.2389, 43.3493 ], [ 3.2379, 43.3491 ], [ 3.2377, 43.3492 ], [ 3.2374, 43.3494 ], [ 3.2372, 43.3497 ], [ 3.2371, 43.3497 ], [ 3.237, 43.3498 ], [ 3.2369, 43.3497 ], [ 3.2368, 43.3496 ], [ 3.2366, 43.3496 ], [ 3.2361, 43.3492 ], [ 3.2365, 43.3488 ], [ 3.2365, 43.3488 ], [ 3.2366, 43.3487 ], [ 3.2367, 43.3486 ], [ 3.2368, 43.3486 ], [ 3.237, 43.3483 ], [ 3.2372, 43.3481 ], [ 3.2367, 43.3479 ], [ 3.2366, 43.3478 ], [ 3.2369, 43.3476 ], [ 3.2371, 43.3474 ], [ 3.2367, 43.3471 ], [ 3.2365, 43.3471 ], [ 3.2363, 43.3473 ], [ 3.2363, 43.3472 ], [ 3.2361, 43.3471 ], [ 3.2362, 43.347 ], [ 3.2355, 43.3466 ], [ 3.2359, 43.3462 ], [ 3.2364, 43.3455 ], [ 3.2366, 43.3453 ], [ 3.2364, 43.3452 ], [ 3.2362, 43.3451 ], [ 3.2359, 43.3451 ], [ 3.2358, 43.345 ], [ 3.2359, 43.3448 ], [ 3.2363, 43.3443 ], [ 3.2365, 43.3444 ], [ 3.2366, 43.3444 ], [ 3.2367, 43.3441 ], [ 3.2368, 43.3439 ], [ 3.2368, 43.3436 ], [ 3.237, 43.3434 ], [ 3.2368, 43.3434 ], [ 3.2363, 43.3432 ], [ 3.2362, 43.3432 ], [ 3.2354, 43.3431 ], [ 3.2348, 43.3431 ], [ 3.2346, 43.3431 ], [ 3.2344, 43.3431 ], [ 3.2343, 43.3432 ], [ 3.234, 43.3433 ], [ 3.2338, 43.3433 ], [ 3.2337, 43.3434 ], [ 3.2338, 43.3435 ], [ 3.2338, 43.3436 ], [ 3.2339, 43.3438 ], [ 3.234, 43.3442 ], [ 3.2341, 43.3447 ], [ 3.2341, 43.3448 ], [ 3.234, 43.3454 ], [ 3.2339, 43.3456 ], [ 3.2339, 43.3457 ], [ 3.2338, 43.3459 ], [ 3.2338, 43.3461 ], [ 3.2335, 43.3465 ], [ 3.2331, 43.347 ], [ 3.2335, 43.3471 ], [ 3.2342, 43.3474 ], [ 3.2343, 43.3475 ], [ 3.2355, 43.348 ], [ 3.2354, 43.3481 ], [ 3.2352, 43.3483 ], [ 3.235, 43.3486 ], [ 3.2348, 43.349 ], [ 3.2344, 43.3497 ], [ 3.2341, 43.35 ], [ 3.2338, 43.3504 ], [ 3.2335, 43.3508 ], [ 3.2334, 43.351 ], [ 3.2335, 43.3511 ], [ 3.2333, 43.3514 ], [ 3.2333, 43.3514 ], [ 3.2333, 43.3515 ], [ 3.2333, 43.3515 ], [ 3.2337, 43.3517 ], [ 3.2338, 43.3517 ], [ 3.2339, 43.3517 ], [ 3.234, 43.3517 ], [ 3.2342, 43.3514 ], [ 3.2343, 43.3514 ], [ 3.235, 43.3517 ], [ 3.2351, 43.3517 ], [ 3.2352, 43.3518 ], [ 3.2353, 43.352 ], [ 3.2355, 43.3521 ], [ 3.2356, 43.3519 ], [ 3.2362, 43.3522 ], [ 3.237, 43.3525 ], [ 3.2374, 43.3527 ], [ 3.2374, 43.3527 ], [ 3.2375, 43.3526 ], [ 3.2377, 43.3523 ], [ 3.2379, 43.3521 ], [ 3.2378, 43.352 ], [ 3.2371, 43.3517 ], [ 3.2373, 43.3515 ], [ 3.2378, 43.3508 ], [ 3.2383, 43.3502 ], [ 3.2389, 43.3504 ], [ 3.239, 43.3504 ], [ 3.2392, 43.3504 ], [ 3.2392, 43.3504 ], [ 3.2393, 43.3502 ] ] ], "type": "Polygon" }, "id": "16", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034002", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Iranget Grangette" }, "type": "Feature" }, { "bbox": [ 4.6382, 43.8051, 4.6484, 43.8134 ], "geometry": { "coordinates": [ [ [ 4.6387, 43.8096 ], [ 4.6393, 43.8096 ], [ 4.6398, 43.8096 ], [ 4.64, 43.8096 ], [ 4.6401, 43.8096 ], [ 4.6403, 43.8096 ], [ 4.6404, 43.8097 ], [ 4.6407, 43.8097 ], [ 4.6413, 43.8097 ], [ 4.6415, 43.8097 ], [ 4.6424, 43.8097 ], [ 4.6429, 43.8097 ], [ 4.6431, 43.8097 ], [ 4.6432, 43.8102 ], [ 4.6432, 43.8103 ], [ 4.6433, 43.8105 ], [ 4.6426, 43.8105 ], [ 4.6421, 43.8104 ], [ 4.6418, 43.8104 ], [ 4.6417, 43.8104 ], [ 4.6416, 43.8105 ], [ 4.6414, 43.8107 ], [ 4.6411, 43.8108 ], [ 4.641, 43.8109 ], [ 4.6409, 43.8109 ], [ 4.6408, 43.8109 ], [ 4.6407, 43.8109 ], [ 4.6405, 43.8108 ], [ 4.6404, 43.8108 ], [ 4.6404, 43.8108 ], [ 4.6407, 43.8111 ], [ 4.6413, 43.8115 ], [ 4.6414, 43.8117 ], [ 4.6413, 43.8119 ], [ 4.6413, 43.8121 ], [ 4.6413, 43.8122 ], [ 4.6411, 43.8126 ], [ 4.6409, 43.8128 ], [ 4.6408, 43.8129 ], [ 4.6408, 43.813 ], [ 4.6408, 43.8131 ], [ 4.6411, 43.8132 ], [ 4.6411, 43.8132 ], [ 4.6412, 43.8132 ], [ 4.6413, 43.8132 ], [ 4.6414, 43.8132 ], [ 4.6414, 43.8133 ], [ 4.6414, 43.8133 ], [ 4.6415, 43.8133 ], [ 4.6417, 43.8134 ], [ 4.6418, 43.8134 ], [ 4.642, 43.8132 ], [ 4.642, 43.8128 ], [ 4.642, 43.8128 ], [ 4.6421, 43.8126 ], [ 4.6422, 43.8126 ], [ 4.6422, 43.8126 ], [ 4.6417, 43.8122 ], [ 4.6416, 43.8122 ], [ 4.6417, 43.8122 ], [ 4.6414, 43.8121 ], [ 4.6414, 43.8119 ], [ 4.6415, 43.8117 ], [ 4.6417, 43.812 ], [ 4.6418, 43.812 ], [ 4.6423, 43.8123 ], [ 4.6426, 43.8125 ], [ 4.6427, 43.8125 ], [ 4.6428, 43.8125 ], [ 4.6429, 43.8126 ], [ 4.644, 43.8115 ], [ 4.6442, 43.8113 ], [ 4.6444, 43.8112 ], [ 4.6456, 43.81 ], [ 4.6457, 43.8099 ], [ 4.6458, 43.8099 ], [ 4.6462, 43.8097 ], [ 4.6461, 43.8096 ], [ 4.6462, 43.8096 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8095 ], [ 4.6464, 43.8094 ], [ 4.6465, 43.8088 ], [ 4.6466, 43.8085 ], [ 4.6466, 43.8084 ], [ 4.6467, 43.8082 ], [ 4.6467, 43.8082 ], [ 4.6475, 43.8075 ], [ 4.6475, 43.8075 ], [ 4.6477, 43.8074 ], [ 4.6477, 43.8073 ], [ 4.6478, 43.8072 ], [ 4.6481, 43.8066 ], [ 4.6482, 43.8063 ], [ 4.6483, 43.806 ], [ 4.6484, 43.8056 ], [ 4.6483, 43.8051 ], [ 4.6472, 43.8052 ], [ 4.6469, 43.8053 ], [ 4.6468, 43.8053 ], [ 4.6467, 43.8052 ], [ 4.6465, 43.8053 ], [ 4.6461, 43.8053 ], [ 4.6453, 43.8055 ], [ 4.6445, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6444, 43.8056 ], [ 4.6422, 43.8059 ], [ 4.6419, 43.806 ], [ 4.6418, 43.806 ], [ 4.6417, 43.806 ], [ 4.6416, 43.806 ], [ 4.6415, 43.806 ], [ 4.641, 43.8061 ], [ 4.6403, 43.8062 ], [ 4.6395, 43.8063 ], [ 4.6388, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6387, 43.8064 ], [ 4.6386, 43.8064 ], [ 4.6385, 43.8065 ], [ 4.6385, 43.8065 ], [ 4.6384, 43.8066 ], [ 4.6384, 43.8066 ], [ 4.6384, 43.8067 ], [ 4.6383, 43.8068 ], [ 4.6383, 43.8068 ], [ 4.6383, 43.8069 ], [ 4.6382, 43.807 ], [ 4.6382, 43.8071 ], [ 4.6383, 43.8076 ], [ 4.6383, 43.8081 ], [ 4.6385, 43.809 ], [ 4.6386, 43.8094 ], [ 4.6386, 43.8096 ], [ 4.6387, 43.8096 ] ] ], "type": "Polygon" }, "id": "17", "properties": { "code_commune": "30032", "code_departement": "30", "code_qp": "QP030013", "commune_qp": "Beaucaire", "nom_commune": "Beaucaire", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 4.0674, 44.1171, 4.0918, 44.1538 ], "geometry": { "coordinates": [ [ [ 4.0918, 44.1425 ], [ 4.0916, 44.1424 ], [ 4.0914, 44.1423 ], [ 4.0912, 44.1421 ], [ 4.091, 44.142 ], [ 4.0908, 44.1419 ], [ 4.0907, 44.1418 ], [ 4.0906, 44.1417 ], [ 4.0903, 44.1414 ], [ 4.0898, 44.1409 ], [ 4.0895, 44.1406 ], [ 4.089, 44.1403 ], [ 4.0886, 44.14 ], [ 4.0886, 44.14 ], [ 4.0884, 44.1399 ], [ 4.0883, 44.1398 ], [ 4.088, 44.1397 ], [ 4.0879, 44.1396 ], [ 4.0869, 44.1391 ], [ 4.0864, 44.1389 ], [ 4.0856, 44.1384 ], [ 4.0854, 44.1382 ], [ 4.0851, 44.138 ], [ 4.0847, 44.1377 ], [ 4.0846, 44.1377 ], [ 4.0845, 44.1377 ], [ 4.0843, 44.1377 ], [ 4.084, 44.1375 ], [ 4.084, 44.1373 ], [ 4.084, 44.1372 ], [ 4.084, 44.1371 ], [ 4.0838, 44.1364 ], [ 4.0837, 44.1363 ], [ 4.0837, 44.1362 ], [ 4.0835, 44.1355 ], [ 4.0835, 44.1354 ], [ 4.0836, 44.1353 ], [ 4.0835, 44.1351 ], [ 4.0841, 44.1351 ], [ 4.084, 44.135 ], [ 4.0841, 44.135 ], [ 4.0841, 44.1349 ], [ 4.0842, 44.1348 ], [ 4.0843, 44.1347 ], [ 4.0844, 44.1347 ], [ 4.0845, 44.1346 ], [ 4.0846, 44.1346 ], [ 4.0849, 44.1345 ], [ 4.085, 44.1344 ], [ 4.0851, 44.1343 ], [ 4.0851, 44.1342 ], [ 4.0852, 44.1341 ], [ 4.0853, 44.1341 ], [ 4.0853, 44.1341 ], [ 4.0853, 44.134 ], [ 4.0854, 44.134 ], [ 4.0854, 44.134 ], [ 4.0854, 44.1339 ], [ 4.0855, 44.1339 ], [ 4.0856, 44.1338 ], [ 4.0856, 44.1337 ], [ 4.0858, 44.1335 ], [ 4.0856, 44.1335 ], [ 4.0858, 44.1333 ], [ 4.0856, 44.1331 ], [ 4.0856, 44.133 ], [ 4.0854, 44.1328 ], [ 4.0854, 44.1328 ], [ 4.0855, 44.1328 ], [ 4.0852, 44.1324 ], [ 4.0849, 44.1325 ], [ 4.0845, 44.1326 ], [ 4.0841, 44.1327 ], [ 4.084, 44.1327 ], [ 4.0839, 44.1327 ], [ 4.0837, 44.1327 ], [ 4.0831, 44.1326 ], [ 4.083, 44.1326 ], [ 4.083, 44.1325 ], [ 4.0829, 44.1324 ], [ 4.0829, 44.1323 ], [ 4.0828, 44.1323 ], [ 4.0826, 44.132 ], [ 4.0825, 44.1319 ], [ 4.0824, 44.1318 ], [ 4.0824, 44.1318 ], [ 4.0823, 44.1318 ], [ 4.0821, 44.1317 ], [ 4.0819, 44.1316 ], [ 4.0818, 44.1315 ], [ 4.0818, 44.1316 ], [ 4.0816, 44.1316 ], [ 4.0814, 44.1317 ], [ 4.0814, 44.1317 ], [ 4.0813, 44.1316 ], [ 4.0812, 44.1316 ], [ 4.0812, 44.1316 ], [ 4.0811, 44.1316 ], [ 4.081, 44.1314 ], [ 4.0808, 44.1313 ], [ 4.0807, 44.1312 ], [ 4.0807, 44.1311 ], [ 4.0806, 44.131 ], [ 4.0806, 44.1308 ], [ 4.0805, 44.1307 ], [ 4.0805, 44.1304 ], [ 4.0805, 44.1303 ], [ 4.0805, 44.1302 ], [ 4.0804, 44.1301 ], [ 4.0804, 44.13 ], [ 4.0802, 44.1299 ], [ 4.0803, 44.1298 ], [ 4.0803, 44.1296 ], [ 4.0804, 44.1295 ], [ 4.0804, 44.1294 ], [ 4.0804, 44.1294 ], [ 4.0802, 44.1295 ], [ 4.0802, 44.1295 ], [ 4.0798, 44.1292 ], [ 4.0797, 44.1291 ], [ 4.0796, 44.1291 ], [ 4.0796, 44.129 ], [ 4.0794, 44.1289 ], [ 4.0793, 44.1288 ], [ 4.0793, 44.1287 ], [ 4.0792, 44.1286 ], [ 4.0792, 44.1285 ], [ 4.0791, 44.1285 ], [ 4.0791, 44.1283 ], [ 4.079, 44.1281 ], [ 4.0791, 44.1279 ], [ 4.0792, 44.1274 ], [ 4.0792, 44.1274 ], [ 4.0792, 44.1273 ], [ 4.0795, 44.1269 ], [ 4.0797, 44.1267 ], [ 4.0797, 44.1266 ], [ 4.0798, 44.1265 ], [ 4.0799, 44.1263 ], [ 4.0799, 44.1262 ], [ 4.0801, 44.125 ], [ 4.0802, 44.1246 ], [ 4.0802, 44.1245 ], [ 4.0803, 44.124 ], [ 4.0804, 44.1239 ], [ 4.0805, 44.1238 ], [ 4.0806, 44.1237 ], [ 4.0816, 44.1236 ], [ 4.0819, 44.1236 ], [ 4.0821, 44.1236 ], [ 4.0822, 44.1236 ], [ 4.0823, 44.1236 ], [ 4.0825, 44.1236 ], [ 4.0828, 44.1236 ], [ 4.0829, 44.1236 ], [ 4.083, 44.1234 ], [ 4.0832, 44.1229 ], [ 4.0834, 44.1225 ], [ 4.0846, 44.1228 ], [ 4.0847, 44.1227 ], [ 4.0847, 44.1219 ], [ 4.0847, 44.1213 ], [ 4.0845, 44.1213 ], [ 4.0845, 44.1213 ], [ 4.0843, 44.1213 ], [ 4.0841, 44.1213 ], [ 4.0839, 44.1212 ], [ 4.0836, 44.1212 ], [ 4.0834, 44.1212 ], [ 4.0831, 44.1212 ], [ 4.0828, 44.1212 ], [ 4.0825, 44.1212 ], [ 4.0822, 44.1212 ], [ 4.0819, 44.1212 ], [ 4.0816, 44.1212 ], [ 4.0815, 44.1212 ], [ 4.0815, 44.1213 ], [ 4.0809, 44.1214 ], [ 4.0806, 44.1213 ], [ 4.0805, 44.1199 ], [ 4.0805, 44.1196 ], [ 4.0805, 44.1196 ], [ 4.0804, 44.1196 ], [ 4.0803, 44.1196 ], [ 4.0802, 44.1193 ], [ 4.0801, 44.1192 ], [ 4.0802, 44.1191 ], [ 4.0804, 44.1189 ], [ 4.0809, 44.1187 ], [ 4.0807, 44.1184 ], [ 4.0805, 44.1183 ], [ 4.0805, 44.1182 ], [ 4.0804, 44.1182 ], [ 4.0806, 44.1179 ], [ 4.0804, 44.1178 ], [ 4.0804, 44.1178 ], [ 4.0806, 44.1176 ], [ 4.0808, 44.1174 ], [ 4.0807, 44.1173 ], [ 4.0806, 44.1173 ], [ 4.0805, 44.1173 ], [ 4.0802, 44.1174 ], [ 4.0801, 44.1174 ], [ 4.0799, 44.1174 ], [ 4.0798, 44.1173 ], [ 4.0797, 44.1173 ], [ 4.0796, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.0794, 44.1173 ], [ 4.079, 44.1171 ], [ 4.0789, 44.1171 ], [ 4.0789, 44.1172 ], [ 4.0788, 44.1174 ], [ 4.0788, 44.1175 ], [ 4.0788, 44.1176 ], [ 4.0788, 44.1176 ], [ 4.0789, 44.1177 ], [ 4.0793, 44.118 ], [ 4.0794, 44.118 ], [ 4.0794, 44.1181 ], [ 4.0795, 44.1183 ], [ 4.0795, 44.1183 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0795, 44.1184 ], [ 4.0793, 44.1185 ], [ 4.0792, 44.1185 ], [ 4.0791, 44.1185 ], [ 4.079, 44.1185 ], [ 4.0788, 44.1186 ], [ 4.0787, 44.1186 ], [ 4.0784, 44.1187 ], [ 4.0782, 44.1187 ], [ 4.0782, 44.1189 ], [ 4.0781, 44.119 ], [ 4.0782, 44.1193 ], [ 4.0782, 44.1194 ], [ 4.0783, 44.1195 ], [ 4.0785, 44.1198 ], [ 4.0784, 44.1198 ], [ 4.0785, 44.12 ], [ 4.0782, 44.121 ], [ 4.078, 44.121 ], [ 4.0773, 44.121 ], [ 4.0768, 44.121 ], [ 4.0767, 44.121 ], [ 4.0765, 44.121 ], [ 4.0763, 44.1211 ], [ 4.076, 44.1212 ], [ 4.0756, 44.1214 ], [ 4.075, 44.1217 ], [ 4.0747, 44.1219 ], [ 4.0741, 44.1223 ], [ 4.0737, 44.1225 ], [ 4.0735, 44.1227 ], [ 4.0733, 44.1228 ], [ 4.0731, 44.123 ], [ 4.073, 44.1231 ], [ 4.0729, 44.1232 ], [ 4.0729, 44.1232 ], [ 4.0728, 44.1234 ], [ 4.0713, 44.1232 ], [ 4.0712, 44.123 ], [ 4.071, 44.1231 ], [ 4.0708, 44.1231 ], [ 4.0708, 44.1232 ], [ 4.0702, 44.1232 ], [ 4.07, 44.1232 ], [ 4.0699, 44.1232 ], [ 4.0699, 44.1232 ], [ 4.0698, 44.1233 ], [ 4.0698, 44.1233 ], [ 4.0697, 44.1233 ], [ 4.0696, 44.1233 ], [ 4.0694, 44.1233 ], [ 4.0693, 44.1233 ], [ 4.0693, 44.1234 ], [ 4.0692, 44.1235 ], [ 4.0692, 44.1236 ], [ 4.0692, 44.1237 ], [ 4.0692, 44.1237 ], [ 4.0692, 44.1238 ], [ 4.0692, 44.1239 ], [ 4.0692, 44.1239 ], [ 4.0692, 44.124 ], [ 4.0692, 44.1241 ], [ 4.0692, 44.1241 ], [ 4.0689, 44.1246 ], [ 4.0688, 44.1246 ], [ 4.0685, 44.1245 ], [ 4.0685, 44.1245 ], [ 4.0684, 44.1245 ], [ 4.0683, 44.1247 ], [ 4.0682, 44.1247 ], [ 4.0681, 44.1248 ], [ 4.068, 44.1248 ], [ 4.068, 44.1248 ], [ 4.068, 44.1249 ], [ 4.0679, 44.1249 ], [ 4.0679, 44.1251 ], [ 4.0679, 44.1251 ], [ 4.0679, 44.1252 ], [ 4.0678, 44.1252 ], [ 4.0677, 44.1253 ], [ 4.0676, 44.1253 ], [ 4.0679, 44.1256 ], [ 4.068, 44.1256 ], [ 4.0683, 44.1259 ], [ 4.0683, 44.1259 ], [ 4.0684, 44.1258 ], [ 4.0683, 44.1259 ], [ 4.0682, 44.126 ], [ 4.0682, 44.126 ], [ 4.0681, 44.1261 ], [ 4.0684, 44.1263 ], [ 4.0684, 44.1263 ], [ 4.0683, 44.1264 ], [ 4.0686, 44.1266 ], [ 4.0688, 44.1265 ], [ 4.069, 44.1264 ], [ 4.0693, 44.1261 ], [ 4.0695, 44.1259 ], [ 4.0698, 44.1256 ], [ 4.0699, 44.1256 ], [ 4.0702, 44.1258 ], [ 4.0703, 44.1258 ], [ 4.0703, 44.1259 ], [ 4.0703, 44.126 ], [ 4.0703, 44.126 ], [ 4.0703, 44.1261 ], [ 4.0703, 44.1262 ], [ 4.0703, 44.1262 ], [ 4.0702, 44.1263 ], [ 4.0702, 44.1264 ], [ 4.0703, 44.1265 ], [ 4.0703, 44.1266 ], [ 4.0703, 44.1266 ], [ 4.0702, 44.1266 ], [ 4.0702, 44.1268 ], [ 4.0701, 44.127 ], [ 4.0701, 44.1271 ], [ 4.0701, 44.1272 ], [ 4.0701, 44.1272 ], [ 4.0701, 44.1272 ], [ 4.0702, 44.1273 ], [ 4.0703, 44.1274 ], [ 4.0703, 44.1275 ], [ 4.0703, 44.1276 ], [ 4.0703, 44.1276 ], [ 4.0704, 44.1279 ], [ 4.0703, 44.1279 ], [ 4.0702, 44.128 ], [ 4.0702, 44.1281 ], [ 4.0704, 44.1282 ], [ 4.0704, 44.1282 ], [ 4.0703, 44.1283 ], [ 4.0703, 44.1284 ], [ 4.0702, 44.1284 ], [ 4.0701, 44.1286 ], [ 4.0701, 44.1285 ], [ 4.07, 44.1287 ], [ 4.0701, 44.1288 ], [ 4.0702, 44.1288 ], [ 4.0702, 44.1289 ], [ 4.0701, 44.1289 ], [ 4.07, 44.1292 ], [ 4.0699, 44.1294 ], [ 4.0698, 44.1293 ], [ 4.0695, 44.1294 ], [ 4.0694, 44.1295 ], [ 4.0693, 44.1295 ], [ 4.0691, 44.1295 ], [ 4.069, 44.1296 ], [ 4.069, 44.1296 ], [ 4.0686, 44.1296 ], [ 4.0684, 44.1297 ], [ 4.0682, 44.1297 ], [ 4.068, 44.1297 ], [ 4.0676, 44.1298 ], [ 4.0676, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.1298 ], [ 4.0674, 44.13 ], [ 4.0674, 44.1303 ], [ 4.0674, 44.1304 ], [ 4.0674, 44.1304 ], [ 4.0675, 44.1305 ], [ 4.0676, 44.1305 ], [ 4.0676, 44.1305 ], [ 4.0677, 44.1304 ], [ 4.0679, 44.1303 ], [ 4.068, 44.1303 ], [ 4.0683, 44.1303 ], [ 4.069, 44.1304 ], [ 4.0689, 44.1304 ], [ 4.0689, 44.1305 ], [ 4.0689, 44.1306 ], [ 4.069, 44.1307 ], [ 4.069, 44.1309 ], [ 4.069, 44.1313 ], [ 4.069, 44.1318 ], [ 4.0697, 44.1318 ], [ 4.0699, 44.1318 ], [ 4.0699, 44.1318 ], [ 4.0699, 44.1329 ], [ 4.0704, 44.1329 ], [ 4.0707, 44.133 ], [ 4.0707, 44.133 ], [ 4.0707, 44.1331 ], [ 4.0708, 44.1331 ], [ 4.0708, 44.1331 ], [ 4.0708, 44.1332 ], [ 4.0709, 44.1332 ], [ 4.0712, 44.1332 ], [ 4.0713, 44.1332 ], [ 4.0715, 44.1333 ], [ 4.0717, 44.1334 ], [ 4.0719, 44.1335 ], [ 4.0717, 44.1337 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1341 ], [ 4.0714, 44.1342 ], [ 4.0716, 44.1344 ], [ 4.0717, 44.1344 ], [ 4.0717, 44.1345 ], [ 4.0716, 44.1345 ], [ 4.0716, 44.1346 ], [ 4.0715, 44.1346 ], [ 4.0714, 44.1346 ], [ 4.0711, 44.1345 ], [ 4.071, 44.1345 ], [ 4.0709, 44.1345 ], [ 4.071, 44.1347 ], [ 4.0711, 44.1348 ], [ 4.0712, 44.135 ], [ 4.0715, 44.1354 ], [ 4.0715, 44.1356 ], [ 4.0716, 44.1357 ], [ 4.0716, 44.1358 ], [ 4.0716, 44.1359 ], [ 4.0717, 44.136 ], [ 4.0718, 44.1362 ], [ 4.0719, 44.1363 ], [ 4.0721, 44.1362 ], [ 4.0723, 44.136 ], [ 4.0725, 44.1359 ], [ 4.0726, 44.1357 ], [ 4.0727, 44.1356 ], [ 4.0729, 44.1356 ], [ 4.073, 44.1353 ], [ 4.0732, 44.1352 ], [ 4.0733, 44.1352 ], [ 4.0736, 44.135 ], [ 4.0737, 44.135 ], [ 4.0737, 44.1351 ], [ 4.0737, 44.1351 ], [ 4.0737, 44.1351 ], [ 4.0738, 44.1352 ], [ 4.0738, 44.1352 ], [ 4.0742, 44.1355 ], [ 4.0743, 44.1356 ], [ 4.0745, 44.1358 ], [ 4.0745, 44.1358 ], [ 4.0747, 44.1359 ], [ 4.0744, 44.1361 ], [ 4.0742, 44.1365 ], [ 4.0741, 44.1369 ], [ 4.074, 44.1372 ], [ 4.0739, 44.1375 ], [ 4.0739, 44.1377 ], [ 4.0739, 44.1381 ], [ 4.074, 44.1385 ], [ 4.0741, 44.1394 ], [ 4.0743, 44.1401 ], [ 4.0744, 44.1407 ], [ 4.0744, 44.1409 ], [ 4.0744, 44.141 ], [ 4.0744, 44.1412 ], [ 4.0745, 44.1414 ], [ 4.0746, 44.1418 ], [ 4.0749, 44.1422 ], [ 4.0749, 44.1424 ], [ 4.0749, 44.1425 ], [ 4.0749, 44.1425 ], [ 4.0747, 44.143 ], [ 4.0744, 44.1437 ], [ 4.0743, 44.1439 ], [ 4.0742, 44.144 ], [ 4.0741, 44.1441 ], [ 4.074, 44.1442 ], [ 4.0739, 44.1443 ], [ 4.0738, 44.1444 ], [ 4.0735, 44.1445 ], [ 4.0732, 44.1447 ], [ 4.073, 44.1449 ], [ 4.0728, 44.1449 ], [ 4.0727, 44.145 ], [ 4.0725, 44.145 ], [ 4.0721, 44.145 ], [ 4.0721, 44.1451 ], [ 4.0723, 44.1451 ], [ 4.0726, 44.1451 ], [ 4.0727, 44.1451 ], [ 4.0728, 44.1451 ], [ 4.0729, 44.1451 ], [ 4.0729, 44.1451 ], [ 4.073, 44.145 ], [ 4.0731, 44.145 ], [ 4.0732, 44.145 ], [ 4.0734, 44.145 ], [ 4.0737, 44.1449 ], [ 4.0739, 44.1448 ], [ 4.0741, 44.1447 ], [ 4.0742, 44.1446 ], [ 4.0743, 44.1447 ], [ 4.0745, 44.1445 ], [ 4.0747, 44.1444 ], [ 4.0747, 44.1444 ], [ 4.0756, 44.1438 ], [ 4.0758, 44.1437 ], [ 4.076, 44.1435 ], [ 4.0762, 44.1433 ], [ 4.0763, 44.1432 ], [ 4.0766, 44.1428 ], [ 4.0769, 44.1423 ], [ 4.0771, 44.1419 ], [ 4.078, 44.1398 ], [ 4.0782, 44.1394 ], [ 4.0779, 44.1395 ], [ 4.0776, 44.1395 ], [ 4.0775, 44.1394 ], [ 4.0775, 44.1393 ], [ 4.0778, 44.1388 ], [ 4.0774, 44.1388 ], [ 4.0774, 44.1385 ], [ 4.0769, 44.1383 ], [ 4.0771, 44.138 ], [ 4.0772, 44.1377 ], [ 4.0773, 44.1375 ], [ 4.0773, 44.1373 ], [ 4.0774, 44.1369 ], [ 4.0773, 44.1365 ], [ 4.0771, 44.1364 ], [ 4.0766, 44.1362 ], [ 4.0764, 44.1362 ], [ 4.0761, 44.136 ], [ 4.0753, 44.1354 ], [ 4.0755, 44.1351 ], [ 4.0758, 44.1349 ], [ 4.0762, 44.1347 ], [ 4.0764, 44.1346 ], [ 4.077, 44.1343 ], [ 4.0783, 44.1337 ], [ 4.0786, 44.134 ], [ 4.0786, 44.1341 ], [ 4.0788, 44.1344 ], [ 4.0792, 44.135 ], [ 4.0795, 44.1355 ], [ 4.0797, 44.1357 ], [ 4.0798, 44.136 ], [ 4.08, 44.1371 ], [ 4.08, 44.1375 ], [ 4.08, 44.1383 ], [ 4.0799, 44.1385 ], [ 4.0798, 44.1389 ], [ 4.0798, 44.1391 ], [ 4.0804, 44.1392 ], [ 4.0808, 44.1396 ], [ 4.0811, 44.1395 ], [ 4.0813, 44.1393 ], [ 4.0813, 44.1393 ], [ 4.0814, 44.1393 ], [ 4.082, 44.1394 ], [ 4.0822, 44.1395 ], [ 4.0825, 44.1397 ], [ 4.0828, 44.1398 ], [ 4.0832, 44.1399 ], [ 4.0835, 44.1401 ], [ 4.0835, 44.1402 ], [ 4.0835, 44.1403 ], [ 4.0837, 44.1403 ], [ 4.084, 44.1405 ], [ 4.0842, 44.1406 ], [ 4.0847, 44.1406 ], [ 4.0847, 44.1407 ], [ 4.0846, 44.1409 ], [ 4.0841, 44.1416 ], [ 4.0838, 44.1418 ], [ 4.0837, 44.1419 ], [ 4.0836, 44.1421 ], [ 4.0833, 44.1429 ], [ 4.0833, 44.143 ], [ 4.0833, 44.1431 ], [ 4.0833, 44.1435 ], [ 4.0833, 44.1436 ], [ 4.0832, 44.1437 ], [ 4.0831, 44.1438 ], [ 4.0829, 44.1441 ], [ 4.0825, 44.1445 ], [ 4.0824, 44.1448 ], [ 4.0823, 44.1449 ], [ 4.0823, 44.1449 ], [ 4.0822, 44.1453 ], [ 4.0822, 44.1454 ], [ 4.0822, 44.1454 ], [ 4.0822, 44.1455 ], [ 4.0822, 44.1455 ], [ 4.082, 44.1458 ], [ 4.0819, 44.1459 ], [ 4.0818, 44.1459 ], [ 4.0811, 44.1462 ], [ 4.0809, 44.1463 ], [ 4.0809, 44.1464 ], [ 4.0807, 44.1471 ], [ 4.0807, 44.1473 ], [ 4.0806, 44.1477 ], [ 4.0807, 44.1477 ], [ 4.0806, 44.148 ], [ 4.0808, 44.148 ], [ 4.0807, 44.1484 ], [ 4.0802, 44.1484 ], [ 4.0801, 44.1489 ], [ 4.0799, 44.1489 ], [ 4.0794, 44.149 ], [ 4.0794, 44.1491 ], [ 4.0795, 44.1492 ], [ 4.0796, 44.1494 ], [ 4.0798, 44.1497 ], [ 4.0803, 44.1496 ], [ 4.0804, 44.1499 ], [ 4.0804, 44.15 ], [ 4.0806, 44.1504 ], [ 4.0809, 44.1504 ], [ 4.0809, 44.1504 ], [ 4.0809, 44.1506 ], [ 4.0809, 44.1509 ], [ 4.0809, 44.1509 ], [ 4.0809, 44.1511 ], [ 4.081, 44.1514 ], [ 4.081, 44.1515 ], [ 4.0813, 44.1514 ], [ 4.0816, 44.1513 ], [ 4.0817, 44.1512 ], [ 4.0817, 44.1513 ], [ 4.0821, 44.1517 ], [ 4.0826, 44.152 ], [ 4.0826, 44.1521 ], [ 4.083, 44.1524 ], [ 4.0831, 44.1524 ], [ 4.0836, 44.1532 ], [ 4.0834, 44.1533 ], [ 4.0836, 44.1537 ], [ 4.0837, 44.1538 ], [ 4.0839, 44.1536 ], [ 4.0841, 44.1535 ], [ 4.0843, 44.1534 ], [ 4.0845, 44.1532 ], [ 4.0848, 44.1531 ], [ 4.0849, 44.153 ], [ 4.0849, 44.153 ], [ 4.085, 44.1529 ], [ 4.0849, 44.1528 ], [ 4.0849, 44.1527 ], [ 4.0848, 44.1527 ], [ 4.0847, 44.1525 ], [ 4.084, 44.1521 ], [ 4.0841, 44.1516 ], [ 4.0838, 44.1515 ], [ 4.0839, 44.151 ], [ 4.0838, 44.1507 ], [ 4.0838, 44.1504 ], [ 4.0836, 44.1502 ], [ 4.0836, 44.1502 ], [ 4.0835, 44.1502 ], [ 4.0835, 44.1502 ], [ 4.0834, 44.1502 ], [ 4.0833, 44.1502 ], [ 4.0832, 44.1498 ], [ 4.0831, 44.1495 ], [ 4.0831, 44.1494 ], [ 4.083, 44.1492 ], [ 4.083, 44.1492 ], [ 4.0829, 44.1492 ], [ 4.0829, 44.1491 ], [ 4.0829, 44.1491 ], [ 4.0828, 44.149 ], [ 4.0823, 44.149 ], [ 4.0821, 44.1491 ], [ 4.0821, 44.149 ], [ 4.0822, 44.1489 ], [ 4.0818, 44.1488 ], [ 4.0816, 44.1488 ], [ 4.0817, 44.1486 ], [ 4.0819, 44.148 ], [ 4.082, 44.1479 ], [ 4.0821, 44.148 ], [ 4.0822, 44.148 ], [ 4.0824, 44.148 ], [ 4.0824, 44.1479 ], [ 4.0825, 44.1475 ], [ 4.0825, 44.1475 ], [ 4.0827, 44.1475 ], [ 4.0828, 44.1475 ], [ 4.0833, 44.1475 ], [ 4.0833, 44.1474 ], [ 4.0833, 44.1474 ], [ 4.0834, 44.1473 ], [ 4.0835, 44.1472 ], [ 4.0837, 44.147 ], [ 4.084, 44.1467 ], [ 4.0843, 44.1465 ], [ 4.0838, 44.1463 ], [ 4.0839, 44.1462 ], [ 4.0839, 44.1462 ], [ 4.0843, 44.1459 ], [ 4.0844, 44.1459 ], [ 4.0845, 44.1458 ], [ 4.0845, 44.1457 ], [ 4.0845, 44.1455 ], [ 4.0851, 44.1455 ], [ 4.0851, 44.1454 ], [ 4.085, 44.1452 ], [ 4.0851, 44.1452 ], [ 4.0851, 44.145 ], [ 4.0851, 44.1446 ], [ 4.0858, 44.1443 ], [ 4.0861, 44.1439 ], [ 4.0865, 44.1439 ], [ 4.087, 44.1439 ], [ 4.0877, 44.1439 ], [ 4.0883, 44.1439 ], [ 4.0886, 44.1439 ], [ 4.0887, 44.1439 ], [ 4.0887, 44.1441 ], [ 4.0887, 44.1445 ], [ 4.0891, 44.1445 ], [ 4.0894, 44.1443 ], [ 4.0894, 44.1442 ], [ 4.0897, 44.1441 ], [ 4.0898, 44.144 ], [ 4.0899, 44.144 ], [ 4.0901, 44.144 ], [ 4.0905, 44.1437 ], [ 4.0905, 44.1437 ], [ 4.0906, 44.1437 ], [ 4.0907, 44.1437 ], [ 4.0909, 44.1436 ], [ 4.091, 44.1436 ], [ 4.091, 44.1436 ], [ 4.0911, 44.1436 ], [ 4.0911, 44.1435 ], [ 4.0912, 44.1435 ], [ 4.0912, 44.1434 ], [ 4.0913, 44.1433 ], [ 4.0913, 44.1433 ], [ 4.0915, 44.143 ], [ 4.0917, 44.1428 ], [ 4.0918, 44.1426 ], [ 4.0918, 44.1425 ] ] ], "type": "Polygon" }, "id": "18", "properties": { "code_commune": "30007", "code_departement": "30", "code_qp": "QP030001", "commune_qp": "Alès", "nom_commune": "Alès", "nom_qp": "Près Saint Jean - Cévennes - Tamaris - Cauvel-la Royale - Rochebelle - Centre ville" }, "type": "Feature" }, { "bbox": [ 4.3733, 43.8361, 4.3789, 43.8394 ], "geometry": { "coordinates": [ [ [ 4.3741, 43.8372 ], [ 4.3741, 43.8372 ], [ 4.374, 43.8372 ], [ 4.3739, 43.8373 ], [ 4.3738, 43.8375 ], [ 4.3737, 43.8377 ], [ 4.3733, 43.8383 ], [ 4.3745, 43.8382 ], [ 4.3752, 43.8381 ], [ 4.3753, 43.838 ], [ 4.3752, 43.8381 ], [ 4.3748, 43.8384 ], [ 4.3745, 43.8387 ], [ 4.3741, 43.839 ], [ 4.3746, 43.8391 ], [ 4.375, 43.8391 ], [ 4.3756, 43.8386 ], [ 4.3757, 43.8386 ], [ 4.3756, 43.838 ], [ 4.376, 43.838 ], [ 4.3762, 43.8376 ], [ 4.3765, 43.8374 ], [ 4.3768, 43.8375 ], [ 4.3767, 43.838 ], [ 4.3768, 43.838 ], [ 4.377, 43.8385 ], [ 4.377, 43.8388 ], [ 4.3771, 43.8394 ], [ 4.3773, 43.8394 ], [ 4.3777, 43.8394 ], [ 4.3777, 43.8391 ], [ 4.3781, 43.839 ], [ 4.3777, 43.8383 ], [ 4.378, 43.8382 ], [ 4.3778, 43.8379 ], [ 4.3779, 43.8379 ], [ 4.3789, 43.8378 ], [ 4.3788, 43.8367 ], [ 4.3784, 43.8369 ], [ 4.3781, 43.8371 ], [ 4.3776, 43.8366 ], [ 4.3774, 43.8363 ], [ 4.3768, 43.8369 ], [ 4.3764, 43.8372 ], [ 4.3759, 43.837 ], [ 4.376, 43.8369 ], [ 4.3761, 43.8368 ], [ 4.3764, 43.8365 ], [ 4.3762, 43.8364 ], [ 4.3758, 43.8361 ], [ 4.3739, 43.8369 ], [ 4.3741, 43.8372 ] ] ], "type": "Polygon" }, "id": "19", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030007", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Route De Beaucaire" }, "type": "Feature" }, { "bbox": [ 1.3974, 43.592, 1.4081, 43.5977 ], "geometry": { "coordinates": [ [ [ 1.4005, 43.5923 ], [ 1.3994, 43.592 ], [ 1.3994, 43.592 ], [ 1.3993, 43.5921 ], [ 1.3992, 43.5922 ], [ 1.3991, 43.5923 ], [ 1.3989, 43.5928 ], [ 1.3984, 43.5935 ], [ 1.3983, 43.5938 ], [ 1.3982, 43.5945 ], [ 1.398, 43.5944 ], [ 1.3979, 43.5947 ], [ 1.3978, 43.5948 ], [ 1.3977, 43.5953 ], [ 1.3977, 43.5954 ], [ 1.3976, 43.5959 ], [ 1.3975, 43.596 ], [ 1.3976, 43.596 ], [ 1.3976, 43.5962 ], [ 1.3976, 43.5963 ], [ 1.3975, 43.5967 ], [ 1.3974, 43.5972 ], [ 1.3974, 43.5977 ], [ 1.3975, 43.5975 ], [ 1.3976, 43.5975 ], [ 1.3977, 43.5974 ], [ 1.3977, 43.5974 ], [ 1.3982, 43.5971 ], [ 1.3987, 43.5969 ], [ 1.3991, 43.5967 ], [ 1.3992, 43.5967 ], [ 1.3993, 43.5967 ], [ 1.4, 43.5968 ], [ 1.4002, 43.5969 ], [ 1.4002, 43.5969 ], [ 1.4004, 43.5966 ], [ 1.4005, 43.5962 ], [ 1.4006, 43.5962 ], [ 1.4006, 43.5962 ], [ 1.4007, 43.5961 ], [ 1.4011, 43.5961 ], [ 1.4012, 43.5961 ], [ 1.4013, 43.5961 ], [ 1.4023, 43.5961 ], [ 1.4025, 43.5961 ], [ 1.403, 43.5965 ], [ 1.4038, 43.5965 ], [ 1.4039, 43.5959 ], [ 1.404, 43.5954 ], [ 1.4042, 43.5954 ], [ 1.4043, 43.5952 ], [ 1.4045, 43.5951 ], [ 1.4047, 43.5949 ], [ 1.4054, 43.5945 ], [ 1.4058, 43.5944 ], [ 1.4058, 43.5944 ], [ 1.4069, 43.5939 ], [ 1.4077, 43.5938 ], [ 1.4078, 43.5937 ], [ 1.4078, 43.5937 ], [ 1.4081, 43.5936 ], [ 1.4079, 43.5936 ], [ 1.407, 43.5934 ], [ 1.4043, 43.5929 ], [ 1.402, 43.5925 ], [ 1.4019, 43.5925 ], [ 1.4016, 43.5925 ], [ 1.4005, 43.5923 ] ] ], "type": "Polygon" }, "id": "20", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031012", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Cépière Beauregard" }, "type": "Feature" }, { "bbox": [ 4.3709, 43.825, 4.3853, 43.834 ], "geometry": { "coordinates": [ [ [ 4.3811, 43.8269 ], [ 4.3805, 43.8276 ], [ 4.3816, 43.8281 ], [ 4.3818, 43.8282 ], [ 4.3826, 43.8285 ], [ 4.3822, 43.8289 ], [ 4.3813, 43.8285 ], [ 4.3809, 43.829 ], [ 4.3805, 43.8294 ], [ 4.3802, 43.8298 ], [ 4.3798, 43.8297 ], [ 4.3795, 43.8295 ], [ 4.3793, 43.8293 ], [ 4.379, 43.8292 ], [ 4.3785, 43.8288 ], [ 4.3783, 43.8286 ], [ 4.378, 43.8288 ], [ 4.3776, 43.8287 ], [ 4.3772, 43.8285 ], [ 4.3771, 43.8285 ], [ 4.3771, 43.8284 ], [ 4.3773, 43.8283 ], [ 4.3776, 43.8279 ], [ 4.3768, 43.8273 ], [ 4.3771, 43.8271 ], [ 4.3768, 43.8267 ], [ 4.3766, 43.8268 ], [ 4.3765, 43.8266 ], [ 4.3764, 43.8267 ], [ 4.3763, 43.8267 ], [ 4.3761, 43.8265 ], [ 4.376, 43.8266 ], [ 4.3752, 43.827 ], [ 4.375, 43.8273 ], [ 4.3745, 43.8273 ], [ 4.3743, 43.8272 ], [ 4.3741, 43.827 ], [ 4.3735, 43.8266 ], [ 4.3745, 43.8257 ], [ 4.3734, 43.8251 ], [ 4.3733, 43.8251 ], [ 4.3732, 43.8251 ], [ 4.3731, 43.8253 ], [ 4.3722, 43.826 ], [ 4.3721, 43.826 ], [ 4.3719, 43.8261 ], [ 4.3717, 43.8264 ], [ 4.3717, 43.8265 ], [ 4.3718, 43.8266 ], [ 4.3718, 43.8267 ], [ 4.3717, 43.8268 ], [ 4.3717, 43.8268 ], [ 4.3717, 43.8268 ], [ 4.3719, 43.8269 ], [ 4.372, 43.827 ], [ 4.3719, 43.8271 ], [ 4.3719, 43.8272 ], [ 4.3718, 43.8273 ], [ 4.3716, 43.8274 ], [ 4.3716, 43.8274 ], [ 4.3713, 43.8275 ], [ 4.3711, 43.8276 ], [ 4.3709, 43.8277 ], [ 4.3712, 43.8279 ], [ 4.3715, 43.8277 ], [ 4.3717, 43.8278 ], [ 4.3719, 43.8278 ], [ 4.3721, 43.8276 ], [ 4.3724, 43.8278 ], [ 4.3732, 43.8283 ], [ 4.3742, 43.8277 ], [ 4.3743, 43.8276 ], [ 4.3743, 43.8275 ], [ 4.3744, 43.8275 ], [ 4.3748, 43.8275 ], [ 4.3752, 43.8275 ], [ 4.3756, 43.8277 ], [ 4.376, 43.828 ], [ 4.3787, 43.8296 ], [ 4.3793, 43.8299 ], [ 4.3801, 43.8304 ], [ 4.3796, 43.8309 ], [ 4.379, 43.8306 ], [ 4.3783, 43.8312 ], [ 4.3803, 43.8323 ], [ 4.3802, 43.8325 ], [ 4.3801, 43.8326 ], [ 4.3799, 43.833 ], [ 4.3798, 43.8331 ], [ 4.3809, 43.8337 ], [ 4.3815, 43.834 ], [ 4.3828, 43.8331 ], [ 4.3837, 43.8336 ], [ 4.384, 43.8332 ], [ 4.3834, 43.8328 ], [ 4.3823, 43.8321 ], [ 4.3825, 43.8319 ], [ 4.3818, 43.8316 ], [ 4.3812, 43.8313 ], [ 4.3811, 43.8312 ], [ 4.3817, 43.8308 ], [ 4.3819, 43.8306 ], [ 4.3825, 43.8299 ], [ 4.3827, 43.8297 ], [ 4.3819, 43.8294 ], [ 4.382, 43.8293 ], [ 4.382, 43.8293 ], [ 4.3826, 43.8291 ], [ 4.3831, 43.8288 ], [ 4.3832, 43.8287 ], [ 4.3836, 43.8284 ], [ 4.384, 43.8279 ], [ 4.3844, 43.8273 ], [ 4.3849, 43.8268 ], [ 4.3853, 43.8264 ], [ 4.385, 43.8264 ], [ 4.3848, 43.8264 ], [ 4.3845, 43.8263 ], [ 4.384, 43.8261 ], [ 4.3835, 43.8259 ], [ 4.3827, 43.8255 ], [ 4.3818, 43.8251 ], [ 4.3816, 43.825 ], [ 4.3814, 43.825 ], [ 4.3813, 43.8251 ], [ 4.3813, 43.8253 ], [ 4.3814, 43.8253 ], [ 4.3821, 43.8257 ], [ 4.382, 43.8258 ], [ 4.3816, 43.8264 ], [ 4.3811, 43.8269 ] ] ], "type": "Polygon" }, "id": "21", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030008", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Némausus-Jonquilles - Haute Magaille - Oliviers" }, "type": "Feature" }, { "bbox": [ 2.3249, 43.2066, 2.3357, 43.2114 ], "geometry": { "coordinates": [ [ [ 2.3351, 43.21 ], [ 2.335, 43.2098 ], [ 2.335, 43.2095 ], [ 2.3357, 43.2094 ], [ 2.3357, 43.2092 ], [ 2.3356, 43.2089 ], [ 2.3351, 43.2089 ], [ 2.335, 43.2089 ], [ 2.335, 43.2088 ], [ 2.335, 43.2087 ], [ 2.335, 43.2085 ], [ 2.335, 43.2081 ], [ 2.3349, 43.208 ], [ 2.3339, 43.2081 ], [ 2.3332, 43.2083 ], [ 2.3324, 43.2084 ], [ 2.3321, 43.2085 ], [ 2.3321, 43.2081 ], [ 2.3317, 43.2082 ], [ 2.3305, 43.2082 ], [ 2.3303, 43.2082 ], [ 2.3302, 43.2082 ], [ 2.3296, 43.2083 ], [ 2.3289, 43.2083 ], [ 2.3289, 43.2081 ], [ 2.3287, 43.208 ], [ 2.3285, 43.208 ], [ 2.3283, 43.2079 ], [ 2.3279, 43.2076 ], [ 2.3279, 43.2075 ], [ 2.3277, 43.2075 ], [ 2.3276, 43.2075 ], [ 2.3276, 43.2074 ], [ 2.3275, 43.2074 ], [ 2.3272, 43.2072 ], [ 2.327, 43.2071 ], [ 2.3269, 43.207 ], [ 2.3268, 43.2069 ], [ 2.3268, 43.2066 ], [ 2.3264, 43.2066 ], [ 2.3265, 43.2069 ], [ 2.3265, 43.207 ], [ 2.3265, 43.2071 ], [ 2.3265, 43.2073 ], [ 2.3258, 43.2073 ], [ 2.3249, 43.2073 ], [ 2.3251, 43.2074 ], [ 2.3252, 43.2076 ], [ 2.3255, 43.2078 ], [ 2.3258, 43.208 ], [ 2.3262, 43.2083 ], [ 2.3263, 43.2084 ], [ 2.3266, 43.2087 ], [ 2.3272, 43.2092 ], [ 2.3275, 43.2094 ], [ 2.3278, 43.2096 ], [ 2.3281, 43.2099 ], [ 2.3286, 43.2104 ], [ 2.3287, 43.2104 ], [ 2.3293, 43.2109 ], [ 2.3297, 43.2112 ], [ 2.3299, 43.2114 ], [ 2.3304, 43.2113 ], [ 2.3304, 43.2113 ], [ 2.3305, 43.2113 ], [ 2.3305, 43.211 ], [ 2.3304, 43.2095 ], [ 2.3305, 43.2095 ], [ 2.3313, 43.2094 ], [ 2.332, 43.2094 ], [ 2.3324, 43.2094 ], [ 2.3324, 43.21 ], [ 2.3333, 43.2099 ], [ 2.3333, 43.2101 ], [ 2.3338, 43.2101 ], [ 2.3351, 43.21 ] ] ], "type": "Polygon" }, "id": "22", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011003", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Le Viguier - Saint-Jacques" }, "type": "Feature" }, { "bbox": [ 1.3251, 43.6093, 1.3344, 43.6178 ], "geometry": { "coordinates": [ [ [ 1.3338, 43.6133 ], [ 1.3339, 43.6133 ], [ 1.3339, 43.6132 ], [ 1.3338, 43.6131 ], [ 1.3338, 43.613 ], [ 1.3339, 43.6129 ], [ 1.3344, 43.6128 ], [ 1.3342, 43.6123 ], [ 1.3341, 43.6122 ], [ 1.334, 43.6121 ], [ 1.3338, 43.6116 ], [ 1.3337, 43.6115 ], [ 1.3336, 43.6115 ], [ 1.3333, 43.6116 ], [ 1.3333, 43.6117 ], [ 1.3328, 43.6118 ], [ 1.3326, 43.6117 ], [ 1.3324, 43.6117 ], [ 1.3319, 43.6118 ], [ 1.3319, 43.6119 ], [ 1.332, 43.6122 ], [ 1.3319, 43.6123 ], [ 1.3319, 43.6123 ], [ 1.3317, 43.6123 ], [ 1.3315, 43.6123 ], [ 1.3316, 43.6124 ], [ 1.3311, 43.6125 ], [ 1.331, 43.6125 ], [ 1.331, 43.6124 ], [ 1.3309, 43.6123 ], [ 1.3308, 43.6121 ], [ 1.3306, 43.6119 ], [ 1.3293, 43.6109 ], [ 1.3274, 43.6094 ], [ 1.3273, 43.6093 ], [ 1.3272, 43.6093 ], [ 1.3271, 43.6093 ], [ 1.3269, 43.6094 ], [ 1.3267, 43.6094 ], [ 1.3265, 43.6093 ], [ 1.3263, 43.6093 ], [ 1.3262, 43.6093 ], [ 1.3257, 43.6096 ], [ 1.3256, 43.6097 ], [ 1.3256, 43.6099 ], [ 1.3253, 43.6099 ], [ 1.3251, 43.61 ], [ 1.3254, 43.6105 ], [ 1.3256, 43.6107 ], [ 1.3254, 43.6108 ], [ 1.3256, 43.6111 ], [ 1.3256, 43.6111 ], [ 1.3258, 43.611 ], [ 1.3262, 43.6108 ], [ 1.3264, 43.6111 ], [ 1.3265, 43.6114 ], [ 1.3266, 43.6119 ], [ 1.3266, 43.6121 ], [ 1.3267, 43.6122 ], [ 1.3268, 43.6122 ], [ 1.327, 43.6129 ], [ 1.3273, 43.6129 ], [ 1.3272, 43.613 ], [ 1.3275, 43.6132 ], [ 1.3274, 43.6133 ], [ 1.3273, 43.6134 ], [ 1.3268, 43.6136 ], [ 1.3269, 43.6138 ], [ 1.3271, 43.614 ], [ 1.3272, 43.6141 ], [ 1.3274, 43.6142 ], [ 1.328, 43.6143 ], [ 1.3283, 43.6144 ], [ 1.3281, 43.6145 ], [ 1.3279, 43.6146 ], [ 1.3282, 43.615 ], [ 1.3264, 43.6158 ], [ 1.3263, 43.6159 ], [ 1.3262, 43.616 ], [ 1.3266, 43.6163 ], [ 1.3272, 43.6167 ], [ 1.3273, 43.6169 ], [ 1.3274, 43.6172 ], [ 1.3274, 43.6174 ], [ 1.3272, 43.6176 ], [ 1.3272, 43.6178 ], [ 1.3281, 43.6177 ], [ 1.3288, 43.6175 ], [ 1.3294, 43.6173 ], [ 1.3293, 43.6172 ], [ 1.3292, 43.6169 ], [ 1.3291, 43.6165 ], [ 1.3288, 43.6154 ], [ 1.3287, 43.6151 ], [ 1.3287, 43.615 ], [ 1.3285, 43.6149 ], [ 1.3288, 43.6148 ], [ 1.3309, 43.6145 ], [ 1.3315, 43.6144 ], [ 1.3314, 43.6143 ], [ 1.3312, 43.6139 ], [ 1.3311, 43.6134 ], [ 1.3314, 43.6132 ], [ 1.3316, 43.6132 ], [ 1.3318, 43.6129 ], [ 1.3319, 43.6128 ], [ 1.3321, 43.6131 ], [ 1.3323, 43.6137 ], [ 1.3323, 43.6137 ], [ 1.3327, 43.6136 ], [ 1.333, 43.6136 ], [ 1.3333, 43.6135 ], [ 1.3338, 43.6133 ] ] ], "type": "Polygon" }, "id": "23", "properties": { "code_commune": "31149", "code_departement": "31", "code_qp": "QP031005", "commune_qp": "Colomiers", "nom_commune": "Colomiers", "nom_qp": "Val D'Aran - Poitou - Pyrénées" }, "type": "Feature" }, { "bbox": [ 1.0964, 44.098, 1.1024, 44.1054 ], "geometry": { "coordinates": [ [ [ 1.1, 44.1052 ], [ 1.0996, 44.1045 ], [ 1.1001, 44.1044 ], [ 1.1, 44.1041 ], [ 1.1, 44.1041 ], [ 1.0999, 44.104 ], [ 1.1004, 44.104 ], [ 1.1016, 44.1039 ], [ 1.1017, 44.1032 ], [ 1.1017, 44.103 ], [ 1.1021, 44.1007 ], [ 1.1022, 44.1 ], [ 1.1022, 44.1 ], [ 1.1024, 44.0988 ], [ 1.1019, 44.0987 ], [ 1.1017, 44.0989 ], [ 1.1014, 44.0991 ], [ 1.1017, 44.0993 ], [ 1.1013, 44.0997 ], [ 1.1006, 44.0991 ], [ 1.1006, 44.099 ], [ 1.101, 44.0988 ], [ 1.1, 44.098 ], [ 1.0997, 44.0981 ], [ 1.0996, 44.0981 ], [ 1.0995, 44.0982 ], [ 1.0995, 44.0982 ], [ 1.0995, 44.0983 ], [ 1.1015, 44.0999 ], [ 1.1016, 44.1001 ], [ 1.1011, 44.1001 ], [ 1.1002, 44.1004 ], [ 1.0999, 44.1004 ], [ 1.0998, 44.1005 ], [ 1.0994, 44.1006 ], [ 1.0994, 44.1008 ], [ 1.0996, 44.1012 ], [ 1.099, 44.1013 ], [ 1.0986, 44.1014 ], [ 1.0984, 44.1014 ], [ 1.0983, 44.1012 ], [ 1.0983, 44.1011 ], [ 1.0978, 44.1013 ], [ 1.0977, 44.1013 ], [ 1.0967, 44.1017 ], [ 1.0969, 44.102 ], [ 1.098, 44.1018 ], [ 1.0984, 44.1027 ], [ 1.0979, 44.1028 ], [ 1.0978, 44.1029 ], [ 1.0975, 44.1036 ], [ 1.0974, 44.1036 ], [ 1.0974, 44.103 ], [ 1.0974, 44.1029 ], [ 1.0966, 44.1031 ], [ 1.0964, 44.1031 ], [ 1.0965, 44.1045 ], [ 1.0975, 44.1043 ], [ 1.0979, 44.1042 ], [ 1.0982, 44.1042 ], [ 1.0986, 44.1042 ], [ 1.0986, 44.1042 ], [ 1.0986, 44.1044 ], [ 1.0987, 44.1045 ], [ 1.0988, 44.1045 ], [ 1.0989, 44.1046 ], [ 1.099, 44.1047 ], [ 1.0992, 44.1047 ], [ 1.0993, 44.1048 ], [ 1.0994, 44.105 ], [ 1.0995, 44.1052 ], [ 1.0996, 44.1054 ], [ 1.1, 44.1052 ] ] ], "type": "Polygon" }, "id": "24", "properties": { "code_commune": "82112", "code_departement": "82", "code_qp": "QP082004", "commune_qp": "Moissac", "nom_commune": "Moissac", "nom_qp": "Sarlac" }, "type": "Feature" }, { "bbox": [ 1.4363, 43.5742, 1.4452, 43.584 ], "geometry": { "coordinates": [ [ [ 1.4389, 43.5821 ], [ 1.4392, 43.5824 ], [ 1.4394, 43.5832 ], [ 1.4396, 43.584 ], [ 1.4415, 43.5839 ], [ 1.4437, 43.5838 ], [ 1.4441, 43.5839 ], [ 1.4444, 43.5839 ], [ 1.4444, 43.5833 ], [ 1.4445, 43.5833 ], [ 1.4445, 43.5832 ], [ 1.4445, 43.5832 ], [ 1.4445, 43.5831 ], [ 1.4445, 43.5829 ], [ 1.4444, 43.5829 ], [ 1.4444, 43.5828 ], [ 1.4445, 43.5828 ], [ 1.4444, 43.5827 ], [ 1.4444, 43.5826 ], [ 1.4443, 43.5826 ], [ 1.4443, 43.5824 ], [ 1.4446, 43.5825 ], [ 1.4446, 43.5824 ], [ 1.4443, 43.5824 ], [ 1.4443, 43.5822 ], [ 1.4444, 43.5822 ], [ 1.4444, 43.5821 ], [ 1.4445, 43.5821 ], [ 1.4446, 43.5819 ], [ 1.4446, 43.5816 ], [ 1.4447, 43.5814 ], [ 1.4448, 43.5813 ], [ 1.4443, 43.5812 ], [ 1.4448, 43.5807 ], [ 1.4452, 43.5803 ], [ 1.4449, 43.5803 ], [ 1.4446, 43.5802 ], [ 1.4445, 43.5803 ], [ 1.4443, 43.5803 ], [ 1.4443, 43.5806 ], [ 1.444, 43.5806 ], [ 1.4436, 43.5806 ], [ 1.4435, 43.58 ], [ 1.4434, 43.5796 ], [ 1.4432, 43.5787 ], [ 1.4432, 43.5784 ], [ 1.4429, 43.578 ], [ 1.4431, 43.5778 ], [ 1.4435, 43.5777 ], [ 1.4441, 43.5771 ], [ 1.4446, 43.5765 ], [ 1.444, 43.576 ], [ 1.4439, 43.576 ], [ 1.443, 43.5761 ], [ 1.443, 43.5761 ], [ 1.4429, 43.5763 ], [ 1.4428, 43.5774 ], [ 1.4426, 43.5774 ], [ 1.4408, 43.5777 ], [ 1.4408, 43.5772 ], [ 1.4418, 43.5769 ], [ 1.4416, 43.5766 ], [ 1.4415, 43.5766 ], [ 1.4414, 43.5764 ], [ 1.4411, 43.5762 ], [ 1.4413, 43.5761 ], [ 1.4407, 43.5756 ], [ 1.4406, 43.5754 ], [ 1.4402, 43.5751 ], [ 1.4387, 43.5742 ], [ 1.438, 43.5744 ], [ 1.4374, 43.5746 ], [ 1.4377, 43.575 ], [ 1.4363, 43.5755 ], [ 1.4363, 43.5771 ], [ 1.4366, 43.5785 ], [ 1.4369, 43.5792 ], [ 1.4376, 43.5802 ], [ 1.4385, 43.5813 ], [ 1.4389, 43.5821 ] ] ], "type": "Polygon" }, "id": "25", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031010", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Empalot" }, "type": "Feature" }, { "bbox": [ 2.8651, 42.6886, 2.8724, 42.6985 ], "geometry": { "coordinates": [ [ [ 2.8724, 42.6973 ], [ 2.8723, 42.6972 ], [ 2.8721, 42.6972 ], [ 2.8718, 42.6972 ], [ 2.8716, 42.6972 ], [ 2.8714, 42.6972 ], [ 2.8712, 42.6971 ], [ 2.871, 42.6971 ], [ 2.871, 42.6971 ], [ 2.8709, 42.697 ], [ 2.8709, 42.6967 ], [ 2.8709, 42.6966 ], [ 2.8709, 42.6964 ], [ 2.8709, 42.6962 ], [ 2.8709, 42.696 ], [ 2.8709, 42.696 ], [ 2.8705, 42.696 ], [ 2.8705, 42.6959 ], [ 2.8704, 42.6958 ], [ 2.8704, 42.6956 ], [ 2.8704, 42.6955 ], [ 2.8703, 42.6953 ], [ 2.8703, 42.6952 ], [ 2.8702, 42.6949 ], [ 2.8703, 42.6948 ], [ 2.8703, 42.6946 ], [ 2.8703, 42.6945 ], [ 2.8704, 42.6945 ], [ 2.8705, 42.6944 ], [ 2.8706, 42.6944 ], [ 2.8707, 42.6944 ], [ 2.8707, 42.6943 ], [ 2.8708, 42.6943 ], [ 2.8709, 42.6942 ], [ 2.8709, 42.6942 ], [ 2.8709, 42.6941 ], [ 2.8708, 42.694 ], [ 2.8708, 42.694 ], [ 2.8707, 42.6938 ], [ 2.8705, 42.6935 ], [ 2.8704, 42.6933 ], [ 2.8703, 42.6932 ], [ 2.8703, 42.6932 ], [ 2.8703, 42.6932 ], [ 2.8702, 42.693 ], [ 2.8703, 42.6926 ], [ 2.8702, 42.6924 ], [ 2.8702, 42.692 ], [ 2.8703, 42.6921 ], [ 2.8706, 42.6918 ], [ 2.8705, 42.6918 ], [ 2.8697, 42.6914 ], [ 2.8693, 42.6912 ], [ 2.8695, 42.6908 ], [ 2.8698, 42.6904 ], [ 2.8702, 42.6901 ], [ 2.8702, 42.69 ], [ 2.8701, 42.69 ], [ 2.8701, 42.6899 ], [ 2.8698, 42.6897 ], [ 2.8693, 42.6894 ], [ 2.8681, 42.6889 ], [ 2.8665, 42.6886 ], [ 2.8659, 42.6892 ], [ 2.8657, 42.6891 ], [ 2.8651, 42.6897 ], [ 2.8661, 42.6902 ], [ 2.8663, 42.6902 ], [ 2.8665, 42.69 ], [ 2.8673, 42.6904 ], [ 2.8671, 42.6906 ], [ 2.867, 42.6907 ], [ 2.8667, 42.6908 ], [ 2.8664, 42.6908 ], [ 2.8669, 42.6917 ], [ 2.8668, 42.6917 ], [ 2.867, 42.6919 ], [ 2.867, 42.692 ], [ 2.8675, 42.692 ], [ 2.8676, 42.6922 ], [ 2.8677, 42.6923 ], [ 2.8679, 42.693 ], [ 2.8679, 42.693 ], [ 2.868, 42.693 ], [ 2.8681, 42.693 ], [ 2.8683, 42.6933 ], [ 2.8685, 42.6938 ], [ 2.8685, 42.6939 ], [ 2.8687, 42.6943 ], [ 2.8687, 42.6944 ], [ 2.8688, 42.6944 ], [ 2.8688, 42.6945 ], [ 2.869, 42.6944 ], [ 2.8692, 42.6949 ], [ 2.8693, 42.6951 ], [ 2.869, 42.6952 ], [ 2.8691, 42.6955 ], [ 2.8691, 42.6955 ], [ 2.8691, 42.6958 ], [ 2.869, 42.6958 ], [ 2.869, 42.696 ], [ 2.869, 42.696 ], [ 2.8684, 42.6961 ], [ 2.8685, 42.6963 ], [ 2.8685, 42.6963 ], [ 2.8685, 42.6967 ], [ 2.8685, 42.697 ], [ 2.8686, 42.6972 ], [ 2.8686, 42.6972 ], [ 2.8687, 42.6973 ], [ 2.8687, 42.6974 ], [ 2.8691, 42.6975 ], [ 2.8693, 42.6976 ], [ 2.8696, 42.6976 ], [ 2.8704, 42.6978 ], [ 2.8704, 42.6978 ], [ 2.8702, 42.6983 ], [ 2.8708, 42.6984 ], [ 2.8714, 42.6984 ], [ 2.8717, 42.6985 ], [ 2.8719, 42.6985 ], [ 2.872, 42.6982 ], [ 2.8723, 42.698 ], [ 2.8724, 42.6973 ] ] ], "type": "Polygon" }, "id": "26", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066002", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Saint Assiscle" }, "type": "Feature" }, { "bbox": [ 1.4277, 43.6221, 1.4323, 43.6243 ], "geometry": { "coordinates": [ [ [ 1.4277, 43.6222 ], [ 1.4277, 43.6225 ], [ 1.4278, 43.6233 ], [ 1.4277, 43.6235 ], [ 1.4277, 43.6236 ], [ 1.4277, 43.6237 ], [ 1.4277, 43.6238 ], [ 1.4282, 43.624 ], [ 1.4285, 43.6237 ], [ 1.4294, 43.624 ], [ 1.4295, 43.6235 ], [ 1.4305, 43.6238 ], [ 1.4305, 43.624 ], [ 1.4304, 43.6242 ], [ 1.4309, 43.6243 ], [ 1.431, 43.6242 ], [ 1.4311, 43.624 ], [ 1.4318, 43.6241 ], [ 1.432, 43.6237 ], [ 1.4322, 43.6233 ], [ 1.4323, 43.6232 ], [ 1.431, 43.6229 ], [ 1.4311, 43.6228 ], [ 1.4313, 43.6224 ], [ 1.4312, 43.6223 ], [ 1.4307, 43.6221 ], [ 1.4304, 43.6223 ], [ 1.4303, 43.6223 ], [ 1.4301, 43.6223 ], [ 1.43, 43.6223 ], [ 1.4298, 43.6223 ], [ 1.4298, 43.6223 ], [ 1.4288, 43.6223 ], [ 1.4277, 43.6222 ] ] ], "type": "Polygon" }, "id": "27", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031009", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Bourbaki" }, "type": "Feature" }, { "bbox": [ 2.8755, 42.7021, 2.8828, 42.7073 ], "geometry": { "coordinates": [ [ [ 2.8763, 42.7073 ], [ 2.8766, 42.7073 ], [ 2.8774, 42.7072 ], [ 2.8781, 42.7068 ], [ 2.8783, 42.7067 ], [ 2.8788, 42.7065 ], [ 2.879, 42.7064 ], [ 2.8803, 42.7064 ], [ 2.8804, 42.7064 ], [ 2.8803, 42.7065 ], [ 2.8803, 42.7066 ], [ 2.8814, 42.707 ], [ 2.8815, 42.7069 ], [ 2.8815, 42.7069 ], [ 2.8816, 42.7068 ], [ 2.8817, 42.7067 ], [ 2.8818, 42.7066 ], [ 2.8819, 42.7065 ], [ 2.882, 42.7064 ], [ 2.882, 42.7062 ], [ 2.8821, 42.7062 ], [ 2.8822, 42.7062 ], [ 2.8824, 42.7055 ], [ 2.8824, 42.7053 ], [ 2.8828, 42.7053 ], [ 2.8828, 42.7052 ], [ 2.8828, 42.7051 ], [ 2.8827, 42.7051 ], [ 2.8826, 42.705 ], [ 2.8825, 42.7049 ], [ 2.8825, 42.7044 ], [ 2.8823, 42.7043 ], [ 2.8822, 42.7043 ], [ 2.8821, 42.7043 ], [ 2.8821, 42.7042 ], [ 2.8819, 42.7042 ], [ 2.8816, 42.7041 ], [ 2.8815, 42.7041 ], [ 2.8813, 42.7044 ], [ 2.8812, 42.7044 ], [ 2.881, 42.7044 ], [ 2.8804, 42.7044 ], [ 2.8803, 42.7045 ], [ 2.8802, 42.7045 ], [ 2.8802, 42.7044 ], [ 2.8802, 42.7042 ], [ 2.8802, 42.7039 ], [ 2.8802, 42.7029 ], [ 2.8802, 42.7026 ], [ 2.8803, 42.7023 ], [ 2.8803, 42.7021 ], [ 2.88, 42.7021 ], [ 2.8796, 42.7022 ], [ 2.8795, 42.7022 ], [ 2.8794, 42.7023 ], [ 2.8792, 42.7024 ], [ 2.8789, 42.7026 ], [ 2.8786, 42.7027 ], [ 2.8784, 42.7028 ], [ 2.8783, 42.703 ], [ 2.8783, 42.7031 ], [ 2.8781, 42.7041 ], [ 2.8781, 42.7043 ], [ 2.8781, 42.7044 ], [ 2.8781, 42.7046 ], [ 2.8781, 42.7048 ], [ 2.878, 42.7049 ], [ 2.878, 42.7051 ], [ 2.8779, 42.7052 ], [ 2.8778, 42.7054 ], [ 2.8777, 42.7055 ], [ 2.8776, 42.7055 ], [ 2.8775, 42.7055 ], [ 2.8774, 42.7055 ], [ 2.8767, 42.7053 ], [ 2.8764, 42.7053 ], [ 2.8761, 42.7054 ], [ 2.8759, 42.7056 ], [ 2.8758, 42.7056 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7057 ], [ 2.8758, 42.7058 ], [ 2.8756, 42.7059 ], [ 2.8755, 42.7062 ], [ 2.8755, 42.7063 ], [ 2.8756, 42.7063 ], [ 2.876, 42.7069 ], [ 2.8763, 42.7073 ], [ 2.8763, 42.7073 ], [ 2.8763, 42.7073 ] ] ], "type": "Polygon" }, "id": "28", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066004", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Bas-Vernet Ancien Zus" }, "type": "Feature" }, { "bbox": [ 3.1999, 43.3319, 3.2299, 43.3509 ], "geometry": { "coordinates": [ [ [ 3.2251, 43.3387 ], [ 3.2251, 43.3386 ], [ 3.2253, 43.3386 ], [ 3.2257, 43.3386 ], [ 3.2259, 43.3385 ], [ 3.2261, 43.3384 ], [ 3.2264, 43.3383 ], [ 3.2264, 43.3382 ], [ 3.2262, 43.3378 ], [ 3.2262, 43.3377 ], [ 3.2262, 43.3377 ], [ 3.2262, 43.3377 ], [ 3.2265, 43.3375 ], [ 3.2265, 43.3375 ], [ 3.2264, 43.3373 ], [ 3.2272, 43.3368 ], [ 3.2273, 43.3368 ], [ 3.2279, 43.3364 ], [ 3.2282, 43.3366 ], [ 3.2287, 43.337 ], [ 3.2294, 43.3365 ], [ 3.2296, 43.3364 ], [ 3.2298, 43.3362 ], [ 3.2299, 43.3361 ], [ 3.2299, 43.3361 ], [ 3.2298, 43.3358 ], [ 3.2295, 43.3352 ], [ 3.2294, 43.3349 ], [ 3.2288, 43.3345 ], [ 3.2272, 43.3355 ], [ 3.227, 43.3355 ], [ 3.2269, 43.3356 ], [ 3.2265, 43.3358 ], [ 3.2264, 43.3359 ], [ 3.2262, 43.336 ], [ 3.2257, 43.3363 ], [ 3.2254, 43.3365 ], [ 3.2249, 43.3368 ], [ 3.2247, 43.3368 ], [ 3.223, 43.3378 ], [ 3.2228, 43.3379 ], [ 3.2219, 43.3384 ], [ 3.2214, 43.3387 ], [ 3.2212, 43.3389 ], [ 3.2206, 43.3392 ], [ 3.2203, 43.3394 ], [ 3.2203, 43.3393 ], [ 3.2202, 43.3391 ], [ 3.2202, 43.3391 ], [ 3.2197, 43.3391 ], [ 3.2196, 43.3391 ], [ 3.2195, 43.3392 ], [ 3.2195, 43.3392 ], [ 3.2195, 43.3392 ], [ 3.2189, 43.339 ], [ 3.2184, 43.3389 ], [ 3.2184, 43.3388 ], [ 3.2188, 43.3384 ], [ 3.2191, 43.338 ], [ 3.2191, 43.338 ], [ 3.2191, 43.3379 ], [ 3.2191, 43.3376 ], [ 3.219, 43.3374 ], [ 3.219, 43.3371 ], [ 3.2189, 43.337 ], [ 3.2189, 43.3352 ], [ 3.2219, 43.3348 ], [ 3.2221, 43.3346 ], [ 3.2222, 43.3344 ], [ 3.2228, 43.3339 ], [ 3.2235, 43.3334 ], [ 3.224, 43.3331 ], [ 3.2239, 43.3331 ], [ 3.2226, 43.3332 ], [ 3.2215, 43.3332 ], [ 3.2191, 43.3327 ], [ 3.2177, 43.3322 ], [ 3.2161, 43.3329 ], [ 3.2158, 43.333 ], [ 3.2153, 43.3335 ], [ 3.2134, 43.3351 ], [ 3.2128, 43.3355 ], [ 3.2117, 43.3349 ], [ 3.2116, 43.3348 ], [ 3.2114, 43.3347 ], [ 3.2113, 43.3346 ], [ 3.211, 43.3345 ], [ 3.2107, 43.3344 ], [ 3.2106, 43.3344 ], [ 3.2105, 43.3345 ], [ 3.2104, 43.3345 ], [ 3.2101, 43.3347 ], [ 3.2101, 43.3346 ], [ 3.2099, 43.3345 ], [ 3.2095, 43.3342 ], [ 3.2092, 43.3345 ], [ 3.2088, 43.3347 ], [ 3.2087, 43.3348 ], [ 3.2081, 43.3349 ], [ 3.2075, 43.3351 ], [ 3.2074, 43.335 ], [ 3.207, 43.3347 ], [ 3.2068, 43.3345 ], [ 3.2064, 43.3342 ], [ 3.2055, 43.3335 ], [ 3.2051, 43.3332 ], [ 3.2047, 43.333 ], [ 3.2039, 43.3325 ], [ 3.2034, 43.3322 ], [ 3.2029, 43.332 ], [ 3.2027, 43.3319 ], [ 3.2026, 43.332 ], [ 3.2027, 43.3321 ], [ 3.2027, 43.3321 ], [ 3.203, 43.3325 ], [ 3.2037, 43.3333 ], [ 3.2036, 43.3333 ], [ 3.2014, 43.3342 ], [ 3.2014, 43.3342 ], [ 3.2012, 43.3343 ], [ 3.2012, 43.3343 ], [ 3.2012, 43.3344 ], [ 3.2011, 43.3345 ], [ 3.2009, 43.3347 ], [ 3.2008, 43.3348 ], [ 3.2004, 43.3351 ], [ 3.2002, 43.3354 ], [ 3.1999, 43.3356 ], [ 3.2007, 43.336 ], [ 3.2008, 43.336 ], [ 3.201, 43.3361 ], [ 3.2023, 43.3367 ], [ 3.2025, 43.3368 ], [ 3.2023, 43.337 ], [ 3.2022, 43.3371 ], [ 3.2019, 43.3374 ], [ 3.2019, 43.3375 ], [ 3.2019, 43.3376 ], [ 3.2018, 43.3376 ], [ 3.2019, 43.3377 ], [ 3.2019, 43.3377 ], [ 3.2019, 43.3377 ], [ 3.202, 43.3378 ], [ 3.2023, 43.3378 ], [ 3.2031, 43.3378 ], [ 3.2034, 43.338 ], [ 3.2035, 43.3382 ], [ 3.2037, 43.3385 ], [ 3.2043, 43.3384 ], [ 3.2044, 43.3384 ], [ 3.2046, 43.3386 ], [ 3.2047, 43.3387 ], [ 3.2052, 43.339 ], [ 3.2053, 43.3391 ], [ 3.2053, 43.3391 ], [ 3.2056, 43.3388 ], [ 3.2058, 43.3386 ], [ 3.2059, 43.3386 ], [ 3.2061, 43.3386 ], [ 3.2063, 43.3387 ], [ 3.2072, 43.3389 ], [ 3.2074, 43.339 ], [ 3.2088, 43.3395 ], [ 3.2088, 43.3396 ], [ 3.2087, 43.3397 ], [ 3.2086, 43.3399 ], [ 3.2086, 43.34 ], [ 3.2085, 43.3401 ], [ 3.2084, 43.3403 ], [ 3.2083, 43.3405 ], [ 3.2081, 43.3408 ], [ 3.208, 43.3411 ], [ 3.2079, 43.3419 ], [ 3.2078, 43.3426 ], [ 3.2082, 43.3426 ], [ 3.2081, 43.343 ], [ 3.2081, 43.3431 ], [ 3.2081, 43.3432 ], [ 3.2082, 43.3434 ], [ 3.2084, 43.3437 ], [ 3.2092, 43.3436 ], [ 3.2092, 43.3438 ], [ 3.2092, 43.344 ], [ 3.2093, 43.3443 ], [ 3.2094, 43.3443 ], [ 3.2096, 43.3443 ], [ 3.2096, 43.3445 ], [ 3.2095, 43.3446 ], [ 3.2096, 43.3447 ], [ 3.2096, 43.3448 ], [ 3.2092, 43.345 ], [ 3.2093, 43.3451 ], [ 3.2096, 43.3454 ], [ 3.2091, 43.3458 ], [ 3.2086, 43.3462 ], [ 3.2083, 43.3464 ], [ 3.2083, 43.3464 ], [ 3.2083, 43.3465 ], [ 3.2083, 43.3466 ], [ 3.2083, 43.3467 ], [ 3.2082, 43.3468 ], [ 3.208, 43.347 ], [ 3.2079, 43.347 ], [ 3.2078, 43.3471 ], [ 3.2082, 43.3475 ], [ 3.2084, 43.3477 ], [ 3.2085, 43.3478 ], [ 3.2086, 43.3479 ], [ 3.2081, 43.348 ], [ 3.208, 43.348 ], [ 3.2077, 43.3481 ], [ 3.2078, 43.3484 ], [ 3.2079, 43.3488 ], [ 3.2079, 43.3491 ], [ 3.2079, 43.3491 ], [ 3.2078, 43.3492 ], [ 3.2077, 43.3492 ], [ 3.2076, 43.3492 ], [ 3.2076, 43.3496 ], [ 3.2076, 43.3497 ], [ 3.2076, 43.35 ], [ 3.2076, 43.3501 ], [ 3.208, 43.35 ], [ 3.2083, 43.35 ], [ 3.2083, 43.3503 ], [ 3.2084, 43.3504 ], [ 3.2084, 43.3506 ], [ 3.2084, 43.3508 ], [ 3.2087, 43.3507 ], [ 3.209, 43.3506 ], [ 3.2093, 43.3506 ], [ 3.2094, 43.3506 ], [ 3.2095, 43.3505 ], [ 3.2096, 43.3505 ], [ 3.2096, 43.3503 ], [ 3.2096, 43.3502 ], [ 3.2096, 43.35 ], [ 3.2096, 43.3498 ], [ 3.2096, 43.3497 ], [ 3.2096, 43.3497 ], [ 3.2096, 43.3494 ], [ 3.2096, 43.3493 ], [ 3.2095, 43.3493 ], [ 3.2093, 43.3493 ], [ 3.209, 43.3492 ], [ 3.209, 43.3489 ], [ 3.2089, 43.3485 ], [ 3.2092, 43.3485 ], [ 3.2094, 43.3485 ], [ 3.2096, 43.3484 ], [ 3.2096, 43.3484 ], [ 3.2096, 43.3483 ], [ 3.2096, 43.3482 ], [ 3.2096, 43.3481 ], [ 3.2096, 43.3479 ], [ 3.2095, 43.3477 ], [ 3.2095, 43.3476 ], [ 3.2098, 43.3472 ], [ 3.2098, 43.3471 ], [ 3.2105, 43.3468 ], [ 3.2107, 43.3467 ], [ 3.2107, 43.3467 ], [ 3.2111, 43.3471 ], [ 3.2113, 43.347 ], [ 3.2115, 43.347 ], [ 3.2115, 43.3471 ], [ 3.2117, 43.347 ], [ 3.2117, 43.347 ], [ 3.2118, 43.3471 ], [ 3.2119, 43.347 ], [ 3.212, 43.3469 ], [ 3.212, 43.3469 ], [ 3.2121, 43.347 ], [ 3.2123, 43.347 ], [ 3.2126, 43.3472 ], [ 3.2127, 43.3472 ], [ 3.2128, 43.3473 ], [ 3.2129, 43.3472 ], [ 3.2133, 43.3471 ], [ 3.2133, 43.3471 ], [ 3.2133, 43.3473 ], [ 3.2134, 43.3472 ], [ 3.2135, 43.3473 ], [ 3.2135, 43.3474 ], [ 3.2136, 43.3474 ], [ 3.2138, 43.3474 ], [ 3.2137, 43.3475 ], [ 3.2139, 43.3475 ], [ 3.214, 43.3476 ], [ 3.214, 43.3476 ], [ 3.214, 43.3477 ], [ 3.2141, 43.3478 ], [ 3.2142, 43.3484 ], [ 3.2148, 43.3483 ], [ 3.2149, 43.3486 ], [ 3.2149, 43.3486 ], [ 3.2149, 43.349 ], [ 3.2151, 43.3489 ], [ 3.2151, 43.349 ], [ 3.2152, 43.349 ], [ 3.2153, 43.349 ], [ 3.2162, 43.3488 ], [ 3.2163, 43.3487 ], [ 3.2163, 43.3488 ], [ 3.2165, 43.3491 ], [ 3.2166, 43.3493 ], [ 3.2167, 43.3495 ], [ 3.2168, 43.3496 ], [ 3.217, 43.3499 ], [ 3.2171, 43.3501 ], [ 3.2173, 43.3502 ], [ 3.2173, 43.3503 ], [ 3.2174, 43.3503 ], [ 3.2174, 43.3504 ], [ 3.2176, 43.3505 ], [ 3.2177, 43.3505 ], [ 3.2185, 43.3507 ], [ 3.219, 43.3509 ], [ 3.2191, 43.3508 ], [ 3.219, 43.3506 ], [ 3.219, 43.3506 ], [ 3.2187, 43.3503 ], [ 3.2189, 43.3502 ], [ 3.2193, 43.3499 ], [ 3.2197, 43.3496 ], [ 3.2198, 43.3495 ], [ 3.22, 43.3493 ], [ 3.2203, 43.3491 ], [ 3.2206, 43.3489 ], [ 3.2207, 43.3489 ], [ 3.2206, 43.3488 ], [ 3.2209, 43.3485 ], [ 3.2212, 43.3483 ], [ 3.2213, 43.3482 ], [ 3.2218, 43.3484 ], [ 3.2218, 43.3485 ], [ 3.222, 43.3485 ], [ 3.2221, 43.3485 ], [ 3.2223, 43.3487 ], [ 3.2227, 43.3489 ], [ 3.2228, 43.3489 ], [ 3.2228, 43.3489 ], [ 3.2229, 43.3488 ], [ 3.2232, 43.3487 ], [ 3.2232, 43.3486 ], [ 3.2231, 43.3486 ], [ 3.223, 43.3485 ], [ 3.2229, 43.3484 ], [ 3.2219, 43.3479 ], [ 3.2215, 43.3477 ], [ 3.221, 43.3475 ], [ 3.2205, 43.3472 ], [ 3.2203, 43.3471 ], [ 3.22, 43.3469 ], [ 3.2197, 43.3468 ], [ 3.2195, 43.3467 ], [ 3.2194, 43.3466 ], [ 3.2191, 43.3465 ], [ 3.219, 43.3464 ], [ 3.219, 43.3463 ], [ 3.2192, 43.346 ], [ 3.2194, 43.3456 ], [ 3.2199, 43.3448 ], [ 3.2201, 43.3444 ], [ 3.2204, 43.344 ], [ 3.2207, 43.3435 ], [ 3.2212, 43.3425 ], [ 3.2213, 43.3424 ], [ 3.2215, 43.3421 ], [ 3.2218, 43.3416 ], [ 3.2219, 43.3414 ], [ 3.2221, 43.3414 ], [ 3.2225, 43.3415 ], [ 3.2225, 43.3415 ], [ 3.2231, 43.3417 ], [ 3.2236, 43.3418 ], [ 3.2237, 43.3418 ], [ 3.2238, 43.3417 ], [ 3.2248, 43.3419 ], [ 3.2248, 43.3418 ], [ 3.2244, 43.3415 ], [ 3.2241, 43.3413 ], [ 3.2243, 43.341 ], [ 3.2244, 43.3407 ], [ 3.224, 43.3404 ], [ 3.2246, 43.3399 ], [ 3.2245, 43.3399 ], [ 3.2242, 43.3397 ], [ 3.2241, 43.3396 ], [ 3.224, 43.3395 ], [ 3.2246, 43.3392 ], [ 3.2247, 43.3391 ], [ 3.2247, 43.339 ], [ 3.225, 43.3388 ], [ 3.2251, 43.3387 ] ] ], "type": "Polygon" }, "id": "29", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034001", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.8106, 43.6198, 3.8251, 43.6441 ], "geometry": { "coordinates": [ [ [ 3.8116, 43.6234 ], [ 3.8115, 43.6235 ], [ 3.8114, 43.6237 ], [ 3.8114, 43.6238 ], [ 3.8114, 43.6239 ], [ 3.8121, 43.6247 ], [ 3.8129, 43.6257 ], [ 3.8137, 43.6265 ], [ 3.8138, 43.6266 ], [ 3.8139, 43.6268 ], [ 3.814, 43.6268 ], [ 3.8143, 43.6269 ], [ 3.8156, 43.627 ], [ 3.8162, 43.627 ], [ 3.8168, 43.627 ], [ 3.8175, 43.627 ], [ 3.8176, 43.6283 ], [ 3.8176, 43.629 ], [ 3.8176, 43.6291 ], [ 3.8177, 43.6292 ], [ 3.8185, 43.6301 ], [ 3.8161, 43.6303 ], [ 3.8163, 43.6307 ], [ 3.8163, 43.6308 ], [ 3.8163, 43.6308 ], [ 3.8164, 43.631 ], [ 3.8164, 43.6313 ], [ 3.8163, 43.6314 ], [ 3.8162, 43.6316 ], [ 3.8159, 43.6318 ], [ 3.8152, 43.6323 ], [ 3.8148, 43.6326 ], [ 3.8144, 43.6329 ], [ 3.8141, 43.633 ], [ 3.8138, 43.6334 ], [ 3.8138, 43.6335 ], [ 3.8136, 43.6337 ], [ 3.8136, 43.6338 ], [ 3.8136, 43.6338 ], [ 3.8134, 43.634 ], [ 3.8131, 43.6342 ], [ 3.813, 43.6343 ], [ 3.8129, 43.6344 ], [ 3.8129, 43.635 ], [ 3.8128, 43.635 ], [ 3.8124, 43.6351 ], [ 3.8122, 43.6351 ], [ 3.8121, 43.6352 ], [ 3.812, 43.6352 ], [ 3.8122, 43.6352 ], [ 3.8124, 43.6352 ], [ 3.8127, 43.6352 ], [ 3.8131, 43.6352 ], [ 3.8133, 43.6352 ], [ 3.8134, 43.6353 ], [ 3.8136, 43.6354 ], [ 3.8137, 43.6355 ], [ 3.8138, 43.6356 ], [ 3.8138, 43.6358 ], [ 3.8139, 43.6364 ], [ 3.8139, 43.6364 ], [ 3.814, 43.6365 ], [ 3.8141, 43.6367 ], [ 3.8143, 43.6373 ], [ 3.8148, 43.6378 ], [ 3.8149, 43.6381 ], [ 3.8145, 43.6384 ], [ 3.8144, 43.6385 ], [ 3.8141, 43.6385 ], [ 3.8138, 43.6386 ], [ 3.8137, 43.6387 ], [ 3.8136, 43.6388 ], [ 3.8135, 43.6389 ], [ 3.8135, 43.639 ], [ 3.8117, 43.639 ], [ 3.8117, 43.6393 ], [ 3.8117, 43.6394 ], [ 3.8115, 43.6394 ], [ 3.8115, 43.6393 ], [ 3.8106, 43.6393 ], [ 3.8106, 43.6396 ], [ 3.8106, 43.6398 ], [ 3.8107, 43.64 ], [ 3.8107, 43.64 ], [ 3.8108, 43.6401 ], [ 3.8109, 43.6403 ], [ 3.8114, 43.6407 ], [ 3.812, 43.6413 ], [ 3.8123, 43.6415 ], [ 3.8129, 43.6418 ], [ 3.8137, 43.6421 ], [ 3.8157, 43.6428 ], [ 3.8156, 43.6429 ], [ 3.8158, 43.643 ], [ 3.8183, 43.644 ], [ 3.8189, 43.6441 ], [ 3.8208, 43.6433 ], [ 3.8215, 43.6433 ], [ 3.8216, 43.6432 ], [ 3.8206, 43.6429 ], [ 3.8205, 43.6429 ], [ 3.8205, 43.6428 ], [ 3.8202, 43.6427 ], [ 3.8201, 43.6427 ], [ 3.8201, 43.6426 ], [ 3.8201, 43.6424 ], [ 3.82, 43.6423 ], [ 3.8199, 43.6422 ], [ 3.8198, 43.6421 ], [ 3.8195, 43.6419 ], [ 3.8192, 43.6421 ], [ 3.8192, 43.6408 ], [ 3.8203, 43.6408 ], [ 3.8203, 43.6387 ], [ 3.8199, 43.6382 ], [ 3.8199, 43.6373 ], [ 3.8197, 43.6373 ], [ 3.8195, 43.6371 ], [ 3.8195, 43.6371 ], [ 3.8192, 43.6368 ], [ 3.8187, 43.6364 ], [ 3.8184, 43.6361 ], [ 3.8183, 43.6361 ], [ 3.8182, 43.6359 ], [ 3.8179, 43.6358 ], [ 3.8177, 43.6358 ], [ 3.8176, 43.6358 ], [ 3.8172, 43.636 ], [ 3.817, 43.6361 ], [ 3.8168, 43.6358 ], [ 3.8167, 43.6357 ], [ 3.8164, 43.6355 ], [ 3.8164, 43.6354 ], [ 3.8163, 43.6353 ], [ 3.8162, 43.6351 ], [ 3.8162, 43.6348 ], [ 3.8163, 43.6347 ], [ 3.8165, 43.6345 ], [ 3.8166, 43.6344 ], [ 3.8168, 43.6343 ], [ 3.8172, 43.6343 ], [ 3.8176, 43.6342 ], [ 3.8192, 43.6342 ], [ 3.8199, 43.6342 ], [ 3.8226, 43.6344 ], [ 3.8232, 43.6344 ], [ 3.8236, 43.6343 ], [ 3.8238, 43.6342 ], [ 3.8243, 43.6339 ], [ 3.8246, 43.6338 ], [ 3.8247, 43.6336 ], [ 3.8247, 43.6334 ], [ 3.8245, 43.6319 ], [ 3.8251, 43.6317 ], [ 3.8251, 43.6305 ], [ 3.8224, 43.6305 ], [ 3.8224, 43.6298 ], [ 3.8221, 43.6284 ], [ 3.8221, 43.6282 ], [ 3.822, 43.6282 ], [ 3.8219, 43.6276 ], [ 3.8217, 43.6269 ], [ 3.8216, 43.6262 ], [ 3.8216, 43.6262 ], [ 3.8214, 43.6259 ], [ 3.8214, 43.6258 ], [ 3.8213, 43.6255 ], [ 3.8203, 43.6239 ], [ 3.8193, 43.6224 ], [ 3.8189, 43.6218 ], [ 3.8186, 43.6215 ], [ 3.8177, 43.6198 ], [ 3.8172, 43.6201 ], [ 3.8154, 43.6212 ], [ 3.8148, 43.6215 ], [ 3.8148, 43.6215 ], [ 3.8131, 43.6226 ], [ 3.8116, 43.6234 ] ] ], "type": "Polygon" }, "id": "30", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034005", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Mosson" }, "type": "Feature" }, { "bbox": [ 3.8217, 43.6117, 3.8279, 43.6151 ], "geometry": { "coordinates": [ [ [ 3.8258, 43.6149 ], [ 3.8259, 43.6149 ], [ 3.8259, 43.6144 ], [ 3.8266, 43.614 ], [ 3.8267, 43.614 ], [ 3.8265, 43.6137 ], [ 3.8267, 43.6136 ], [ 3.8271, 43.6135 ], [ 3.8272, 43.6135 ], [ 3.8273, 43.6135 ], [ 3.8278, 43.6133 ], [ 3.8277, 43.613 ], [ 3.8274, 43.6127 ], [ 3.8272, 43.6125 ], [ 3.8274, 43.6125 ], [ 3.8278, 43.6124 ], [ 3.8279, 43.6124 ], [ 3.8278, 43.6123 ], [ 3.8278, 43.6123 ], [ 3.8277, 43.6122 ], [ 3.8276, 43.6121 ], [ 3.8275, 43.6122 ], [ 3.8274, 43.6121 ], [ 3.8271, 43.6122 ], [ 3.827, 43.6121 ], [ 3.8268, 43.6122 ], [ 3.8266, 43.6124 ], [ 3.8261, 43.6117 ], [ 3.8256, 43.6118 ], [ 3.8252, 43.6118 ], [ 3.8248, 43.6119 ], [ 3.8244, 43.612 ], [ 3.8242, 43.6121 ], [ 3.8238, 43.6123 ], [ 3.8237, 43.6124 ], [ 3.8233, 43.6125 ], [ 3.823, 43.6128 ], [ 3.8228, 43.6129 ], [ 3.8225, 43.6132 ], [ 3.8225, 43.6134 ], [ 3.8222, 43.6138 ], [ 3.8218, 43.6146 ], [ 3.8217, 43.6147 ], [ 3.8217, 43.6148 ], [ 3.8218, 43.6149 ], [ 3.8219, 43.615 ], [ 3.822, 43.6151 ], [ 3.8221, 43.6151 ], [ 3.8222, 43.6151 ], [ 3.8229, 43.615 ], [ 3.8236, 43.615 ], [ 3.8239, 43.6149 ], [ 3.8244, 43.6149 ], [ 3.8246, 43.6148 ], [ 3.8249, 43.6148 ], [ 3.8257, 43.6148 ], [ 3.8258, 43.6149 ] ] ], "type": "Polygon" }, "id": "31", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034004", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Celleneuve" }, "type": "Feature" }, { "bbox": [ 3.8326, 43.6122, 3.841, 43.6202 ], "geometry": { "coordinates": [ [ [ 3.8373, 43.6202 ], [ 3.8374, 43.6201 ], [ 3.8375, 43.62 ], [ 3.8377, 43.6197 ], [ 3.8381, 43.6193 ], [ 3.8382, 43.6192 ], [ 3.8392, 43.6179 ], [ 3.8394, 43.6179 ], [ 3.8399, 43.6172 ], [ 3.8402, 43.6168 ], [ 3.8408, 43.6163 ], [ 3.841, 43.6162 ], [ 3.8404, 43.6158 ], [ 3.8402, 43.6156 ], [ 3.84, 43.6155 ], [ 3.8399, 43.6154 ], [ 3.8398, 43.6152 ], [ 3.8395, 43.6146 ], [ 3.839, 43.6138 ], [ 3.839, 43.6137 ], [ 3.8389, 43.6136 ], [ 3.8388, 43.6128 ], [ 3.8387, 43.6126 ], [ 3.8384, 43.6124 ], [ 3.838, 43.6122 ], [ 3.8354, 43.6137 ], [ 3.8353, 43.6134 ], [ 3.8338, 43.6135 ], [ 3.8337, 43.6135 ], [ 3.8328, 43.6135 ], [ 3.8326, 43.6134 ], [ 3.8327, 43.614 ], [ 3.8327, 43.6147 ], [ 3.8344, 43.6146 ], [ 3.8348, 43.6158 ], [ 3.8348, 43.6159 ], [ 3.8348, 43.6159 ], [ 3.8347, 43.616 ], [ 3.8346, 43.616 ], [ 3.8345, 43.6161 ], [ 3.8342, 43.6165 ], [ 3.8347, 43.6167 ], [ 3.835, 43.6169 ], [ 3.8347, 43.6172 ], [ 3.8347, 43.6173 ], [ 3.8346, 43.6173 ], [ 3.8345, 43.6173 ], [ 3.8345, 43.6173 ], [ 3.8343, 43.6172 ], [ 3.8341, 43.6174 ], [ 3.8342, 43.6175 ], [ 3.8343, 43.6175 ], [ 3.8348, 43.6178 ], [ 3.8343, 43.618 ], [ 3.8355, 43.6188 ], [ 3.8355, 43.6189 ], [ 3.8357, 43.619 ], [ 3.8356, 43.619 ], [ 3.8373, 43.6202 ] ] ], "type": "Polygon" }, "id": "32", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034006", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Petit Bard Pergola" }, "type": "Feature" }, { "bbox": [ 1.3266, 43.4645, 1.3373, 43.4715 ], "geometry": { "coordinates": [ [ [ 1.3327, 43.4714 ], [ 1.3323, 43.4708 ], [ 1.3324, 43.4707 ], [ 1.3324, 43.4707 ], [ 1.335, 43.4698 ], [ 1.3351, 43.4698 ], [ 1.3352, 43.4698 ], [ 1.3356, 43.4705 ], [ 1.3358, 43.4707 ], [ 1.336, 43.4708 ], [ 1.3361, 43.4709 ], [ 1.3365, 43.471 ], [ 1.337, 43.4711 ], [ 1.3373, 43.4711 ], [ 1.337, 43.4704 ], [ 1.3369, 43.4703 ], [ 1.3369, 43.4703 ], [ 1.3363, 43.4689 ], [ 1.3361, 43.4685 ], [ 1.3354, 43.4687 ], [ 1.3351, 43.4682 ], [ 1.335, 43.4681 ], [ 1.3345, 43.4683 ], [ 1.3339, 43.4684 ], [ 1.3337, 43.4686 ], [ 1.3325, 43.469 ], [ 1.3323, 43.4687 ], [ 1.3322, 43.4687 ], [ 1.3318, 43.4686 ], [ 1.332, 43.4679 ], [ 1.332, 43.4678 ], [ 1.3321, 43.4678 ], [ 1.3321, 43.4677 ], [ 1.3321, 43.4677 ], [ 1.3321, 43.4676 ], [ 1.3319, 43.4675 ], [ 1.3319, 43.4673 ], [ 1.3316, 43.4673 ], [ 1.3315, 43.4673 ], [ 1.3313, 43.4671 ], [ 1.3314, 43.467 ], [ 1.3315, 43.4668 ], [ 1.3317, 43.4662 ], [ 1.3317, 43.466 ], [ 1.3318, 43.4657 ], [ 1.3305, 43.4655 ], [ 1.3301, 43.4655 ], [ 1.3299, 43.4654 ], [ 1.3295, 43.4653 ], [ 1.3291, 43.4652 ], [ 1.3303, 43.4649 ], [ 1.3304, 43.4648 ], [ 1.3303, 43.4647 ], [ 1.3303, 43.4647 ], [ 1.3302, 43.4645 ], [ 1.3301, 43.4645 ], [ 1.3293, 43.4647 ], [ 1.3289, 43.4648 ], [ 1.3288, 43.4648 ], [ 1.3286, 43.4646 ], [ 1.3284, 43.4645 ], [ 1.3267, 43.465 ], [ 1.3266, 43.4651 ], [ 1.3266, 43.4652 ], [ 1.3269, 43.4656 ], [ 1.3275, 43.4654 ], [ 1.3288, 43.4651 ], [ 1.3292, 43.4653 ], [ 1.3297, 43.4654 ], [ 1.3299, 43.4656 ], [ 1.33, 43.4658 ], [ 1.3298, 43.4659 ], [ 1.3301, 43.4666 ], [ 1.3303, 43.4671 ], [ 1.3303, 43.4672 ], [ 1.3304, 43.4673 ], [ 1.3304, 43.4673 ], [ 1.3308, 43.4674 ], [ 1.3308, 43.4674 ], [ 1.3306, 43.4682 ], [ 1.3306, 43.4682 ], [ 1.3309, 43.4683 ], [ 1.3308, 43.4688 ], [ 1.3308, 43.469 ], [ 1.3307, 43.4694 ], [ 1.3295, 43.4696 ], [ 1.3294, 43.4697 ], [ 1.3288, 43.4699 ], [ 1.3278, 43.4701 ], [ 1.3278, 43.4702 ], [ 1.3282, 43.4711 ], [ 1.3283, 43.4711 ], [ 1.3288, 43.471 ], [ 1.3298, 43.4708 ], [ 1.33, 43.4707 ], [ 1.33, 43.4706 ], [ 1.3302, 43.4707 ], [ 1.3303, 43.4706 ], [ 1.3304, 43.4708 ], [ 1.3304, 43.4709 ], [ 1.3305, 43.4708 ], [ 1.3306, 43.4707 ], [ 1.3307, 43.4709 ], [ 1.3308, 43.4709 ], [ 1.3311, 43.4715 ], [ 1.3312, 43.4715 ], [ 1.3316, 43.4713 ], [ 1.3317, 43.4713 ], [ 1.3321, 43.4712 ], [ 1.3323, 43.4715 ], [ 1.3327, 43.4714 ] ] ], "type": "Polygon" }, "id": "33", "properties": { "code_commune": "31395", "code_departement": "31", "code_qp": "QP031001", "commune_qp": "Muret", "nom_commune": "Muret", "nom_qp": "Saint Jean" }, "type": "Feature" }, { "bbox": [ 2.2268, 43.5938, 2.234, 43.5983 ], "geometry": { "coordinates": [ [ [ 2.2322, 43.5969 ], [ 2.2331, 43.5963 ], [ 2.2333, 43.5964 ], [ 2.234, 43.5958 ], [ 2.2338, 43.5955 ], [ 2.2337, 43.5955 ], [ 2.2331, 43.5949 ], [ 2.2328, 43.5951 ], [ 2.232, 43.5955 ], [ 2.2306, 43.5962 ], [ 2.2304, 43.5959 ], [ 2.2303, 43.5958 ], [ 2.2306, 43.5956 ], [ 2.2307, 43.5957 ], [ 2.2314, 43.5953 ], [ 2.2313, 43.5952 ], [ 2.2324, 43.5947 ], [ 2.2316, 43.5938 ], [ 2.2305, 43.5944 ], [ 2.2304, 43.5944 ], [ 2.2295, 43.5949 ], [ 2.2278, 43.5958 ], [ 2.2274, 43.5954 ], [ 2.2273, 43.5955 ], [ 2.2276, 43.5958 ], [ 2.2276, 43.5958 ], [ 2.2269, 43.5962 ], [ 2.2268, 43.5963 ], [ 2.2268, 43.5963 ], [ 2.227, 43.5964 ], [ 2.2279, 43.5968 ], [ 2.2282, 43.597 ], [ 2.2285, 43.5971 ], [ 2.2287, 43.5972 ], [ 2.2288, 43.5972 ], [ 2.2291, 43.5975 ], [ 2.2306, 43.5983 ], [ 2.231, 43.5979 ], [ 2.2312, 43.5979 ], [ 2.2312, 43.5978 ], [ 2.2318, 43.5973 ], [ 2.2322, 43.5969 ], [ 2.2322, 43.5969 ] ] ], "type": "Polygon" }, "id": "34", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081002", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Laden Petit Train" }, "type": "Feature" }, { "bbox": [ 2.3542, 43.2246, 2.3595, 43.2285 ], "geometry": { "coordinates": [ [ [ 2.3586, 43.2264 ], [ 2.3582, 43.226 ], [ 2.3575, 43.2254 ], [ 2.3572, 43.2252 ], [ 2.3571, 43.2251 ], [ 2.3565, 43.2255 ], [ 2.3564, 43.2254 ], [ 2.3563, 43.2254 ], [ 2.3561, 43.2252 ], [ 2.3558, 43.225 ], [ 2.3557, 43.2249 ], [ 2.3561, 43.2247 ], [ 2.3557, 43.2246 ], [ 2.3557, 43.2246 ], [ 2.3554, 43.2246 ], [ 2.3554, 43.2246 ], [ 2.3552, 43.2246 ], [ 2.3551, 43.2246 ], [ 2.355, 43.2247 ], [ 2.3546, 43.2246 ], [ 2.3544, 43.2247 ], [ 2.3547, 43.225 ], [ 2.355, 43.2253 ], [ 2.3546, 43.2256 ], [ 2.3544, 43.2258 ], [ 2.3542, 43.226 ], [ 2.3544, 43.2261 ], [ 2.3543, 43.2262 ], [ 2.3542, 43.2263 ], [ 2.3545, 43.2265 ], [ 2.3546, 43.2265 ], [ 2.3545, 43.2268 ], [ 2.3548, 43.2268 ], [ 2.3548, 43.2271 ], [ 2.3547, 43.2275 ], [ 2.3547, 43.2276 ], [ 2.3549, 43.2277 ], [ 2.3552, 43.2277 ], [ 2.3554, 43.2277 ], [ 2.3559, 43.2277 ], [ 2.3568, 43.2278 ], [ 2.3569, 43.2279 ], [ 2.357, 43.2279 ], [ 2.3571, 43.2279 ], [ 2.3579, 43.2284 ], [ 2.358, 43.2284 ], [ 2.3581, 43.2284 ], [ 2.3582, 43.2285 ], [ 2.3583, 43.2285 ], [ 2.3584, 43.2285 ], [ 2.3585, 43.2285 ], [ 2.3585, 43.2285 ], [ 2.3586, 43.2285 ], [ 2.3587, 43.2285 ], [ 2.3588, 43.2285 ], [ 2.359, 43.2285 ], [ 2.3595, 43.2283 ], [ 2.3592, 43.2277 ], [ 2.3589, 43.2271 ], [ 2.3588, 43.2269 ], [ 2.3586, 43.2267 ], [ 2.3586, 43.2265 ], [ 2.3586, 43.2264 ] ] ], "type": "Polygon" }, "id": "35", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011006", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Grazailles" }, "type": "Feature" }, { "bbox": [ 3.8767, 43.6256, 3.8824, 43.6304 ], "geometry": { "coordinates": [ [ [ 3.8817, 43.6275 ], [ 3.8818, 43.6273 ], [ 3.8819, 43.6269 ], [ 3.8821, 43.6265 ], [ 3.8824, 43.626 ], [ 3.8814, 43.6258 ], [ 3.8803, 43.6257 ], [ 3.8795, 43.6256 ], [ 3.8791, 43.6256 ], [ 3.879, 43.6256 ], [ 3.8792, 43.6261 ], [ 3.8792, 43.6262 ], [ 3.8794, 43.6267 ], [ 3.8794, 43.6268 ], [ 3.8795, 43.627 ], [ 3.8795, 43.6271 ], [ 3.8797, 43.6274 ], [ 3.8798, 43.6275 ], [ 3.8799, 43.6275 ], [ 3.8799, 43.6276 ], [ 3.8799, 43.6276 ], [ 3.8797, 43.6277 ], [ 3.8792, 43.6279 ], [ 3.879, 43.628 ], [ 3.8789, 43.628 ], [ 3.8789, 43.6281 ], [ 3.8788, 43.6282 ], [ 3.8787, 43.6282 ], [ 3.8781, 43.6282 ], [ 3.8781, 43.6284 ], [ 3.8781, 43.6285 ], [ 3.878, 43.6285 ], [ 3.8774, 43.6287 ], [ 3.8767, 43.6289 ], [ 3.8768, 43.629 ], [ 3.8771, 43.6296 ], [ 3.8775, 43.6295 ], [ 3.8775, 43.6295 ], [ 3.8776, 43.6295 ], [ 3.8776, 43.6295 ], [ 3.8777, 43.6296 ], [ 3.8779, 43.6295 ], [ 3.878, 43.6299 ], [ 3.8781, 43.63 ], [ 3.8782, 43.6301 ], [ 3.8783, 43.6302 ], [ 3.8785, 43.6303 ], [ 3.8787, 43.6304 ], [ 3.8788, 43.6304 ], [ 3.8789, 43.6303 ], [ 3.8789, 43.6303 ], [ 3.879, 43.6303 ], [ 3.8792, 43.6301 ], [ 3.8794, 43.6299 ], [ 3.8797, 43.6297 ], [ 3.8801, 43.6293 ], [ 3.8802, 43.6292 ], [ 3.8807, 43.6289 ], [ 3.8811, 43.6286 ], [ 3.8812, 43.6285 ], [ 3.8813, 43.6284 ], [ 3.8814, 43.6283 ], [ 3.8815, 43.6282 ], [ 3.8816, 43.6279 ], [ 3.8816, 43.6277 ], [ 3.8817, 43.6275 ] ] ], "type": "Polygon" }, "id": "36", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034014", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Aiguelongue" }, "type": "Feature" }, { "bbox": [ 1.3822, 43.5783, 1.3906, 43.5831 ], "geometry": { "coordinates": [ [ [ 1.3896, 43.5828 ], [ 1.3896, 43.5827 ], [ 1.3895, 43.5826 ], [ 1.3893, 43.5824 ], [ 1.3894, 43.5824 ], [ 1.3906, 43.5819 ], [ 1.3903, 43.5815 ], [ 1.3902, 43.5814 ], [ 1.3898, 43.5808 ], [ 1.3895, 43.5802 ], [ 1.3886, 43.5804 ], [ 1.3885, 43.5805 ], [ 1.3884, 43.5804 ], [ 1.3881, 43.58 ], [ 1.3883, 43.5793 ], [ 1.3884, 43.5792 ], [ 1.3885, 43.5792 ], [ 1.3888, 43.5791 ], [ 1.3889, 43.5791 ], [ 1.3889, 43.579 ], [ 1.3885, 43.5783 ], [ 1.387, 43.5787 ], [ 1.3871, 43.579 ], [ 1.387, 43.579 ], [ 1.3867, 43.5791 ], [ 1.3861, 43.5792 ], [ 1.386, 43.5792 ], [ 1.3859, 43.5792 ], [ 1.3855, 43.5791 ], [ 1.3855, 43.5791 ], [ 1.3854, 43.5791 ], [ 1.3853, 43.5791 ], [ 1.3852, 43.5792 ], [ 1.3851, 43.5794 ], [ 1.3848, 43.5793 ], [ 1.3847, 43.5792 ], [ 1.3847, 43.5792 ], [ 1.3841, 43.579 ], [ 1.3838, 43.5791 ], [ 1.3837, 43.5788 ], [ 1.3834, 43.5787 ], [ 1.3822, 43.579 ], [ 1.3822, 43.5791 ], [ 1.3822, 43.5791 ], [ 1.3823, 43.5792 ], [ 1.3824, 43.5793 ], [ 1.3825, 43.5795 ], [ 1.3826, 43.5796 ], [ 1.3826, 43.5798 ], [ 1.3827, 43.5799 ], [ 1.3828, 43.5799 ], [ 1.3833, 43.5801 ], [ 1.3833, 43.5801 ], [ 1.3835, 43.5801 ], [ 1.3836, 43.5802 ], [ 1.3839, 43.5803 ], [ 1.384, 43.5803 ], [ 1.3841, 43.5804 ], [ 1.3842, 43.5806 ], [ 1.3844, 43.5807 ], [ 1.3846, 43.5808 ], [ 1.3848, 43.5808 ], [ 1.3855, 43.5811 ], [ 1.3857, 43.5811 ], [ 1.3859, 43.5812 ], [ 1.3858, 43.5813 ], [ 1.3858, 43.5814 ], [ 1.3858, 43.5815 ], [ 1.386, 43.5822 ], [ 1.3861, 43.5831 ], [ 1.3896, 43.5828 ] ] ], "type": "Polygon" }, "id": "37", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031006", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Pradettes" }, "type": "Feature" }, { "bbox": [ 1.3909, 43.5583, 1.4183, 43.5864 ], "geometry": { "coordinates": [ [ [ 1.4183, 43.5824 ], [ 1.4174, 43.5806 ], [ 1.4168, 43.5804 ], [ 1.4165, 43.5798 ], [ 1.4173, 43.5796 ], [ 1.4169, 43.5789 ], [ 1.4167, 43.5784 ], [ 1.4171, 43.5783 ], [ 1.4164, 43.5766 ], [ 1.416, 43.5767 ], [ 1.4159, 43.5764 ], [ 1.4158, 43.5764 ], [ 1.4154, 43.5757 ], [ 1.4152, 43.5757 ], [ 1.415, 43.5758 ], [ 1.4147, 43.5753 ], [ 1.4137, 43.5736 ], [ 1.4123, 43.574 ], [ 1.4122, 43.5737 ], [ 1.4116, 43.5725 ], [ 1.4142, 43.5718 ], [ 1.4134, 43.5704 ], [ 1.4155, 43.5698 ], [ 1.4165, 43.5706 ], [ 1.4171, 43.571 ], [ 1.4175, 43.5713 ], [ 1.4176, 43.5714 ], [ 1.4179, 43.5718 ], [ 1.4181, 43.5718 ], [ 1.4182, 43.5717 ], [ 1.418, 43.5712 ], [ 1.4174, 43.5699 ], [ 1.4162, 43.5692 ], [ 1.4158, 43.5691 ], [ 1.4151, 43.5691 ], [ 1.4147, 43.569 ], [ 1.4137, 43.5685 ], [ 1.4122, 43.5674 ], [ 1.4115, 43.5665 ], [ 1.4107, 43.5666 ], [ 1.4107, 43.5668 ], [ 1.4103, 43.5668 ], [ 1.4102, 43.5669 ], [ 1.4075, 43.5674 ], [ 1.4062, 43.5674 ], [ 1.4026, 43.5674 ], [ 1.4026, 43.5666 ], [ 1.4025, 43.5665 ], [ 1.4024, 43.5662 ], [ 1.4021, 43.5662 ], [ 1.4021, 43.5662 ], [ 1.4018, 43.5662 ], [ 1.4018, 43.5656 ], [ 1.4016, 43.5656 ], [ 1.4016, 43.5652 ], [ 1.4026, 43.5652 ], [ 1.4026, 43.5646 ], [ 1.4036, 43.5646 ], [ 1.403, 43.5638 ], [ 1.4027, 43.5635 ], [ 1.4018, 43.5623 ], [ 1.4018, 43.5612 ], [ 1.4017, 43.561 ], [ 1.4027, 43.5606 ], [ 1.4018, 43.5593 ], [ 1.4016, 43.5589 ], [ 1.4011, 43.5583 ], [ 1.4005, 43.5584 ], [ 1.3985, 43.5589 ], [ 1.3961, 43.5594 ], [ 1.3952, 43.5597 ], [ 1.393, 43.5607 ], [ 1.3909, 43.5619 ], [ 1.3937, 43.5658 ], [ 1.3965, 43.5659 ], [ 1.3966, 43.5661 ], [ 1.3971, 43.5668 ], [ 1.3973, 43.5675 ], [ 1.3971, 43.5679 ], [ 1.397, 43.5684 ], [ 1.3963, 43.5684 ], [ 1.3962, 43.5693 ], [ 1.3962, 43.5704 ], [ 1.3959, 43.5704 ], [ 1.3959, 43.5711 ], [ 1.3954, 43.5711 ], [ 1.3954, 43.5712 ], [ 1.3952, 43.5714 ], [ 1.3949, 43.5713 ], [ 1.3949, 43.5717 ], [ 1.3951, 43.5718 ], [ 1.3951, 43.5722 ], [ 1.395, 43.5722 ], [ 1.395, 43.5722 ], [ 1.3949, 43.5722 ], [ 1.3946, 43.5722 ], [ 1.3945, 43.5722 ], [ 1.3944, 43.5722 ], [ 1.3944, 43.5723 ], [ 1.3944, 43.5724 ], [ 1.3943, 43.5726 ], [ 1.3943, 43.573 ], [ 1.3958, 43.5743 ], [ 1.3957, 43.5744 ], [ 1.3957, 43.5746 ], [ 1.3959, 43.5747 ], [ 1.3947, 43.5779 ], [ 1.3947, 43.5787 ], [ 1.3966, 43.5812 ], [ 1.3978, 43.5827 ], [ 1.3992, 43.5838 ], [ 1.3994, 43.5838 ], [ 1.4001, 43.5838 ], [ 1.4004, 43.5837 ], [ 1.4004, 43.583 ], [ 1.4003, 43.5823 ], [ 1.4007, 43.5822 ], [ 1.4012, 43.5818 ], [ 1.401, 43.5813 ], [ 1.3999, 43.5797 ], [ 1.3994, 43.5797 ], [ 1.3997, 43.5803 ], [ 1.3996, 43.5803 ], [ 1.3995, 43.5805 ], [ 1.3992, 43.5804 ], [ 1.399, 43.5803 ], [ 1.3988, 43.5803 ], [ 1.3978, 43.5804 ], [ 1.3975, 43.5804 ], [ 1.3971, 43.5802 ], [ 1.3967, 43.58 ], [ 1.3966, 43.58 ], [ 1.3966, 43.5799 ], [ 1.3965, 43.5798 ], [ 1.3965, 43.5788 ], [ 1.3965, 43.5787 ], [ 1.3964, 43.5786 ], [ 1.3965, 43.5785 ], [ 1.3967, 43.5785 ], [ 1.3976, 43.5785 ], [ 1.397, 43.5765 ], [ 1.3971, 43.5757 ], [ 1.3966, 43.5757 ], [ 1.3959, 43.5754 ], [ 1.3959, 43.5752 ], [ 1.3962, 43.575 ], [ 1.3964, 43.5749 ], [ 1.3966, 43.5748 ], [ 1.397, 43.5747 ], [ 1.399, 43.5746 ], [ 1.401, 43.5745 ], [ 1.4011, 43.5748 ], [ 1.401, 43.5753 ], [ 1.401, 43.5756 ], [ 1.4012, 43.5756 ], [ 1.4012, 43.5761 ], [ 1.402, 43.5761 ], [ 1.402, 43.5761 ], [ 1.4025, 43.5761 ], [ 1.4025, 43.5753 ], [ 1.402, 43.5753 ], [ 1.4021, 43.575 ], [ 1.4021, 43.5749 ], [ 1.4022, 43.5748 ], [ 1.4025, 43.5746 ], [ 1.4026, 43.5745 ], [ 1.4028, 43.5743 ], [ 1.4053, 43.5742 ], [ 1.4058, 43.5738 ], [ 1.4082, 43.5717 ], [ 1.4084, 43.5714 ], [ 1.4086, 43.5713 ], [ 1.4087, 43.5709 ], [ 1.4091, 43.5709 ], [ 1.4093, 43.5708 ], [ 1.4098, 43.5707 ], [ 1.41, 43.5706 ], [ 1.4108, 43.5705 ], [ 1.4111, 43.5712 ], [ 1.4113, 43.5716 ], [ 1.4096, 43.5743 ], [ 1.4092, 43.5749 ], [ 1.4079, 43.5772 ], [ 1.4059, 43.58 ], [ 1.4037, 43.5836 ], [ 1.4052, 43.5836 ], [ 1.4061, 43.5842 ], [ 1.4055, 43.5851 ], [ 1.4062, 43.5853 ], [ 1.4067, 43.5844 ], [ 1.4067, 43.5843 ], [ 1.4067, 43.5843 ], [ 1.4062, 43.5841 ], [ 1.4063, 43.5839 ], [ 1.4067, 43.5835 ], [ 1.4074, 43.5838 ], [ 1.4074, 43.584 ], [ 1.4081, 43.5845 ], [ 1.4084, 43.5846 ], [ 1.409, 43.5848 ], [ 1.41, 43.585 ], [ 1.4097, 43.5857 ], [ 1.4097, 43.5857 ], [ 1.4097, 43.5858 ], [ 1.4099, 43.5858 ], [ 1.4114, 43.5864 ], [ 1.4115, 43.5864 ], [ 1.4116, 43.5864 ], [ 1.412, 43.5854 ], [ 1.4128, 43.5855 ], [ 1.4135, 43.5858 ], [ 1.4145, 43.5862 ], [ 1.4162, 43.5851 ], [ 1.4155, 43.5843 ], [ 1.4149, 43.5834 ], [ 1.4154, 43.5833 ], [ 1.4164, 43.583 ], [ 1.4171, 43.5827 ], [ 1.4179, 43.5825 ], [ 1.4183, 43.5824 ] ] ], "type": "Polygon" }, "id": "38", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031007", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Grand Mirail" }, "type": "Feature" }, { "bbox": [ 2.1293, 43.9124, 2.1414, 43.919 ], "geometry": { "coordinates": [ [ [ 2.1316, 43.917 ], [ 2.1331, 43.9166 ], [ 2.1328, 43.9157 ], [ 2.1332, 43.9156 ], [ 2.1333, 43.9155 ], [ 2.1337, 43.9154 ], [ 2.1338, 43.9153 ], [ 2.1339, 43.9153 ], [ 2.1349, 43.915 ], [ 2.135, 43.915 ], [ 2.1358, 43.9147 ], [ 2.1357, 43.9146 ], [ 2.1355, 43.9138 ], [ 2.1354, 43.9137 ], [ 2.1361, 43.9137 ], [ 2.1369, 43.9152 ], [ 2.137, 43.9152 ], [ 2.1372, 43.9154 ], [ 2.1377, 43.9151 ], [ 2.1383, 43.9154 ], [ 2.1377, 43.9158 ], [ 2.1383, 43.9162 ], [ 2.1387, 43.916 ], [ 2.1389, 43.9159 ], [ 2.1387, 43.9157 ], [ 2.1398, 43.9152 ], [ 2.1389, 43.9145 ], [ 2.1387, 43.9144 ], [ 2.1386, 43.9142 ], [ 2.1385, 43.9141 ], [ 2.1397, 43.9139 ], [ 2.1397, 43.9137 ], [ 2.1401, 43.9137 ], [ 2.1406, 43.9136 ], [ 2.1414, 43.9136 ], [ 2.1414, 43.9133 ], [ 2.1414, 43.9131 ], [ 2.1413, 43.9131 ], [ 2.1413, 43.913 ], [ 2.1391, 43.9124 ], [ 2.139, 43.9126 ], [ 2.139, 43.9127 ], [ 2.139, 43.9128 ], [ 2.1391, 43.9128 ], [ 2.1386, 43.9129 ], [ 2.1383, 43.913 ], [ 2.1382, 43.913 ], [ 2.1383, 43.9132 ], [ 2.138, 43.9133 ], [ 2.1379, 43.9132 ], [ 2.1378, 43.9133 ], [ 2.1378, 43.9131 ], [ 2.1373, 43.9132 ], [ 2.1373, 43.9131 ], [ 2.137, 43.9131 ], [ 2.137, 43.913 ], [ 2.1365, 43.9131 ], [ 2.1365, 43.9129 ], [ 2.1362, 43.9129 ], [ 2.1362, 43.913 ], [ 2.136, 43.9131 ], [ 2.1353, 43.9132 ], [ 2.135, 43.9128 ], [ 2.1333, 43.9135 ], [ 2.1332, 43.9136 ], [ 2.1332, 43.9137 ], [ 2.133, 43.9138 ], [ 2.1332, 43.9143 ], [ 2.1332, 43.9143 ], [ 2.1327, 43.9144 ], [ 2.1326, 43.9145 ], [ 2.1326, 43.9145 ], [ 2.1325, 43.9146 ], [ 2.1323, 43.9148 ], [ 2.1324, 43.9148 ], [ 2.1323, 43.9149 ], [ 2.1319, 43.9154 ], [ 2.1316, 43.9157 ], [ 2.1316, 43.916 ], [ 2.1316, 43.916 ], [ 2.1316, 43.9161 ], [ 2.1315, 43.9161 ], [ 2.1313, 43.9161 ], [ 2.1313, 43.916 ], [ 2.1312, 43.916 ], [ 2.131, 43.9159 ], [ 2.1298, 43.9159 ], [ 2.1298, 43.9159 ], [ 2.1296, 43.9159 ], [ 2.1296, 43.9162 ], [ 2.1295, 43.9162 ], [ 2.1293, 43.9167 ], [ 2.1293, 43.9172 ], [ 2.1293, 43.9176 ], [ 2.1294, 43.918 ], [ 2.1296, 43.9184 ], [ 2.1299, 43.9188 ], [ 2.1301, 43.9189 ], [ 2.1302, 43.919 ], [ 2.1307, 43.919 ], [ 2.1307, 43.9187 ], [ 2.1307, 43.9186 ], [ 2.1307, 43.9184 ], [ 2.1308, 43.9183 ], [ 2.1309, 43.9182 ], [ 2.1312, 43.918 ], [ 2.1313, 43.918 ], [ 2.1314, 43.9179 ], [ 2.1315, 43.9178 ], [ 2.1316, 43.9177 ], [ 2.1316, 43.9176 ], [ 2.1316, 43.9174 ], [ 2.1316, 43.9173 ], [ 2.1316, 43.9171 ], [ 2.1315, 43.9171 ], [ 2.1316, 43.917 ] ] ], "type": "Polygon" }, "id": "39", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081007", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Veyrières Rayssac" }, "type": "Feature" }, { "bbox": [ 2.2374, 43.6027, 2.2451, 43.6086 ], "geometry": { "coordinates": [ [ [ 2.2376, 43.6086 ], [ 2.2378, 43.6086 ], [ 2.2378, 43.6086 ], [ 2.2381, 43.6085 ], [ 2.2383, 43.6085 ], [ 2.2382, 43.6081 ], [ 2.2382, 43.608 ], [ 2.2389, 43.6079 ], [ 2.2389, 43.6078 ], [ 2.2388, 43.6076 ], [ 2.2391, 43.6075 ], [ 2.2391, 43.6076 ], [ 2.2393, 43.608 ], [ 2.2394, 43.6083 ], [ 2.2409, 43.6079 ], [ 2.2418, 43.6076 ], [ 2.2417, 43.6074 ], [ 2.2422, 43.6073 ], [ 2.2424, 43.6067 ], [ 2.2425, 43.6065 ], [ 2.2425, 43.6064 ], [ 2.2425, 43.6059 ], [ 2.2424, 43.6056 ], [ 2.2426, 43.6056 ], [ 2.2426, 43.6052 ], [ 2.2425, 43.6048 ], [ 2.2429, 43.6048 ], [ 2.2429, 43.6052 ], [ 2.243, 43.6054 ], [ 2.243, 43.6058 ], [ 2.243, 43.606 ], [ 2.243, 43.6061 ], [ 2.2431, 43.6061 ], [ 2.2431, 43.6063 ], [ 2.2431, 43.6065 ], [ 2.2431, 43.6064 ], [ 2.2433, 43.6064 ], [ 2.2439, 43.6062 ], [ 2.2446, 43.6059 ], [ 2.2449, 43.6058 ], [ 2.2451, 43.6057 ], [ 2.2451, 43.6056 ], [ 2.2451, 43.6055 ], [ 2.2449, 43.6054 ], [ 2.2446, 43.6043 ], [ 2.2447, 43.6043 ], [ 2.2443, 43.6039 ], [ 2.2436, 43.6033 ], [ 2.2435, 43.6032 ], [ 2.2431, 43.603 ], [ 2.2431, 43.6027 ], [ 2.2429, 43.6027 ], [ 2.243, 43.603 ], [ 2.2428, 43.603 ], [ 2.2428, 43.6032 ], [ 2.2429, 43.6033 ], [ 2.2429, 43.6035 ], [ 2.2429, 43.6047 ], [ 2.2425, 43.6047 ], [ 2.2424, 43.604 ], [ 2.2423, 43.604 ], [ 2.2422, 43.604 ], [ 2.242, 43.604 ], [ 2.2419, 43.604 ], [ 2.2414, 43.604 ], [ 2.2407, 43.6042 ], [ 2.2407, 43.6043 ], [ 2.2408, 43.6048 ], [ 2.2409, 43.6051 ], [ 2.2409, 43.6053 ], [ 2.2408, 43.6053 ], [ 2.2405, 43.6055 ], [ 2.2403, 43.6056 ], [ 2.2401, 43.6058 ], [ 2.2393, 43.6059 ], [ 2.2387, 43.6061 ], [ 2.2384, 43.6062 ], [ 2.2388, 43.607 ], [ 2.2389, 43.6073 ], [ 2.2383, 43.6074 ], [ 2.2379, 43.6075 ], [ 2.2374, 43.6077 ], [ 2.2376, 43.6086 ] ] ], "type": "Polygon" }, "id": "40", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081005", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.8545, 43.6049, 3.8625, 43.6078 ], "geometry": { "coordinates": [ [ [ 3.8551, 43.6078 ], [ 3.8559, 43.6075 ], [ 3.8564, 43.6073 ], [ 3.8565, 43.6072 ], [ 3.8568, 43.6071 ], [ 3.8573, 43.6068 ], [ 3.8568, 43.6064 ], [ 3.857, 43.6063 ], [ 3.8574, 43.606 ], [ 3.8576, 43.6059 ], [ 3.8577, 43.6058 ], [ 3.8578, 43.6058 ], [ 3.8579, 43.6058 ], [ 3.8581, 43.6059 ], [ 3.8582, 43.606 ], [ 3.8587, 43.6062 ], [ 3.8596, 43.6067 ], [ 3.8595, 43.6067 ], [ 3.8596, 43.6068 ], [ 3.8598, 43.6068 ], [ 3.8603, 43.6064 ], [ 3.8609, 43.6069 ], [ 3.8612, 43.6071 ], [ 3.8613, 43.6072 ], [ 3.8614, 43.6073 ], [ 3.8616, 43.6071 ], [ 3.8618, 43.6069 ], [ 3.8619, 43.6067 ], [ 3.8619, 43.6066 ], [ 3.8621, 43.6063 ], [ 3.8622, 43.6064 ], [ 3.8625, 43.6059 ], [ 3.8623, 43.6058 ], [ 3.8619, 43.6057 ], [ 3.8615, 43.6056 ], [ 3.8608, 43.6054 ], [ 3.8604, 43.6053 ], [ 3.8601, 43.6052 ], [ 3.8598, 43.6051 ], [ 3.8596, 43.6051 ], [ 3.8592, 43.605 ], [ 3.859, 43.605 ], [ 3.8588, 43.605 ], [ 3.8586, 43.605 ], [ 3.8585, 43.605 ], [ 3.8584, 43.605 ], [ 3.8581, 43.605 ], [ 3.8576, 43.6049 ], [ 3.8573, 43.6049 ], [ 3.8569, 43.6049 ], [ 3.8564, 43.6049 ], [ 3.8561, 43.6049 ], [ 3.8562, 43.6057 ], [ 3.8551, 43.6062 ], [ 3.855, 43.606 ], [ 3.8545, 43.6062 ], [ 3.8554, 43.6073 ], [ 3.855, 43.6075 ], [ 3.8549, 43.6076 ], [ 3.8551, 43.6078 ] ] ], "type": "Polygon" }, "id": "41", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034009", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Gély" }, "type": "Feature" }, { "bbox": [ 4.194, 44.2582, 4.203, 44.2626 ], "geometry": { "coordinates": [ [ [ 4.197, 44.2616 ], [ 4.1971, 44.2617 ], [ 4.197, 44.2617 ], [ 4.1972, 44.2617 ], [ 4.1972, 44.2617 ], [ 4.1969, 44.2619 ], [ 4.1969, 44.2619 ], [ 4.1968, 44.262 ], [ 4.1966, 44.2619 ], [ 4.1965, 44.2618 ], [ 4.1962, 44.2617 ], [ 4.1961, 44.2617 ], [ 4.1959, 44.2616 ], [ 4.1958, 44.2615 ], [ 4.1957, 44.2615 ], [ 4.1957, 44.2614 ], [ 4.1957, 44.2612 ], [ 4.1956, 44.2613 ], [ 4.1956, 44.2613 ], [ 4.1956, 44.2617 ], [ 4.1956, 44.2617 ], [ 4.1956, 44.2618 ], [ 4.1957, 44.262 ], [ 4.196, 44.2619 ], [ 4.1963, 44.2618 ], [ 4.1964, 44.2619 ], [ 4.1968, 44.2625 ], [ 4.197, 44.2626 ], [ 4.1974, 44.2624 ], [ 4.1972, 44.2623 ], [ 4.1974, 44.2622 ], [ 4.1975, 44.262 ], [ 4.1976, 44.262 ], [ 4.1977, 44.2621 ], [ 4.1978, 44.2621 ], [ 4.198, 44.2622 ], [ 4.1983, 44.2622 ], [ 4.1984, 44.2622 ], [ 4.1984, 44.2622 ], [ 4.1985, 44.2621 ], [ 4.1985, 44.262 ], [ 4.1987, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1988, 44.262 ], [ 4.1989, 44.262 ], [ 4.199, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2621 ], [ 4.1989, 44.2622 ], [ 4.1992, 44.2623 ], [ 4.1992, 44.2622 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1994, 44.2623 ], [ 4.1995, 44.2623 ], [ 4.1995, 44.2623 ], [ 4.1996, 44.2623 ], [ 4.1997, 44.2623 ], [ 4.2, 44.2624 ], [ 4.2001, 44.2624 ], [ 4.2001, 44.2624 ], [ 4.2002, 44.2624 ], [ 4.2002, 44.2624 ], [ 4.2004, 44.2624 ], [ 4.2004, 44.2624 ], [ 4.2006, 44.2625 ], [ 4.2006, 44.2624 ], [ 4.2007, 44.2624 ], [ 4.2007, 44.2625 ], [ 4.2008, 44.2625 ], [ 4.201, 44.2624 ], [ 4.201, 44.2624 ], [ 4.2011, 44.2624 ], [ 4.2012, 44.2623 ], [ 4.2012, 44.2623 ], [ 4.2013, 44.2623 ], [ 4.2017, 44.2623 ], [ 4.2015, 44.2619 ], [ 4.2012, 44.262 ], [ 4.2011, 44.262 ], [ 4.2011, 44.262 ], [ 4.2011, 44.262 ], [ 4.201, 44.2619 ], [ 4.201, 44.2618 ], [ 4.201, 44.2617 ], [ 4.201, 44.2617 ], [ 4.2013, 44.2613 ], [ 4.2013, 44.2613 ], [ 4.2012, 44.2613 ], [ 4.201, 44.2613 ], [ 4.2004, 44.2612 ], [ 4.2001, 44.2612 ], [ 4.2001, 44.2611 ], [ 4.2002, 44.261 ], [ 4.2004, 44.2606 ], [ 4.1999, 44.2605 ], [ 4.2, 44.2603 ], [ 4.2, 44.2602 ], [ 4.2001, 44.2602 ], [ 4.2006, 44.2603 ], [ 4.2007, 44.2601 ], [ 4.2008, 44.2599 ], [ 4.2009, 44.2599 ], [ 4.2016, 44.2594 ], [ 4.2017, 44.2591 ], [ 4.2017, 44.259 ], [ 4.203, 44.2584 ], [ 4.2029, 44.2582 ], [ 4.2026, 44.2582 ], [ 4.202, 44.2582 ], [ 4.202, 44.2584 ], [ 4.2022, 44.2585 ], [ 4.2021, 44.2585 ], [ 4.202, 44.2585 ], [ 4.202, 44.2585 ], [ 4.2019, 44.2585 ], [ 4.2019, 44.2586 ], [ 4.2019, 44.2586 ], [ 4.202, 44.2586 ], [ 4.202, 44.2587 ], [ 4.2014, 44.2587 ], [ 4.2014, 44.2588 ], [ 4.2011, 44.2588 ], [ 4.2011, 44.2587 ], [ 4.201, 44.2586 ], [ 4.2005, 44.2587 ], [ 4.2004, 44.2584 ], [ 4.2, 44.2584 ], [ 4.1996, 44.2584 ], [ 4.1994, 44.2584 ], [ 4.1994, 44.2584 ], [ 4.1993, 44.2584 ], [ 4.1993, 44.2584 ], [ 4.1992, 44.2584 ], [ 4.199, 44.2584 ], [ 4.1988, 44.2584 ], [ 4.1985, 44.2586 ], [ 4.1984, 44.2586 ], [ 4.1985, 44.259 ], [ 4.1984, 44.2591 ], [ 4.1983, 44.2595 ], [ 4.1975, 44.2593 ], [ 4.1968, 44.2592 ], [ 4.1966, 44.2595 ], [ 4.1965, 44.2595 ], [ 4.1965, 44.2595 ], [ 4.1949, 44.2592 ], [ 4.1946, 44.259 ], [ 4.1944, 44.2592 ], [ 4.1943, 44.2593 ], [ 4.1944, 44.2594 ], [ 4.1943, 44.2595 ], [ 4.194, 44.2599 ], [ 4.1943, 44.26 ], [ 4.1943, 44.26 ], [ 4.1944, 44.2603 ], [ 4.1944, 44.2604 ], [ 4.1947, 44.2604 ], [ 4.1947, 44.2604 ], [ 4.1948, 44.2604 ], [ 4.1949, 44.2605 ], [ 4.1948, 44.2606 ], [ 4.1948, 44.2606 ], [ 4.1947, 44.2607 ], [ 4.1945, 44.2608 ], [ 4.1944, 44.2609 ], [ 4.1944, 44.2609 ], [ 4.1944, 44.261 ], [ 4.1946, 44.2612 ], [ 4.1947, 44.2613 ], [ 4.1952, 44.2611 ], [ 4.1952, 44.2611 ], [ 4.1957, 44.2611 ], [ 4.1957, 44.261 ], [ 4.1956, 44.2609 ], [ 4.1957, 44.2608 ], [ 4.1958, 44.2609 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.1959, 44.2607 ], [ 4.196, 44.2607 ], [ 4.1961, 44.2607 ], [ 4.196, 44.2607 ], [ 4.1962, 44.2608 ], [ 4.1963, 44.2607 ], [ 4.1963, 44.2607 ], [ 4.1964, 44.2607 ], [ 4.1965, 44.2607 ], [ 4.1966, 44.2607 ], [ 4.1966, 44.2607 ], [ 4.1966, 44.2608 ], [ 4.1967, 44.2608 ], [ 4.1966, 44.2608 ], [ 4.1967, 44.2609 ], [ 4.1968, 44.261 ], [ 4.1968, 44.2611 ], [ 4.1969, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1968, 44.2612 ], [ 4.1969, 44.2612 ], [ 4.1969, 44.2613 ], [ 4.1968, 44.2616 ], [ 4.1969, 44.2616 ], [ 4.1968, 44.2617 ], [ 4.1969, 44.2617 ], [ 4.1969, 44.2616 ], [ 4.197, 44.2616 ], [ 4.197, 44.2616 ] ] ], "type": "Polygon" }, "id": "42", "properties": { "code_commune": "30227", "code_departement": "30", "code_qp": "QP030014", "commune_qp": "Saint-Ambroix", "nom_commune": "Saint-Ambroix", "nom_qp": "L'Ecusson" }, "type": "Feature" }, { "bbox": [ 1.3507, 44.0158, 1.3577, 44.0229 ], "geometry": { "coordinates": [ [ [ 1.3511, 44.0207 ], [ 1.3513, 44.0209 ], [ 1.3508, 44.0212 ], [ 1.3511, 44.0214 ], [ 1.3519, 44.021 ], [ 1.3522, 44.0213 ], [ 1.3526, 44.0217 ], [ 1.3529, 44.022 ], [ 1.3531, 44.0223 ], [ 1.3532, 44.0229 ], [ 1.354, 44.0228 ], [ 1.354, 44.0225 ], [ 1.3543, 44.0226 ], [ 1.3543, 44.0224 ], [ 1.3547, 44.0224 ], [ 1.3548, 44.0227 ], [ 1.3555, 44.0225 ], [ 1.3555, 44.0225 ], [ 1.3555, 44.0223 ], [ 1.3572, 44.0224 ], [ 1.3573, 44.0217 ], [ 1.3566, 44.0217 ], [ 1.356, 44.0218 ], [ 1.356, 44.0215 ], [ 1.3561, 44.0215 ], [ 1.3561, 44.0214 ], [ 1.3561, 44.0212 ], [ 1.3561, 44.021 ], [ 1.3559, 44.0206 ], [ 1.3558, 44.0204 ], [ 1.356, 44.0204 ], [ 1.3558, 44.02 ], [ 1.3559, 44.0199 ], [ 1.3558, 44.0198 ], [ 1.3558, 44.0197 ], [ 1.3559, 44.0195 ], [ 1.3561, 44.0194 ], [ 1.3562, 44.0193 ], [ 1.3562, 44.0193 ], [ 1.3565, 44.019 ], [ 1.357, 44.0194 ], [ 1.3577, 44.0189 ], [ 1.3575, 44.0189 ], [ 1.3571, 44.0192 ], [ 1.3568, 44.0189 ], [ 1.3566, 44.019 ], [ 1.3564, 44.019 ], [ 1.3562, 44.0188 ], [ 1.3561, 44.0188 ], [ 1.356, 44.0188 ], [ 1.3559, 44.0186 ], [ 1.3558, 44.0185 ], [ 1.3557, 44.0184 ], [ 1.3561, 44.0183 ], [ 1.3565, 44.0183 ], [ 1.357, 44.018 ], [ 1.3569, 44.0179 ], [ 1.3569, 44.0178 ], [ 1.3568, 44.0172 ], [ 1.3566, 44.0172 ], [ 1.3565, 44.0166 ], [ 1.3563, 44.0159 ], [ 1.3562, 44.0158 ], [ 1.3557, 44.016 ], [ 1.355, 44.0162 ], [ 1.3537, 44.0168 ], [ 1.3529, 44.0173 ], [ 1.3524, 44.0175 ], [ 1.3521, 44.0173 ], [ 1.3518, 44.0171 ], [ 1.3515, 44.0174 ], [ 1.3514, 44.0174 ], [ 1.3513, 44.0175 ], [ 1.3513, 44.0177 ], [ 1.3512, 44.0179 ], [ 1.3515, 44.0181 ], [ 1.3514, 44.0182 ], [ 1.3511, 44.0185 ], [ 1.3511, 44.0186 ], [ 1.351, 44.0187 ], [ 1.3509, 44.0189 ], [ 1.3507, 44.0191 ], [ 1.351, 44.0193 ], [ 1.3514, 44.0195 ], [ 1.3513, 44.0197 ], [ 1.3519, 44.0202 ], [ 1.3516, 44.0204 ], [ 1.3511, 44.0207 ] ] ], "type": "Polygon" }, "id": "43", "properties": { "code_commune": "82121", "code_departement": "82", "code_qp": "QP082001", "commune_qp": "Montauban", "nom_commune": "Montauban", "nom_qp": "Cœur de Ville" }, "type": "Feature" }, { "bbox": [ 1.6033, 42.9636, 1.6111, 42.9686 ], "geometry": { "coordinates": [ [ [ 1.6046, 42.9644 ], [ 1.6043, 42.9644 ], [ 1.6043, 42.9645 ], [ 1.6042, 42.9645 ], [ 1.604, 42.9647 ], [ 1.6039, 42.9649 ], [ 1.6038, 42.965 ], [ 1.6039, 42.965 ], [ 1.6039, 42.965 ], [ 1.604, 42.9651 ], [ 1.6041, 42.9651 ], [ 1.6042, 42.9651 ], [ 1.6042, 42.9651 ], [ 1.6042, 42.965 ], [ 1.6042, 42.965 ], [ 1.6043, 42.9649 ], [ 1.6043, 42.9649 ], [ 1.6044, 42.9648 ], [ 1.6044, 42.9649 ], [ 1.6044, 42.9648 ], [ 1.6044, 42.9649 ], [ 1.6045, 42.9649 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6046, 42.965 ], [ 1.6047, 42.9651 ], [ 1.6047, 42.9651 ], [ 1.6047, 42.9651 ], [ 1.6048, 42.9651 ], [ 1.6048, 42.9651 ], [ 1.6049, 42.9652 ], [ 1.6049, 42.9652 ], [ 1.6049, 42.9653 ], [ 1.605, 42.9653 ], [ 1.605, 42.9653 ], [ 1.6051, 42.9653 ], [ 1.605, 42.9654 ], [ 1.6051, 42.9655 ], [ 1.6051, 42.9656 ], [ 1.6052, 42.9656 ], [ 1.6052, 42.9656 ], [ 1.6052, 42.9657 ], [ 1.6051, 42.9659 ], [ 1.6052, 42.9659 ], [ 1.6052, 42.966 ], [ 1.6052, 42.9662 ], [ 1.6051, 42.9663 ], [ 1.6051, 42.9663 ], [ 1.6051, 42.9664 ], [ 1.6051, 42.9665 ], [ 1.6051, 42.9666 ], [ 1.6051, 42.9666 ], [ 1.605, 42.9666 ], [ 1.6049, 42.9667 ], [ 1.6049, 42.9667 ], [ 1.6049, 42.9667 ], [ 1.6047, 42.9668 ], [ 1.6047, 42.9668 ], [ 1.6047, 42.9668 ], [ 1.6046, 42.9668 ], [ 1.6046, 42.9668 ], [ 1.6045, 42.967 ], [ 1.6044, 42.967 ], [ 1.6043, 42.9669 ], [ 1.6042, 42.9668 ], [ 1.604, 42.9667 ], [ 1.6038, 42.9667 ], [ 1.6035, 42.9668 ], [ 1.6034, 42.9668 ], [ 1.6033, 42.9669 ], [ 1.6035, 42.9671 ], [ 1.6036, 42.9672 ], [ 1.6039, 42.9673 ], [ 1.604, 42.9673 ], [ 1.604, 42.9674 ], [ 1.6041, 42.9674 ], [ 1.6042, 42.9674 ], [ 1.6042, 42.9674 ], [ 1.6043, 42.9674 ], [ 1.6044, 42.9674 ], [ 1.6045, 42.9674 ], [ 1.6044, 42.9671 ], [ 1.6045, 42.967 ], [ 1.6046, 42.9671 ], [ 1.6047, 42.9671 ], [ 1.6049, 42.9672 ], [ 1.6051, 42.9672 ], [ 1.6052, 42.9672 ], [ 1.6052, 42.9671 ], [ 1.6053, 42.9671 ], [ 1.6055, 42.9672 ], [ 1.6056, 42.9671 ], [ 1.6056, 42.967 ], [ 1.6058, 42.9671 ], [ 1.6058, 42.9671 ], [ 1.606, 42.9669 ], [ 1.6061, 42.9667 ], [ 1.6062, 42.9667 ], [ 1.6063, 42.9667 ], [ 1.6069, 42.9667 ], [ 1.6073, 42.9668 ], [ 1.6072, 42.9669 ], [ 1.6073, 42.967 ], [ 1.6075, 42.9669 ], [ 1.6076, 42.9669 ], [ 1.6076, 42.9669 ], [ 1.6078, 42.9668 ], [ 1.6079, 42.9667 ], [ 1.6079, 42.9667 ], [ 1.6081, 42.9666 ], [ 1.6081, 42.9666 ], [ 1.6081, 42.9666 ], [ 1.6082, 42.9665 ], [ 1.6084, 42.9664 ], [ 1.6084, 42.9663 ], [ 1.6085, 42.9664 ], [ 1.6087, 42.9661 ], [ 1.6092, 42.9664 ], [ 1.6092, 42.9664 ], [ 1.6091, 42.9666 ], [ 1.6088, 42.9669 ], [ 1.6086, 42.9671 ], [ 1.6086, 42.9673 ], [ 1.6084, 42.9672 ], [ 1.6083, 42.9672 ], [ 1.6081, 42.9673 ], [ 1.608, 42.9675 ], [ 1.6077, 42.9677 ], [ 1.6077, 42.9677 ], [ 1.6079, 42.9678 ], [ 1.6079, 42.9678 ], [ 1.6081, 42.9679 ], [ 1.6082, 42.9679 ], [ 1.6082, 42.968 ], [ 1.6082, 42.9686 ], [ 1.6084, 42.9686 ], [ 1.6084, 42.9686 ], [ 1.6086, 42.9686 ], [ 1.6086, 42.9682 ], [ 1.6086, 42.968 ], [ 1.6085, 42.9679 ], [ 1.6086, 42.9678 ], [ 1.6086, 42.9678 ], [ 1.6086, 42.9677 ], [ 1.6087, 42.9676 ], [ 1.6094, 42.9668 ], [ 1.6095, 42.9668 ], [ 1.6095, 42.9668 ], [ 1.6097, 42.9665 ], [ 1.6098, 42.9665 ], [ 1.6098, 42.9664 ], [ 1.6098, 42.9664 ], [ 1.6098, 42.9663 ], [ 1.61, 42.9662 ], [ 1.61, 42.9662 ], [ 1.61, 42.9661 ], [ 1.61, 42.9661 ], [ 1.6101, 42.966 ], [ 1.6102, 42.9659 ], [ 1.6104, 42.9658 ], [ 1.6104, 42.9657 ], [ 1.6105, 42.9656 ], [ 1.6106, 42.9655 ], [ 1.6107, 42.9654 ], [ 1.6107, 42.9654 ], [ 1.611, 42.965 ], [ 1.6109, 42.965 ], [ 1.611, 42.9649 ], [ 1.6111, 42.9647 ], [ 1.6109, 42.9646 ], [ 1.6107, 42.9649 ], [ 1.6104, 42.9651 ], [ 1.6102, 42.9653 ], [ 1.61, 42.9655 ], [ 1.6098, 42.9657 ], [ 1.6096, 42.9661 ], [ 1.6095, 42.9662 ], [ 1.6093, 42.9664 ], [ 1.6092, 42.9663 ], [ 1.6088, 42.9661 ], [ 1.6092, 42.9658 ], [ 1.6093, 42.9656 ], [ 1.6095, 42.9654 ], [ 1.6097, 42.9652 ], [ 1.6094, 42.965 ], [ 1.6094, 42.9651 ], [ 1.609, 42.9653 ], [ 1.609, 42.9653 ], [ 1.6089, 42.9651 ], [ 1.6089, 42.9649 ], [ 1.6089, 42.9648 ], [ 1.6089, 42.9648 ], [ 1.6089, 42.9647 ], [ 1.6089, 42.9645 ], [ 1.6089, 42.9643 ], [ 1.6089, 42.9643 ], [ 1.6086, 42.9642 ], [ 1.6086, 42.9641 ], [ 1.6085, 42.964 ], [ 1.6083, 42.964 ], [ 1.6081, 42.964 ], [ 1.6074, 42.9639 ], [ 1.6072, 42.9639 ], [ 1.6068, 42.9638 ], [ 1.6066, 42.9638 ], [ 1.6064, 42.9638 ], [ 1.6058, 42.9637 ], [ 1.6054, 42.9636 ], [ 1.6046, 42.9636 ], [ 1.6046, 42.9641 ], [ 1.6046, 42.9644 ] ] ], "type": "Polygon" }, "id": "44", "properties": { "code_commune": "09122", "code_departement": "09", "code_qp": "QP009002", "commune_qp": "Foix", "nom_commune": "Foix", "nom_qp": "Centre Ancien" }, "type": "Feature" }, { "bbox": [ 2.244, 43.5904, 2.2551, 43.5952 ], "geometry": { "coordinates": [ [ [ 2.244, 43.593 ], [ 2.2441, 43.5931 ], [ 2.2442, 43.5932 ], [ 2.2446, 43.593 ], [ 2.2452, 43.5927 ], [ 2.2458, 43.5925 ], [ 2.2464, 43.5924 ], [ 2.2467, 43.5924 ], [ 2.2471, 43.5924 ], [ 2.2475, 43.5925 ], [ 2.2481, 43.5927 ], [ 2.2483, 43.5927 ], [ 2.2484, 43.5927 ], [ 2.249, 43.5927 ], [ 2.249, 43.5926 ], [ 2.2491, 43.5925 ], [ 2.2496, 43.5925 ], [ 2.2497, 43.5926 ], [ 2.2497, 43.5929 ], [ 2.2499, 43.5931 ], [ 2.2503, 43.5929 ], [ 2.2503, 43.5928 ], [ 2.2505, 43.5927 ], [ 2.2505, 43.5926 ], [ 2.2506, 43.5925 ], [ 2.2501, 43.5921 ], [ 2.2501, 43.592 ], [ 2.2502, 43.5919 ], [ 2.2516, 43.5919 ], [ 2.2517, 43.5919 ], [ 2.2519, 43.5921 ], [ 2.252, 43.5928 ], [ 2.2525, 43.5933 ], [ 2.2523, 43.5934 ], [ 2.2528, 43.5938 ], [ 2.2529, 43.5937 ], [ 2.253, 43.5937 ], [ 2.2533, 43.594 ], [ 2.2536, 43.5943 ], [ 2.2532, 43.5946 ], [ 2.2531, 43.5946 ], [ 2.2531, 43.5947 ], [ 2.2531, 43.5952 ], [ 2.2537, 43.5951 ], [ 2.2539, 43.5951 ], [ 2.2543, 43.5949 ], [ 2.2544, 43.5948 ], [ 2.2546, 43.5947 ], [ 2.2546, 43.5945 ], [ 2.2548, 43.5941 ], [ 2.2551, 43.5934 ], [ 2.2545, 43.5928 ], [ 2.2542, 43.5929 ], [ 2.2542, 43.5928 ], [ 2.2542, 43.5928 ], [ 2.254, 43.5926 ], [ 2.2536, 43.5928 ], [ 2.2533, 43.5926 ], [ 2.2535, 43.5925 ], [ 2.2532, 43.5922 ], [ 2.2528, 43.5924 ], [ 2.2527, 43.5923 ], [ 2.2527, 43.5923 ], [ 2.253, 43.5921 ], [ 2.2531, 43.592 ], [ 2.2533, 43.5919 ], [ 2.2537, 43.5916 ], [ 2.254, 43.5915 ], [ 2.2542, 43.5913 ], [ 2.2542, 43.5913 ], [ 2.2542, 43.5912 ], [ 2.2542, 43.5911 ], [ 2.2534, 43.5907 ], [ 2.2528, 43.5905 ], [ 2.2524, 43.5904 ], [ 2.2521, 43.5906 ], [ 2.2523, 43.5909 ], [ 2.2522, 43.591 ], [ 2.2521, 43.5911 ], [ 2.2518, 43.5908 ], [ 2.2517, 43.5907 ], [ 2.2517, 43.5906 ], [ 2.2509, 43.5907 ], [ 2.2508, 43.5905 ], [ 2.2497, 43.5906 ], [ 2.2497, 43.5907 ], [ 2.2494, 43.5908 ], [ 2.2488, 43.591 ], [ 2.2485, 43.5912 ], [ 2.2483, 43.5913 ], [ 2.2483, 43.5913 ], [ 2.2482, 43.5914 ], [ 2.2482, 43.5916 ], [ 2.248, 43.5916 ], [ 2.2477, 43.5916 ], [ 2.2472, 43.5916 ], [ 2.247, 43.5916 ], [ 2.247, 43.5915 ], [ 2.2468, 43.5913 ], [ 2.2464, 43.5914 ], [ 2.2464, 43.5914 ], [ 2.2457, 43.5916 ], [ 2.2458, 43.5917 ], [ 2.2452, 43.5918 ], [ 2.2448, 43.5919 ], [ 2.2447, 43.5919 ], [ 2.2446, 43.5918 ], [ 2.2443, 43.5919 ], [ 2.2442, 43.592 ], [ 2.2441, 43.5921 ], [ 2.244, 43.5923 ], [ 2.244, 43.5924 ], [ 2.244, 43.5927 ], [ 2.244, 43.593 ] ] ], "type": "Polygon" }, "id": "45", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081003", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Lameilhé" }, "type": "Feature" }, { "bbox": [ 1.4792, 43.5738, 1.4848, 43.5778 ], "geometry": { "coordinates": [ [ [ 1.4801, 43.5777 ], [ 1.4802, 43.5778 ], [ 1.4804, 43.5778 ], [ 1.4815, 43.5772 ], [ 1.4816, 43.5772 ], [ 1.4818, 43.5772 ], [ 1.4818, 43.5772 ], [ 1.482, 43.5771 ], [ 1.482, 43.5771 ], [ 1.4821, 43.5769 ], [ 1.4822, 43.5769 ], [ 1.4822, 43.5768 ], [ 1.4827, 43.5765 ], [ 1.483, 43.5764 ], [ 1.4833, 43.5764 ], [ 1.4834, 43.5764 ], [ 1.4838, 43.5761 ], [ 1.484, 43.576 ], [ 1.4842, 43.5758 ], [ 1.4844, 43.5757 ], [ 1.4845, 43.5756 ], [ 1.4846, 43.5754 ], [ 1.4846, 43.5754 ], [ 1.4847, 43.5753 ], [ 1.4848, 43.5753 ], [ 1.4848, 43.5753 ], [ 1.4845, 43.5751 ], [ 1.4843, 43.575 ], [ 1.4841, 43.5749 ], [ 1.4843, 43.5748 ], [ 1.4836, 43.5747 ], [ 1.4837, 43.5744 ], [ 1.4837, 43.5744 ], [ 1.4838, 43.574 ], [ 1.4838, 43.5739 ], [ 1.4839, 43.5738 ], [ 1.4837, 43.5738 ], [ 1.4835, 43.5738 ], [ 1.4835, 43.5738 ], [ 1.4833, 43.5738 ], [ 1.4819, 43.5747 ], [ 1.4818, 43.5748 ], [ 1.4817, 43.5749 ], [ 1.4816, 43.5749 ], [ 1.4814, 43.575 ], [ 1.4812, 43.5751 ], [ 1.4802, 43.5756 ], [ 1.4794, 43.576 ], [ 1.4793, 43.5761 ], [ 1.4792, 43.5763 ], [ 1.4792, 43.5763 ], [ 1.4792, 43.5764 ], [ 1.4793, 43.5768 ], [ 1.4794, 43.5772 ], [ 1.4798, 43.5778 ], [ 1.4798, 43.5778 ], [ 1.4801, 43.5777 ] ] ], "type": "Polygon" }, "id": "46", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031013", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Saint Exupéry" }, "type": "Feature" }, { "bbox": [ 1.073, 44.0999, 1.0904, 44.1069 ], "geometry": { "coordinates": [ [ [ 1.0777, 44.102 ], [ 1.0779, 44.1021 ], [ 1.078, 44.1022 ], [ 1.0784, 44.1024 ], [ 1.0787, 44.1025 ], [ 1.0796, 44.1028 ], [ 1.0807, 44.1032 ], [ 1.0818, 44.1036 ], [ 1.0818, 44.1037 ], [ 1.0819, 44.1037 ], [ 1.082, 44.1038 ], [ 1.0821, 44.1037 ], [ 1.0826, 44.1039 ], [ 1.0832, 44.1043 ], [ 1.0837, 44.1045 ], [ 1.0838, 44.1047 ], [ 1.0838, 44.1047 ], [ 1.0838, 44.1051 ], [ 1.0838, 44.1054 ], [ 1.0839, 44.1062 ], [ 1.084, 44.1065 ], [ 1.0844, 44.1065 ], [ 1.0844, 44.1066 ], [ 1.0844, 44.1067 ], [ 1.0846, 44.1068 ], [ 1.0847, 44.1068 ], [ 1.0849, 44.1068 ], [ 1.0851, 44.1068 ], [ 1.0853, 44.1068 ], [ 1.0854, 44.1068 ], [ 1.0858, 44.1069 ], [ 1.086, 44.1068 ], [ 1.0862, 44.1068 ], [ 1.0871, 44.1068 ], [ 1.0871, 44.1067 ], [ 1.0871, 44.1065 ], [ 1.0871, 44.1063 ], [ 1.0874, 44.1063 ], [ 1.0874, 44.1063 ], [ 1.0901, 44.1063 ], [ 1.0901, 44.1061 ], [ 1.0902, 44.106 ], [ 1.0901, 44.106 ], [ 1.0901, 44.1059 ], [ 1.0902, 44.106 ], [ 1.0902, 44.1059 ], [ 1.0902, 44.1059 ], [ 1.0902, 44.1058 ], [ 1.0903, 44.1057 ], [ 1.0902, 44.1057 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1056 ], [ 1.0903, 44.1055 ], [ 1.0902, 44.1055 ], [ 1.0902, 44.1055 ], [ 1.0904, 44.1055 ], [ 1.0904, 44.1054 ], [ 1.0903, 44.1052 ], [ 1.0902, 44.1053 ], [ 1.0899, 44.1053 ], [ 1.0893, 44.1054 ], [ 1.0895, 44.1053 ], [ 1.0897, 44.105 ], [ 1.0888, 44.1045 ], [ 1.0884, 44.1044 ], [ 1.0885, 44.1042 ], [ 1.0887, 44.1041 ], [ 1.0886, 44.1041 ], [ 1.0883, 44.1039 ], [ 1.088, 44.1039 ], [ 1.0879, 44.1039 ], [ 1.0879, 44.1039 ], [ 1.0878, 44.1037 ], [ 1.0877, 44.1036 ], [ 1.0875, 44.1035 ], [ 1.0879, 44.1034 ], [ 1.0878, 44.1029 ], [ 1.0872, 44.1031 ], [ 1.0871, 44.1032 ], [ 1.0869, 44.1029 ], [ 1.0868, 44.1028 ], [ 1.0867, 44.1026 ], [ 1.0865, 44.1024 ], [ 1.0864, 44.1023 ], [ 1.0863, 44.1022 ], [ 1.086, 44.1021 ], [ 1.0855, 44.102 ], [ 1.0853, 44.102 ], [ 1.0852, 44.1018 ], [ 1.0851, 44.1016 ], [ 1.085, 44.1015 ], [ 1.0847, 44.1009 ], [ 1.0844, 44.1004 ], [ 1.0844, 44.1003 ], [ 1.0841, 44.1 ], [ 1.084, 44.1 ], [ 1.0838, 44.1 ], [ 1.0837, 44.1 ], [ 1.0835, 44.1 ], [ 1.0835, 44.1 ], [ 1.0833, 44.1 ], [ 1.083, 44.0999 ], [ 1.0823, 44.1 ], [ 1.0818, 44.1 ], [ 1.0817, 44.1 ], [ 1.0814, 44.1001 ], [ 1.0811, 44.1002 ], [ 1.0799, 44.1004 ], [ 1.0788, 44.1006 ], [ 1.0786, 44.1006 ], [ 1.0782, 44.1006 ], [ 1.0781, 44.1007 ], [ 1.078, 44.1005 ], [ 1.0778, 44.0999 ], [ 1.0771, 44.1 ], [ 1.0751, 44.1 ], [ 1.0747, 44.1001 ], [ 1.0738, 44.1002 ], [ 1.0731, 44.1001 ], [ 1.0732, 44.1005 ], [ 1.0731, 44.1008 ], [ 1.073, 44.1014 ], [ 1.0742, 44.1016 ], [ 1.0745, 44.1015 ], [ 1.0746, 44.1015 ], [ 1.0747, 44.1015 ], [ 1.0747, 44.1014 ], [ 1.0751, 44.1014 ], [ 1.0754, 44.1014 ], [ 1.0757, 44.1014 ], [ 1.0766, 44.1013 ], [ 1.0769, 44.1013 ], [ 1.0771, 44.1013 ], [ 1.0774, 44.1014 ], [ 1.0775, 44.1015 ], [ 1.0776, 44.1019 ], [ 1.0777, 44.102 ] ] ], "type": "Polygon" }, "id": "47", "properties": { "code_commune": "82112", "code_departement": "82", "code_qp": "QP082003", "commune_qp": "Moissac", "nom_commune": "Moissac", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.4487, 44.4585, 1.4596, 44.4672 ], "geometry": { "coordinates": [ [ [ 1.4509, 44.4638 ], [ 1.4503, 44.4641 ], [ 1.4506, 44.4645 ], [ 1.4512, 44.4652 ], [ 1.452, 44.4648 ], [ 1.4514, 44.4643 ], [ 1.4521, 44.464 ], [ 1.4524, 44.4639 ], [ 1.4525, 44.4638 ], [ 1.4529, 44.4637 ], [ 1.4537, 44.4633 ], [ 1.4543, 44.4639 ], [ 1.4545, 44.4638 ], [ 1.4553, 44.4633 ], [ 1.4554, 44.4633 ], [ 1.4555, 44.4632 ], [ 1.4558, 44.4632 ], [ 1.4559, 44.4633 ], [ 1.4559, 44.4634 ], [ 1.456, 44.4635 ], [ 1.456, 44.4635 ], [ 1.4559, 44.4635 ], [ 1.4558, 44.4635 ], [ 1.4556, 44.4635 ], [ 1.4562, 44.464 ], [ 1.4565, 44.4642 ], [ 1.4568, 44.4645 ], [ 1.4567, 44.4646 ], [ 1.4565, 44.4647 ], [ 1.4566, 44.4648 ], [ 1.4566, 44.4651 ], [ 1.4568, 44.4653 ], [ 1.457, 44.4654 ], [ 1.4576, 44.4654 ], [ 1.4578, 44.4653 ], [ 1.458, 44.4658 ], [ 1.458, 44.4661 ], [ 1.4581, 44.4663 ], [ 1.4583, 44.4665 ], [ 1.4577, 44.4668 ], [ 1.458, 44.467 ], [ 1.4581, 44.4672 ], [ 1.4589, 44.4671 ], [ 1.459, 44.4671 ], [ 1.4589, 44.4667 ], [ 1.4589, 44.4667 ], [ 1.4591, 44.4667 ], [ 1.4592, 44.4667 ], [ 1.4593, 44.4666 ], [ 1.4593, 44.4666 ], [ 1.4594, 44.4666 ], [ 1.4596, 44.4666 ], [ 1.4596, 44.4664 ], [ 1.4596, 44.4662 ], [ 1.4595, 44.466 ], [ 1.4594, 44.4654 ], [ 1.4594, 44.4653 ], [ 1.459, 44.4653 ], [ 1.4589, 44.4651 ], [ 1.4589, 44.4651 ], [ 1.4585, 44.4651 ], [ 1.4584, 44.4648 ], [ 1.4584, 44.4646 ], [ 1.4584, 44.4644 ], [ 1.4584, 44.4642 ], [ 1.4584, 44.464 ], [ 1.4585, 44.4639 ], [ 1.4585, 44.4638 ], [ 1.4586, 44.4637 ], [ 1.4586, 44.4636 ], [ 1.4583, 44.4633 ], [ 1.457, 44.4622 ], [ 1.4559, 44.4614 ], [ 1.4552, 44.4608 ], [ 1.4547, 44.4604 ], [ 1.4541, 44.4607 ], [ 1.4537, 44.4608 ], [ 1.4535, 44.461 ], [ 1.4531, 44.4611 ], [ 1.4529, 44.4612 ], [ 1.4529, 44.4612 ], [ 1.4521, 44.4613 ], [ 1.4521, 44.4614 ], [ 1.452, 44.4614 ], [ 1.4519, 44.4611 ], [ 1.4518, 44.461 ], [ 1.4518, 44.4609 ], [ 1.4517, 44.4609 ], [ 1.4522, 44.4607 ], [ 1.4526, 44.4606 ], [ 1.4533, 44.4603 ], [ 1.4531, 44.46 ], [ 1.4518, 44.4605 ], [ 1.4515, 44.4607 ], [ 1.4514, 44.4607 ], [ 1.4512, 44.4608 ], [ 1.4509, 44.4609 ], [ 1.4507, 44.4605 ], [ 1.4505, 44.4601 ], [ 1.4503, 44.46 ], [ 1.4501, 44.4597 ], [ 1.4497, 44.4593 ], [ 1.4491, 44.4586 ], [ 1.4489, 44.4585 ], [ 1.4488, 44.4587 ], [ 1.4487, 44.4588 ], [ 1.4487, 44.4589 ], [ 1.4488, 44.459 ], [ 1.4489, 44.4595 ], [ 1.449, 44.4595 ], [ 1.4494, 44.46 ], [ 1.4489, 44.4601 ], [ 1.4491, 44.4603 ], [ 1.4493, 44.4607 ], [ 1.4496, 44.4611 ], [ 1.4498, 44.4615 ], [ 1.4499, 44.4619 ], [ 1.4502, 44.4628 ], [ 1.4502, 44.463 ], [ 1.4503, 44.4631 ], [ 1.4508, 44.4637 ], [ 1.4509, 44.4638 ] ] ], "type": "Polygon" }, "id": "48", "properties": { "code_commune": "46042", "code_departement": "46", "code_qp": "QP046001", "commune_qp": "Cahors", "nom_commune": "Cahors", "nom_qp": "Terre Rouge" }, "type": "Feature" }, { "bbox": [ 2.3371, 43.2234, 2.3456, 43.2272 ], "geometry": { "coordinates": [ [ [ 2.3455, 43.2244 ], [ 2.3456, 43.2242 ], [ 2.3456, 43.2241 ], [ 2.3455, 43.224 ], [ 2.3454, 43.224 ], [ 2.3452, 43.224 ], [ 2.3451, 43.224 ], [ 2.3447, 43.224 ], [ 2.3447, 43.224 ], [ 2.3448, 43.2238 ], [ 2.3441, 43.2236 ], [ 2.3439, 43.2235 ], [ 2.3437, 43.2235 ], [ 2.3432, 43.2234 ], [ 2.3432, 43.2236 ], [ 2.344, 43.2239 ], [ 2.3443, 43.224 ], [ 2.3443, 43.2243 ], [ 2.3443, 43.2243 ], [ 2.3442, 43.2247 ], [ 2.3441, 43.2247 ], [ 2.3439, 43.2253 ], [ 2.3438, 43.2253 ], [ 2.3428, 43.2252 ], [ 2.3428, 43.2252 ], [ 2.3428, 43.2251 ], [ 2.3427, 43.2251 ], [ 2.3425, 43.2251 ], [ 2.3424, 43.2251 ], [ 2.3419, 43.225 ], [ 2.3419, 43.225 ], [ 2.3418, 43.225 ], [ 2.3416, 43.225 ], [ 2.3411, 43.2249 ], [ 2.3409, 43.2248 ], [ 2.3405, 43.2247 ], [ 2.3399, 43.2246 ], [ 2.3398, 43.2246 ], [ 2.3396, 43.2245 ], [ 2.3394, 43.2246 ], [ 2.3391, 43.2245 ], [ 2.3391, 43.2246 ], [ 2.339, 43.2248 ], [ 2.339, 43.2251 ], [ 2.3389, 43.2252 ], [ 2.3389, 43.2252 ], [ 2.3388, 43.2253 ], [ 2.3388, 43.2253 ], [ 2.3385, 43.2257 ], [ 2.3384, 43.2258 ], [ 2.3381, 43.2261 ], [ 2.338, 43.2261 ], [ 2.3376, 43.2265 ], [ 2.3374, 43.2266 ], [ 2.3372, 43.2269 ], [ 2.3371, 43.2271 ], [ 2.3372, 43.2271 ], [ 2.3382, 43.2272 ], [ 2.3383, 43.2269 ], [ 2.3393, 43.2269 ], [ 2.3396, 43.2269 ], [ 2.3401, 43.2269 ], [ 2.3403, 43.2269 ], [ 2.3407, 43.2269 ], [ 2.3411, 43.2268 ], [ 2.3419, 43.2266 ], [ 2.3425, 43.2265 ], [ 2.3429, 43.2264 ], [ 2.3433, 43.2263 ], [ 2.3438, 43.2262 ], [ 2.344, 43.2262 ], [ 2.3449, 43.2263 ], [ 2.345, 43.2263 ], [ 2.345, 43.2258 ], [ 2.345, 43.2255 ], [ 2.3451, 43.2251 ], [ 2.3451, 43.225 ], [ 2.3452, 43.2249 ], [ 2.3455, 43.2244 ] ] ], "type": "Polygon" }, "id": "49", "properties": { "code_commune": "11069", "code_departement": "11", "code_qp": "QP011005", "commune_qp": "Carcassonne", "nom_commune": "Carcassonne", "nom_qp": "Fleming La Reille" }, "type": "Feature" }, { "bbox": [ 2.0317, 44.3495, 2.0405, 44.3571 ], "geometry": { "coordinates": [ [ [ 2.0348, 44.3523 ], [ 2.0343, 44.3523 ], [ 2.0345, 44.3527 ], [ 2.0347, 44.3531 ], [ 2.0346, 44.3532 ], [ 2.0349, 44.3534 ], [ 2.035, 44.3534 ], [ 2.0352, 44.3535 ], [ 2.0354, 44.3536 ], [ 2.0357, 44.3537 ], [ 2.0363, 44.3538 ], [ 2.0368, 44.3539 ], [ 2.0368, 44.3539 ], [ 2.0374, 44.354 ], [ 2.0377, 44.354 ], [ 2.0379, 44.3541 ], [ 2.0378, 44.3542 ], [ 2.0374, 44.3542 ], [ 2.0372, 44.3543 ], [ 2.037, 44.3546 ], [ 2.0368, 44.3548 ], [ 2.0367, 44.355 ], [ 2.0365, 44.3552 ], [ 2.0364, 44.3555 ], [ 2.0361, 44.3554 ], [ 2.036, 44.3554 ], [ 2.0357, 44.3554 ], [ 2.0352, 44.3556 ], [ 2.0348, 44.355 ], [ 2.0337, 44.3554 ], [ 2.0331, 44.3555 ], [ 2.0329, 44.3556 ], [ 2.0323, 44.3555 ], [ 2.0321, 44.3559 ], [ 2.0319, 44.3561 ], [ 2.0319, 44.3561 ], [ 2.032, 44.3562 ], [ 2.0318, 44.3564 ], [ 2.0317, 44.3566 ], [ 2.0319, 44.3568 ], [ 2.0326, 44.3566 ], [ 2.0327, 44.3565 ], [ 2.0327, 44.3566 ], [ 2.0329, 44.3571 ], [ 2.0331, 44.3571 ], [ 2.0332, 44.3569 ], [ 2.0334, 44.3569 ], [ 2.0336, 44.357 ], [ 2.0337, 44.3568 ], [ 2.0338, 44.3566 ], [ 2.0341, 44.3566 ], [ 2.0339, 44.3563 ], [ 2.034, 44.3562 ], [ 2.0346, 44.356 ], [ 2.0348, 44.3558 ], [ 2.0351, 44.3558 ], [ 2.0352, 44.3558 ], [ 2.0357, 44.356 ], [ 2.036, 44.3557 ], [ 2.0362, 44.3558 ], [ 2.0365, 44.356 ], [ 2.0364, 44.3561 ], [ 2.0363, 44.3564 ], [ 2.0373, 44.3567 ], [ 2.0375, 44.3563 ], [ 2.0373, 44.3557 ], [ 2.038, 44.3555 ], [ 2.0379, 44.3554 ], [ 2.0377, 44.3551 ], [ 2.0375, 44.355 ], [ 2.038, 44.3548 ], [ 2.0379, 44.3545 ], [ 2.038, 44.3545 ], [ 2.0379, 44.3544 ], [ 2.0381, 44.3543 ], [ 2.0382, 44.3544 ], [ 2.0385, 44.3544 ], [ 2.0387, 44.3544 ], [ 2.0387, 44.3544 ], [ 2.0387, 44.354 ], [ 2.0387, 44.3539 ], [ 2.0388, 44.3536 ], [ 2.0391, 44.353 ], [ 2.0394, 44.3526 ], [ 2.0396, 44.3522 ], [ 2.04, 44.3517 ], [ 2.0404, 44.3513 ], [ 2.0404, 44.3512 ], [ 2.0405, 44.3509 ], [ 2.0404, 44.3508 ], [ 2.0401, 44.3507 ], [ 2.0397, 44.3503 ], [ 2.0395, 44.3501 ], [ 2.0394, 44.35 ], [ 2.0385, 44.3498 ], [ 2.0381, 44.3497 ], [ 2.0378, 44.3497 ], [ 2.0371, 44.3495 ], [ 2.0365, 44.3495 ], [ 2.0362, 44.35 ], [ 2.0361, 44.35 ], [ 2.0365, 44.35 ], [ 2.0366, 44.3501 ], [ 2.0367, 44.3502 ], [ 2.0367, 44.3505 ], [ 2.0367, 44.3506 ], [ 2.0368, 44.3509 ], [ 2.0369, 44.3511 ], [ 2.0363, 44.3513 ], [ 2.0351, 44.3519 ], [ 2.0348, 44.3521 ], [ 2.0348, 44.3521 ], [ 2.0348, 44.3522 ], [ 2.0348, 44.3523 ] ] ], "type": "Polygon" }, "id": "50", "properties": { "code_commune": "12300", "code_departement": "12", "code_qp": "QP012002", "commune_qp": "Villefranche-de-Rouergue", "nom_commune": "Villefranche-de-Rouergue", "nom_qp": "La Bastide" }, "type": "Feature" }, { "bbox": [ 1.3795, 43.6375, 1.3879, 43.6403 ], "geometry": { "coordinates": [ [ [ 1.3819, 43.6376 ], [ 1.3815, 43.6377 ], [ 1.381, 43.6379 ], [ 1.3807, 43.638 ], [ 1.3804, 43.6381 ], [ 1.3801, 43.6382 ], [ 1.38, 43.6383 ], [ 1.3795, 43.6385 ], [ 1.3801, 43.6394 ], [ 1.3801, 43.6394 ], [ 1.3799, 43.6394 ], [ 1.38, 43.6395 ], [ 1.3804, 43.6396 ], [ 1.3805, 43.6396 ], [ 1.3806, 43.6393 ], [ 1.3807, 43.6393 ], [ 1.3808, 43.6395 ], [ 1.381, 43.6399 ], [ 1.3815, 43.6399 ], [ 1.3815, 43.6398 ], [ 1.3816, 43.6397 ], [ 1.3819, 43.6398 ], [ 1.3819, 43.6398 ], [ 1.3826, 43.6397 ], [ 1.3828, 43.6398 ], [ 1.3829, 43.6395 ], [ 1.3853, 43.6397 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6401 ], [ 1.3852, 43.6402 ], [ 1.3853, 43.6402 ], [ 1.3859, 43.6403 ], [ 1.3862, 43.6403 ], [ 1.3863, 43.6403 ], [ 1.3865, 43.6401 ], [ 1.3867, 43.6399 ], [ 1.387, 43.6397 ], [ 1.387, 43.6397 ], [ 1.3872, 43.6398 ], [ 1.3879, 43.6392 ], [ 1.3866, 43.639 ], [ 1.3857, 43.6389 ], [ 1.3856, 43.6389 ], [ 1.3856, 43.6389 ], [ 1.3856, 43.639 ], [ 1.3855, 43.639 ], [ 1.3854, 43.6391 ], [ 1.3853, 43.639 ], [ 1.3831, 43.6389 ], [ 1.3836, 43.6376 ], [ 1.3835, 43.6375 ], [ 1.3833, 43.6375 ], [ 1.383, 43.6375 ], [ 1.3824, 43.6376 ], [ 1.3819, 43.6376 ] ] ], "type": "Polygon" }, "id": "51", "properties": { "code_commune": "31069", "code_departement": "31", "code_qp": "QP031004", "commune_qp": "Blagnac", "nom_commune": "Blagnac", "nom_qp": "Barradels" }, "type": "Feature" }, { "bbox": [ 1.4736, 43.608, 1.4801, 43.6149 ], "geometry": { "coordinates": [ [ [ 1.4736, 43.6126 ], [ 1.4753, 43.6133 ], [ 1.4758, 43.6136 ], [ 1.4761, 43.6138 ], [ 1.4764, 43.6135 ], [ 1.478, 43.6143 ], [ 1.4792, 43.6149 ], [ 1.4799, 43.6142 ], [ 1.48, 43.6142 ], [ 1.4801, 43.614 ], [ 1.4785, 43.6132 ], [ 1.478, 43.6129 ], [ 1.4774, 43.6126 ], [ 1.4773, 43.6123 ], [ 1.4772, 43.612 ], [ 1.4776, 43.6116 ], [ 1.4786, 43.6106 ], [ 1.4791, 43.6101 ], [ 1.4779, 43.6096 ], [ 1.4774, 43.6093 ], [ 1.4781, 43.6086 ], [ 1.4767, 43.608 ], [ 1.4762, 43.6086 ], [ 1.476, 43.6087 ], [ 1.4759, 43.6088 ], [ 1.4753, 43.6095 ], [ 1.4753, 43.6095 ], [ 1.4753, 43.6096 ], [ 1.4753, 43.6096 ], [ 1.4755, 43.6097 ], [ 1.4769, 43.6104 ], [ 1.4762, 43.6112 ], [ 1.4767, 43.6114 ], [ 1.4774, 43.6117 ], [ 1.4771, 43.612 ], [ 1.4772, 43.6125 ], [ 1.4771, 43.6125 ], [ 1.4767, 43.6123 ], [ 1.476, 43.6119 ], [ 1.4756, 43.6117 ], [ 1.4754, 43.6116 ], [ 1.4748, 43.6122 ], [ 1.4742, 43.6119 ], [ 1.4736, 43.6126 ] ] ], "type": "Polygon" }, "id": "52", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031014", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Soupetard" }, "type": "Feature" }, { "bbox": [ 2.8921, 42.6847, 2.8956, 42.6892 ], "geometry": { "coordinates": [ [ [ 2.8956, 42.6868 ], [ 2.8955, 42.6868 ], [ 2.8954, 42.6866 ], [ 2.8955, 42.6867 ], [ 2.8948, 42.6861 ], [ 2.8946, 42.6859 ], [ 2.8945, 42.6858 ], [ 2.8945, 42.6857 ], [ 2.8944, 42.6857 ], [ 2.8944, 42.6855 ], [ 2.8943, 42.6852 ], [ 2.8947, 42.6852 ], [ 2.8946, 42.6852 ], [ 2.8945, 42.685 ], [ 2.8943, 42.6847 ], [ 2.8939, 42.6848 ], [ 2.8935, 42.685 ], [ 2.8933, 42.6851 ], [ 2.8933, 42.6853 ], [ 2.8933, 42.6854 ], [ 2.8934, 42.6858 ], [ 2.8929, 42.6858 ], [ 2.8928, 42.6858 ], [ 2.8923, 42.6858 ], [ 2.8921, 42.6859 ], [ 2.8922, 42.686 ], [ 2.8922, 42.6867 ], [ 2.8923, 42.6867 ], [ 2.8923, 42.6868 ], [ 2.8923, 42.6871 ], [ 2.8924, 42.6873 ], [ 2.8925, 42.6876 ], [ 2.8927, 42.6881 ], [ 2.8928, 42.688 ], [ 2.8928, 42.688 ], [ 2.8928, 42.6881 ], [ 2.8928, 42.6883 ], [ 2.893, 42.6886 ], [ 2.893, 42.6887 ], [ 2.8931, 42.6889 ], [ 2.8931, 42.6889 ], [ 2.8932, 42.6891 ], [ 2.8932, 42.6892 ], [ 2.8935, 42.689 ], [ 2.8936, 42.6889 ], [ 2.8937, 42.6889 ], [ 2.8937, 42.6888 ], [ 2.8937, 42.6888 ], [ 2.8947, 42.6881 ], [ 2.895, 42.6878 ], [ 2.8951, 42.6878 ], [ 2.8954, 42.6873 ], [ 2.8956, 42.6869 ], [ 2.8956, 42.6868 ] ] ], "type": "Polygon" }, "id": "53", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066006", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Rois De Majorque" }, "type": "Feature" }, { "bbox": [ 2.892, 42.7241, 2.9024, 42.729 ], "geometry": { "coordinates": [ [ [ 2.8942, 42.7246 ], [ 2.8936, 42.7241 ], [ 2.8931, 42.7245 ], [ 2.8923, 42.7251 ], [ 2.8923, 42.7251 ], [ 2.892, 42.7253 ], [ 2.8932, 42.7264 ], [ 2.8945, 42.7275 ], [ 2.8949, 42.7278 ], [ 2.8952, 42.728 ], [ 2.896, 42.7285 ], [ 2.8964, 42.7288 ], [ 2.897, 42.7283 ], [ 2.897, 42.7284 ], [ 2.8975, 42.7287 ], [ 2.8977, 42.7289 ], [ 2.8979, 42.729 ], [ 2.8991, 42.7281 ], [ 2.8993, 42.728 ], [ 2.8994, 42.7281 ], [ 2.8996, 42.7279 ], [ 2.8999, 42.7278 ], [ 2.9001, 42.7276 ], [ 2.9003, 42.7279 ], [ 2.9004, 42.7279 ], [ 2.9007, 42.7282 ], [ 2.9007, 42.7282 ], [ 2.9011, 42.7286 ], [ 2.9018, 42.7281 ], [ 2.9019, 42.728 ], [ 2.9021, 42.7278 ], [ 2.9022, 42.7277 ], [ 2.9023, 42.7274 ], [ 2.9024, 42.7273 ], [ 2.9008, 42.7271 ], [ 2.9007, 42.7271 ], [ 2.9, 42.727 ], [ 2.8999, 42.7269 ], [ 2.8997, 42.7269 ], [ 2.8983, 42.7267 ], [ 2.8983, 42.7266 ], [ 2.8988, 42.7262 ], [ 2.8985, 42.726 ], [ 2.8982, 42.7258 ], [ 2.8981, 42.7257 ], [ 2.8979, 42.7256 ], [ 2.8979, 42.7255 ], [ 2.8978, 42.7255 ], [ 2.8977, 42.7255 ], [ 2.8977, 42.7255 ], [ 2.8975, 42.7255 ], [ 2.8974, 42.7254 ], [ 2.8974, 42.7254 ], [ 2.8972, 42.7253 ], [ 2.8971, 42.7253 ], [ 2.897, 42.7254 ], [ 2.8969, 42.7255 ], [ 2.8965, 42.7257 ], [ 2.8963, 42.7259 ], [ 2.8962, 42.7258 ], [ 2.896, 42.726 ], [ 2.8953, 42.7255 ], [ 2.8953, 42.7255 ], [ 2.8942, 42.7246 ] ] ], "type": "Polygon" }, "id": "54", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066009", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Nouveau Logis" }, "type": "Feature" }, { "bbox": [ 3.8654, 43.6347, 3.8703, 43.6395 ], "geometry": { "coordinates": [ [ [ 3.8667, 43.635 ], [ 3.8668, 43.635 ], [ 3.8666, 43.6353 ], [ 3.8659, 43.6351 ], [ 3.8657, 43.6357 ], [ 3.8663, 43.6358 ], [ 3.8664, 43.6359 ], [ 3.8659, 43.6363 ], [ 3.8654, 43.6367 ], [ 3.8659, 43.6369 ], [ 3.8662, 43.637 ], [ 3.8667, 43.6373 ], [ 3.8665, 43.6375 ], [ 3.8671, 43.6378 ], [ 3.8673, 43.6383 ], [ 3.8686, 43.6389 ], [ 3.8691, 43.6391 ], [ 3.87, 43.6395 ], [ 3.8695, 43.6389 ], [ 3.869, 43.6384 ], [ 3.869, 43.6383 ], [ 3.8693, 43.6381 ], [ 3.8694, 43.6379 ], [ 3.8697, 43.638 ], [ 3.8699, 43.6381 ], [ 3.8699, 43.6381 ], [ 3.8699, 43.6379 ], [ 3.8697, 43.6378 ], [ 3.8701, 43.6377 ], [ 3.8703, 43.6376 ], [ 3.8703, 43.6372 ], [ 3.8696, 43.6364 ], [ 3.8687, 43.6364 ], [ 3.8684, 43.6358 ], [ 3.8683, 43.6357 ], [ 3.8682, 43.6355 ], [ 3.8682, 43.6352 ], [ 3.8682, 43.6349 ], [ 3.8681, 43.6348 ], [ 3.8679, 43.6347 ], [ 3.8676, 43.6347 ], [ 3.867, 43.6347 ], [ 3.8668, 43.6347 ], [ 3.8667, 43.6349 ], [ 3.8667, 43.6349 ], [ 3.8667, 43.635 ] ] ], "type": "Polygon" }, "id": "55", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034015", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Vert-Bois" }, "type": "Feature" }, { "bbox": [ 1.3685, 44.0085, 1.3867, 44.0176 ], "geometry": { "coordinates": [ [ [ 1.3867, 44.0146 ], [ 1.3866, 44.0144 ], [ 1.3861, 44.0143 ], [ 1.3849, 44.0141 ], [ 1.3845, 44.014 ], [ 1.3838, 44.0139 ], [ 1.3848, 44.0127 ], [ 1.3842, 44.0122 ], [ 1.3836, 44.0117 ], [ 1.3827, 44.011 ], [ 1.3832, 44.0107 ], [ 1.384, 44.0103 ], [ 1.3841, 44.0102 ], [ 1.3841, 44.0102 ], [ 1.3839, 44.0101 ], [ 1.3836, 44.0099 ], [ 1.3833, 44.0096 ], [ 1.383, 44.0093 ], [ 1.3827, 44.009 ], [ 1.3825, 44.0088 ], [ 1.3824, 44.0088 ], [ 1.3821, 44.0088 ], [ 1.3818, 44.0091 ], [ 1.3807, 44.0098 ], [ 1.3813, 44.0103 ], [ 1.3809, 44.0105 ], [ 1.3806, 44.0106 ], [ 1.3804, 44.0108 ], [ 1.3803, 44.0108 ], [ 1.3802, 44.0108 ], [ 1.3802, 44.0108 ], [ 1.3793, 44.0111 ], [ 1.3792, 44.0109 ], [ 1.3789, 44.011 ], [ 1.3789, 44.0111 ], [ 1.3786, 44.0111 ], [ 1.3786, 44.0114 ], [ 1.3782, 44.0114 ], [ 1.3779, 44.0105 ], [ 1.3779, 44.0103 ], [ 1.3786, 44.01 ], [ 1.3787, 44.01 ], [ 1.379, 44.0098 ], [ 1.3797, 44.0097 ], [ 1.3796, 44.0094 ], [ 1.3788, 44.0095 ], [ 1.3787, 44.0085 ], [ 1.3781, 44.0085 ], [ 1.3777, 44.0086 ], [ 1.3774, 44.0086 ], [ 1.3774, 44.0086 ], [ 1.3771, 44.0087 ], [ 1.3764, 44.0087 ], [ 1.3762, 44.0088 ], [ 1.376, 44.0089 ], [ 1.3757, 44.009 ], [ 1.3756, 44.0092 ], [ 1.3747, 44.0099 ], [ 1.3737, 44.011 ], [ 1.3735, 44.0104 ], [ 1.3734, 44.0102 ], [ 1.3734, 44.0102 ], [ 1.3733, 44.0101 ], [ 1.3732, 44.01 ], [ 1.3733, 44.0099 ], [ 1.3732, 44.0097 ], [ 1.3724, 44.0098 ], [ 1.3723, 44.0098 ], [ 1.3721, 44.0098 ], [ 1.3721, 44.0099 ], [ 1.3713, 44.0101 ], [ 1.3716, 44.0107 ], [ 1.3718, 44.0109 ], [ 1.3713, 44.0111 ], [ 1.3711, 44.0112 ], [ 1.3708, 44.0107 ], [ 1.3703, 44.0108 ], [ 1.3704, 44.0109 ], [ 1.3698, 44.0111 ], [ 1.3697, 44.0112 ], [ 1.3699, 44.0116 ], [ 1.3693, 44.0116 ], [ 1.3688, 44.0117 ], [ 1.3685, 44.012 ], [ 1.3698, 44.0128 ], [ 1.3701, 44.0127 ], [ 1.3704, 44.0128 ], [ 1.371, 44.0132 ], [ 1.3718, 44.0138 ], [ 1.3719, 44.0138 ], [ 1.3729, 44.015 ], [ 1.3735, 44.0157 ], [ 1.3742, 44.0153 ], [ 1.3751, 44.0161 ], [ 1.3759, 44.0168 ], [ 1.3761, 44.017 ], [ 1.3766, 44.0172 ], [ 1.3773, 44.0166 ], [ 1.378, 44.016 ], [ 1.3779, 44.0159 ], [ 1.3774, 44.0156 ], [ 1.377, 44.0153 ], [ 1.3769, 44.0155 ], [ 1.3764, 44.0152 ], [ 1.3763, 44.0153 ], [ 1.3754, 44.0145 ], [ 1.3758, 44.0142 ], [ 1.3763, 44.014 ], [ 1.3754, 44.0129 ], [ 1.3754, 44.0128 ], [ 1.375, 44.0122 ], [ 1.3751, 44.0122 ], [ 1.3744, 44.0121 ], [ 1.374, 44.012 ], [ 1.3739, 44.0121 ], [ 1.3737, 44.0112 ], [ 1.3739, 44.0109 ], [ 1.3751, 44.0108 ], [ 1.3754, 44.0108 ], [ 1.3756, 44.0106 ], [ 1.3764, 44.0105 ], [ 1.3766, 44.0105 ], [ 1.3767, 44.0107 ], [ 1.3766, 44.0107 ], [ 1.3765, 44.0107 ], [ 1.3762, 44.0108 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.0109 ], [ 1.3762, 44.011 ], [ 1.3763, 44.0112 ], [ 1.3762, 44.0112 ], [ 1.3761, 44.0112 ], [ 1.3757, 44.0112 ], [ 1.3757, 44.0113 ], [ 1.3757, 44.0113 ], [ 1.3758, 44.0118 ], [ 1.3758, 44.0118 ], [ 1.3758, 44.012 ], [ 1.3757, 44.0122 ], [ 1.3765, 44.0122 ], [ 1.3769, 44.0122 ], [ 1.3771, 44.0122 ], [ 1.3773, 44.0123 ], [ 1.3784, 44.0124 ], [ 1.3786, 44.0125 ], [ 1.3788, 44.0124 ], [ 1.3789, 44.0124 ], [ 1.3792, 44.0124 ], [ 1.3793, 44.0125 ], [ 1.3794, 44.0126 ], [ 1.3804, 44.0128 ], [ 1.3806, 44.0128 ], [ 1.3809, 44.0129 ], [ 1.3812, 44.0131 ], [ 1.3814, 44.0132 ], [ 1.3814, 44.0133 ], [ 1.381, 44.0138 ], [ 1.3825, 44.0143 ], [ 1.3821, 44.0149 ], [ 1.3819, 44.0151 ], [ 1.3813, 44.0158 ], [ 1.3817, 44.0159 ], [ 1.3822, 44.0161 ], [ 1.3829, 44.0164 ], [ 1.3836, 44.0167 ], [ 1.3839, 44.0168 ], [ 1.3841, 44.0168 ], [ 1.3837, 44.0176 ], [ 1.384, 44.0176 ], [ 1.3843, 44.0176 ], [ 1.3847, 44.0169 ], [ 1.3848, 44.017 ], [ 1.3855, 44.0166 ], [ 1.3855, 44.0166 ], [ 1.3858, 44.0164 ], [ 1.3857, 44.016 ], [ 1.3864, 44.0156 ], [ 1.3863, 44.015 ], [ 1.3863, 44.0149 ], [ 1.3864, 44.0148 ], [ 1.3866, 44.0147 ], [ 1.3867, 44.0146 ], [ 1.3867, 44.0146 ] ] ], "type": "Polygon" }, "id": "56", "properties": { "code_commune": "82121", "code_departement": "82", "code_qp": "QP082002", "commune_qp": "Montauban", "nom_commune": "Montauban", "nom_qp": "Médiathèque - Chambord" }, "type": "Feature" }, { "bbox": [ 2.1581, 43.9249, 2.1666, 43.9301 ], "geometry": { "coordinates": [ [ [ 2.1634, 43.9298 ], [ 2.1645, 43.9293 ], [ 2.1646, 43.9292 ], [ 2.1644, 43.9291 ], [ 2.1648, 43.9287 ], [ 2.165, 43.9286 ], [ 2.1651, 43.9284 ], [ 2.1653, 43.9282 ], [ 2.1652, 43.9279 ], [ 2.1653, 43.9279 ], [ 2.1662, 43.9278 ], [ 2.1661, 43.9278 ], [ 2.1666, 43.9276 ], [ 2.1665, 43.9272 ], [ 2.166, 43.9272 ], [ 2.166, 43.9273 ], [ 2.1659, 43.9274 ], [ 2.1651, 43.9275 ], [ 2.165, 43.9274 ], [ 2.1646, 43.9274 ], [ 2.1646, 43.9273 ], [ 2.1644, 43.9274 ], [ 2.1643, 43.9271 ], [ 2.164, 43.9271 ], [ 2.1639, 43.9267 ], [ 2.1638, 43.9266 ], [ 2.1633, 43.9266 ], [ 2.1632, 43.9261 ], [ 2.1632, 43.9261 ], [ 2.1631, 43.926 ], [ 2.1629, 43.9257 ], [ 2.1623, 43.9257 ], [ 2.1622, 43.9253 ], [ 2.162, 43.9252 ], [ 2.1614, 43.9254 ], [ 2.1613, 43.925 ], [ 2.1607, 43.9252 ], [ 2.1596, 43.9255 ], [ 2.1596, 43.9254 ], [ 2.1592, 43.9249 ], [ 2.159, 43.9249 ], [ 2.1587, 43.925 ], [ 2.1584, 43.9252 ], [ 2.1581, 43.9253 ], [ 2.1587, 43.9267 ], [ 2.1598, 43.9265 ], [ 2.1597, 43.9259 ], [ 2.1603, 43.9259 ], [ 2.1606, 43.9259 ], [ 2.161, 43.9258 ], [ 2.1612, 43.9262 ], [ 2.1612, 43.9264 ], [ 2.1615, 43.9264 ], [ 2.1616, 43.9267 ], [ 2.1615, 43.9267 ], [ 2.1617, 43.9273 ], [ 2.1618, 43.9273 ], [ 2.1618, 43.9273 ], [ 2.1619, 43.9276 ], [ 2.1619, 43.9278 ], [ 2.162, 43.9283 ], [ 2.1616, 43.9284 ], [ 2.1611, 43.9283 ], [ 2.1611, 43.9287 ], [ 2.1611, 43.9288 ], [ 2.1621, 43.9287 ], [ 2.1622, 43.929 ], [ 2.1632, 43.9288 ], [ 2.1633, 43.9293 ], [ 2.1629, 43.9294 ], [ 2.1627, 43.9297 ], [ 2.1628, 43.9297 ], [ 2.1626, 43.9299 ], [ 2.1631, 43.9301 ], [ 2.1632, 43.9301 ], [ 2.1634, 43.9298 ] ] ], "type": "Polygon" }, "id": "57", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081008", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Lapanouse" }, "type": "Feature" }, { "bbox": [ 1.4619, 43.565, 1.4697, 43.5738 ], "geometry": { "coordinates": [ [ [ 1.4636, 43.5734 ], [ 1.4637, 43.5734 ], [ 1.4626, 43.5724 ], [ 1.4639, 43.5722 ], [ 1.4628, 43.5712 ], [ 1.464, 43.5705 ], [ 1.4639, 43.5705 ], [ 1.4641, 43.5704 ], [ 1.4642, 43.5704 ], [ 1.4645, 43.5702 ], [ 1.4647, 43.57 ], [ 1.4648, 43.5693 ], [ 1.4654, 43.5693 ], [ 1.4658, 43.5689 ], [ 1.4664, 43.5692 ], [ 1.4679, 43.5699 ], [ 1.4685, 43.5693 ], [ 1.4692, 43.5686 ], [ 1.4697, 43.5681 ], [ 1.4658, 43.5661 ], [ 1.4652, 43.5657 ], [ 1.4645, 43.565 ], [ 1.464, 43.5656 ], [ 1.4635, 43.5658 ], [ 1.4637, 43.566 ], [ 1.4633, 43.5663 ], [ 1.4634, 43.5677 ], [ 1.4643, 43.5676 ], [ 1.464, 43.569 ], [ 1.4634, 43.5691 ], [ 1.4633, 43.5702 ], [ 1.4619, 43.5705 ], [ 1.4626, 43.5713 ], [ 1.4623, 43.5715 ], [ 1.4627, 43.5719 ], [ 1.462, 43.5725 ], [ 1.4627, 43.5731 ], [ 1.4624, 43.5732 ], [ 1.463, 43.5738 ], [ 1.463, 43.5738 ], [ 1.4636, 43.5734 ] ] ], "type": "Polygon" }, "id": "58", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031015", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Rangueil" }, "type": "Feature" }, { "bbox": [ 2.9733, 43.1814, 2.9962, 43.19 ], "geometry": { "coordinates": [ [ [ 2.9837, 43.1842 ], [ 2.9837, 43.1836 ], [ 2.9812, 43.1837 ], [ 2.9808, 43.1838 ], [ 2.9807, 43.1827 ], [ 2.9807, 43.1827 ], [ 2.981, 43.1827 ], [ 2.9809, 43.1816 ], [ 2.98, 43.1815 ], [ 2.9786, 43.1815 ], [ 2.9779, 43.1814 ], [ 2.9779, 43.1819 ], [ 2.978, 43.1826 ], [ 2.978, 43.1827 ], [ 2.978, 43.1834 ], [ 2.978, 43.1834 ], [ 2.9778, 43.1834 ], [ 2.9776, 43.1834 ], [ 2.9768, 43.1833 ], [ 2.9762, 43.1833 ], [ 2.9761, 43.1833 ], [ 2.976, 43.1833 ], [ 2.9759, 43.1832 ], [ 2.9761, 43.1826 ], [ 2.9761, 43.1826 ], [ 2.9755, 43.1825 ], [ 2.9752, 43.1825 ], [ 2.9751, 43.1825 ], [ 2.975, 43.1825 ], [ 2.9749, 43.1825 ], [ 2.9749, 43.182 ], [ 2.9743, 43.1819 ], [ 2.9743, 43.1821 ], [ 2.9739, 43.1821 ], [ 2.9739, 43.182 ], [ 2.9739, 43.182 ], [ 2.9734, 43.182 ], [ 2.9734, 43.1827 ], [ 2.9733, 43.1831 ], [ 2.9735, 43.1831 ], [ 2.974, 43.1833 ], [ 2.9755, 43.1838 ], [ 2.9757, 43.1839 ], [ 2.9758, 43.1839 ], [ 2.9763, 43.1842 ], [ 2.9764, 43.1842 ], [ 2.9765, 43.1843 ], [ 2.9768, 43.1848 ], [ 2.9768, 43.1849 ], [ 2.9768, 43.1852 ], [ 2.9762, 43.1851 ], [ 2.9762, 43.1858 ], [ 2.9763, 43.1861 ], [ 2.9763, 43.1863 ], [ 2.9765, 43.1864 ], [ 2.9765, 43.1866 ], [ 2.9768, 43.1866 ], [ 2.9769, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9772, 43.1864 ], [ 2.9775, 43.1865 ], [ 2.9775, 43.1864 ], [ 2.9778, 43.1864 ], [ 2.9778, 43.1863 ], [ 2.9782, 43.1864 ], [ 2.9782, 43.1864 ], [ 2.9783, 43.1865 ], [ 2.9783, 43.1865 ], [ 2.9786, 43.1865 ], [ 2.9786, 43.1867 ], [ 2.9785, 43.1868 ], [ 2.9786, 43.1868 ], [ 2.9786, 43.1868 ], [ 2.979, 43.1868 ], [ 2.979, 43.1867 ], [ 2.9789, 43.1866 ], [ 2.9789, 43.1865 ], [ 2.9789, 43.1864 ], [ 2.9789, 43.1861 ], [ 2.9793, 43.1861 ], [ 2.9793, 43.1859 ], [ 2.9786, 43.1859 ], [ 2.9786, 43.1858 ], [ 2.9786, 43.1849 ], [ 2.9786, 43.1846 ], [ 2.979, 43.1847 ], [ 2.9791, 43.1847 ], [ 2.9794, 43.1847 ], [ 2.9798, 43.1847 ], [ 2.981, 43.185 ], [ 2.9811, 43.1847 ], [ 2.981, 43.1846 ], [ 2.981, 43.1841 ], [ 2.9817, 43.1841 ], [ 2.9822, 43.1842 ], [ 2.9824, 43.1841 ], [ 2.9825, 43.1841 ], [ 2.9832, 43.1841 ], [ 2.9832, 43.1841 ], [ 2.9833, 43.1842 ], [ 2.9833, 43.1843 ], [ 2.9836, 43.1855 ], [ 2.9837, 43.1856 ], [ 2.9839, 43.1864 ], [ 2.984, 43.1871 ], [ 2.9836, 43.1871 ], [ 2.984, 43.1877 ], [ 2.9842, 43.188 ], [ 2.9843, 43.1881 ], [ 2.9844, 43.1881 ], [ 2.9847, 43.1882 ], [ 2.9848, 43.1882 ], [ 2.985, 43.1885 ], [ 2.9852, 43.189 ], [ 2.9854, 43.1891 ], [ 2.9854, 43.1891 ], [ 2.9863, 43.1886 ], [ 2.9864, 43.1886 ], [ 2.9864, 43.1887 ], [ 2.9865, 43.1887 ], [ 2.9866, 43.1888 ], [ 2.9867, 43.1888 ], [ 2.9876, 43.1884 ], [ 2.9878, 43.1888 ], [ 2.9881, 43.1891 ], [ 2.9882, 43.1893 ], [ 2.9881, 43.1894 ], [ 2.9885, 43.1898 ], [ 2.9898, 43.189 ], [ 2.9901, 43.1888 ], [ 2.9903, 43.1886 ], [ 2.991, 43.1882 ], [ 2.9913, 43.1886 ], [ 2.9917, 43.1889 ], [ 2.9923, 43.189 ], [ 2.9929, 43.1887 ], [ 2.9933, 43.189 ], [ 2.9936, 43.1892 ], [ 2.9936, 43.1892 ], [ 2.9935, 43.1894 ], [ 2.9935, 43.1895 ], [ 2.9935, 43.1896 ], [ 2.9941, 43.1898 ], [ 2.9947, 43.19 ], [ 2.9949, 43.19 ], [ 2.9951, 43.1898 ], [ 2.9958, 43.1889 ], [ 2.9961, 43.1886 ], [ 2.9962, 43.1884 ], [ 2.9955, 43.1887 ], [ 2.9941, 43.1891 ], [ 2.9934, 43.1885 ], [ 2.993, 43.1881 ], [ 2.9928, 43.1879 ], [ 2.9928, 43.1877 ], [ 2.9929, 43.1877 ], [ 2.9932, 43.1877 ], [ 2.9934, 43.1877 ], [ 2.9939, 43.1878 ], [ 2.9942, 43.1878 ], [ 2.9942, 43.1878 ], [ 2.9943, 43.1877 ], [ 2.995, 43.1877 ], [ 2.9954, 43.1877 ], [ 2.9958, 43.1877 ], [ 2.9961, 43.1876 ], [ 2.9953, 43.1866 ], [ 2.995, 43.1867 ], [ 2.9945, 43.1869 ], [ 2.9946, 43.1871 ], [ 2.9944, 43.1872 ], [ 2.9944, 43.1872 ], [ 2.994, 43.1874 ], [ 2.9939, 43.1874 ], [ 2.9937, 43.1871 ], [ 2.9934, 43.1873 ], [ 2.9931, 43.1874 ], [ 2.9923, 43.1876 ], [ 2.9921, 43.1871 ], [ 2.9919, 43.1871 ], [ 2.992, 43.1871 ], [ 2.9916, 43.1873 ], [ 2.9916, 43.1874 ], [ 2.9915, 43.1874 ], [ 2.9909, 43.1877 ], [ 2.9908, 43.1873 ], [ 2.9907, 43.1871 ], [ 2.9906, 43.187 ], [ 2.9905, 43.187 ], [ 2.9895, 43.1871 ], [ 2.9888, 43.1872 ], [ 2.9877, 43.1872 ], [ 2.9871, 43.1873 ], [ 2.9866, 43.1873 ], [ 2.986, 43.1873 ], [ 2.9858, 43.1871 ], [ 2.9855, 43.187 ], [ 2.9853, 43.187 ], [ 2.9848, 43.187 ], [ 2.9848, 43.1866 ], [ 2.9849, 43.1865 ], [ 2.9848, 43.1859 ], [ 2.9843, 43.1859 ], [ 2.9843, 43.1856 ], [ 2.9843, 43.1855 ], [ 2.985, 43.1855 ], [ 2.9848, 43.1842 ], [ 2.9841, 43.1842 ], [ 2.9837, 43.1842 ] ] ], "type": "Polygon" }, "id": "59", "properties": { "code_commune": "11262", "code_departement": "11", "code_qp": "QP011007", "commune_qp": "Narbonne", "nom_commune": "Narbonne", "nom_qp": "Narbonne Ouest" }, "type": "Feature" }, { "bbox": [ 4.0105, 44.2164, 4.0202, 44.2295 ], "geometry": { "coordinates": [ [ [ 4.0202, 44.2165 ], [ 4.02, 44.2164 ], [ 4.0198, 44.2166 ], [ 4.0197, 44.2168 ], [ 4.0196, 44.2169 ], [ 4.0194, 44.2171 ], [ 4.0192, 44.2172 ], [ 4.0189, 44.2174 ], [ 4.0188, 44.2175 ], [ 4.0187, 44.2176 ], [ 4.0182, 44.2178 ], [ 4.0177, 44.2181 ], [ 4.0169, 44.2185 ], [ 4.0163, 44.2188 ], [ 4.016, 44.2191 ], [ 4.0151, 44.2198 ], [ 4.0147, 44.22 ], [ 4.0144, 44.2203 ], [ 4.0142, 44.2205 ], [ 4.014, 44.2206 ], [ 4.0139, 44.2207 ], [ 4.0139, 44.2208 ], [ 4.0139, 44.2208 ], [ 4.0137, 44.2208 ], [ 4.0136, 44.2208 ], [ 4.0134, 44.221 ], [ 4.0133, 44.2214 ], [ 4.0132, 44.2217 ], [ 4.0132, 44.2218 ], [ 4.0132, 44.2219 ], [ 4.0132, 44.222 ], [ 4.0137, 44.2222 ], [ 4.014, 44.2224 ], [ 4.0138, 44.2226 ], [ 4.0137, 44.2228 ], [ 4.0136, 44.223 ], [ 4.0135, 44.2232 ], [ 4.0134, 44.2234 ], [ 4.0134, 44.2236 ], [ 4.0133, 44.2236 ], [ 4.0132, 44.2239 ], [ 4.0132, 44.224 ], [ 4.0132, 44.2241 ], [ 4.0132, 44.2242 ], [ 4.0131, 44.2246 ], [ 4.0131, 44.2246 ], [ 4.0131, 44.2248 ], [ 4.013, 44.2252 ], [ 4.0129, 44.2255 ], [ 4.0128, 44.2256 ], [ 4.0128, 44.2258 ], [ 4.0127, 44.2259 ], [ 4.0126, 44.2261 ], [ 4.0125, 44.2263 ], [ 4.0124, 44.2265 ], [ 4.0123, 44.2266 ], [ 4.0121, 44.227 ], [ 4.0121, 44.227 ], [ 4.012, 44.227 ], [ 4.0118, 44.2274 ], [ 4.0117, 44.2276 ], [ 4.0116, 44.2277 ], [ 4.0114, 44.2279 ], [ 4.0112, 44.2281 ], [ 4.011, 44.2283 ], [ 4.0108, 44.2284 ], [ 4.0108, 44.2284 ], [ 4.0108, 44.2285 ], [ 4.0108, 44.2285 ], [ 4.0106, 44.2286 ], [ 4.0105, 44.2287 ], [ 4.0106, 44.2289 ], [ 4.0107, 44.2289 ], [ 4.0108, 44.2289 ], [ 4.0108, 44.2289 ], [ 4.011, 44.229 ], [ 4.011, 44.229 ], [ 4.0114, 44.2291 ], [ 4.0112, 44.2294 ], [ 4.0112, 44.2295 ], [ 4.0113, 44.2295 ], [ 4.0114, 44.2295 ], [ 4.0116, 44.2295 ], [ 4.0119, 44.2295 ], [ 4.0121, 44.2295 ], [ 4.0121, 44.2295 ], [ 4.0121, 44.2294 ], [ 4.0122, 44.2293 ], [ 4.0123, 44.2293 ], [ 4.0124, 44.2292 ], [ 4.0128, 44.2292 ], [ 4.0129, 44.229 ], [ 4.0128, 44.229 ], [ 4.0127, 44.229 ], [ 4.0127, 44.229 ], [ 4.0126, 44.229 ], [ 4.0125, 44.2289 ], [ 4.0126, 44.2289 ], [ 4.0125, 44.2289 ], [ 4.0127, 44.2287 ], [ 4.0127, 44.2287 ], [ 4.0127, 44.2287 ], [ 4.0124, 44.2285 ], [ 4.0122, 44.2285 ], [ 4.012, 44.2284 ], [ 4.0118, 44.2283 ], [ 4.0117, 44.2283 ], [ 4.0118, 44.2282 ], [ 4.0118, 44.2282 ], [ 4.0119, 44.2281 ], [ 4.012, 44.2281 ], [ 4.0119, 44.2281 ], [ 4.0119, 44.228 ], [ 4.012, 44.228 ], [ 4.0121, 44.228 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.2281 ], [ 4.0123, 44.228 ], [ 4.0125, 44.228 ], [ 4.0127, 44.2279 ], [ 4.013, 44.2277 ], [ 4.0131, 44.2277 ], [ 4.0131, 44.2276 ], [ 4.0131, 44.2275 ], [ 4.0131, 44.2274 ], [ 4.0131, 44.2273 ], [ 4.0131, 44.2272 ], [ 4.0131, 44.2272 ], [ 4.0136, 44.2272 ], [ 4.0141, 44.2272 ], [ 4.0141, 44.2272 ], [ 4.0142, 44.2272 ], [ 4.0144, 44.2272 ], [ 4.0144, 44.2273 ], [ 4.0144, 44.2274 ], [ 4.0146, 44.2275 ], [ 4.0147, 44.2275 ], [ 4.0147, 44.2275 ], [ 4.0148, 44.2275 ], [ 4.0149, 44.2276 ], [ 4.015, 44.2276 ], [ 4.015, 44.2276 ], [ 4.0151, 44.2277 ], [ 4.0151, 44.2277 ], [ 4.0151, 44.2278 ], [ 4.0152, 44.2278 ], [ 4.0153, 44.2278 ], [ 4.0153, 44.2279 ], [ 4.0154, 44.2279 ], [ 4.0155, 44.228 ], [ 4.0156, 44.2279 ], [ 4.0157, 44.2279 ], [ 4.0157, 44.2279 ], [ 4.0156, 44.2276 ], [ 4.0155, 44.2275 ], [ 4.0155, 44.2274 ], [ 4.0155, 44.2273 ], [ 4.0155, 44.2272 ], [ 4.0155, 44.2271 ], [ 4.0155, 44.2271 ], [ 4.0156, 44.227 ], [ 4.0156, 44.2269 ], [ 4.0157, 44.2268 ], [ 4.0161, 44.2265 ], [ 4.0157, 44.2258 ], [ 4.0152, 44.225 ], [ 4.0152, 44.2245 ], [ 4.0152, 44.2245 ], [ 4.0151, 44.2244 ], [ 4.0151, 44.2243 ], [ 4.015, 44.2242 ], [ 4.015, 44.2242 ], [ 4.0149, 44.224 ], [ 4.0149, 44.2239 ], [ 4.0151, 44.2238 ], [ 4.0154, 44.2236 ], [ 4.0156, 44.2235 ], [ 4.016, 44.2233 ], [ 4.0162, 44.2232 ], [ 4.0163, 44.2232 ], [ 4.0164, 44.2232 ], [ 4.0164, 44.2232 ], [ 4.0166, 44.2235 ], [ 4.0169, 44.224 ], [ 4.0171, 44.2239 ], [ 4.0173, 44.2239 ], [ 4.0174, 44.2238 ], [ 4.018, 44.2237 ], [ 4.018, 44.2237 ], [ 4.018, 44.2238 ], [ 4.0181, 44.224 ], [ 4.0185, 44.2239 ], [ 4.0188, 44.2237 ], [ 4.0187, 44.2236 ], [ 4.0188, 44.2234 ], [ 4.0187, 44.2233 ], [ 4.0187, 44.2231 ], [ 4.0186, 44.2229 ], [ 4.0187, 44.2229 ], [ 4.0185, 44.2228 ], [ 4.0184, 44.2228 ], [ 4.0183, 44.2228 ], [ 4.0182, 44.2227 ], [ 4.0182, 44.2225 ], [ 4.0183, 44.2224 ], [ 4.0186, 44.2223 ], [ 4.0186, 44.2223 ], [ 4.0188, 44.2222 ], [ 4.0188, 44.2222 ], [ 4.019, 44.2221 ], [ 4.0191, 44.2219 ], [ 4.0192, 44.2218 ], [ 4.0194, 44.2218 ], [ 4.0195, 44.2218 ], [ 4.0195, 44.2217 ], [ 4.0192, 44.2216 ], [ 4.0192, 44.2216 ], [ 4.019, 44.2215 ], [ 4.0191, 44.2214 ], [ 4.0189, 44.2213 ], [ 4.0189, 44.2212 ], [ 4.0189, 44.221 ], [ 4.019, 44.221 ], [ 4.019, 44.2209 ], [ 4.019, 44.2208 ], [ 4.019, 44.2208 ], [ 4.0191, 44.2207 ], [ 4.0191, 44.2207 ], [ 4.0191, 44.2206 ], [ 4.0192, 44.2205 ], [ 4.0193, 44.2205 ], [ 4.0196, 44.2202 ], [ 4.0197, 44.2201 ], [ 4.0197, 44.2199 ], [ 4.0202, 44.2196 ], [ 4.02, 44.2195 ], [ 4.0198, 44.2195 ], [ 4.0194, 44.2193 ], [ 4.0194, 44.2192 ], [ 4.0194, 44.2191 ], [ 4.0193, 44.219 ], [ 4.0196, 44.2187 ], [ 4.0197, 44.2186 ], [ 4.0196, 44.2185 ], [ 4.0196, 44.2185 ], [ 4.0196, 44.2184 ], [ 4.0196, 44.2183 ], [ 4.0196, 44.2181 ], [ 4.019, 44.218 ], [ 4.0193, 44.2176 ], [ 4.0193, 44.2175 ], [ 4.0195, 44.2173 ], [ 4.0196, 44.2171 ], [ 4.0199, 44.2167 ], [ 4.0202, 44.2165 ] ] ], "type": "Polygon" }, "id": "60", "properties": { "code_commune": "30132", "code_departement": "30", "code_qp": "QP030017", "commune_qp": "La Grand-Combe", "nom_commune": "La Grand-Combe", "nom_qp": "Trescol - La Levade" }, "type": "Feature" }, { "bbox": [ 3.8707, 43.5912, 3.874, 43.594 ], "geometry": { "coordinates": [ [ [ 3.8721, 43.594 ], [ 3.8726, 43.5937 ], [ 3.8729, 43.5936 ], [ 3.8733, 43.5934 ], [ 3.8734, 43.5933 ], [ 3.8737, 43.5932 ], [ 3.8738, 43.5931 ], [ 3.874, 43.593 ], [ 3.8732, 43.5921 ], [ 3.873, 43.5921 ], [ 3.8729, 43.5921 ], [ 3.8727, 43.5922 ], [ 3.8725, 43.5923 ], [ 3.8723, 43.5921 ], [ 3.8728, 43.5919 ], [ 3.8733, 43.5917 ], [ 3.8727, 43.5912 ], [ 3.8719, 43.5916 ], [ 3.8715, 43.5913 ], [ 3.8707, 43.5917 ], [ 3.8713, 43.5923 ], [ 3.8716, 43.5927 ], [ 3.8712, 43.5929 ], [ 3.8717, 43.5935 ], [ 3.8717, 43.5936 ], [ 3.8721, 43.594 ] ] ], "type": "Polygon" }, "id": "61", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034011", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Lemasson" }, "type": "Feature" }, { "bbox": [ 3.8982, 43.6178, 3.9038, 43.6215 ], "geometry": { "coordinates": [ [ [ 3.9006, 43.6185 ], [ 3.9002, 43.6184 ], [ 3.8991, 43.6183 ], [ 3.8988, 43.6183 ], [ 3.8986, 43.6183 ], [ 3.8982, 43.6184 ], [ 3.8983, 43.6185 ], [ 3.8986, 43.6188 ], [ 3.8988, 43.6189 ], [ 3.899, 43.619 ], [ 3.8994, 43.6192 ], [ 3.8996, 43.6193 ], [ 3.8997, 43.6193 ], [ 3.8999, 43.6194 ], [ 3.9002, 43.6194 ], [ 3.9005, 43.6194 ], [ 3.9007, 43.6195 ], [ 3.9008, 43.6196 ], [ 3.901, 43.6197 ], [ 3.901, 43.6198 ], [ 3.9011, 43.6199 ], [ 3.9011, 43.62 ], [ 3.9015, 43.6203 ], [ 3.9016, 43.6204 ], [ 3.9017, 43.6205 ], [ 3.9017, 43.6206 ], [ 3.9016, 43.621 ], [ 3.9016, 43.621 ], [ 3.9017, 43.6212 ], [ 3.9018, 43.6213 ], [ 3.9019, 43.6213 ], [ 3.9021, 43.6214 ], [ 3.9026, 43.6214 ], [ 3.9029, 43.6214 ], [ 3.9031, 43.6215 ], [ 3.9033, 43.6215 ], [ 3.9034, 43.6215 ], [ 3.9036, 43.6214 ], [ 3.9036, 43.6213 ], [ 3.9037, 43.6213 ], [ 3.9037, 43.6212 ], [ 3.9038, 43.6209 ], [ 3.9038, 43.6208 ], [ 3.9037, 43.6208 ], [ 3.9036, 43.6207 ], [ 3.9034, 43.6206 ], [ 3.9033, 43.6205 ], [ 3.9033, 43.6204 ], [ 3.9034, 43.6201 ], [ 3.9034, 43.62 ], [ 3.9037, 43.6198 ], [ 3.9038, 43.6197 ], [ 3.9033, 43.6195 ], [ 3.9032, 43.6195 ], [ 3.9033, 43.6191 ], [ 3.903, 43.6191 ], [ 3.9027, 43.6191 ], [ 3.9023, 43.6191 ], [ 3.9019, 43.6192 ], [ 3.9015, 43.6193 ], [ 3.9009, 43.6194 ], [ 3.9011, 43.6189 ], [ 3.9012, 43.6185 ], [ 3.9014, 43.618 ], [ 3.9014, 43.6179 ], [ 3.9012, 43.6178 ], [ 3.9011, 43.6178 ], [ 3.9009, 43.6178 ], [ 3.9008, 43.6178 ], [ 3.9007, 43.6178 ], [ 3.9007, 43.6179 ], [ 3.9006, 43.6185 ] ] ], "type": "Polygon" }, "id": "62", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034013", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Pompignane" }, "type": "Feature" }, { "bbox": [ 1.1403, 42.9816, 1.1485, 42.9867 ], "geometry": { "coordinates": [ [ [ 1.1438, 42.9863 ], [ 1.1441, 42.9864 ], [ 1.1443, 42.9865 ], [ 1.1445, 42.9866 ], [ 1.1447, 42.9867 ], [ 1.145, 42.9864 ], [ 1.145, 42.9863 ], [ 1.145, 42.9863 ], [ 1.1452, 42.9862 ], [ 1.1453, 42.9863 ], [ 1.1454, 42.9863 ], [ 1.1455, 42.9863 ], [ 1.1454, 42.9862 ], [ 1.1455, 42.9862 ], [ 1.1456, 42.9862 ], [ 1.1456, 42.9862 ], [ 1.1455, 42.9862 ], [ 1.1455, 42.9861 ], [ 1.1455, 42.9861 ], [ 1.1456, 42.9861 ], [ 1.1456, 42.986 ], [ 1.1455, 42.986 ], [ 1.1455, 42.9859 ], [ 1.146, 42.9858 ], [ 1.1465, 42.9857 ], [ 1.1467, 42.9856 ], [ 1.1468, 42.9856 ], [ 1.147, 42.9855 ], [ 1.1472, 42.9853 ], [ 1.1473, 42.9851 ], [ 1.1475, 42.9847 ], [ 1.1485, 42.9829 ], [ 1.1481, 42.9828 ], [ 1.1478, 42.9827 ], [ 1.1474, 42.9828 ], [ 1.1472, 42.9828 ], [ 1.147, 42.9827 ], [ 1.146, 42.9823 ], [ 1.1449, 42.9834 ], [ 1.1448, 42.9835 ], [ 1.1447, 42.9834 ], [ 1.1446, 42.9835 ], [ 1.1445, 42.9836 ], [ 1.1442, 42.9839 ], [ 1.1441, 42.9841 ], [ 1.144, 42.9842 ], [ 1.1435, 42.9844 ], [ 1.1432, 42.9846 ], [ 1.1433, 42.9848 ], [ 1.1427, 42.9857 ], [ 1.1421, 42.9855 ], [ 1.1422, 42.9853 ], [ 1.1429, 42.9842 ], [ 1.1432, 42.984 ], [ 1.1437, 42.9836 ], [ 1.1442, 42.9831 ], [ 1.1442, 42.9832 ], [ 1.1443, 42.9831 ], [ 1.1443, 42.9831 ], [ 1.1443, 42.983 ], [ 1.1442, 42.983 ], [ 1.1444, 42.9829 ], [ 1.1445, 42.9828 ], [ 1.1446, 42.9827 ], [ 1.1449, 42.9825 ], [ 1.1452, 42.9823 ], [ 1.1455, 42.9819 ], [ 1.1454, 42.9819 ], [ 1.1451, 42.9818 ], [ 1.1451, 42.9817 ], [ 1.1449, 42.9816 ], [ 1.1448, 42.9817 ], [ 1.1446, 42.9816 ], [ 1.1446, 42.9817 ], [ 1.1443, 42.9816 ], [ 1.1441, 42.9817 ], [ 1.1443, 42.9818 ], [ 1.1442, 42.9818 ], [ 1.1441, 42.9819 ], [ 1.144, 42.982 ], [ 1.1439, 42.982 ], [ 1.1438, 42.9821 ], [ 1.1439, 42.9821 ], [ 1.1436, 42.9825 ], [ 1.1435, 42.9824 ], [ 1.1434, 42.9824 ], [ 1.1433, 42.9825 ], [ 1.1432, 42.983 ], [ 1.1432, 42.9832 ], [ 1.1431, 42.9833 ], [ 1.1427, 42.9838 ], [ 1.1425, 42.984 ], [ 1.1413, 42.9852 ], [ 1.1412, 42.9851 ], [ 1.1406, 42.9849 ], [ 1.1403, 42.9854 ], [ 1.1412, 42.9858 ], [ 1.1413, 42.9859 ], [ 1.1415, 42.986 ], [ 1.1414, 42.9862 ], [ 1.1416, 42.9862 ], [ 1.142, 42.9857 ], [ 1.1426, 42.9859 ], [ 1.1438, 42.9863 ] ] ], "type": "Polygon" }, "id": "63", "properties": { "code_commune": "09261", "code_departement": "09", "code_qp": "QP009001", "commune_qp": "Saint-Girons", "nom_commune": "Saint-Girons", "nom_qp": "Coeur De Ville" }, "type": "Feature" }, { "bbox": [ 2.9697, 42.5983, 2.9755, 42.6013 ], "geometry": { "coordinates": [ [ [ 2.9716, 42.6011 ], [ 2.9718, 42.601 ], [ 2.972, 42.601 ], [ 2.9723, 42.601 ], [ 2.9725, 42.6009 ], [ 2.9727, 42.6009 ], [ 2.9733, 42.601 ], [ 2.9737, 42.6011 ], [ 2.9743, 42.6012 ], [ 2.9744, 42.6012 ], [ 2.9745, 42.6012 ], [ 2.9746, 42.6011 ], [ 2.975, 42.601 ], [ 2.975, 42.6009 ], [ 2.9751, 42.6008 ], [ 2.9751, 42.6006 ], [ 2.9751, 42.6006 ], [ 2.9755, 42.5995 ], [ 2.9755, 42.5993 ], [ 2.9755, 42.5992 ], [ 2.9753, 42.599 ], [ 2.9751, 42.5989 ], [ 2.9749, 42.5988 ], [ 2.9735, 42.5985 ], [ 2.9735, 42.5984 ], [ 2.9734, 42.5983 ], [ 2.9732, 42.5985 ], [ 2.9732, 42.5985 ], [ 2.9731, 42.5985 ], [ 2.9732, 42.5985 ], [ 2.9731, 42.5986 ], [ 2.973, 42.5987 ], [ 2.9728, 42.5987 ], [ 2.9728, 42.5987 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5988 ], [ 2.9727, 42.5987 ], [ 2.9726, 42.5986 ], [ 2.9724, 42.5986 ], [ 2.9722, 42.5987 ], [ 2.9722, 42.5987 ], [ 2.9722, 42.5988 ], [ 2.9723, 42.5989 ], [ 2.9724, 42.599 ], [ 2.9725, 42.5991 ], [ 2.9725, 42.5992 ], [ 2.9725, 42.5993 ], [ 2.9724, 42.5993 ], [ 2.9723, 42.5994 ], [ 2.9721, 42.5995 ], [ 2.9721, 42.5995 ], [ 2.972, 42.5995 ], [ 2.9719, 42.5994 ], [ 2.9718, 42.5994 ], [ 2.9716, 42.5994 ], [ 2.9716, 42.5995 ], [ 2.9715, 42.5996 ], [ 2.9715, 42.5996 ], [ 2.9714, 42.5996 ], [ 2.9711, 42.5995 ], [ 2.9711, 42.5995 ], [ 2.971, 42.5995 ], [ 2.9709, 42.5994 ], [ 2.9709, 42.5993 ], [ 2.9706, 42.5993 ], [ 2.9701, 42.5993 ], [ 2.9699, 42.5994 ], [ 2.9698, 42.5993 ], [ 2.9697, 42.5993 ], [ 2.9697, 42.5994 ], [ 2.9698, 42.5996 ], [ 2.9698, 42.5997 ], [ 2.9699, 42.5998 ], [ 2.97, 42.6 ], [ 2.97, 42.6001 ], [ 2.9701, 42.6003 ], [ 2.9702, 42.6004 ], [ 2.9702, 42.6005 ], [ 2.9703, 42.6006 ], [ 2.9704, 42.6006 ], [ 2.9704, 42.6006 ], [ 2.9703, 42.6009 ], [ 2.9703, 42.601 ], [ 2.9705, 42.601 ], [ 2.9709, 42.6011 ], [ 2.971, 42.6011 ], [ 2.971, 42.6012 ], [ 2.971, 42.6013 ], [ 2.9711, 42.6013 ], [ 2.9712, 42.6012 ], [ 2.9716, 42.6011 ] ] ], "type": "Polygon" }, "id": "64", "properties": { "code_commune": "66065", "code_departement": "66", "code_qp": "QP066001", "commune_qp": "Elne", "nom_commune": "Elne", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 2.8899, 42.6937, 2.9034, 42.7007 ], "geometry": { "coordinates": [ [ [ 2.9033, 42.6991 ], [ 2.9034, 42.6991 ], [ 2.9033, 42.699 ], [ 2.903, 42.6988 ], [ 2.9026, 42.6991 ], [ 2.9026, 42.6991 ], [ 2.9025, 42.699 ], [ 2.9023, 42.699 ], [ 2.9022, 42.6989 ], [ 2.9023, 42.6989 ], [ 2.9022, 42.6988 ], [ 2.9018, 42.6985 ], [ 2.902, 42.6984 ], [ 2.9021, 42.6983 ], [ 2.9023, 42.6982 ], [ 2.9021, 42.698 ], [ 2.9023, 42.6979 ], [ 2.9024, 42.6979 ], [ 2.9026, 42.6978 ], [ 2.9025, 42.6977 ], [ 2.9024, 42.6976 ], [ 2.9024, 42.6975 ], [ 2.9024, 42.6975 ], [ 2.9023, 42.6974 ], [ 2.9022, 42.6973 ], [ 2.9022, 42.6973 ], [ 2.9021, 42.6972 ], [ 2.9021, 42.6972 ], [ 2.902, 42.6971 ], [ 2.902, 42.697 ], [ 2.9019, 42.6969 ], [ 2.9018, 42.6966 ], [ 2.9018, 42.6965 ], [ 2.9017, 42.6964 ], [ 2.9017, 42.6962 ], [ 2.9017, 42.696 ], [ 2.9017, 42.6959 ], [ 2.9017, 42.6959 ], [ 2.9014, 42.6957 ], [ 2.9011, 42.6956 ], [ 2.901, 42.6955 ], [ 2.9006, 42.6952 ], [ 2.9002, 42.6955 ], [ 2.8995, 42.6961 ], [ 2.8992, 42.6962 ], [ 2.8989, 42.6964 ], [ 2.8988, 42.6963 ], [ 2.8988, 42.6961 ], [ 2.8988, 42.6961 ], [ 2.8983, 42.6961 ], [ 2.8982, 42.696 ], [ 2.8976, 42.6957 ], [ 2.8973, 42.6955 ], [ 2.8972, 42.6955 ], [ 2.8972, 42.6955 ], [ 2.8971, 42.6956 ], [ 2.8971, 42.6956 ], [ 2.8966, 42.6952 ], [ 2.8964, 42.6952 ], [ 2.8963, 42.6952 ], [ 2.896, 42.6953 ], [ 2.8956, 42.6951 ], [ 2.8954, 42.695 ], [ 2.8954, 42.6949 ], [ 2.8953, 42.6949 ], [ 2.895, 42.6948 ], [ 2.8947, 42.6948 ], [ 2.8946, 42.6948 ], [ 2.8936, 42.6948 ], [ 2.8929, 42.6947 ], [ 2.8928, 42.6951 ], [ 2.8927, 42.6951 ], [ 2.8926, 42.695 ], [ 2.8925, 42.6949 ], [ 2.8924, 42.6948 ], [ 2.8923, 42.6946 ], [ 2.8922, 42.6945 ], [ 2.8921, 42.6944 ], [ 2.8921, 42.6943 ], [ 2.892, 42.6942 ], [ 2.8916, 42.6939 ], [ 2.8915, 42.6939 ], [ 2.8913, 42.6937 ], [ 2.8903, 42.6944 ], [ 2.8906, 42.6946 ], [ 2.8908, 42.6947 ], [ 2.8906, 42.6949 ], [ 2.8904, 42.6951 ], [ 2.8901, 42.6952 ], [ 2.8899, 42.6954 ], [ 2.89, 42.6955 ], [ 2.8901, 42.6956 ], [ 2.8903, 42.6957 ], [ 2.8904, 42.6958 ], [ 2.8908, 42.696 ], [ 2.8913, 42.6964 ], [ 2.8911, 42.6966 ], [ 2.8913, 42.6968 ], [ 2.8917, 42.6971 ], [ 2.892, 42.6973 ], [ 2.8922, 42.6975 ], [ 2.8923, 42.6976 ], [ 2.8922, 42.6977 ], [ 2.892, 42.698 ], [ 2.8922, 42.6981 ], [ 2.8923, 42.6981 ], [ 2.8923, 42.6982 ], [ 2.8925, 42.6984 ], [ 2.8925, 42.6986 ], [ 2.8925, 42.6986 ], [ 2.8925, 42.6987 ], [ 2.8923, 42.6987 ], [ 2.8924, 42.6989 ], [ 2.8925, 42.6991 ], [ 2.8929, 42.6995 ], [ 2.8931, 42.6997 ], [ 2.8933, 42.7 ], [ 2.8935, 42.7002 ], [ 2.8936, 42.7003 ], [ 2.8937, 42.7003 ], [ 2.8938, 42.7001 ], [ 2.8941, 42.7003 ], [ 2.8941, 42.7003 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8942, 42.7004 ], [ 2.8943, 42.7004 ], [ 2.8945, 42.7004 ], [ 2.8948, 42.7005 ], [ 2.895, 42.7006 ], [ 2.8951, 42.7005 ], [ 2.8953, 42.7003 ], [ 2.8953, 42.7003 ], [ 2.8954, 42.7004 ], [ 2.8954, 42.7003 ], [ 2.8957, 42.7 ], [ 2.8958, 42.7 ], [ 2.8959, 42.6999 ], [ 2.8959, 42.6999 ], [ 2.896, 42.6998 ], [ 2.8961, 42.6997 ], [ 2.8963, 42.6996 ], [ 2.8963, 42.6996 ], [ 2.8964, 42.6995 ], [ 2.8965, 42.6995 ], [ 2.8965, 42.6995 ], [ 2.8966, 42.6994 ], [ 2.8966, 42.6994 ], [ 2.8967, 42.6995 ], [ 2.8967, 42.6995 ], [ 2.8969, 42.6995 ], [ 2.8969, 42.6995 ], [ 2.897, 42.6995 ], [ 2.8972, 42.6996 ], [ 2.8973, 42.6996 ], [ 2.8974, 42.6996 ], [ 2.8974, 42.6996 ], [ 2.8975, 42.6996 ], [ 2.8977, 42.6997 ], [ 2.8978, 42.6997 ], [ 2.8979, 42.6997 ], [ 2.8981, 42.6997 ], [ 2.8982, 42.6997 ], [ 2.8983, 42.6995 ], [ 2.8986, 42.6996 ], [ 2.8988, 42.6996 ], [ 2.8997, 42.6992 ], [ 2.8999, 42.6994 ], [ 2.9004, 42.6999 ], [ 2.9006, 42.7002 ], [ 2.9005, 42.7003 ], [ 2.9007, 42.7004 ], [ 2.9008, 42.7005 ], [ 2.9011, 42.7007 ], [ 2.9018, 42.7001 ], [ 2.9025, 42.6995 ], [ 2.9028, 42.6997 ], [ 2.9033, 42.6992 ], [ 2.9032, 42.6992 ], [ 2.9033, 42.6991 ] ] ], "type": "Polygon" }, "id": "65", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066008", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Centre Ancien" }, "type": "Feature" }, { "bbox": [ 1.4331, 43.6327, 1.4456, 43.6435 ], "geometry": { "coordinates": [ [ [ 1.4331, 43.6346 ], [ 1.4331, 43.635 ], [ 1.4331, 43.6353 ], [ 1.4333, 43.636 ], [ 1.4349, 43.6358 ], [ 1.435, 43.6359 ], [ 1.4366, 43.6357 ], [ 1.4368, 43.6362 ], [ 1.4376, 43.6361 ], [ 1.4373, 43.6364 ], [ 1.4382, 43.6367 ], [ 1.439, 43.6366 ], [ 1.4391, 43.6369 ], [ 1.4391, 43.6375 ], [ 1.4392, 43.6382 ], [ 1.4399, 43.6382 ], [ 1.4418, 43.6384 ], [ 1.4418, 43.6385 ], [ 1.4419, 43.6388 ], [ 1.4419, 43.6389 ], [ 1.4418, 43.6393 ], [ 1.4417, 43.64 ], [ 1.4416, 43.6404 ], [ 1.4392, 43.6403 ], [ 1.4391, 43.6418 ], [ 1.4391, 43.6429 ], [ 1.4406, 43.6431 ], [ 1.4413, 43.6432 ], [ 1.4419, 43.6432 ], [ 1.4422, 43.6435 ], [ 1.4434, 43.6431 ], [ 1.4445, 43.6429 ], [ 1.4444, 43.6423 ], [ 1.4444, 43.6409 ], [ 1.4444, 43.6401 ], [ 1.4451, 43.6401 ], [ 1.4451, 43.6395 ], [ 1.4453, 43.6395 ], [ 1.4452, 43.639 ], [ 1.4454, 43.6389 ], [ 1.4453, 43.6379 ], [ 1.4456, 43.6379 ], [ 1.4455, 43.6376 ], [ 1.4454, 43.6373 ], [ 1.4448, 43.6374 ], [ 1.4447, 43.6372 ], [ 1.4447, 43.6369 ], [ 1.4447, 43.6364 ], [ 1.4446, 43.636 ], [ 1.4442, 43.6361 ], [ 1.4441, 43.6356 ], [ 1.4439, 43.6356 ], [ 1.4439, 43.6354 ], [ 1.4434, 43.6356 ], [ 1.4426, 43.635 ], [ 1.4419, 43.6344 ], [ 1.4417, 43.6341 ], [ 1.4413, 43.6332 ], [ 1.4411, 43.6328 ], [ 1.441, 43.6327 ], [ 1.44, 43.6346 ], [ 1.4392, 43.6344 ], [ 1.4391, 43.6346 ], [ 1.4389, 43.6346 ], [ 1.4383, 43.6348 ], [ 1.4379, 43.6348 ], [ 1.4378, 43.6346 ], [ 1.4377, 43.6345 ], [ 1.4368, 43.6345 ], [ 1.4368, 43.6345 ], [ 1.4369, 43.6346 ], [ 1.4369, 43.6347 ], [ 1.4367, 43.6347 ], [ 1.4365, 43.6347 ], [ 1.4364, 43.6348 ], [ 1.4364, 43.6349 ], [ 1.4363, 43.6349 ], [ 1.436, 43.635 ], [ 1.4356, 43.635 ], [ 1.4356, 43.6346 ], [ 1.4356, 43.6343 ], [ 1.4342, 43.6344 ], [ 1.4342, 43.6346 ], [ 1.4341, 43.6346 ], [ 1.4335, 43.6346 ], [ 1.4331, 43.6346 ] ] ], "type": "Polygon" }, "id": "66", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031011", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Les Izards - La Vache" }, "type": "Feature" }, { "bbox": [ 0.0491, 43.2277, 0.0564, 43.2315 ], "geometry": { "coordinates": [ [ [ 0.0497, 43.2288 ], [ 0.05, 43.229 ], [ 0.0503, 43.2292 ], [ 0.0507, 43.2293 ], [ 0.0513, 43.2294 ], [ 0.0518, 43.2293 ], [ 0.0523, 43.2293 ], [ 0.0528, 43.2293 ], [ 0.0535, 43.2293 ], [ 0.0543, 43.2294 ], [ 0.0546, 43.2295 ], [ 0.0546, 43.2296 ], [ 0.0546, 43.23 ], [ 0.054, 43.23 ], [ 0.054, 43.2301 ], [ 0.054, 43.2302 ], [ 0.0539, 43.2315 ], [ 0.0546, 43.2315 ], [ 0.0546, 43.2313 ], [ 0.0547, 43.2311 ], [ 0.0548, 43.2309 ], [ 0.0549, 43.231 ], [ 0.0556, 43.231 ], [ 0.0558, 43.231 ], [ 0.0558, 43.2309 ], [ 0.0564, 43.2309 ], [ 0.0564, 43.2303 ], [ 0.0564, 43.2296 ], [ 0.0559, 43.2296 ], [ 0.0557, 43.2296 ], [ 0.0555, 43.2295 ], [ 0.0556, 43.2293 ], [ 0.0548, 43.2293 ], [ 0.0547, 43.2293 ], [ 0.0543, 43.2293 ], [ 0.0543, 43.228 ], [ 0.0539, 43.2281 ], [ 0.0534, 43.2281 ], [ 0.0534, 43.2277 ], [ 0.052, 43.2278 ], [ 0.0504, 43.2278 ], [ 0.0497, 43.2278 ], [ 0.0497, 43.2279 ], [ 0.0496, 43.2279 ], [ 0.0493, 43.2279 ], [ 0.0493, 43.228 ], [ 0.0493, 43.228 ], [ 0.0492, 43.2281 ], [ 0.0492, 43.2281 ], [ 0.0491, 43.2281 ], [ 0.0491, 43.2282 ], [ 0.0495, 43.2285 ], [ 0.0497, 43.2288 ], [ 0.0497, 43.2288 ] ] ], "type": "Polygon" }, "id": "67", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065001", "commune_qp": "Tarbes", "nom_commune": "Tarbes", "nom_qp": "Tarbes Ouest" }, "type": "Feature" }, { "bbox": [ 3.8367, 43.5925, 3.8495, 43.6013 ], "geometry": { "coordinates": [ [ [ 3.8479, 43.5999 ], [ 3.8475, 43.5997 ], [ 3.8472, 43.5994 ], [ 3.8466, 43.5987 ], [ 3.8464, 43.5985 ], [ 3.8469, 43.5984 ], [ 3.8467, 43.5979 ], [ 3.8464, 43.5974 ], [ 3.8459, 43.5977 ], [ 3.8455, 43.5972 ], [ 3.8457, 43.5971 ], [ 3.846, 43.597 ], [ 3.8458, 43.5968 ], [ 3.8463, 43.5965 ], [ 3.846, 43.5962 ], [ 3.845, 43.5966 ], [ 3.8436, 43.5972 ], [ 3.8428, 43.5976 ], [ 3.8418, 43.5966 ], [ 3.8422, 43.5965 ], [ 3.8421, 43.5964 ], [ 3.8418, 43.5961 ], [ 3.8415, 43.5959 ], [ 3.8413, 43.5956 ], [ 3.841, 43.5956 ], [ 3.8409, 43.5955 ], [ 3.8407, 43.5954 ], [ 3.8404, 43.5952 ], [ 3.8401, 43.595 ], [ 3.8398, 43.5947 ], [ 3.8401, 43.5944 ], [ 3.8404, 43.5946 ], [ 3.8405, 43.5945 ], [ 3.8408, 43.5946 ], [ 3.841, 43.5944 ], [ 3.8412, 43.5942 ], [ 3.8414, 43.5943 ], [ 3.8414, 43.5943 ], [ 3.8415, 43.5943 ], [ 3.8416, 43.5943 ], [ 3.8418, 43.5943 ], [ 3.8424, 43.5946 ], [ 3.8425, 43.5946 ], [ 3.8425, 43.5946 ], [ 3.8426, 43.5946 ], [ 3.8431, 43.5935 ], [ 3.8431, 43.5934 ], [ 3.843, 43.5934 ], [ 3.8425, 43.5935 ], [ 3.8422, 43.5929 ], [ 3.8417, 43.5926 ], [ 3.8416, 43.5925 ], [ 3.8415, 43.5925 ], [ 3.8407, 43.5932 ], [ 3.8406, 43.5932 ], [ 3.8405, 43.5933 ], [ 3.8399, 43.5931 ], [ 3.8396, 43.593 ], [ 3.8388, 43.5942 ], [ 3.8386, 43.5942 ], [ 3.8385, 43.5943 ], [ 3.8388, 43.5946 ], [ 3.8385, 43.5948 ], [ 3.8382, 43.5946 ], [ 3.8378, 43.5948 ], [ 3.8376, 43.5947 ], [ 3.8374, 43.5949 ], [ 3.8372, 43.595 ], [ 3.8369, 43.5949 ], [ 3.8367, 43.5952 ], [ 3.8369, 43.5953 ], [ 3.837, 43.5955 ], [ 3.8369, 43.5956 ], [ 3.8368, 43.5957 ], [ 3.8368, 43.5958 ], [ 3.8368, 43.5959 ], [ 3.8368, 43.5961 ], [ 3.8369, 43.5961 ], [ 3.8372, 43.5963 ], [ 3.8375, 43.5965 ], [ 3.8378, 43.5966 ], [ 3.8385, 43.5968 ], [ 3.839, 43.5963 ], [ 3.8388, 43.5961 ], [ 3.8391, 43.5958 ], [ 3.8393, 43.5956 ], [ 3.8394, 43.5956 ], [ 3.8395, 43.5957 ], [ 3.8396, 43.5957 ], [ 3.8399, 43.5961 ], [ 3.84, 43.5962 ], [ 3.8401, 43.5964 ], [ 3.8405, 43.5966 ], [ 3.8412, 43.5969 ], [ 3.8415, 43.5971 ], [ 3.8418, 43.5984 ], [ 3.8431, 43.5996 ], [ 3.8454, 43.6008 ], [ 3.8461, 43.6011 ], [ 3.8466, 43.6012 ], [ 3.8484, 43.6013 ], [ 3.8494, 43.601 ], [ 3.8495, 43.6008 ], [ 3.8484, 43.6003 ], [ 3.8479, 43.5999 ] ] ], "type": "Polygon" }, "id": "68", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034007", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Pas Du Loup - Val De Croze" }, "type": "Feature" }, { "bbox": [ 2.5906, 44.3632, 2.6018, 44.3674 ], "geometry": { "coordinates": [ [ [ 2.5926, 44.3671 ], [ 2.5927, 44.3672 ], [ 2.5929, 44.3674 ], [ 2.5933, 44.3672 ], [ 2.594, 44.367 ], [ 2.5947, 44.3668 ], [ 2.5949, 44.3667 ], [ 2.5954, 44.3666 ], [ 2.5956, 44.3665 ], [ 2.5965, 44.3661 ], [ 2.5972, 44.3656 ], [ 2.5977, 44.3652 ], [ 2.598, 44.365 ], [ 2.5988, 44.3655 ], [ 2.5996, 44.3653 ], [ 2.5998, 44.3653 ], [ 2.6001, 44.3652 ], [ 2.6005, 44.3647 ], [ 2.6006, 44.3646 ], [ 2.6006, 44.3646 ], [ 2.6009, 44.3646 ], [ 2.6013, 44.3645 ], [ 2.6014, 44.3645 ], [ 2.6016, 44.3645 ], [ 2.6017, 44.3644 ], [ 2.6018, 44.3643 ], [ 2.6016, 44.3643 ], [ 2.6015, 44.3642 ], [ 2.6013, 44.3641 ], [ 2.6011, 44.3641 ], [ 2.6016, 44.3638 ], [ 2.6018, 44.3634 ], [ 2.6015, 44.3632 ], [ 2.6011, 44.3634 ], [ 2.6009, 44.3635 ], [ 2.6003, 44.3639 ], [ 2.5994, 44.3637 ], [ 2.5991, 44.3636 ], [ 2.5974, 44.3635 ], [ 2.597, 44.3636 ], [ 2.5969, 44.3637 ], [ 2.5967, 44.3638 ], [ 2.5963, 44.3641 ], [ 2.5959, 44.3642 ], [ 2.5955, 44.3643 ], [ 2.5947, 44.3645 ], [ 2.5945, 44.3645 ], [ 2.5942, 44.3645 ], [ 2.5941, 44.3643 ], [ 2.594, 44.3641 ], [ 2.5927, 44.3642 ], [ 2.5924, 44.3642 ], [ 2.5922, 44.3642 ], [ 2.592, 44.3642 ], [ 2.5919, 44.3643 ], [ 2.5918, 44.3644 ], [ 2.5919, 44.3647 ], [ 2.5921, 44.3646 ], [ 2.5921, 44.3648 ], [ 2.5921, 44.3649 ], [ 2.5921, 44.3651 ], [ 2.592, 44.3651 ], [ 2.5919, 44.3652 ], [ 2.5919, 44.3652 ], [ 2.5919, 44.3653 ], [ 2.5919, 44.3653 ], [ 2.5919, 44.3654 ], [ 2.592, 44.3654 ], [ 2.592, 44.3655 ], [ 2.5918, 44.3656 ], [ 2.5918, 44.3657 ], [ 2.5911, 44.3657 ], [ 2.5912, 44.3658 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.3659 ], [ 2.5907, 44.366 ], [ 2.5906, 44.3661 ], [ 2.5907, 44.3663 ], [ 2.5908, 44.3663 ], [ 2.5909, 44.3663 ], [ 2.5911, 44.3662 ], [ 2.5913, 44.3664 ], [ 2.592, 44.3664 ], [ 2.5921, 44.3664 ], [ 2.5926, 44.3671 ] ] ], "type": "Polygon" }, "id": "69", "properties": { "code_commune": "12176", "code_departement": "12", "code_qp": "QP012001", "commune_qp": "Onet-le-Château", "nom_commune": "Onet-le-Château", "nom_qp": "Quatre Saisons" }, "type": "Feature" }, { "bbox": [ -0.0437, 43.0836, -0.0404, 43.0895 ], "geometry": { "coordinates": [ [ [ -0.0418, 43.0892 ], [ -0.0417, 43.0895 ], [ -0.0408, 43.0893 ], [ -0.0404, 43.0888 ], [ -0.0405, 43.0885 ], [ -0.0406, 43.0883 ], [ -0.0407, 43.088 ], [ -0.0408, 43.0879 ], [ -0.0408, 43.0878 ], [ -0.0409, 43.0877 ], [ -0.0407, 43.0872 ], [ -0.0407, 43.0869 ], [ -0.0407, 43.0868 ], [ -0.0407, 43.0867 ], [ -0.0412, 43.0865 ], [ -0.0419, 43.0865 ], [ -0.0421, 43.0865 ], [ -0.0421, 43.086 ], [ -0.0421, 43.0851 ], [ -0.0414, 43.0845 ], [ -0.0414, 43.0843 ], [ -0.0414, 43.0841 ], [ -0.0414, 43.0838 ], [ -0.0415, 43.0838 ], [ -0.0416, 43.0837 ], [ -0.0417, 43.0837 ], [ -0.0421, 43.0837 ], [ -0.0429, 43.0836 ], [ -0.0433, 43.0836 ], [ -0.0437, 43.0836 ], [ -0.0437, 43.0837 ], [ -0.0435, 43.0838 ], [ -0.0434, 43.0851 ], [ -0.0433, 43.0851 ], [ -0.0433, 43.0856 ], [ -0.0433, 43.0861 ], [ -0.0433, 43.0861 ], [ -0.0432, 43.0865 ], [ -0.0432, 43.0867 ], [ -0.0431, 43.0867 ], [ -0.043, 43.0875 ], [ -0.0429, 43.0881 ], [ -0.0427, 43.0891 ], [ -0.0427, 43.0893 ], [ -0.0418, 43.0892 ] ] ], "type": "Polygon" }, "id": "70", "properties": { "code_commune": "65286", "code_departement": "65", "code_qp": "QP065004", "commune_qp": "Lourdes", "nom_commune": "Lourdes", "nom_qp": "Ophite" }, "type": "Feature" }, { "bbox": [ 4.3577, 43.8386, 4.3726, 43.8447 ], "geometry": { "coordinates": [ [ [ 4.3726, 43.8407 ], [ 4.3721, 43.8405 ], [ 4.3712, 43.8403 ], [ 4.3707, 43.8402 ], [ 4.3701, 43.8397 ], [ 4.3695, 43.8393 ], [ 4.3691, 43.839 ], [ 4.3688, 43.8388 ], [ 4.3665, 43.8391 ], [ 4.3657, 43.8391 ], [ 4.3645, 43.8392 ], [ 4.3643, 43.8393 ], [ 4.3641, 43.8392 ], [ 4.3637, 43.839 ], [ 4.3634, 43.8392 ], [ 4.3635, 43.8396 ], [ 4.3635, 43.8398 ], [ 4.3635, 43.8398 ], [ 4.363, 43.84 ], [ 4.3629, 43.84 ], [ 4.3626, 43.8393 ], [ 4.3626, 43.8391 ], [ 4.3626, 43.8391 ], [ 4.3626, 43.839 ], [ 4.3625, 43.8389 ], [ 4.3624, 43.8388 ], [ 4.3622, 43.8387 ], [ 4.3621, 43.8387 ], [ 4.362, 43.8386 ], [ 4.3617, 43.8386 ], [ 4.3616, 43.8386 ], [ 4.3615, 43.8387 ], [ 4.3612, 43.8388 ], [ 4.3606, 43.8391 ], [ 4.3605, 43.8391 ], [ 4.3604, 43.8391 ], [ 4.3599, 43.839 ], [ 4.3599, 43.8393 ], [ 4.3599, 43.8395 ], [ 4.3602, 43.84 ], [ 4.3603, 43.8403 ], [ 4.3603, 43.8404 ], [ 4.36, 43.8404 ], [ 4.3598, 43.8405 ], [ 4.3596, 43.8405 ], [ 4.3591, 43.8405 ], [ 4.3589, 43.8405 ], [ 4.3581, 43.8404 ], [ 4.358, 43.8408 ], [ 4.3579, 43.8413 ], [ 4.3579, 43.8415 ], [ 4.3577, 43.8419 ], [ 4.3582, 43.842 ], [ 4.3583, 43.8421 ], [ 4.3582, 43.8423 ], [ 4.3579, 43.8429 ], [ 4.3577, 43.8433 ], [ 4.3582, 43.8433 ], [ 4.3582, 43.8434 ], [ 4.3587, 43.8435 ], [ 4.3587, 43.8435 ], [ 4.3595, 43.8436 ], [ 4.3597, 43.8436 ], [ 4.3602, 43.8436 ], [ 4.3607, 43.8437 ], [ 4.3607, 43.8437 ], [ 4.3615, 43.8438 ], [ 4.3623, 43.8438 ], [ 4.3624, 43.8436 ], [ 4.3625, 43.8434 ], [ 4.3626, 43.8433 ], [ 4.3625, 43.8423 ], [ 4.3624, 43.8416 ], [ 4.3623, 43.841 ], [ 4.3622, 43.8403 ], [ 4.3629, 43.8402 ], [ 4.3649, 43.8401 ], [ 4.3652, 43.8402 ], [ 4.3656, 43.8404 ], [ 4.3663, 43.841 ], [ 4.3672, 43.8417 ], [ 4.3672, 43.8417 ], [ 4.3675, 43.8426 ], [ 4.3676, 43.8428 ], [ 4.3677, 43.8435 ], [ 4.3677, 43.8437 ], [ 4.3677, 43.8442 ], [ 4.3677, 43.8447 ], [ 4.3686, 43.844 ], [ 4.3692, 43.8433 ], [ 4.3696, 43.8429 ], [ 4.3698, 43.8427 ], [ 4.3704, 43.8423 ], [ 4.3704, 43.8423 ], [ 4.3716, 43.8425 ], [ 4.3718, 43.8419 ], [ 4.372, 43.8415 ], [ 4.372, 43.8415 ], [ 4.372, 43.8415 ], [ 4.3722, 43.8415 ], [ 4.3726, 43.8407 ] ] ], "type": "Polygon" }, "id": "71", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030004", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Gambetta-Richelieu" }, "type": "Feature" }, { "bbox": [ 3.8427, 43.617, 3.8555, 43.6246 ], "geometry": { "coordinates": [ [ [ 3.8548, 43.6206 ], [ 3.8549, 43.6201 ], [ 3.8543, 43.6201 ], [ 3.8533, 43.6201 ], [ 3.8521, 43.62 ], [ 3.8505, 43.62 ], [ 3.8482, 43.6213 ], [ 3.8475, 43.6212 ], [ 3.8475, 43.6212 ], [ 3.8474, 43.6212 ], [ 3.847, 43.6213 ], [ 3.8465, 43.621 ], [ 3.8465, 43.621 ], [ 3.8465, 43.6209 ], [ 3.8465, 43.6208 ], [ 3.8459, 43.6207 ], [ 3.8459, 43.6207 ], [ 3.8458, 43.6207 ], [ 3.8458, 43.6205 ], [ 3.8459, 43.6202 ], [ 3.8461, 43.6199 ], [ 3.8462, 43.6198 ], [ 3.8462, 43.6198 ], [ 3.8462, 43.6197 ], [ 3.8463, 43.6196 ], [ 3.8464, 43.6195 ], [ 3.8464, 43.6194 ], [ 3.8465, 43.6192 ], [ 3.8466, 43.6191 ], [ 3.8466, 43.619 ], [ 3.8466, 43.6189 ], [ 3.8466, 43.6187 ], [ 3.8462, 43.6186 ], [ 3.8463, 43.6184 ], [ 3.8469, 43.6179 ], [ 3.8474, 43.618 ], [ 3.8477, 43.6174 ], [ 3.8471, 43.6174 ], [ 3.8465, 43.6175 ], [ 3.8464, 43.6175 ], [ 3.8459, 43.617 ], [ 3.8459, 43.6171 ], [ 3.8458, 43.6171 ], [ 3.8452, 43.6171 ], [ 3.8451, 43.6171 ], [ 3.8439, 43.618 ], [ 3.8442, 43.6181 ], [ 3.8435, 43.6189 ], [ 3.8427, 43.6194 ], [ 3.8436, 43.6198 ], [ 3.8432, 43.6203 ], [ 3.8437, 43.6206 ], [ 3.8435, 43.6209 ], [ 3.8432, 43.6213 ], [ 3.8434, 43.6214 ], [ 3.8435, 43.6215 ], [ 3.8437, 43.6215 ], [ 3.8438, 43.6215 ], [ 3.8443, 43.6215 ], [ 3.8444, 43.6217 ], [ 3.8444, 43.6219 ], [ 3.8446, 43.6219 ], [ 3.8447, 43.622 ], [ 3.844, 43.6225 ], [ 3.8444, 43.623 ], [ 3.8452, 43.6225 ], [ 3.8459, 43.6221 ], [ 3.8468, 43.6218 ], [ 3.8473, 43.6217 ], [ 3.8477, 43.6216 ], [ 3.8478, 43.6217 ], [ 3.8479, 43.6217 ], [ 3.8481, 43.6218 ], [ 3.8481, 43.6218 ], [ 3.8483, 43.6224 ], [ 3.8491, 43.6222 ], [ 3.8492, 43.6222 ], [ 3.8498, 43.6224 ], [ 3.8499, 43.6224 ], [ 3.85, 43.6224 ], [ 3.8504, 43.623 ], [ 3.8495, 43.6234 ], [ 3.8492, 43.6237 ], [ 3.8492, 43.6238 ], [ 3.8492, 43.6238 ], [ 3.8493, 43.6241 ], [ 3.8493, 43.6243 ], [ 3.8494, 43.6243 ], [ 3.8498, 43.6245 ], [ 3.85, 43.6246 ], [ 3.8501, 43.6245 ], [ 3.8504, 43.6244 ], [ 3.8509, 43.624 ], [ 3.8513, 43.6235 ], [ 3.8516, 43.6233 ], [ 3.8519, 43.6231 ], [ 3.852, 43.6231 ], [ 3.8525, 43.6235 ], [ 3.8529, 43.6237 ], [ 3.8537, 43.6231 ], [ 3.8536, 43.623 ], [ 3.8535, 43.6227 ], [ 3.8538, 43.6226 ], [ 3.8542, 43.6226 ], [ 3.8545, 43.6226 ], [ 3.8547, 43.6224 ], [ 3.8555, 43.6219 ], [ 3.855, 43.6217 ], [ 3.855, 43.6217 ], [ 3.8545, 43.6216 ], [ 3.8544, 43.6215 ], [ 3.855, 43.6212 ], [ 3.8551, 43.6211 ], [ 3.8552, 43.6209 ], [ 3.8549, 43.6206 ], [ 3.8548, 43.6206 ] ] ], "type": "Polygon" }, "id": "72", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034008", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Cévennes" }, "type": "Feature" }, { "bbox": [ 4.3816, 43.8369, 4.396, 43.8472 ], "geometry": { "coordinates": [ [ [ 4.3863, 43.8422 ], [ 4.3821, 43.8428 ], [ 4.3817, 43.8429 ], [ 4.3816, 43.843 ], [ 4.3816, 43.8432 ], [ 4.3829, 43.8443 ], [ 4.3826, 43.8444 ], [ 4.3825, 43.8446 ], [ 4.3824, 43.8447 ], [ 4.3821, 43.8448 ], [ 4.3822, 43.8454 ], [ 4.3849, 43.8461 ], [ 4.385, 43.846 ], [ 4.3839, 43.8451 ], [ 4.3843, 43.8449 ], [ 4.3846, 43.8447 ], [ 4.3852, 43.8444 ], [ 4.3856, 43.8445 ], [ 4.3863, 43.8449 ], [ 4.3866, 43.8451 ], [ 4.3871, 43.8453 ], [ 4.3874, 43.8454 ], [ 4.3879, 43.8456 ], [ 4.3884, 43.8458 ], [ 4.3888, 43.846 ], [ 4.3892, 43.8463 ], [ 4.3896, 43.8465 ], [ 4.3898, 43.8466 ], [ 4.39, 43.8466 ], [ 4.3901, 43.8467 ], [ 4.3903, 43.8467 ], [ 4.3905, 43.8468 ], [ 4.3907, 43.8468 ], [ 4.3916, 43.8469 ], [ 4.3929, 43.8469 ], [ 4.3942, 43.8471 ], [ 4.3949, 43.8472 ], [ 4.3959, 43.8471 ], [ 4.396, 43.8469 ], [ 4.3955, 43.8466 ], [ 4.3952, 43.8463 ], [ 4.3949, 43.8461 ], [ 4.3947, 43.8459 ], [ 4.3942, 43.8454 ], [ 4.3935, 43.8448 ], [ 4.3925, 43.8441 ], [ 4.3916, 43.8433 ], [ 4.3913, 43.8431 ], [ 4.3905, 43.8423 ], [ 4.3904, 43.8422 ], [ 4.3903, 43.8421 ], [ 4.39, 43.8418 ], [ 4.3897, 43.8415 ], [ 4.3897, 43.8412 ], [ 4.3895, 43.841 ], [ 4.389, 43.8401 ], [ 4.3885, 43.8389 ], [ 4.3881, 43.8372 ], [ 4.388, 43.837 ], [ 4.3875, 43.8369 ], [ 4.3871, 43.8369 ], [ 4.3869, 43.8375 ], [ 4.3867, 43.8383 ], [ 4.3866, 43.8388 ], [ 4.3866, 43.8389 ], [ 4.3868, 43.839 ], [ 4.3873, 43.8392 ], [ 4.3873, 43.8393 ], [ 4.3872, 43.8396 ], [ 4.3869, 43.8402 ], [ 4.3882, 43.8405 ], [ 4.388, 43.8409 ], [ 4.3885, 43.8411 ], [ 4.3886, 43.8411 ], [ 4.3885, 43.8414 ], [ 4.3874, 43.8412 ], [ 4.3873, 43.8412 ], [ 4.3872, 43.8417 ], [ 4.3867, 43.8416 ], [ 4.3865, 43.8416 ], [ 4.3862, 43.8421 ], [ 4.3863, 43.8422 ] ] ], "type": "Polygon" }, "id": "73", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030005", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Chemin-Bas D'Avignon - Clos D'Orville" }, "type": "Feature" }, { "bbox": [ 4.3932, 43.8528, 4.4027, 43.8608 ], "geometry": { "coordinates": [ [ [ 4.3977, 43.8531 ], [ 4.3975, 43.8528 ], [ 4.3972, 43.8529 ], [ 4.3973, 43.8531 ], [ 4.3969, 43.8532 ], [ 4.397, 43.8534 ], [ 4.3969, 43.8538 ], [ 4.3968, 43.8543 ], [ 4.3966, 43.8546 ], [ 4.3967, 43.8546 ], [ 4.3965, 43.8548 ], [ 4.3963, 43.8552 ], [ 4.3962, 43.8554 ], [ 4.3962, 43.8554 ], [ 4.3957, 43.8553 ], [ 4.3956, 43.8553 ], [ 4.3954, 43.8552 ], [ 4.3953, 43.8552 ], [ 4.395, 43.8556 ], [ 4.3947, 43.856 ], [ 4.3946, 43.8559 ], [ 4.3944, 43.8561 ], [ 4.3944, 43.8561 ], [ 4.3944, 43.8562 ], [ 4.3943, 43.8562 ], [ 4.3942, 43.8562 ], [ 4.3941, 43.8563 ], [ 4.394, 43.8563 ], [ 4.3936, 43.8563 ], [ 4.3934, 43.8567 ], [ 4.3935, 43.8567 ], [ 4.3933, 43.857 ], [ 4.3932, 43.857 ], [ 4.3932, 43.8571 ], [ 4.3935, 43.8573 ], [ 4.3938, 43.8575 ], [ 4.394, 43.8576 ], [ 4.3942, 43.8577 ], [ 4.3945, 43.8578 ], [ 4.3945, 43.8578 ], [ 4.3944, 43.8579 ], [ 4.3944, 43.8581 ], [ 4.3943, 43.8582 ], [ 4.3943, 43.8583 ], [ 4.3943, 43.8585 ], [ 4.3944, 43.8586 ], [ 4.3946, 43.8586 ], [ 4.3949, 43.8586 ], [ 4.395, 43.8587 ], [ 4.3949, 43.8592 ], [ 4.395, 43.8593 ], [ 4.3957, 43.8595 ], [ 4.3959, 43.8596 ], [ 4.396, 43.8596 ], [ 4.3962, 43.8596 ], [ 4.3964, 43.8593 ], [ 4.3964, 43.8589 ], [ 4.3961, 43.8589 ], [ 4.3961, 43.8589 ], [ 4.3958, 43.8588 ], [ 4.3957, 43.8586 ], [ 4.3957, 43.8584 ], [ 4.3957, 43.8583 ], [ 4.3957, 43.8582 ], [ 4.3961, 43.8582 ], [ 4.3963, 43.8583 ], [ 4.3963, 43.8582 ], [ 4.3964, 43.8582 ], [ 4.3965, 43.8583 ], [ 4.3966, 43.8583 ], [ 4.3966, 43.8585 ], [ 4.3965, 43.8586 ], [ 4.3964, 43.8589 ], [ 4.397, 43.8589 ], [ 4.3973, 43.8589 ], [ 4.3975, 43.8588 ], [ 4.3974, 43.8587 ], [ 4.3973, 43.8585 ], [ 4.3972, 43.8583 ], [ 4.3972, 43.8583 ], [ 4.3971, 43.8582 ], [ 4.3971, 43.8581 ], [ 4.3971, 43.8579 ], [ 4.3971, 43.8577 ], [ 4.3972, 43.8575 ], [ 4.3977, 43.8575 ], [ 4.3976, 43.8577 ], [ 4.3977, 43.8577 ], [ 4.3981, 43.8579 ], [ 4.3983, 43.858 ], [ 4.3984, 43.858 ], [ 4.3986, 43.8582 ], [ 4.3984, 43.8584 ], [ 4.3983, 43.8583 ], [ 4.3983, 43.8584 ], [ 4.3982, 43.8584 ], [ 4.3981, 43.8585 ], [ 4.398, 43.8586 ], [ 4.398, 43.8586 ], [ 4.3981, 43.8586 ], [ 4.3983, 43.8586 ], [ 4.3986, 43.8586 ], [ 4.3988, 43.8588 ], [ 4.399, 43.8589 ], [ 4.3993, 43.8592 ], [ 4.3987, 43.8597 ], [ 4.3989, 43.8599 ], [ 4.3997, 43.8592 ], [ 4.3998, 43.8593 ], [ 4.3998, 43.8594 ], [ 4.4, 43.8595 ], [ 4.4001, 43.8597 ], [ 4.4002, 43.8597 ], [ 4.4003, 43.8597 ], [ 4.4007, 43.8599 ], [ 4.4011, 43.8603 ], [ 4.401, 43.8603 ], [ 4.4015, 43.8608 ], [ 4.4018, 43.8607 ], [ 4.4017, 43.8606 ], [ 4.402, 43.8604 ], [ 4.4022, 43.8605 ], [ 4.4023, 43.8605 ], [ 4.4024, 43.8605 ], [ 4.4025, 43.8605 ], [ 4.4026, 43.8603 ], [ 4.4027, 43.8603 ], [ 4.4027, 43.8602 ], [ 4.4027, 43.8602 ], [ 4.4027, 43.86 ], [ 4.4024, 43.8593 ], [ 4.4023, 43.8591 ], [ 4.4021, 43.8587 ], [ 4.402, 43.8583 ], [ 4.4013, 43.8572 ], [ 4.4003, 43.8576 ], [ 4.4002, 43.8578 ], [ 4.4001, 43.8579 ], [ 4.4001, 43.8579 ], [ 4.4002, 43.8579 ], [ 4.4, 43.8582 ], [ 4.3999, 43.8581 ], [ 4.3997, 43.8581 ], [ 4.3996, 43.8581 ], [ 4.3995, 43.858 ], [ 4.3997, 43.8579 ], [ 4.3998, 43.8575 ], [ 4.3998, 43.8575 ], [ 4.3997, 43.8572 ], [ 4.3997, 43.8571 ], [ 4.3999, 43.8566 ], [ 4.4, 43.8564 ], [ 4.4001, 43.8563 ], [ 4.4001, 43.8563 ], [ 4.4002, 43.8562 ], [ 4.4004, 43.8561 ], [ 4.4005, 43.856 ], [ 4.4006, 43.8559 ], [ 4.4005, 43.8558 ], [ 4.4003, 43.8556 ], [ 4.4, 43.8554 ], [ 4.3995, 43.8551 ], [ 4.3991, 43.8548 ], [ 4.3989, 43.8546 ], [ 4.3986, 43.8544 ], [ 4.3982, 43.854 ], [ 4.3981, 43.8538 ], [ 4.398, 43.8538 ], [ 4.3979, 43.8534 ], [ 4.3979, 43.8533 ], [ 4.3977, 43.8531 ] ] ], "type": "Polygon" }, "id": "74", "properties": { "code_commune": "30189", "code_departement": "30", "code_qp": "QP030006", "commune_qp": "Nîmes", "nom_commune": "Nîmes", "nom_qp": "Mas De Mingue" }, "type": "Feature" }, { "bbox": [ 3.8752, 43.58, 3.8901, 43.5942 ], "geometry": { "coordinates": [ [ [ 3.8763, 43.5812 ], [ 3.8766, 43.5814 ], [ 3.8762, 43.5818 ], [ 3.8766, 43.5821 ], [ 3.8769, 43.5822 ], [ 3.8773, 43.5822 ], [ 3.8776, 43.5822 ], [ 3.8779, 43.5821 ], [ 3.8782, 43.582 ], [ 3.8784, 43.5819 ], [ 3.8786, 43.5817 ], [ 3.8797, 43.5822 ], [ 3.8805, 43.5829 ], [ 3.8829, 43.5865 ], [ 3.884, 43.588 ], [ 3.8827, 43.5884 ], [ 3.8838, 43.5894 ], [ 3.8836, 43.5894 ], [ 3.8844, 43.5906 ], [ 3.8832, 43.5911 ], [ 3.8822, 43.5915 ], [ 3.883, 43.5927 ], [ 3.8824, 43.5929 ], [ 3.8826, 43.5932 ], [ 3.8839, 43.5927 ], [ 3.8845, 43.5935 ], [ 3.8848, 43.5938 ], [ 3.8852, 43.5942 ], [ 3.8854, 43.5941 ], [ 3.8856, 43.5939 ], [ 3.8859, 43.5937 ], [ 3.8861, 43.5935 ], [ 3.8863, 43.5933 ], [ 3.8861, 43.5931 ], [ 3.8861, 43.593 ], [ 3.8862, 43.5929 ], [ 3.8867, 43.5924 ], [ 3.8854, 43.5907 ], [ 3.8857, 43.5905 ], [ 3.8856, 43.5902 ], [ 3.886, 43.5901 ], [ 3.8876, 43.5896 ], [ 3.8879, 43.5895 ], [ 3.8886, 43.5894 ], [ 3.8894, 43.5894 ], [ 3.8896, 43.5894 ], [ 3.8895, 43.5891 ], [ 3.8897, 43.5889 ], [ 3.89, 43.5887 ], [ 3.8901, 43.5882 ], [ 3.89, 43.5879 ], [ 3.8895, 43.5872 ], [ 3.8892, 43.5868 ], [ 3.8887, 43.5857 ], [ 3.8883, 43.5853 ], [ 3.8882, 43.5846 ], [ 3.8881, 43.5843 ], [ 3.888, 43.5843 ], [ 3.8875, 43.5835 ], [ 3.8871, 43.5831 ], [ 3.886, 43.5821 ], [ 3.8856, 43.5819 ], [ 3.8837, 43.5812 ], [ 3.8824, 43.5808 ], [ 3.8821, 43.5807 ], [ 3.8819, 43.5808 ], [ 3.8813, 43.5811 ], [ 3.8812, 43.5813 ], [ 3.8809, 43.5815 ], [ 3.8804, 43.5818 ], [ 3.8789, 43.5815 ], [ 3.879, 43.5813 ], [ 3.879, 43.5812 ], [ 3.879, 43.581 ], [ 3.8788, 43.581 ], [ 3.8787, 43.581 ], [ 3.8786, 43.5808 ], [ 3.8784, 43.5806 ], [ 3.8782, 43.5804 ], [ 3.8778, 43.5802 ], [ 3.8776, 43.5802 ], [ 3.8775, 43.5802 ], [ 3.8771, 43.5802 ], [ 3.8767, 43.5803 ], [ 3.8765, 43.58 ], [ 3.8761, 43.5802 ], [ 3.8759, 43.58 ], [ 3.8752, 43.5804 ], [ 3.8762, 43.5806 ], [ 3.8763, 43.5807 ], [ 3.8764, 43.581 ], [ 3.8764, 43.5811 ], [ 3.8764, 43.5811 ], [ 3.8763, 43.5812 ] ] ], "type": "Polygon" }, "id": "75", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034012", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Près D'Arènes" }, "type": "Feature" }, { "bbox": [ 0.7183, 43.1062, 0.7301, 43.1123 ], "geometry": { "coordinates": [ [ [ 0.7224, 43.1089 ], [ 0.7222, 43.1095 ], [ 0.7222, 43.1098 ], [ 0.7217, 43.1097 ], [ 0.7215, 43.11 ], [ 0.7214, 43.11 ], [ 0.7213, 43.1101 ], [ 0.723, 43.1103 ], [ 0.7229, 43.1106 ], [ 0.7229, 43.1107 ], [ 0.7227, 43.111 ], [ 0.7228, 43.111 ], [ 0.7234, 43.1111 ], [ 0.7241, 43.1112 ], [ 0.7242, 43.1113 ], [ 0.7242, 43.1116 ], [ 0.7242, 43.1117 ], [ 0.7245, 43.1117 ], [ 0.7245, 43.1123 ], [ 0.7257, 43.1122 ], [ 0.7259, 43.1121 ], [ 0.7263, 43.1121 ], [ 0.7264, 43.1118 ], [ 0.7263, 43.1117 ], [ 0.7263, 43.1114 ], [ 0.7263, 43.1112 ], [ 0.7271, 43.1112 ], [ 0.7271, 43.1109 ], [ 0.7276, 43.1109 ], [ 0.7279, 43.1109 ], [ 0.7279, 43.1109 ], [ 0.728, 43.1102 ], [ 0.7283, 43.1103 ], [ 0.729, 43.1103 ], [ 0.729, 43.1105 ], [ 0.7292, 43.1105 ], [ 0.7294, 43.1105 ], [ 0.7295, 43.1106 ], [ 0.7297, 43.1106 ], [ 0.7298, 43.1107 ], [ 0.7299, 43.1107 ], [ 0.73, 43.1105 ], [ 0.7301, 43.1103 ], [ 0.7296, 43.1101 ], [ 0.729, 43.1096 ], [ 0.7286, 43.1095 ], [ 0.7286, 43.1093 ], [ 0.7286, 43.1091 ], [ 0.7298, 43.1065 ], [ 0.7295, 43.1065 ], [ 0.7292, 43.1066 ], [ 0.7286, 43.1067 ], [ 0.7283, 43.1067 ], [ 0.7278, 43.1069 ], [ 0.7277, 43.1069 ], [ 0.7276, 43.107 ], [ 0.7274, 43.1073 ], [ 0.7273, 43.1073 ], [ 0.7272, 43.1073 ], [ 0.7268, 43.1073 ], [ 0.7267, 43.1075 ], [ 0.7265, 43.1076 ], [ 0.7266, 43.1079 ], [ 0.7263, 43.1078 ], [ 0.7262, 43.1078 ], [ 0.7261, 43.1077 ], [ 0.7261, 43.1075 ], [ 0.726, 43.1075 ], [ 0.7259, 43.1074 ], [ 0.7253, 43.1071 ], [ 0.7252, 43.1071 ], [ 0.725, 43.1071 ], [ 0.7249, 43.1071 ], [ 0.7247, 43.107 ], [ 0.7238, 43.1068 ], [ 0.7229, 43.1065 ], [ 0.7221, 43.1063 ], [ 0.7217, 43.1062 ], [ 0.7215, 43.1062 ], [ 0.7215, 43.1062 ], [ 0.7212, 43.1063 ], [ 0.721, 43.1063 ], [ 0.7209, 43.1064 ], [ 0.7208, 43.1066 ], [ 0.7208, 43.1067 ], [ 0.7207, 43.1068 ], [ 0.7204, 43.1067 ], [ 0.72, 43.1066 ], [ 0.7191, 43.1063 ], [ 0.719, 43.1066 ], [ 0.7189, 43.1066 ], [ 0.7187, 43.1069 ], [ 0.7186, 43.1071 ], [ 0.7186, 43.1071 ], [ 0.7186, 43.1072 ], [ 0.7183, 43.1071 ], [ 0.7184, 43.1074 ], [ 0.7186, 43.1074 ], [ 0.7187, 43.1078 ], [ 0.7189, 43.1078 ], [ 0.719, 43.1079 ], [ 0.7191, 43.1079 ], [ 0.7191, 43.1082 ], [ 0.7191, 43.1083 ], [ 0.7191, 43.1088 ], [ 0.7189, 43.1088 ], [ 0.7191, 43.1091 ], [ 0.7201, 43.1086 ], [ 0.7202, 43.1086 ], [ 0.7207, 43.1084 ], [ 0.7208, 43.1084 ], [ 0.7209, 43.1085 ], [ 0.7209, 43.1085 ], [ 0.7217, 43.1087 ], [ 0.7224, 43.1089 ] ] ], "type": "Polygon" }, "id": "76", "properties": { "code_commune": "31483", "code_departement": "31", "code_qp": "QP031003", "commune_qp": "Saint-Gaudens", "nom_commune": "Saint-Gaudens", "nom_qp": "Coeur De Ville" }, "type": "Feature" }, { "bbox": [ 3.7479, 43.4489, 3.7537, 43.4538 ], "geometry": { "coordinates": [ [ [ 3.7501, 43.4538 ], [ 3.7503, 43.4535 ], [ 3.7504, 43.4534 ], [ 3.7506, 43.4532 ], [ 3.7509, 43.4529 ], [ 3.7509, 43.4528 ], [ 3.751, 43.4528 ], [ 3.7513, 43.4526 ], [ 3.7514, 43.4525 ], [ 3.7516, 43.4524 ], [ 3.7516, 43.4524 ], [ 3.7518, 43.4521 ], [ 3.7523, 43.4516 ], [ 3.7524, 43.4516 ], [ 3.7527, 43.4513 ], [ 3.7533, 43.451 ], [ 3.7534, 43.4509 ], [ 3.7537, 43.4505 ], [ 3.7534, 43.4503 ], [ 3.7529, 43.45 ], [ 3.7518, 43.4493 ], [ 3.7515, 43.4491 ], [ 3.7512, 43.4489 ], [ 3.7511, 43.4489 ], [ 3.7511, 43.449 ], [ 3.751, 43.4491 ], [ 3.7507, 43.4492 ], [ 3.7513, 43.4497 ], [ 3.7517, 43.45 ], [ 3.7519, 43.4502 ], [ 3.7521, 43.4503 ], [ 3.7524, 43.4504 ], [ 3.7518, 43.4508 ], [ 3.7517, 43.4508 ], [ 3.7514, 43.451 ], [ 3.7513, 43.4511 ], [ 3.7512, 43.4513 ], [ 3.751, 43.4512 ], [ 3.7507, 43.4514 ], [ 3.751, 43.4516 ], [ 3.7507, 43.4518 ], [ 3.7507, 43.4518 ], [ 3.7503, 43.4521 ], [ 3.7504, 43.4522 ], [ 3.7505, 43.4523 ], [ 3.7502, 43.4526 ], [ 3.7501, 43.4525 ], [ 3.7492, 43.4518 ], [ 3.7491, 43.4519 ], [ 3.7487, 43.4521 ], [ 3.7486, 43.4522 ], [ 3.7485, 43.4523 ], [ 3.7483, 43.4523 ], [ 3.7481, 43.4524 ], [ 3.748, 43.4525 ], [ 3.748, 43.4526 ], [ 3.7479, 43.4527 ], [ 3.7479, 43.4527 ], [ 3.748, 43.4528 ], [ 3.7481, 43.4531 ], [ 3.7483, 43.4533 ], [ 3.7484, 43.4534 ], [ 3.7485, 43.4535 ], [ 3.749, 43.4533 ], [ 3.7491, 43.4532 ], [ 3.7492, 43.4532 ], [ 3.7493, 43.4533 ], [ 3.7494, 43.4533 ], [ 3.7495, 43.4534 ], [ 3.7495, 43.4534 ], [ 3.7497, 43.4535 ], [ 3.7498, 43.4536 ], [ 3.7498, 43.4536 ], [ 3.7498, 43.4537 ], [ 3.7501, 43.4538 ] ] ], "type": "Polygon" }, "id": "77", "properties": { "code_commune": "34108", "code_departement": "34", "code_qp": "QP034016", "commune_qp": "Frontignan", "nom_commune": "Frontignan", "nom_qp": "Les Deux Pins" }, "type": "Feature" }, { "bbox": [ 3.6911, 43.3997, 3.701, 43.4078 ], "geometry": { "coordinates": [ [ [ 3.6965, 43.4013 ], [ 3.6964, 43.4009 ], [ 3.6962, 43.4002 ], [ 3.6961, 43.3998 ], [ 3.6951, 43.3998 ], [ 3.695, 43.3998 ], [ 3.695, 43.3997 ], [ 3.6946, 43.3997 ], [ 3.6943, 43.3997 ], [ 3.6941, 43.3997 ], [ 3.694, 43.3998 ], [ 3.694, 43.4 ], [ 3.6938, 43.4 ], [ 3.6935, 43.4 ], [ 3.6931, 43.3997 ], [ 3.6929, 43.4001 ], [ 3.6928, 43.4001 ], [ 3.6927, 43.4004 ], [ 3.6927, 43.4005 ], [ 3.6926, 43.4008 ], [ 3.6926, 43.4008 ], [ 3.6925, 43.4013 ], [ 3.6925, 43.4015 ], [ 3.6927, 43.4015 ], [ 3.6928, 43.4014 ], [ 3.6928, 43.4016 ], [ 3.6929, 43.4016 ], [ 3.6929, 43.4016 ], [ 3.693, 43.4016 ], [ 3.693, 43.4016 ], [ 3.6931, 43.4016 ], [ 3.6933, 43.4016 ], [ 3.6933, 43.4017 ], [ 3.6933, 43.4017 ], [ 3.6936, 43.4017 ], [ 3.6936, 43.4018 ], [ 3.6939, 43.4018 ], [ 3.6939, 43.4019 ], [ 3.6942, 43.4019 ], [ 3.6941, 43.4022 ], [ 3.6941, 43.4022 ], [ 3.6941, 43.4023 ], [ 3.6938, 43.4023 ], [ 3.6938, 43.4024 ], [ 3.6939, 43.4024 ], [ 3.6939, 43.4025 ], [ 3.6938, 43.4025 ], [ 3.6934, 43.4025 ], [ 3.6931, 43.4025 ], [ 3.6927, 43.4024 ], [ 3.6923, 43.4024 ], [ 3.6927, 43.4031 ], [ 3.6928, 43.4033 ], [ 3.6937, 43.4034 ], [ 3.6937, 43.4037 ], [ 3.6935, 43.4037 ], [ 3.6934, 43.4039 ], [ 3.6931, 43.4039 ], [ 3.6931, 43.4039 ], [ 3.693, 43.404 ], [ 3.6929, 43.4041 ], [ 3.6928, 43.4041 ], [ 3.6927, 43.4042 ], [ 3.6925, 43.4042 ], [ 3.6915, 43.4041 ], [ 3.6914, 43.4043 ], [ 3.6914, 43.4044 ], [ 3.6914, 43.4046 ], [ 3.6914, 43.4048 ], [ 3.6912, 43.4058 ], [ 3.6911, 43.4065 ], [ 3.6915, 43.4066 ], [ 3.692, 43.4066 ], [ 3.6919, 43.4067 ], [ 3.6925, 43.4067 ], [ 3.6925, 43.4068 ], [ 3.6928, 43.4068 ], [ 3.6927, 43.407 ], [ 3.693, 43.407 ], [ 3.693, 43.4067 ], [ 3.693, 43.4066 ], [ 3.6933, 43.4066 ], [ 3.6932, 43.4078 ], [ 3.6935, 43.4076 ], [ 3.6939, 43.4072 ], [ 3.6941, 43.4066 ], [ 3.6933, 43.4065 ], [ 3.6934, 43.406 ], [ 3.6935, 43.4055 ], [ 3.6935, 43.4053 ], [ 3.6935, 43.405 ], [ 3.6939, 43.4051 ], [ 3.6943, 43.4051 ], [ 3.6944, 43.404 ], [ 3.6945, 43.4037 ], [ 3.6945, 43.4036 ], [ 3.6943, 43.4036 ], [ 3.6944, 43.4033 ], [ 3.6943, 43.4033 ], [ 3.6943, 43.4033 ], [ 3.6944, 43.4032 ], [ 3.6944, 43.4032 ], [ 3.6945, 43.4032 ], [ 3.6946, 43.4029 ], [ 3.6945, 43.4029 ], [ 3.6945, 43.4027 ], [ 3.6945, 43.4026 ], [ 3.6946, 43.4026 ], [ 3.6946, 43.4025 ], [ 3.6945, 43.4024 ], [ 3.6945, 43.4019 ], [ 3.6947, 43.4019 ], [ 3.6951, 43.402 ], [ 3.6956, 43.402 ], [ 3.6956, 43.4016 ], [ 3.6959, 43.4016 ], [ 3.6959, 43.4018 ], [ 3.6959, 43.4018 ], [ 3.6958, 43.4018 ], [ 3.6958, 43.4018 ], [ 3.6959, 43.4018 ], [ 3.6959, 43.4019 ], [ 3.6958, 43.4019 ], [ 3.6958, 43.402 ], [ 3.6966, 43.402 ], [ 3.6967, 43.402 ], [ 3.6967, 43.4019 ], [ 3.697, 43.4018 ], [ 3.6977, 43.4018 ], [ 3.6977, 43.4025 ], [ 3.6981, 43.4025 ], [ 3.6981, 43.4028 ], [ 3.6984, 43.4028 ], [ 3.6986, 43.4028 ], [ 3.6986, 43.4027 ], [ 3.6987, 43.4027 ], [ 3.6991, 43.403 ], [ 3.699, 43.4031 ], [ 3.699, 43.4031 ], [ 3.6994, 43.4033 ], [ 3.6993, 43.404 ], [ 3.6994, 43.4045 ], [ 3.6994, 43.4045 ], [ 3.6993, 43.4048 ], [ 3.6993, 43.4049 ], [ 3.6992, 43.4049 ], [ 3.6992, 43.4049 ], [ 3.6991, 43.4051 ], [ 3.6991, 43.4052 ], [ 3.6991, 43.4052 ], [ 3.6991, 43.4052 ], [ 3.699, 43.4052 ], [ 3.699, 43.4054 ], [ 3.6993, 43.4054 ], [ 3.6993, 43.4055 ], [ 3.6993, 43.4055 ], [ 3.6993, 43.4056 ], [ 3.6989, 43.4055 ], [ 3.6989, 43.4056 ], [ 3.6992, 43.4056 ], [ 3.699, 43.4059 ], [ 3.6992, 43.406 ], [ 3.6995, 43.4057 ], [ 3.6996, 43.4056 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4057 ], [ 3.7001, 43.4059 ], [ 3.6999, 43.4059 ], [ 3.6999, 43.4061 ], [ 3.7001, 43.4061 ], [ 3.7001, 43.4062 ], [ 3.7002, 43.4062 ], [ 3.7004, 43.4062 ], [ 3.7004, 43.4064 ], [ 3.7003, 43.4066 ], [ 3.7001, 43.4067 ], [ 3.7003, 43.4068 ], [ 3.7006, 43.4066 ], [ 3.7005, 43.4065 ], [ 3.7006, 43.4065 ], [ 3.7007, 43.4065 ], [ 3.7007, 43.4064 ], [ 3.7006, 43.4064 ], [ 3.7006, 43.4063 ], [ 3.7008, 43.4063 ], [ 3.7008, 43.4062 ], [ 3.7006, 43.4063 ], [ 3.7006, 43.4062 ], [ 3.7006, 43.4062 ], [ 3.7008, 43.4061 ], [ 3.7007, 43.4061 ], [ 3.7005, 43.4061 ], [ 3.7005, 43.406 ], [ 3.7005, 43.4059 ], [ 3.7004, 43.4059 ], [ 3.7002, 43.4059 ], [ 3.7001, 43.4055 ], [ 3.7, 43.4054 ], [ 3.7007, 43.4054 ], [ 3.7007, 43.4053 ], [ 3.7003, 43.4052 ], [ 3.7004, 43.4052 ], [ 3.7002, 43.405 ], [ 3.7001, 43.4049 ], [ 3.7, 43.4048 ], [ 3.7001, 43.4046 ], [ 3.6998, 43.4046 ], [ 3.7, 43.4042 ], [ 3.7002, 43.4041 ], [ 3.7004, 43.4041 ], [ 3.7005, 43.4041 ], [ 3.7006, 43.4042 ], [ 3.7009, 43.404 ], [ 3.701, 43.4041 ], [ 3.701, 43.4036 ], [ 3.7004, 43.4033 ], [ 3.7005, 43.4032 ], [ 3.7004, 43.4031 ], [ 3.7003, 43.4033 ], [ 3.7002, 43.4033 ], [ 3.7003, 43.4031 ], [ 3.7001, 43.4031 ], [ 3.7001, 43.4032 ], [ 3.7, 43.4032 ], [ 3.7, 43.4031 ], [ 3.7, 43.4031 ], [ 3.6999, 43.4031 ], [ 3.6999, 43.4029 ], [ 3.6997, 43.4029 ], [ 3.6997, 43.4028 ], [ 3.6994, 43.4028 ], [ 3.6995, 43.4025 ], [ 3.6986, 43.4025 ], [ 3.6986, 43.4024 ], [ 3.6981, 43.4024 ], [ 3.6981, 43.4022 ], [ 3.6983, 43.4022 ], [ 3.6983, 43.4021 ], [ 3.6979, 43.4021 ], [ 3.698, 43.402 ], [ 3.698, 43.402 ], [ 3.698, 43.4019 ], [ 3.698, 43.4019 ], [ 3.698, 43.4019 ], [ 3.698, 43.4017 ], [ 3.6977, 43.4017 ], [ 3.697, 43.4015 ], [ 3.6966, 43.4016 ], [ 3.6965, 43.4013 ] ] ], "type": "Polygon" }, "id": "78", "properties": { "code_commune": "34301", "code_departement": "34", "code_qp": "QP034018", "commune_qp": "Sète", "nom_commune": "Sète", "nom_qp": "Centre Ville - Ile Sud" }, "type": "Feature" }, { "bbox": [ 4.6479, 44.2542, 4.6525, 44.2583 ], "geometry": { "coordinates": [ [ [ 4.6485, 44.2583 ], [ 4.6488, 44.2582 ], [ 4.649, 44.2582 ], [ 4.6492, 44.2581 ], [ 4.6493, 44.2581 ], [ 4.6498, 44.2581 ], [ 4.6499, 44.258 ], [ 4.65, 44.258 ], [ 4.65, 44.2579 ], [ 4.6501, 44.2579 ], [ 4.6501, 44.258 ], [ 4.6501, 44.2583 ], [ 4.6505, 44.2583 ], [ 4.6509, 44.2578 ], [ 4.6511, 44.2576 ], [ 4.6514, 44.2572 ], [ 4.6517, 44.2568 ], [ 4.6518, 44.2566 ], [ 4.6519, 44.2563 ], [ 4.652, 44.2561 ], [ 4.6523, 44.2554 ], [ 4.6524, 44.2551 ], [ 4.6524, 44.2551 ], [ 4.6524, 44.2547 ], [ 4.6525, 44.2543 ], [ 4.652, 44.2544 ], [ 4.6519, 44.2543 ], [ 4.6517, 44.2543 ], [ 4.6512, 44.2542 ], [ 4.6511, 44.2544 ], [ 4.6511, 44.2545 ], [ 4.6508, 44.2546 ], [ 4.6507, 44.2546 ], [ 4.6505, 44.2546 ], [ 4.6505, 44.2546 ], [ 4.6505, 44.2547 ], [ 4.6504, 44.2546 ], [ 4.6503, 44.2547 ], [ 4.6502, 44.2547 ], [ 4.6502, 44.2547 ], [ 4.6501, 44.2546 ], [ 4.6501, 44.2546 ], [ 4.65, 44.2546 ], [ 4.65, 44.2546 ], [ 4.6499, 44.2546 ], [ 4.6497, 44.2546 ], [ 4.6497, 44.2546 ], [ 4.6496, 44.2546 ], [ 4.6496, 44.2547 ], [ 4.6495, 44.2547 ], [ 4.6496, 44.2547 ], [ 4.6495, 44.2546 ], [ 4.6494, 44.2546 ], [ 4.6493, 44.2546 ], [ 4.6493, 44.2548 ], [ 4.6491, 44.2548 ], [ 4.649, 44.2548 ], [ 4.6485, 44.2549 ], [ 4.6483, 44.2548 ], [ 4.6482, 44.255 ], [ 4.6482, 44.2551 ], [ 4.6483, 44.2552 ], [ 4.6484, 44.2555 ], [ 4.6481, 44.2555 ], [ 4.648, 44.2555 ], [ 4.648, 44.2556 ], [ 4.6479, 44.2557 ], [ 4.6481, 44.2557 ], [ 4.6481, 44.2558 ], [ 4.6481, 44.2558 ], [ 4.6482, 44.2559 ], [ 4.6481, 44.2559 ], [ 4.6481, 44.256 ], [ 4.648, 44.256 ], [ 4.648, 44.2561 ], [ 4.6481, 44.2561 ], [ 4.6481, 44.2562 ], [ 4.648, 44.2562 ], [ 4.648, 44.2563 ], [ 4.648, 44.2563 ], [ 4.648, 44.2564 ], [ 4.648, 44.2565 ], [ 4.6479, 44.2565 ], [ 4.6479, 44.2566 ], [ 4.6479, 44.2566 ], [ 4.6479, 44.2568 ], [ 4.648, 44.2568 ], [ 4.648, 44.2568 ], [ 4.648, 44.2568 ], [ 4.6481, 44.2569 ], [ 4.6481, 44.257 ], [ 4.6481, 44.257 ], [ 4.6481, 44.2571 ], [ 4.6481, 44.2571 ], [ 4.6481, 44.2571 ], [ 4.6482, 44.2571 ], [ 4.6482, 44.2572 ], [ 4.6483, 44.2572 ], [ 4.6483, 44.2572 ], [ 4.6481, 44.2572 ], [ 4.6481, 44.2573 ], [ 4.6482, 44.2573 ], [ 4.6481, 44.2573 ], [ 4.6481, 44.2573 ], [ 4.6481, 44.2574 ], [ 4.6482, 44.2574 ], [ 4.6482, 44.2574 ], [ 4.6481, 44.2574 ], [ 4.6481, 44.2574 ], [ 4.6482, 44.2575 ], [ 4.6482, 44.2575 ], [ 4.6483, 44.2576 ], [ 4.6483, 44.2576 ], [ 4.6482, 44.2576 ], [ 4.6482, 44.2577 ], [ 4.6481, 44.2577 ], [ 4.6481, 44.2578 ], [ 4.6482, 44.258 ], [ 4.6482, 44.2581 ], [ 4.6482, 44.2582 ], [ 4.6483, 44.2582 ], [ 4.6484, 44.2583 ], [ 4.6485, 44.2583 ] ] ], "type": "Polygon" }, "id": "79", "properties": { "code_commune": "30202", "code_departement": "30", "code_qp": "QP030011", "commune_qp": "Pont-Saint-Esprit", "nom_commune": "Pont-Saint-Esprit", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.9763, 43.76, 2.0026, 43.7681 ], "geometry": { "coordinates": [ [ [ 2.0023, 43.7645 ], [ 2.0025, 43.7645 ], [ 2.0026, 43.7642 ], [ 2.0026, 43.764 ], [ 2.0025, 43.7639 ], [ 2.0017, 43.7639 ], [ 2.0013, 43.7624 ], [ 2.0012, 43.7624 ], [ 1.9999, 43.7624 ], [ 1.9988, 43.7624 ], [ 1.9977, 43.7625 ], [ 1.9977, 43.7625 ], [ 1.997, 43.7625 ], [ 1.9969, 43.7627 ], [ 1.9966, 43.7629 ], [ 1.9965, 43.763 ], [ 1.9964, 43.7631 ], [ 1.9963, 43.7631 ], [ 1.9963, 43.763 ], [ 1.996, 43.7627 ], [ 1.9959, 43.7626 ], [ 1.9958, 43.7626 ], [ 1.9957, 43.7625 ], [ 1.9954, 43.7626 ], [ 1.9919, 43.7628 ], [ 1.9914, 43.7629 ], [ 1.9907, 43.7629 ], [ 1.9905, 43.7628 ], [ 1.9903, 43.7625 ], [ 1.9912, 43.7623 ], [ 1.9915, 43.7621 ], [ 1.9931, 43.7615 ], [ 1.9944, 43.7611 ], [ 1.9948, 43.7611 ], [ 1.9943, 43.7602 ], [ 1.9939, 43.7601 ], [ 1.9929, 43.76 ], [ 1.9889, 43.76 ], [ 1.9878, 43.7601 ], [ 1.9876, 43.7602 ], [ 1.9873, 43.7604 ], [ 1.9869, 43.7607 ], [ 1.9867, 43.7608 ], [ 1.9866, 43.7608 ], [ 1.9851, 43.7608 ], [ 1.9851, 43.7622 ], [ 1.985, 43.7622 ], [ 1.9832, 43.7622 ], [ 1.982, 43.7622 ], [ 1.9813, 43.7622 ], [ 1.981, 43.7621 ], [ 1.9792, 43.7614 ], [ 1.979, 43.7615 ], [ 1.9784, 43.7615 ], [ 1.9781, 43.7618 ], [ 1.9763, 43.7618 ], [ 1.9766, 43.7636 ], [ 1.977, 43.7641 ], [ 1.9779, 43.7645 ], [ 1.9778, 43.7643 ], [ 1.9785, 43.764 ], [ 1.9794, 43.7636 ], [ 1.9796, 43.7636 ], [ 1.9806, 43.7634 ], [ 1.9815, 43.7647 ], [ 1.9824, 43.7643 ], [ 1.983, 43.764 ], [ 1.9838, 43.7637 ], [ 1.9843, 43.7635 ], [ 1.9853, 43.7633 ], [ 1.9855, 43.7642 ], [ 1.9875, 43.764 ], [ 1.9874, 43.7638 ], [ 1.988, 43.7637 ], [ 1.988, 43.7638 ], [ 1.9884, 43.7637 ], [ 1.9884, 43.7637 ], [ 1.9889, 43.7636 ], [ 1.989, 43.7638 ], [ 1.9892, 43.7639 ], [ 1.9894, 43.7634 ], [ 1.9898, 43.7628 ], [ 1.9903, 43.763 ], [ 1.9902, 43.7631 ], [ 1.99, 43.7635 ], [ 1.99, 43.7636 ], [ 1.9903, 43.7637 ], [ 1.9903, 43.7636 ], [ 1.9904, 43.7635 ], [ 1.9907, 43.7635 ], [ 1.9909, 43.7637 ], [ 1.991, 43.7638 ], [ 1.9913, 43.7642 ], [ 1.9916, 43.7646 ], [ 1.9917, 43.7647 ], [ 1.9919, 43.7648 ], [ 1.9923, 43.7649 ], [ 1.9931, 43.7652 ], [ 1.9932, 43.7652 ], [ 1.9947, 43.7649 ], [ 1.9971, 43.7646 ], [ 1.9974, 43.7645 ], [ 1.9979, 43.7661 ], [ 1.9967, 43.7663 ], [ 1.9968, 43.7667 ], [ 1.9989, 43.768 ], [ 1.999, 43.7679 ], [ 1.9991, 43.7681 ], [ 2.0003, 43.7679 ], [ 2.0004, 43.7679 ], [ 2.0005, 43.7679 ], [ 2.0012, 43.7662 ], [ 2.0017, 43.7648 ], [ 2.0019, 43.7645 ], [ 2.0023, 43.7645 ] ] ], "type": "Polygon" }, "id": "80", "properties": { "code_commune": "81105", "code_departement": "81", "code_qp": "QP081011", "commune_qp": "Graulhet", "nom_commune": "Graulhet", "nom_qp": "Crins - En Gach" }, "type": "Feature" }, { "bbox": [ 2.1471, 44.0485, 2.1615, 44.0577 ], "geometry": { "coordinates": [ [ [ 2.1605, 44.0528 ], [ 2.1608, 44.0525 ], [ 2.1609, 44.0522 ], [ 2.161, 44.0514 ], [ 2.1609, 44.0513 ], [ 2.1608, 44.0511 ], [ 2.161, 44.0511 ], [ 2.1614, 44.0509 ], [ 2.1612, 44.0505 ], [ 2.1615, 44.0504 ], [ 2.1615, 44.0502 ], [ 2.1612, 44.0499 ], [ 2.1609, 44.0498 ], [ 2.1606, 44.0497 ], [ 2.1603, 44.0498 ], [ 2.1592, 44.05 ], [ 2.1584, 44.0499 ], [ 2.1584, 44.0497 ], [ 2.1583, 44.0496 ], [ 2.158, 44.0497 ], [ 2.1581, 44.0507 ], [ 2.1582, 44.0517 ], [ 2.1582, 44.0518 ], [ 2.1579, 44.0519 ], [ 2.1564, 44.0525 ], [ 2.1558, 44.0518 ], [ 2.1539, 44.0519 ], [ 2.1538, 44.0508 ], [ 2.1537, 44.0504 ], [ 2.1537, 44.0498 ], [ 2.1533, 44.0499 ], [ 2.1532, 44.0497 ], [ 2.1532, 44.0495 ], [ 2.1533, 44.0492 ], [ 2.1535, 44.0491 ], [ 2.1536, 44.0491 ], [ 2.1537, 44.049 ], [ 2.1534, 44.0488 ], [ 2.1536, 44.0486 ], [ 2.1533, 44.0485 ], [ 2.1529, 44.0489 ], [ 2.1527, 44.049 ], [ 2.1525, 44.049 ], [ 2.1521, 44.0491 ], [ 2.1519, 44.0491 ], [ 2.1513, 44.0498 ], [ 2.151, 44.05 ], [ 2.1509, 44.05 ], [ 2.1494, 44.0501 ], [ 2.1492, 44.0501 ], [ 2.1492, 44.0501 ], [ 2.1471, 44.0502 ], [ 2.1473, 44.0507 ], [ 2.1475, 44.051 ], [ 2.1477, 44.0512 ], [ 2.1482, 44.0514 ], [ 2.1483, 44.0515 ], [ 2.1486, 44.0515 ], [ 2.1488, 44.0515 ], [ 2.1508, 44.0519 ], [ 2.1516, 44.0521 ], [ 2.1522, 44.0521 ], [ 2.1534, 44.052 ], [ 2.1535, 44.052 ], [ 2.1535, 44.0521 ], [ 2.1539, 44.0526 ], [ 2.1539, 44.0526 ], [ 2.154, 44.0528 ], [ 2.1541, 44.0528 ], [ 2.154, 44.0529 ], [ 2.1541, 44.053 ], [ 2.1542, 44.0531 ], [ 2.1542, 44.0531 ], [ 2.1543, 44.0532 ], [ 2.1544, 44.0533 ], [ 2.154, 44.0534 ], [ 2.1549, 44.054 ], [ 2.155, 44.0539 ], [ 2.1567, 44.0531 ], [ 2.1571, 44.0529 ], [ 2.1576, 44.0535 ], [ 2.1573, 44.0536 ], [ 2.1572, 44.0536 ], [ 2.157, 44.0536 ], [ 2.1563, 44.0538 ], [ 2.1562, 44.0538 ], [ 2.1559, 44.054 ], [ 2.1558, 44.054 ], [ 2.1555, 44.054 ], [ 2.155, 44.054 ], [ 2.1547, 44.0543 ], [ 2.1546, 44.0545 ], [ 2.1547, 44.0547 ], [ 2.1547, 44.0548 ], [ 2.1541, 44.0548 ], [ 2.1535, 44.0544 ], [ 2.1535, 44.0544 ], [ 2.1533, 44.0544 ], [ 2.1526, 44.0545 ], [ 2.1524, 44.0546 ], [ 2.1522, 44.0543 ], [ 2.1519, 44.0544 ], [ 2.151, 44.0535 ], [ 2.1502, 44.054 ], [ 2.1501, 44.0542 ], [ 2.1502, 44.0543 ], [ 2.1503, 44.0545 ], [ 2.1504, 44.0546 ], [ 2.1501, 44.0551 ], [ 2.15, 44.0552 ], [ 2.1501, 44.0554 ], [ 2.1498, 44.0555 ], [ 2.1482, 44.056 ], [ 2.1487, 44.0561 ], [ 2.1492, 44.0561 ], [ 2.1492, 44.0571 ], [ 2.15, 44.057 ], [ 2.151, 44.0571 ], [ 2.1513, 44.0572 ], [ 2.1515, 44.0572 ], [ 2.1518, 44.0574 ], [ 2.1522, 44.0575 ], [ 2.1525, 44.0576 ], [ 2.1527, 44.0577 ], [ 2.153, 44.0576 ], [ 2.1532, 44.0576 ], [ 2.154, 44.0573 ], [ 2.1546, 44.0571 ], [ 2.1549, 44.0571 ], [ 2.1552, 44.057 ], [ 2.1555, 44.0568 ], [ 2.1558, 44.0564 ], [ 2.156, 44.0562 ], [ 2.1561, 44.0562 ], [ 2.1564, 44.0559 ], [ 2.1573, 44.0552 ], [ 2.1578, 44.0557 ], [ 2.1586, 44.0553 ], [ 2.1589, 44.0552 ], [ 2.1598, 44.0552 ], [ 2.1599, 44.0552 ], [ 2.1603, 44.055 ], [ 2.1611, 44.0545 ], [ 2.1596, 44.0535 ], [ 2.1595, 44.0535 ], [ 2.16, 44.0531 ], [ 2.1605, 44.0528 ] ] ], "type": "Polygon" }, "id": "81", "properties": { "code_commune": "81060", "code_departement": "81", "code_qp": "QP081009", "commune_qp": "Carmaux", "nom_commune": "Carmaux", "nom_qp": "Rajol - Cérou - Gourgatieux - Bouloc - Verrerie" }, "type": "Feature" }, { "bbox": [ 3.312, 43.7269, 3.3249, 43.7361 ], "geometry": { "coordinates": [ [ [ 3.3249, 43.731 ], [ 3.3246, 43.731 ], [ 3.3246, 43.731 ], [ 3.3244, 43.731 ], [ 3.3244, 43.7308 ], [ 3.3244, 43.7307 ], [ 3.3244, 43.7305 ], [ 3.3243, 43.7305 ], [ 3.3244, 43.7303 ], [ 3.3244, 43.7303 ], [ 3.3244, 43.7299 ], [ 3.3243, 43.7298 ], [ 3.3242, 43.7298 ], [ 3.3243, 43.7297 ], [ 3.3243, 43.7296 ], [ 3.3241, 43.7295 ], [ 3.3238, 43.7292 ], [ 3.3241, 43.7289 ], [ 3.3241, 43.7289 ], [ 3.3242, 43.7288 ], [ 3.3241, 43.7287 ], [ 3.324, 43.7285 ], [ 3.3238, 43.7283 ], [ 3.3237, 43.7281 ], [ 3.3232, 43.7278 ], [ 3.3231, 43.7279 ], [ 3.3233, 43.728 ], [ 3.3232, 43.7281 ], [ 3.3232, 43.7282 ], [ 3.3232, 43.7283 ], [ 3.3233, 43.7285 ], [ 3.3234, 43.7286 ], [ 3.3235, 43.7286 ], [ 3.3235, 43.7286 ], [ 3.3235, 43.7288 ], [ 3.3234, 43.729 ], [ 3.3231, 43.7291 ], [ 3.3229, 43.7291 ], [ 3.3227, 43.7291 ], [ 3.3224, 43.7291 ], [ 3.3223, 43.729 ], [ 3.3221, 43.729 ], [ 3.3221, 43.7289 ], [ 3.322, 43.7289 ], [ 3.3219, 43.7288 ], [ 3.3217, 43.7288 ], [ 3.3213, 43.7287 ], [ 3.3211, 43.7286 ], [ 3.321, 43.7287 ], [ 3.3208, 43.7287 ], [ 3.3205, 43.7287 ], [ 3.3202, 43.7288 ], [ 3.3202, 43.7289 ], [ 3.3201, 43.7289 ], [ 3.3197, 43.7287 ], [ 3.3197, 43.7286 ], [ 3.3197, 43.7285 ], [ 3.3196, 43.7283 ], [ 3.3195, 43.7282 ], [ 3.3194, 43.7282 ], [ 3.3193, 43.7281 ], [ 3.3187, 43.7281 ], [ 3.3182, 43.7278 ], [ 3.3181, 43.7277 ], [ 3.318, 43.7276 ], [ 3.3179, 43.7274 ], [ 3.3178, 43.7273 ], [ 3.3174, 43.7271 ], [ 3.3172, 43.727 ], [ 3.3167, 43.727 ], [ 3.3163, 43.727 ], [ 3.3161, 43.727 ], [ 3.3158, 43.7269 ], [ 3.3158, 43.7269 ], [ 3.3161, 43.7272 ], [ 3.3162, 43.7273 ], [ 3.3162, 43.7274 ], [ 3.316, 43.7278 ], [ 3.316, 43.7278 ], [ 3.3161, 43.728 ], [ 3.3163, 43.728 ], [ 3.3161, 43.7281 ], [ 3.3159, 43.7283 ], [ 3.316, 43.7284 ], [ 3.3161, 43.7288 ], [ 3.3161, 43.7288 ], [ 3.3163, 43.7291 ], [ 3.3163, 43.7292 ], [ 3.3162, 43.7294 ], [ 3.3167, 43.7295 ], [ 3.3166, 43.7297 ], [ 3.3168, 43.73 ], [ 3.3169, 43.7303 ], [ 3.3164, 43.7303 ], [ 3.3165, 43.7305 ], [ 3.3166, 43.7307 ], [ 3.3164, 43.7307 ], [ 3.3165, 43.7309 ], [ 3.3165, 43.7309 ], [ 3.316, 43.7312 ], [ 3.3149, 43.7318 ], [ 3.3147, 43.7319 ], [ 3.3146, 43.732 ], [ 3.3136, 43.7324 ], [ 3.313, 43.7327 ], [ 3.3125, 43.7329 ], [ 3.312, 43.7332 ], [ 3.3121, 43.7334 ], [ 3.3122, 43.7335 ], [ 3.3122, 43.7336 ], [ 3.3129, 43.7334 ], [ 3.3132, 43.7333 ], [ 3.3142, 43.7328 ], [ 3.3148, 43.7326 ], [ 3.3157, 43.7322 ], [ 3.3162, 43.7324 ], [ 3.3163, 43.7323 ], [ 3.3161, 43.7322 ], [ 3.3163, 43.7321 ], [ 3.3165, 43.732 ], [ 3.3166, 43.7318 ], [ 3.3168, 43.7316 ], [ 3.3171, 43.7313 ], [ 3.3174, 43.7315 ], [ 3.3175, 43.7315 ], [ 3.3176, 43.7317 ], [ 3.3177, 43.7318 ], [ 3.3177, 43.732 ], [ 3.3177, 43.7322 ], [ 3.3177, 43.7323 ], [ 3.3181, 43.7325 ], [ 3.3182, 43.7326 ], [ 3.3184, 43.7329 ], [ 3.3187, 43.7331 ], [ 3.319, 43.7329 ], [ 3.3191, 43.7329 ], [ 3.3193, 43.733 ], [ 3.3195, 43.7333 ], [ 3.3176, 43.7349 ], [ 3.3179, 43.735 ], [ 3.3174, 43.7354 ], [ 3.3176, 43.7355 ], [ 3.3176, 43.7355 ], [ 3.3177, 43.7356 ], [ 3.3176, 43.7357 ], [ 3.3175, 43.7357 ], [ 3.3175, 43.7358 ], [ 3.3176, 43.7359 ], [ 3.3176, 43.7359 ], [ 3.3183, 43.7361 ], [ 3.3184, 43.7361 ], [ 3.3187, 43.736 ], [ 3.3188, 43.7358 ], [ 3.3188, 43.7358 ], [ 3.3189, 43.7357 ], [ 3.319, 43.7358 ], [ 3.3194, 43.7356 ], [ 3.3195, 43.7355 ], [ 3.3198, 43.7355 ], [ 3.3206, 43.7354 ], [ 3.3205, 43.7351 ], [ 3.3194, 43.7352 ], [ 3.3197, 43.7349 ], [ 3.32, 43.7346 ], [ 3.3205, 43.7341 ], [ 3.3198, 43.7334 ], [ 3.3203, 43.733 ], [ 3.3205, 43.7329 ], [ 3.3207, 43.7327 ], [ 3.3208, 43.7328 ], [ 3.3212, 43.7325 ], [ 3.3215, 43.7322 ], [ 3.322, 43.7321 ], [ 3.3223, 43.732 ], [ 3.3227, 43.7322 ], [ 3.3233, 43.7323 ], [ 3.3236, 43.7323 ], [ 3.3236, 43.7325 ], [ 3.3236, 43.7327 ], [ 3.3237, 43.7332 ], [ 3.3239, 43.7337 ], [ 3.3249, 43.7338 ], [ 3.3249, 43.7334 ], [ 3.3246, 43.7335 ], [ 3.3245, 43.7331 ], [ 3.3245, 43.7329 ], [ 3.3244, 43.7324 ], [ 3.3244, 43.7324 ], [ 3.3245, 43.7324 ], [ 3.3246, 43.7321 ], [ 3.3246, 43.732 ], [ 3.3248, 43.7318 ], [ 3.3247, 43.7318 ], [ 3.3248, 43.7315 ], [ 3.3248, 43.7315 ], [ 3.3248, 43.7314 ], [ 3.3248, 43.7314 ], [ 3.3248, 43.7313 ], [ 3.3249, 43.7312 ], [ 3.3249, 43.731 ] ] ], "type": "Polygon" }, "id": "82", "properties": { "code_commune": "34142", "code_departement": "34", "code_qp": "QP034022", "commune_qp": "Lodève", "nom_commune": "Lodève", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 3.153, 43.6131, 3.1621, 43.6187 ], "geometry": { "coordinates": [ [ [ 3.1553, 43.6173 ], [ 3.1553, 43.6176 ], [ 3.1559, 43.6174 ], [ 3.1558, 43.6174 ], [ 3.1561, 43.6173 ], [ 3.1561, 43.6172 ], [ 3.1562, 43.6167 ], [ 3.1562, 43.6164 ], [ 3.1562, 43.6163 ], [ 3.1562, 43.6162 ], [ 3.157, 43.6162 ], [ 3.157, 43.6166 ], [ 3.157, 43.6173 ], [ 3.1568, 43.6175 ], [ 3.1568, 43.6175 ], [ 3.1567, 43.6176 ], [ 3.1567, 43.6176 ], [ 3.1566, 43.6177 ], [ 3.1575, 43.6182 ], [ 3.1578, 43.6179 ], [ 3.1585, 43.6183 ], [ 3.1589, 43.6185 ], [ 3.1593, 43.6187 ], [ 3.1601, 43.6181 ], [ 3.1605, 43.6177 ], [ 3.1608, 43.6175 ], [ 3.161, 43.6176 ], [ 3.1611, 43.6175 ], [ 3.1613, 43.6176 ], [ 3.1615, 43.6177 ], [ 3.1617, 43.6179 ], [ 3.1617, 43.6179 ], [ 3.1621, 43.6177 ], [ 3.1618, 43.6175 ], [ 3.162, 43.6174 ], [ 3.1615, 43.6169 ], [ 3.1614, 43.6168 ], [ 3.1614, 43.6168 ], [ 3.1613, 43.6167 ], [ 3.1613, 43.6167 ], [ 3.1611, 43.6163 ], [ 3.1609, 43.6161 ], [ 3.1609, 43.6161 ], [ 3.1608, 43.6161 ], [ 3.1608, 43.616 ], [ 3.1607, 43.6159 ], [ 3.1608, 43.6158 ], [ 3.1608, 43.6157 ], [ 3.1609, 43.6156 ], [ 3.1609, 43.6156 ], [ 3.1611, 43.6155 ], [ 3.1605, 43.615 ], [ 3.1597, 43.6145 ], [ 3.1596, 43.6144 ], [ 3.1595, 43.6142 ], [ 3.1595, 43.6142 ], [ 3.1593, 43.6141 ], [ 3.1595, 43.614 ], [ 3.1594, 43.6139 ], [ 3.1594, 43.6139 ], [ 3.1594, 43.6139 ], [ 3.1592, 43.6139 ], [ 3.1596, 43.6135 ], [ 3.1592, 43.6132 ], [ 3.159, 43.6131 ], [ 3.1589, 43.6131 ], [ 3.1585, 43.6133 ], [ 3.1583, 43.6134 ], [ 3.1582, 43.6134 ], [ 3.158, 43.6135 ], [ 3.158, 43.6135 ], [ 3.1575, 43.6137 ], [ 3.1576, 43.6139 ], [ 3.1576, 43.6139 ], [ 3.1576, 43.6139 ], [ 3.1577, 43.614 ], [ 3.1571, 43.6143 ], [ 3.1571, 43.6143 ], [ 3.157, 43.6144 ], [ 3.1569, 43.6143 ], [ 3.1569, 43.6143 ], [ 3.1568, 43.6142 ], [ 3.1567, 43.6143 ], [ 3.1566, 43.6142 ], [ 3.1563, 43.6144 ], [ 3.1564, 43.6145 ], [ 3.1565, 43.6147 ], [ 3.1568, 43.6149 ], [ 3.1569, 43.6149 ], [ 3.1569, 43.615 ], [ 3.1569, 43.615 ], [ 3.1569, 43.615 ], [ 3.157, 43.615 ], [ 3.1571, 43.6151 ], [ 3.1573, 43.6151 ], [ 3.1574, 43.6152 ], [ 3.1572, 43.6153 ], [ 3.1572, 43.6156 ], [ 3.1571, 43.6159 ], [ 3.1571, 43.6161 ], [ 3.1562, 43.6161 ], [ 3.1562, 43.6159 ], [ 3.1559, 43.6154 ], [ 3.1557, 43.6154 ], [ 3.1553, 43.6153 ], [ 3.1551, 43.6153 ], [ 3.1547, 43.6152 ], [ 3.1544, 43.6152 ], [ 3.1544, 43.6151 ], [ 3.1536, 43.6154 ], [ 3.1535, 43.6154 ], [ 3.1535, 43.6154 ], [ 3.1537, 43.6156 ], [ 3.1538, 43.6158 ], [ 3.1537, 43.6158 ], [ 3.1535, 43.6159 ], [ 3.1534, 43.6159 ], [ 3.153, 43.6161 ], [ 3.153, 43.6162 ], [ 3.1535, 43.6169 ], [ 3.1536, 43.6168 ], [ 3.1537, 43.617 ], [ 3.1537, 43.6171 ], [ 3.1537, 43.6172 ], [ 3.1539, 43.6173 ], [ 3.1541, 43.6176 ], [ 3.1541, 43.6176 ], [ 3.1543, 43.6175 ], [ 3.1543, 43.6176 ], [ 3.1553, 43.6173 ] ] ], "type": "Polygon" }, "id": "83", "properties": { "code_commune": "34028", "code_departement": "34", "code_qp": "QP034020", "commune_qp": "Bédarieux", "nom_commune": "Bédarieux", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 1.6053, 43.107, 1.6151, 43.1218 ], "geometry": { "coordinates": [ [ [ 1.6151, 43.108 ], [ 1.6148, 43.108 ], [ 1.6148, 43.1079 ], [ 1.6141, 43.1079 ], [ 1.6144, 43.1073 ], [ 1.6143, 43.1073 ], [ 1.6142, 43.1073 ], [ 1.6141, 43.1073 ], [ 1.614, 43.1072 ], [ 1.6138, 43.1071 ], [ 1.6137, 43.1071 ], [ 1.6135, 43.1071 ], [ 1.6134, 43.107 ], [ 1.6129, 43.1071 ], [ 1.6125, 43.1072 ], [ 1.6123, 43.1073 ], [ 1.6121, 43.1073 ], [ 1.612, 43.1074 ], [ 1.6115, 43.1075 ], [ 1.6109, 43.1077 ], [ 1.6108, 43.1077 ], [ 1.6106, 43.1077 ], [ 1.6099, 43.1077 ], [ 1.6097, 43.1077 ], [ 1.6094, 43.1077 ], [ 1.6089, 43.1077 ], [ 1.6084, 43.1077 ], [ 1.6081, 43.1077 ], [ 1.608, 43.1078 ], [ 1.6078, 43.108 ], [ 1.6073, 43.1085 ], [ 1.6074, 43.109 ], [ 1.6075, 43.1093 ], [ 1.6082, 43.109 ], [ 1.6083, 43.1091 ], [ 1.6089, 43.1088 ], [ 1.6093, 43.1093 ], [ 1.6102, 43.109 ], [ 1.611, 43.1095 ], [ 1.6112, 43.1097 ], [ 1.6116, 43.1102 ], [ 1.6117, 43.1104 ], [ 1.6121, 43.1109 ], [ 1.612, 43.111 ], [ 1.6115, 43.1111 ], [ 1.6114, 43.111 ], [ 1.6113, 43.111 ], [ 1.6113, 43.111 ], [ 1.6109, 43.1111 ], [ 1.6109, 43.1111 ], [ 1.6105, 43.111 ], [ 1.6097, 43.1107 ], [ 1.6096, 43.1107 ], [ 1.6095, 43.1107 ], [ 1.6093, 43.1108 ], [ 1.609, 43.1111 ], [ 1.6092, 43.1111 ], [ 1.6093, 43.1112 ], [ 1.6095, 43.1115 ], [ 1.6096, 43.1115 ], [ 1.6097, 43.1116 ], [ 1.6097, 43.1117 ], [ 1.6097, 43.1118 ], [ 1.6096, 43.112 ], [ 1.6096, 43.1124 ], [ 1.6095, 43.1126 ], [ 1.6085, 43.1126 ], [ 1.6085, 43.1128 ], [ 1.6085, 43.1129 ], [ 1.6085, 43.1131 ], [ 1.6085, 43.1131 ], [ 1.6086, 43.1131 ], [ 1.6087, 43.1131 ], [ 1.6089, 43.1131 ], [ 1.609, 43.113 ], [ 1.6091, 43.1131 ], [ 1.6093, 43.1131 ], [ 1.6094, 43.1131 ], [ 1.6094, 43.1131 ], [ 1.6095, 43.1131 ], [ 1.6095, 43.1132 ], [ 1.6096, 43.1132 ], [ 1.6096, 43.1132 ], [ 1.6097, 43.1132 ], [ 1.6099, 43.1133 ], [ 1.61, 43.1133 ], [ 1.6102, 43.1134 ], [ 1.6104, 43.1134 ], [ 1.6107, 43.1136 ], [ 1.6105, 43.1138 ], [ 1.6102, 43.1139 ], [ 1.6105, 43.1142 ], [ 1.6106, 43.1143 ], [ 1.6106, 43.1144 ], [ 1.6106, 43.1144 ], [ 1.6109, 43.1146 ], [ 1.6108, 43.1147 ], [ 1.6104, 43.1148 ], [ 1.6098, 43.115 ], [ 1.6095, 43.1151 ], [ 1.6097, 43.1153 ], [ 1.6095, 43.1154 ], [ 1.6094, 43.1155 ], [ 1.6094, 43.1156 ], [ 1.6093, 43.1156 ], [ 1.6089, 43.1157 ], [ 1.6087, 43.1153 ], [ 1.6081, 43.1154 ], [ 1.6076, 43.1147 ], [ 1.6072, 43.1145 ], [ 1.607, 43.1144 ], [ 1.6069, 43.1144 ], [ 1.6068, 43.1143 ], [ 1.6068, 43.1143 ], [ 1.6068, 43.1143 ], [ 1.6069, 43.1141 ], [ 1.6066, 43.1139 ], [ 1.6065, 43.1139 ], [ 1.6065, 43.1138 ], [ 1.6064, 43.1137 ], [ 1.6063, 43.1137 ], [ 1.6062, 43.1137 ], [ 1.6061, 43.1137 ], [ 1.6062, 43.1137 ], [ 1.6059, 43.1135 ], [ 1.6057, 43.1135 ], [ 1.6055, 43.1138 ], [ 1.6054, 43.114 ], [ 1.6053, 43.1143 ], [ 1.6054, 43.1144 ], [ 1.6054, 43.1144 ], [ 1.6055, 43.1145 ], [ 1.6055, 43.1145 ], [ 1.6056, 43.1145 ], [ 1.6064, 43.115 ], [ 1.6066, 43.115 ], [ 1.6067, 43.1152 ], [ 1.6069, 43.1154 ], [ 1.607, 43.1156 ], [ 1.6071, 43.1157 ], [ 1.6073, 43.1161 ], [ 1.6074, 43.1164 ], [ 1.6075, 43.1165 ], [ 1.6078, 43.1166 ], [ 1.608, 43.1167 ], [ 1.608, 43.1167 ], [ 1.6082, 43.1166 ], [ 1.6089, 43.1173 ], [ 1.6092, 43.1177 ], [ 1.6094, 43.1178 ], [ 1.6094, 43.1179 ], [ 1.6095, 43.1181 ], [ 1.6095, 43.1182 ], [ 1.6094, 43.1182 ], [ 1.609, 43.1182 ], [ 1.609, 43.1188 ], [ 1.6089, 43.1191 ], [ 1.6088, 43.1193 ], [ 1.6087, 43.1195 ], [ 1.6087, 43.1197 ], [ 1.6088, 43.1198 ], [ 1.609, 43.12 ], [ 1.6098, 43.1206 ], [ 1.6099, 43.1207 ], [ 1.61, 43.1206 ], [ 1.6105, 43.1204 ], [ 1.6109, 43.1203 ], [ 1.6111, 43.1202 ], [ 1.6113, 43.1202 ], [ 1.6115, 43.1203 ], [ 1.6115, 43.1204 ], [ 1.6116, 43.1204 ], [ 1.6116, 43.1207 ], [ 1.6117, 43.1213 ], [ 1.6124, 43.1214 ], [ 1.6125, 43.1215 ], [ 1.6128, 43.1217 ], [ 1.613, 43.1217 ], [ 1.6134, 43.1218 ], [ 1.6133, 43.1217 ], [ 1.6131, 43.1214 ], [ 1.6128, 43.1213 ], [ 1.6131, 43.1209 ], [ 1.6134, 43.1211 ], [ 1.6137, 43.1209 ], [ 1.6141, 43.1207 ], [ 1.614, 43.1207 ], [ 1.6134, 43.1206 ], [ 1.613, 43.1205 ], [ 1.6127, 43.1206 ], [ 1.6125, 43.1206 ], [ 1.6124, 43.1205 ], [ 1.6125, 43.1203 ], [ 1.6125, 43.12 ], [ 1.6129, 43.12 ], [ 1.6124, 43.1194 ], [ 1.6122, 43.1193 ], [ 1.6125, 43.1192 ], [ 1.6125, 43.1191 ], [ 1.6127, 43.119 ], [ 1.613, 43.1188 ], [ 1.6131, 43.1187 ], [ 1.6135, 43.1185 ], [ 1.6136, 43.1185 ], [ 1.6138, 43.1184 ], [ 1.614, 43.1184 ], [ 1.6142, 43.1182 ], [ 1.6145, 43.118 ], [ 1.6147, 43.1178 ], [ 1.6148, 43.1177 ], [ 1.6149, 43.1175 ], [ 1.6149, 43.1174 ], [ 1.6149, 43.1172 ], [ 1.6149, 43.1169 ], [ 1.6148, 43.1165 ], [ 1.6148, 43.1163 ], [ 1.6147, 43.116 ], [ 1.6146, 43.1155 ], [ 1.6145, 43.1151 ], [ 1.6141, 43.1152 ], [ 1.614, 43.1152 ], [ 1.6139, 43.1153 ], [ 1.6138, 43.1153 ], [ 1.6138, 43.1152 ], [ 1.6137, 43.1152 ], [ 1.6134, 43.1153 ], [ 1.6134, 43.1152 ], [ 1.6132, 43.1152 ], [ 1.6132, 43.1152 ], [ 1.6131, 43.1152 ], [ 1.6131, 43.1153 ], [ 1.6129, 43.1153 ], [ 1.6129, 43.1152 ], [ 1.6127, 43.1153 ], [ 1.6127, 43.1151 ], [ 1.6125, 43.1152 ], [ 1.6124, 43.1151 ], [ 1.6124, 43.1151 ], [ 1.6123, 43.1151 ], [ 1.6121, 43.1149 ], [ 1.6119, 43.1146 ], [ 1.6119, 43.1145 ], [ 1.6116, 43.1142 ], [ 1.6117, 43.1142 ], [ 1.6115, 43.1141 ], [ 1.6115, 43.1141 ], [ 1.6115, 43.114 ], [ 1.6114, 43.114 ], [ 1.6115, 43.114 ], [ 1.6112, 43.1138 ], [ 1.6116, 43.1135 ], [ 1.6121, 43.1137 ], [ 1.6122, 43.1135 ], [ 1.6116, 43.1131 ], [ 1.611, 43.1127 ], [ 1.6113, 43.1125 ], [ 1.6116, 43.1124 ], [ 1.612, 43.1121 ], [ 1.612, 43.112 ], [ 1.6125, 43.1118 ], [ 1.6124, 43.1117 ], [ 1.6123, 43.1117 ], [ 1.6122, 43.1117 ], [ 1.6122, 43.1116 ], [ 1.6122, 43.1116 ], [ 1.612, 43.1115 ], [ 1.6123, 43.1113 ], [ 1.613, 43.111 ], [ 1.6132, 43.1109 ], [ 1.6134, 43.1108 ], [ 1.614, 43.1106 ], [ 1.6147, 43.1102 ], [ 1.6147, 43.1102 ], [ 1.6147, 43.1101 ], [ 1.6146, 43.1099 ], [ 1.6145, 43.1098 ], [ 1.6144, 43.1097 ], [ 1.6141, 43.1094 ], [ 1.6138, 43.1091 ], [ 1.6138, 43.1087 ], [ 1.6138, 43.1084 ], [ 1.6139, 43.1084 ], [ 1.6142, 43.1084 ], [ 1.6147, 43.1084 ], [ 1.6148, 43.1084 ], [ 1.6151, 43.108 ] ] ], "type": "Polygon" }, "id": "84", "properties": { "code_commune": "09225", "code_departement": "09", "code_qp": "QP009003", "commune_qp": "Pamiers", "nom_commune": "Pamiers", "nom_qp": "Centre Ancien - La Gloriette" }, "type": "Feature" }, { "bbox": [ 3.4658, 43.3088, 3.4746, 43.3166 ], "geometry": { "coordinates": [ [ [ 3.4736, 43.316 ], [ 3.4736, 43.3158 ], [ 3.4736, 43.3155 ], [ 3.4735, 43.3151 ], [ 3.4734, 43.3147 ], [ 3.4733, 43.3145 ], [ 3.4733, 43.3143 ], [ 3.4732, 43.314 ], [ 3.4735, 43.3139 ], [ 3.4739, 43.3137 ], [ 3.4741, 43.3132 ], [ 3.4741, 43.3131 ], [ 3.474, 43.3131 ], [ 3.474, 43.3131 ], [ 3.4739, 43.3127 ], [ 3.4737, 43.3117 ], [ 3.4746, 43.3116 ], [ 3.4745, 43.3112 ], [ 3.4735, 43.3111 ], [ 3.4739, 43.3107 ], [ 3.4742, 43.3105 ], [ 3.4746, 43.3102 ], [ 3.4745, 43.3102 ], [ 3.4745, 43.3101 ], [ 3.4745, 43.3101 ], [ 3.4741, 43.3102 ], [ 3.4737, 43.3102 ], [ 3.4733, 43.3103 ], [ 3.4733, 43.3102 ], [ 3.4731, 43.3099 ], [ 3.4729, 43.3099 ], [ 3.4725, 43.31 ], [ 3.4721, 43.31 ], [ 3.4718, 43.31 ], [ 3.4718, 43.31 ], [ 3.4718, 43.3091 ], [ 3.4715, 43.3091 ], [ 3.4715, 43.3091 ], [ 3.471, 43.3089 ], [ 3.471, 43.3089 ], [ 3.4708, 43.3088 ], [ 3.4704, 43.3088 ], [ 3.4703, 43.3088 ], [ 3.4702, 43.3088 ], [ 3.4702, 43.3089 ], [ 3.4701, 43.3089 ], [ 3.4701, 43.3089 ], [ 3.47, 43.3089 ], [ 3.47, 43.309 ], [ 3.4699, 43.309 ], [ 3.4699, 43.309 ], [ 3.4699, 43.309 ], [ 3.4698, 43.309 ], [ 3.4697, 43.309 ], [ 3.4696, 43.3089 ], [ 3.4693, 43.3089 ], [ 3.4692, 43.3088 ], [ 3.4691, 43.3088 ], [ 3.469, 43.3088 ], [ 3.4685, 43.309 ], [ 3.4685, 43.309 ], [ 3.4686, 43.3092 ], [ 3.4687, 43.3093 ], [ 3.4687, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4685, 43.3095 ], [ 3.4682, 43.3096 ], [ 3.4681, 43.3097 ], [ 3.4681, 43.3097 ], [ 3.4682, 43.3099 ], [ 3.468, 43.3099 ], [ 3.4681, 43.3101 ], [ 3.4681, 43.3102 ], [ 3.4682, 43.3104 ], [ 3.4682, 43.3104 ], [ 3.4682, 43.3105 ], [ 3.4682, 43.3106 ], [ 3.4659, 43.3109 ], [ 3.466, 43.3111 ], [ 3.4658, 43.3112 ], [ 3.4659, 43.3114 ], [ 3.4661, 43.3114 ], [ 3.4661, 43.3116 ], [ 3.4662, 43.3117 ], [ 3.4663, 43.3119 ], [ 3.4666, 43.3122 ], [ 3.4668, 43.3124 ], [ 3.4669, 43.3126 ], [ 3.4669, 43.3126 ], [ 3.4669, 43.3126 ], [ 3.4674, 43.3133 ], [ 3.4675, 43.3134 ], [ 3.4676, 43.3135 ], [ 3.4678, 43.3136 ], [ 3.4682, 43.3138 ], [ 3.4686, 43.314 ], [ 3.4689, 43.3142 ], [ 3.4692, 43.3144 ], [ 3.4694, 43.3145 ], [ 3.4696, 43.3147 ], [ 3.469, 43.3148 ], [ 3.4682, 43.315 ], [ 3.4677, 43.3146 ], [ 3.4668, 43.315 ], [ 3.4666, 43.3151 ], [ 3.4663, 43.3153 ], [ 3.4662, 43.3153 ], [ 3.4664, 43.3154 ], [ 3.4664, 43.3154 ], [ 3.4665, 43.3154 ], [ 3.467, 43.3156 ], [ 3.4672, 43.3155 ], [ 3.4677, 43.3159 ], [ 3.4683, 43.3153 ], [ 3.47, 43.3148 ], [ 3.4704, 43.315 ], [ 3.4706, 43.3151 ], [ 3.4708, 43.3152 ], [ 3.4724, 43.3161 ], [ 3.4726, 43.3164 ], [ 3.4733, 43.3166 ], [ 3.4734, 43.3165 ], [ 3.4734, 43.316 ], [ 3.4736, 43.316 ] ] ], "type": "Polygon" }, "id": "85", "properties": { "code_commune": "34003", "code_departement": "34", "code_qp": "QP034019", "commune_qp": "Agde", "nom_commune": "Agde", "nom_qp": "Centre Ville" }, "type": "Feature" }, { "bbox": [ 0.0545, 43.2405, 0.0703, 43.2469 ], "geometry": { "coordinates": [ [ [ 0.0611, 43.2419 ], [ 0.0611, 43.2425 ], [ 0.061, 43.2425 ], [ 0.061, 43.2431 ], [ 0.0614, 43.2431 ], [ 0.0616, 43.2431 ], [ 0.0616, 43.2431 ], [ 0.0615, 43.2433 ], [ 0.0612, 43.2435 ], [ 0.0601, 43.2436 ], [ 0.0595, 43.2436 ], [ 0.0595, 43.2436 ], [ 0.059, 43.2436 ], [ 0.059, 43.2438 ], [ 0.059, 43.2444 ], [ 0.059, 43.2445 ], [ 0.0589, 43.2447 ], [ 0.0589, 43.2449 ], [ 0.0588, 43.2449 ], [ 0.0588, 43.2449 ], [ 0.0582, 43.2449 ], [ 0.0578, 43.2449 ], [ 0.0568, 43.2449 ], [ 0.0568, 43.245 ], [ 0.0565, 43.2449 ], [ 0.0559, 43.2449 ], [ 0.0559, 43.245 ], [ 0.0559, 43.2453 ], [ 0.0559, 43.2454 ], [ 0.0558, 43.2455 ], [ 0.0557, 43.2455 ], [ 0.0556, 43.2455 ], [ 0.0555, 43.2455 ], [ 0.0553, 43.2454 ], [ 0.0553, 43.2454 ], [ 0.0553, 43.2453 ], [ 0.0553, 43.2451 ], [ 0.0553, 43.245 ], [ 0.0553, 43.2449 ], [ 0.0552, 43.2449 ], [ 0.0552, 43.2448 ], [ 0.0551, 43.2447 ], [ 0.0548, 43.2446 ], [ 0.0547, 43.2446 ], [ 0.0546, 43.2458 ], [ 0.0546, 43.2459 ], [ 0.0545, 43.2459 ], [ 0.0545, 43.2461 ], [ 0.0545, 43.2463 ], [ 0.0546, 43.2466 ], [ 0.055, 43.2469 ], [ 0.0557, 43.2468 ], [ 0.0558, 43.2461 ], [ 0.0558, 43.2461 ], [ 0.0558, 43.2456 ], [ 0.0559, 43.2455 ], [ 0.0559, 43.2455 ], [ 0.056, 43.2455 ], [ 0.0561, 43.2457 ], [ 0.0562, 43.2459 ], [ 0.0563, 43.2459 ], [ 0.0565, 43.246 ], [ 0.057, 43.246 ], [ 0.0574, 43.2461 ], [ 0.0576, 43.2459 ], [ 0.0577, 43.2458 ], [ 0.058, 43.2456 ], [ 0.0583, 43.2454 ], [ 0.0586, 43.2452 ], [ 0.059, 43.2449 ], [ 0.0591, 43.245 ], [ 0.0595, 43.2452 ], [ 0.0602, 43.2445 ], [ 0.0609, 43.2438 ], [ 0.061, 43.2439 ], [ 0.0611, 43.2439 ], [ 0.0614, 43.2439 ], [ 0.0614, 43.244 ], [ 0.0615, 43.244 ], [ 0.0615, 43.2442 ], [ 0.0614, 43.2456 ], [ 0.0613, 43.2459 ], [ 0.0614, 43.2459 ], [ 0.0625, 43.2465 ], [ 0.0627, 43.2466 ], [ 0.0628, 43.2466 ], [ 0.0633, 43.2466 ], [ 0.0646, 43.2466 ], [ 0.0651, 43.2467 ], [ 0.0656, 43.2456 ], [ 0.0657, 43.2456 ], [ 0.0667, 43.2458 ], [ 0.0667, 43.2457 ], [ 0.0668, 43.2458 ], [ 0.0674, 43.2458 ], [ 0.0679, 43.2459 ], [ 0.0684, 43.2459 ], [ 0.0684, 43.2459 ], [ 0.0684, 43.2458 ], [ 0.0684, 43.2458 ], [ 0.0685, 43.2457 ], [ 0.0687, 43.2457 ], [ 0.0689, 43.2456 ], [ 0.0691, 43.2454 ], [ 0.0686, 43.245 ], [ 0.0686, 43.245 ], [ 0.0683, 43.2449 ], [ 0.0684, 43.2449 ], [ 0.0684, 43.2447 ], [ 0.0685, 43.2446 ], [ 0.0685, 43.2445 ], [ 0.0685, 43.2442 ], [ 0.0685, 43.2441 ], [ 0.0693, 43.2442 ], [ 0.07, 43.2442 ], [ 0.0701, 43.2437 ], [ 0.0701, 43.2436 ], [ 0.0702, 43.2434 ], [ 0.0703, 43.243 ], [ 0.0703, 43.2429 ], [ 0.0703, 43.2426 ], [ 0.0697, 43.2426 ], [ 0.0696, 43.2425 ], [ 0.0696, 43.2426 ], [ 0.0695, 43.2426 ], [ 0.0694, 43.2426 ], [ 0.0694, 43.2427 ], [ 0.0694, 43.2427 ], [ 0.0692, 43.243 ], [ 0.069, 43.2431 ], [ 0.069, 43.2432 ], [ 0.069, 43.2432 ], [ 0.069, 43.2432 ], [ 0.069, 43.2433 ], [ 0.069, 43.2434 ], [ 0.0682, 43.2433 ], [ 0.0683, 43.243 ], [ 0.0683, 43.2425 ], [ 0.0683, 43.2425 ], [ 0.0683, 43.2424 ], [ 0.0683, 43.2419 ], [ 0.0674, 43.2419 ], [ 0.0674, 43.2415 ], [ 0.0672, 43.2415 ], [ 0.0671, 43.2417 ], [ 0.0667, 43.2422 ], [ 0.0667, 43.2423 ], [ 0.0659, 43.2423 ], [ 0.0657, 43.2423 ], [ 0.0656, 43.2425 ], [ 0.0641, 43.2424 ], [ 0.064, 43.2424 ], [ 0.0639, 43.2425 ], [ 0.0638, 43.2425 ], [ 0.0635, 43.2428 ], [ 0.063, 43.2426 ], [ 0.0625, 43.2423 ], [ 0.0627, 43.2421 ], [ 0.0626, 43.242 ], [ 0.0626, 43.2421 ], [ 0.0621, 43.2421 ], [ 0.0621, 43.242 ], [ 0.062, 43.242 ], [ 0.0619, 43.242 ], [ 0.0617, 43.242 ], [ 0.0616, 43.242 ], [ 0.0616, 43.2405 ], [ 0.0612, 43.2405 ], [ 0.0609, 43.2405 ], [ 0.0603, 43.2406 ], [ 0.0597, 43.2407 ], [ 0.0591, 43.2408 ], [ 0.0588, 43.2408 ], [ 0.0587, 43.2409 ], [ 0.059, 43.2416 ], [ 0.0591, 43.2418 ], [ 0.0591, 43.242 ], [ 0.0591, 43.242 ], [ 0.0595, 43.2419 ], [ 0.0597, 43.2419 ], [ 0.0601, 43.2419 ], [ 0.0611, 43.2418 ], [ 0.0611, 43.2419 ] ] ], "type": "Polygon" }, "id": "86", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065002", "commune_qp": "Tarbes", "nom_commune": "Tarbes", "nom_qp": "Tarbes Nord" }, "type": "Feature" }, { "bbox": [ 1.8884, 43.8981, 1.9055, 43.91 ], "geometry": { "coordinates": [ [ [ 1.8974, 43.9039 ], [ 1.8973, 43.9038 ], [ 1.8973, 43.9038 ], [ 1.8972, 43.9038 ], [ 1.8972, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8971, 43.9037 ], [ 1.8972, 43.9035 ], [ 1.8972, 43.9034 ], [ 1.8965, 43.9033 ], [ 1.8963, 43.9033 ], [ 1.8962, 43.9032 ], [ 1.8961, 43.9031 ], [ 1.8959, 43.903 ], [ 1.8957, 43.9029 ], [ 1.8956, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8955, 43.9029 ], [ 1.8954, 43.9029 ], [ 1.8953, 43.9029 ], [ 1.8952, 43.9028 ], [ 1.8951, 43.9028 ], [ 1.8951, 43.9028 ], [ 1.895, 43.9028 ], [ 1.8949, 43.9028 ], [ 1.8948, 43.903 ], [ 1.8946, 43.9029 ], [ 1.8944, 43.9028 ], [ 1.8945, 43.9027 ], [ 1.8941, 43.9025 ], [ 1.8939, 43.9024 ], [ 1.8936, 43.9024 ], [ 1.8934, 43.9023 ], [ 1.8933, 43.9023 ], [ 1.8934, 43.9021 ], [ 1.8932, 43.9021 ], [ 1.8927, 43.9022 ], [ 1.8923, 43.9023 ], [ 1.8923, 43.902 ], [ 1.8922, 43.902 ], [ 1.8922, 43.9018 ], [ 1.8922, 43.9015 ], [ 1.8921, 43.9014 ], [ 1.8921, 43.9012 ], [ 1.8922, 43.9008 ], [ 1.8922, 43.9007 ], [ 1.8923, 43.9005 ], [ 1.8924, 43.9004 ], [ 1.8922, 43.9002 ], [ 1.8919, 43.9 ], [ 1.8918, 43.9001 ], [ 1.8916, 43.9002 ], [ 1.8914, 43.9003 ], [ 1.8912, 43.9004 ], [ 1.891, 43.9006 ], [ 1.8909, 43.9006 ], [ 1.8908, 43.9006 ], [ 1.8906, 43.9006 ], [ 1.8905, 43.9006 ], [ 1.8906, 43.9005 ], [ 1.8907, 43.9005 ], [ 1.8909, 43.9003 ], [ 1.8911, 43.9002 ], [ 1.8912, 43.9001 ], [ 1.8912, 43.9 ], [ 1.8912, 43.8999 ], [ 1.8912, 43.8998 ], [ 1.8913, 43.8997 ], [ 1.8913, 43.8996 ], [ 1.8915, 43.8994 ], [ 1.8915, 43.8994 ], [ 1.8916, 43.8993 ], [ 1.8917, 43.8993 ], [ 1.8919, 43.8992 ], [ 1.8921, 43.899 ], [ 1.8925, 43.8987 ], [ 1.8919, 43.8987 ], [ 1.8915, 43.8986 ], [ 1.8913, 43.8985 ], [ 1.8911, 43.8985 ], [ 1.8907, 43.8984 ], [ 1.8906, 43.8982 ], [ 1.8905, 43.8982 ], [ 1.8903, 43.8981 ], [ 1.89, 43.8981 ], [ 1.8899, 43.8983 ], [ 1.8897, 43.8986 ], [ 1.8894, 43.8989 ], [ 1.8892, 43.899 ], [ 1.889, 43.8992 ], [ 1.889, 43.8992 ], [ 1.8887, 43.8996 ], [ 1.8889, 43.8998 ], [ 1.8884, 43.9003 ], [ 1.8898, 43.9015 ], [ 1.8902, 43.9018 ], [ 1.8906, 43.9022 ], [ 1.8906, 43.9022 ], [ 1.8907, 43.9024 ], [ 1.8909, 43.9026 ], [ 1.8909, 43.9026 ], [ 1.8911, 43.9027 ], [ 1.8912, 43.9027 ], [ 1.8913, 43.9028 ], [ 1.8913, 43.9029 ], [ 1.8914, 43.903 ], [ 1.8915, 43.9032 ], [ 1.8916, 43.9033 ], [ 1.8917, 43.9034 ], [ 1.8918, 43.9035 ], [ 1.8921, 43.9035 ], [ 1.8927, 43.9037 ], [ 1.8928, 43.9037 ], [ 1.893, 43.9038 ], [ 1.893, 43.9039 ], [ 1.8931, 43.904 ], [ 1.8931, 43.9041 ], [ 1.8931, 43.9042 ], [ 1.8931, 43.9043 ], [ 1.893, 43.9046 ], [ 1.893, 43.9047 ], [ 1.8931, 43.9049 ], [ 1.8939, 43.9049 ], [ 1.8942, 43.9049 ], [ 1.8946, 43.9048 ], [ 1.8949, 43.9048 ], [ 1.8956, 43.9048 ], [ 1.8957, 43.9048 ], [ 1.8959, 43.9048 ], [ 1.896, 43.9049 ], [ 1.8961, 43.9049 ], [ 1.896, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8967, 43.9049 ], [ 1.8968, 43.9049 ], [ 1.8968, 43.9049 ], [ 1.8969, 43.9049 ], [ 1.8969, 43.9046 ], [ 1.8969, 43.9046 ], [ 1.8971, 43.9046 ], [ 1.8973, 43.9046 ], [ 1.8973, 43.9047 ], [ 1.8975, 43.9047 ], [ 1.8977, 43.9047 ], [ 1.8978, 43.9048 ], [ 1.8979, 43.9048 ], [ 1.8979, 43.9049 ], [ 1.8981, 43.9051 ], [ 1.8981, 43.9052 ], [ 1.8987, 43.9063 ], [ 1.9006, 43.9058 ], [ 1.9008, 43.906 ], [ 1.9014, 43.9068 ], [ 1.9016, 43.9072 ], [ 1.9019, 43.9075 ], [ 1.902, 43.9076 ], [ 1.9021, 43.9078 ], [ 1.9023, 43.9083 ], [ 1.9027, 43.9089 ], [ 1.9031, 43.9094 ], [ 1.9035, 43.9099 ], [ 1.9036, 43.91 ], [ 1.9036, 43.91 ], [ 1.9037, 43.91 ], [ 1.9043, 43.9094 ], [ 1.9052, 43.9087 ], [ 1.9055, 43.9084 ], [ 1.9042, 43.9062 ], [ 1.9041, 43.9061 ], [ 1.904, 43.9061 ], [ 1.9038, 43.9061 ], [ 1.9037, 43.9061 ], [ 1.9035, 43.9061 ], [ 1.9033, 43.9061 ], [ 1.9032, 43.9061 ], [ 1.9031, 43.9061 ], [ 1.9028, 43.906 ], [ 1.9022, 43.9058 ], [ 1.9016, 43.9056 ], [ 1.9012, 43.9055 ], [ 1.9008, 43.9054 ], [ 1.9004, 43.9053 ], [ 1.9001, 43.9052 ], [ 1.8993, 43.9051 ], [ 1.8992, 43.9051 ], [ 1.8987, 43.905 ], [ 1.8984, 43.905 ], [ 1.8983, 43.9049 ], [ 1.8982, 43.9049 ], [ 1.898, 43.9049 ], [ 1.898, 43.9049 ], [ 1.898, 43.9048 ], [ 1.8979, 43.9048 ], [ 1.8978, 43.9047 ], [ 1.8978, 43.9046 ], [ 1.8977, 43.9045 ], [ 1.8974, 43.9039 ] ] ], "type": "Polygon" }, "id": "87", "properties": { "code_commune": "81099", "code_departement": "81", "code_qp": "QP081010", "commune_qp": "Gaillac", "nom_commune": "Gaillac", "nom_qp": "Lentajou - Catalanis" }, "type": "Feature" }, { "bbox": [ 0.5908, 43.6323, 0.5997, 43.6392 ], "geometry": { "coordinates": [ [ [ 0.5963, 43.6372 ], [ 0.5963, 43.6371 ], [ 0.5964, 43.637 ], [ 0.5963, 43.6369 ], [ 0.5961, 43.6356 ], [ 0.5959, 43.6349 ], [ 0.5959, 43.6347 ], [ 0.5959, 43.6345 ], [ 0.5958, 43.6344 ], [ 0.5956, 43.6342 ], [ 0.5953, 43.6337 ], [ 0.595, 43.6333 ], [ 0.5948, 43.633 ], [ 0.5947, 43.6329 ], [ 0.5944, 43.6326 ], [ 0.5942, 43.6325 ], [ 0.5938, 43.6324 ], [ 0.5932, 43.6323 ], [ 0.593, 43.6323 ], [ 0.5928, 43.6323 ], [ 0.5926, 43.6323 ], [ 0.5924, 43.6323 ], [ 0.5921, 43.6324 ], [ 0.5922, 43.6327 ], [ 0.5921, 43.6327 ], [ 0.592, 43.6328 ], [ 0.5923, 43.6339 ], [ 0.5921, 43.6339 ], [ 0.5921, 43.6342 ], [ 0.5922, 43.6342 ], [ 0.5914, 43.6343 ], [ 0.5915, 43.6347 ], [ 0.5914, 43.6347 ], [ 0.5915, 43.6349 ], [ 0.5914, 43.6349 ], [ 0.5915, 43.6352 ], [ 0.5909, 43.6353 ], [ 0.5908, 43.6353 ], [ 0.5908, 43.6353 ], [ 0.5911, 43.636 ], [ 0.5911, 43.6361 ], [ 0.5913, 43.636 ], [ 0.5916, 43.636 ], [ 0.5919, 43.6359 ], [ 0.592, 43.6363 ], [ 0.5925, 43.6363 ], [ 0.5925, 43.6363 ], [ 0.5929, 43.6362 ], [ 0.5931, 43.6367 ], [ 0.5931, 43.6367 ], [ 0.5933, 43.6372 ], [ 0.5932, 43.6373 ], [ 0.5933, 43.6375 ], [ 0.5934, 43.6376 ], [ 0.5939, 43.6375 ], [ 0.5941, 43.6381 ], [ 0.5941, 43.6382 ], [ 0.5946, 43.6381 ], [ 0.5949, 43.6379 ], [ 0.5957, 43.6375 ], [ 0.5961, 43.6373 ], [ 0.5964, 43.6376 ], [ 0.5966, 43.6375 ], [ 0.5967, 43.6375 ], [ 0.5968, 43.6376 ], [ 0.5967, 43.6377 ], [ 0.5972, 43.6381 ], [ 0.596, 43.6386 ], [ 0.5961, 43.6386 ], [ 0.5962, 43.6387 ], [ 0.5966, 43.639 ], [ 0.5968, 43.6391 ], [ 0.5969, 43.6392 ], [ 0.5975, 43.6389 ], [ 0.5977, 43.6389 ], [ 0.5982, 43.6386 ], [ 0.598, 43.6381 ], [ 0.5981, 43.6381 ], [ 0.5983, 43.6381 ], [ 0.5983, 43.6379 ], [ 0.5985, 43.6378 ], [ 0.5989, 43.6376 ], [ 0.5991, 43.6374 ], [ 0.5993, 43.6373 ], [ 0.5994, 43.6371 ], [ 0.5995, 43.6369 ], [ 0.5996, 43.6366 ], [ 0.5997, 43.6366 ], [ 0.5997, 43.6365 ], [ 0.5997, 43.6364 ], [ 0.5997, 43.6363 ], [ 0.5994, 43.6364 ], [ 0.5994, 43.6364 ], [ 0.5992, 43.6363 ], [ 0.5989, 43.6361 ], [ 0.5988, 43.6362 ], [ 0.5985, 43.6363 ], [ 0.5981, 43.6365 ], [ 0.5978, 43.6366 ], [ 0.5974, 43.6367 ], [ 0.5971, 43.6368 ], [ 0.5969, 43.6369 ], [ 0.5967, 43.6371 ], [ 0.5966, 43.6371 ], [ 0.5964, 43.6372 ], [ 0.5964, 43.6372 ], [ 0.5963, 43.6372 ] ] ], "type": "Polygon" }, "id": "88", "properties": { "code_commune": "32013", "code_departement": "32", "code_qp": "QP032001", "commune_qp": "Auch", "nom_commune": "Auch", "nom_qp": "Grand Garros" }, "type": "Feature" }, { "bbox": [ 3.2468, 43.3314, 3.2605, 43.3417 ], "geometry": { "coordinates": [ [ [ 3.259, 43.3402 ], [ 3.2587, 43.34 ], [ 3.2587, 43.34 ], [ 3.2586, 43.34 ], [ 3.2584, 43.3401 ], [ 3.2583, 43.3402 ], [ 3.2583, 43.3401 ], [ 3.2583, 43.3399 ], [ 3.2582, 43.3396 ], [ 3.2581, 43.3391 ], [ 3.2573, 43.3393 ], [ 3.257, 43.3389 ], [ 3.257, 43.3388 ], [ 3.2568, 43.3384 ], [ 3.2567, 43.3383 ], [ 3.2569, 43.3379 ], [ 3.2571, 43.338 ], [ 3.2574, 43.3377 ], [ 3.2578, 43.3378 ], [ 3.2579, 43.3379 ], [ 3.258, 43.3379 ], [ 3.2579, 43.3378 ], [ 3.2583, 43.3373 ], [ 3.2583, 43.3373 ], [ 3.2584, 43.3372 ], [ 3.2584, 43.3372 ], [ 3.2587, 43.3369 ], [ 3.2589, 43.3366 ], [ 3.2589, 43.3366 ], [ 3.2589, 43.3364 ], [ 3.2588, 43.336 ], [ 3.2596, 43.3359 ], [ 3.2599, 43.3358 ], [ 3.26, 43.3357 ], [ 3.2602, 43.3356 ], [ 3.2603, 43.3355 ], [ 3.2604, 43.3354 ], [ 3.2604, 43.3353 ], [ 3.2605, 43.3351 ], [ 3.2595, 43.3351 ], [ 3.2595, 43.3348 ], [ 3.2589, 43.3348 ], [ 3.2586, 43.3348 ], [ 3.2586, 43.3348 ], [ 3.2585, 43.335 ], [ 3.2585, 43.3352 ], [ 3.2584, 43.3352 ], [ 3.2578, 43.3352 ], [ 3.2575, 43.3353 ], [ 3.2574, 43.3352 ], [ 3.2573, 43.3352 ], [ 3.2569, 43.3352 ], [ 3.2567, 43.3352 ], [ 3.2567, 43.3353 ], [ 3.2566, 43.3349 ], [ 3.2567, 43.3348 ], [ 3.2567, 43.334 ], [ 3.2566, 43.3336 ], [ 3.2565, 43.3336 ], [ 3.2561, 43.3336 ], [ 3.2557, 43.3336 ], [ 3.2554, 43.3336 ], [ 3.2552, 43.3336 ], [ 3.2549, 43.3336 ], [ 3.2542, 43.3336 ], [ 3.2537, 43.3336 ], [ 3.2528, 43.3336 ], [ 3.2524, 43.3336 ], [ 3.2522, 43.3336 ], [ 3.252, 43.3336 ], [ 3.2519, 43.3336 ], [ 3.2514, 43.3336 ], [ 3.2513, 43.3336 ], [ 3.2512, 43.3336 ], [ 3.2508, 43.3336 ], [ 3.2506, 43.3333 ], [ 3.2506, 43.3333 ], [ 3.2506, 43.3332 ], [ 3.2506, 43.3331 ], [ 3.2506, 43.3329 ], [ 3.2506, 43.3328 ], [ 3.2506, 43.3326 ], [ 3.2506, 43.3325 ], [ 3.2506, 43.3321 ], [ 3.2506, 43.3318 ], [ 3.2506, 43.3317 ], [ 3.2506, 43.3315 ], [ 3.2506, 43.3315 ], [ 3.2505, 43.3315 ], [ 3.2505, 43.3314 ], [ 3.2498, 43.3314 ], [ 3.2495, 43.3314 ], [ 3.2493, 43.3314 ], [ 3.2491, 43.3315 ], [ 3.2491, 43.3317 ], [ 3.2488, 43.3318 ], [ 3.2488, 43.3319 ], [ 3.2487, 43.3319 ], [ 3.2487, 43.332 ], [ 3.2487, 43.3321 ], [ 3.2487, 43.3321 ], [ 3.2487, 43.3322 ], [ 3.2488, 43.3323 ], [ 3.2488, 43.3323 ], [ 3.2487, 43.3323 ], [ 3.2485, 43.3325 ], [ 3.2485, 43.3326 ], [ 3.2486, 43.3327 ], [ 3.2485, 43.3328 ], [ 3.2485, 43.3328 ], [ 3.2484, 43.3328 ], [ 3.2484, 43.3329 ], [ 3.2483, 43.3329 ], [ 3.2482, 43.3328 ], [ 3.2482, 43.3328 ], [ 3.2479, 43.3328 ], [ 3.2474, 43.3328 ], [ 3.2474, 43.3328 ], [ 3.2473, 43.3329 ], [ 3.2473, 43.333 ], [ 3.2472, 43.333 ], [ 3.2472, 43.3331 ], [ 3.2472, 43.3332 ], [ 3.2472, 43.3333 ], [ 3.2472, 43.3333 ], [ 3.2471, 43.3336 ], [ 3.2471, 43.3338 ], [ 3.2471, 43.334 ], [ 3.2471, 43.3342 ], [ 3.2471, 43.3343 ], [ 3.247, 43.3345 ], [ 3.247, 43.3346 ], [ 3.247, 43.3347 ], [ 3.247, 43.3348 ], [ 3.2471, 43.3349 ], [ 3.2471, 43.3349 ], [ 3.2472, 43.335 ], [ 3.2471, 43.335 ], [ 3.2472, 43.3351 ], [ 3.2468, 43.3352 ], [ 3.2468, 43.3352 ], [ 3.2468, 43.3357 ], [ 3.247, 43.3357 ], [ 3.247, 43.3357 ], [ 3.247, 43.3359 ], [ 3.2475, 43.3359 ], [ 3.2477, 43.3359 ], [ 3.2478, 43.3359 ], [ 3.2478, 43.3358 ], [ 3.2477, 43.3357 ], [ 3.2476, 43.3355 ], [ 3.2475, 43.3353 ], [ 3.2474, 43.3351 ], [ 3.2473, 43.3349 ], [ 3.2472, 43.3349 ], [ 3.2478, 43.3347 ], [ 3.2481, 43.3346 ], [ 3.2484, 43.3345 ], [ 3.2484, 43.3344 ], [ 3.2484, 43.3342 ], [ 3.249, 43.3342 ], [ 3.2493, 43.3341 ], [ 3.2494, 43.334 ], [ 3.2496, 43.334 ], [ 3.2497, 43.3339 ], [ 3.2498, 43.3339 ], [ 3.2499, 43.3339 ], [ 3.25, 43.3339 ], [ 3.2501, 43.3339 ], [ 3.2502, 43.3341 ], [ 3.2502, 43.3342 ], [ 3.2502, 43.3343 ], [ 3.2502, 43.3348 ], [ 3.2502, 43.3352 ], [ 3.2502, 43.3354 ], [ 3.2502, 43.3356 ], [ 3.2502, 43.3356 ], [ 3.2501, 43.3357 ], [ 3.2501, 43.3359 ], [ 3.2501, 43.3365 ], [ 3.2501, 43.3365 ], [ 3.2501, 43.3366 ], [ 3.2502, 43.3366 ], [ 3.2503, 43.3366 ], [ 3.2504, 43.3366 ], [ 3.2504, 43.337 ], [ 3.2502, 43.3371 ], [ 3.2502, 43.337 ], [ 3.2502, 43.3371 ], [ 3.2502, 43.3372 ], [ 3.2496, 43.3374 ], [ 3.2492, 43.3376 ], [ 3.2494, 43.3378 ], [ 3.2495, 43.3379 ], [ 3.2495, 43.3379 ], [ 3.2496, 43.3379 ], [ 3.25, 43.3379 ], [ 3.2501, 43.3379 ], [ 3.2502, 43.3379 ], [ 3.2502, 43.3379 ], [ 3.2503, 43.3379 ], [ 3.2505, 43.3379 ], [ 3.2507, 43.338 ], [ 3.2509, 43.338 ], [ 3.251, 43.338 ], [ 3.251, 43.338 ], [ 3.2511, 43.3381 ], [ 3.2516, 43.3387 ], [ 3.2521, 43.3393 ], [ 3.2523, 43.3392 ], [ 3.2527, 43.3391 ], [ 3.2527, 43.3391 ], [ 3.2527, 43.339 ], [ 3.2529, 43.339 ], [ 3.253, 43.339 ], [ 3.2532, 43.3389 ], [ 3.2533, 43.3388 ], [ 3.2534, 43.3387 ], [ 3.2534, 43.3387 ], [ 3.2536, 43.3386 ], [ 3.2537, 43.3384 ], [ 3.2538, 43.3384 ], [ 3.2539, 43.3382 ], [ 3.2541, 43.338 ], [ 3.2542, 43.338 ], [ 3.2542, 43.3379 ], [ 3.2547, 43.3374 ], [ 3.2547, 43.3374 ], [ 3.2549, 43.3374 ], [ 3.2556, 43.3378 ], [ 3.2556, 43.3381 ], [ 3.2557, 43.3392 ], [ 3.2557, 43.3393 ], [ 3.2557, 43.3394 ], [ 3.2557, 43.3395 ], [ 3.2558, 43.3399 ], [ 3.2559, 43.3411 ], [ 3.2559, 43.3414 ], [ 3.2559, 43.3415 ], [ 3.2563, 43.3415 ], [ 3.2569, 43.3415 ], [ 3.2574, 43.3416 ], [ 3.258, 43.3417 ], [ 3.2584, 43.3417 ], [ 3.2585, 43.3417 ], [ 3.2586, 43.3415 ], [ 3.2586, 43.3414 ], [ 3.2587, 43.3411 ], [ 3.2588, 43.3408 ], [ 3.2591, 43.3403 ], [ 3.259, 43.3402 ] ] ], "type": "Polygon" }, "id": "89", "properties": { "code_commune": "34032", "code_departement": "34", "code_qp": "QP034003", "commune_qp": "Béziers", "nom_commune": "Béziers", "nom_qp": "Devèze" }, "type": "Feature" }, { "bbox": [ 1.3182, 43.4559, 1.3307, 43.4649 ], "geometry": { "coordinates": [ [ [ 1.321, 43.464 ], [ 1.3214, 43.4638 ], [ 1.3218, 43.4638 ], [ 1.3214, 43.4627 ], [ 1.3218, 43.4626 ], [ 1.3221, 43.4624 ], [ 1.3227, 43.4622 ], [ 1.3229, 43.4625 ], [ 1.3234, 43.4628 ], [ 1.3246, 43.4624 ], [ 1.3248, 43.4624 ], [ 1.3252, 43.4622 ], [ 1.3254, 43.4622 ], [ 1.3256, 43.4622 ], [ 1.326, 43.4621 ], [ 1.3262, 43.4621 ], [ 1.3263, 43.4621 ], [ 1.3263, 43.4618 ], [ 1.3262, 43.4614 ], [ 1.3262, 43.4614 ], [ 1.3265, 43.4614 ], [ 1.3265, 43.4614 ], [ 1.327, 43.4613 ], [ 1.3272, 43.4613 ], [ 1.3276, 43.4612 ], [ 1.3283, 43.4611 ], [ 1.3289, 43.461 ], [ 1.3289, 43.461 ], [ 1.3291, 43.4611 ], [ 1.3292, 43.4611 ], [ 1.3294, 43.4612 ], [ 1.33, 43.4614 ], [ 1.3301, 43.4612 ], [ 1.3303, 43.4612 ], [ 1.3304, 43.4612 ], [ 1.3305, 43.4612 ], [ 1.3305, 43.4612 ], [ 1.3307, 43.4611 ], [ 1.3301, 43.4608 ], [ 1.3299, 43.4607 ], [ 1.3296, 43.4606 ], [ 1.3292, 43.4605 ], [ 1.329, 43.4605 ], [ 1.3288, 43.4603 ], [ 1.3287, 43.4602 ], [ 1.3286, 43.4601 ], [ 1.3285, 43.4601 ], [ 1.3281, 43.4598 ], [ 1.3277, 43.4595 ], [ 1.3275, 43.4594 ], [ 1.3275, 43.4594 ], [ 1.3275, 43.4593 ], [ 1.3275, 43.4593 ], [ 1.3274, 43.4592 ], [ 1.3275, 43.4592 ], [ 1.327, 43.4587 ], [ 1.3266, 43.4586 ], [ 1.3262, 43.458 ], [ 1.3262, 43.4579 ], [ 1.3261, 43.4578 ], [ 1.3259, 43.4575 ], [ 1.3258, 43.4573 ], [ 1.3257, 43.4573 ], [ 1.3256, 43.4573 ], [ 1.3254, 43.4573 ], [ 1.3253, 43.457 ], [ 1.3253, 43.4568 ], [ 1.3252, 43.4567 ], [ 1.3252, 43.4565 ], [ 1.3252, 43.4564 ], [ 1.325, 43.4562 ], [ 1.3249, 43.4561 ], [ 1.3249, 43.456 ], [ 1.3247, 43.4559 ], [ 1.3234, 43.4563 ], [ 1.3236, 43.4566 ], [ 1.3238, 43.4568 ], [ 1.3241, 43.4572 ], [ 1.3246, 43.4576 ], [ 1.3255, 43.4583 ], [ 1.3262, 43.4589 ], [ 1.3262, 43.459 ], [ 1.3262, 43.459 ], [ 1.3257, 43.4594 ], [ 1.3254, 43.4597 ], [ 1.325, 43.46 ], [ 1.3246, 43.4603 ], [ 1.3246, 43.4605 ], [ 1.3245, 43.4606 ], [ 1.3247, 43.4607 ], [ 1.3246, 43.4609 ], [ 1.3246, 43.4609 ], [ 1.3245, 43.461 ], [ 1.3245, 43.461 ], [ 1.3244, 43.4611 ], [ 1.3244, 43.4612 ], [ 1.3242, 43.4614 ], [ 1.3241, 43.4614 ], [ 1.3241, 43.4614 ], [ 1.324, 43.4614 ], [ 1.3239, 43.4615 ], [ 1.3236, 43.4615 ], [ 1.3233, 43.4615 ], [ 1.3232, 43.4615 ], [ 1.323, 43.4616 ], [ 1.323, 43.4616 ], [ 1.3226, 43.4618 ], [ 1.3226, 43.4617 ], [ 1.3223, 43.4618 ], [ 1.3216, 43.462 ], [ 1.3215, 43.4623 ], [ 1.3212, 43.4622 ], [ 1.3208, 43.4621 ], [ 1.3201, 43.4619 ], [ 1.32, 43.4618 ], [ 1.3202, 43.4613 ], [ 1.3202, 43.4613 ], [ 1.3201, 43.4613 ], [ 1.3201, 43.4612 ], [ 1.3202, 43.461 ], [ 1.3198, 43.4609 ], [ 1.3192, 43.4613 ], [ 1.319, 43.4616 ], [ 1.3194, 43.4617 ], [ 1.3199, 43.4618 ], [ 1.32, 43.4619 ], [ 1.3201, 43.4624 ], [ 1.3201, 43.4628 ], [ 1.3209, 43.4628 ], [ 1.321, 43.4628 ], [ 1.3207, 43.4629 ], [ 1.3201, 43.4632 ], [ 1.3193, 43.4636 ], [ 1.3192, 43.4637 ], [ 1.3187, 43.4638 ], [ 1.3182, 43.4639 ], [ 1.3185, 43.4646 ], [ 1.3198, 43.4649 ], [ 1.3203, 43.4647 ], [ 1.3203, 43.4647 ], [ 1.3203, 43.4646 ], [ 1.3212, 43.4644 ], [ 1.321, 43.464 ] ] ], "type": "Polygon" }, "id": "90", "properties": { "code_commune": "31395", "code_departement": "31", "code_qp": "QP031002", "commune_qp": "Muret", "nom_commune": "Muret", "nom_qp": "Centre Ouest" }, "type": "Feature" }, { "bbox": [ 2.9064, 42.6896, 2.9104, 42.6948 ], "geometry": { "coordinates": [ [ [ 2.9104, 42.6943 ], [ 2.9102, 42.6942 ], [ 2.9089, 42.6926 ], [ 2.908, 42.6915 ], [ 2.9077, 42.6912 ], [ 2.9078, 42.6912 ], [ 2.908, 42.691 ], [ 2.909, 42.6906 ], [ 2.9089, 42.6906 ], [ 2.9088, 42.6905 ], [ 2.9073, 42.6896 ], [ 2.907, 42.6899 ], [ 2.9075, 42.6904 ], [ 2.9077, 42.6905 ], [ 2.908, 42.6909 ], [ 2.9077, 42.6911 ], [ 2.9075, 42.6912 ], [ 2.9069, 42.6915 ], [ 2.9065, 42.6917 ], [ 2.9064, 42.6919 ], [ 2.9064, 42.6921 ], [ 2.9065, 42.6927 ], [ 2.9066, 42.6928 ], [ 2.9066, 42.6929 ], [ 2.9066, 42.6929 ], [ 2.9072, 42.6936 ], [ 2.9072, 42.6937 ], [ 2.9073, 42.6938 ], [ 2.9073, 42.6938 ], [ 2.9073, 42.6938 ], [ 2.9072, 42.6938 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9072, 42.6939 ], [ 2.9071, 42.694 ], [ 2.907, 42.694 ], [ 2.9069, 42.6941 ], [ 2.9068, 42.6941 ], [ 2.9068, 42.6942 ], [ 2.9068, 42.6942 ], [ 2.9067, 42.6942 ], [ 2.9067, 42.6945 ], [ 2.9066, 42.6947 ], [ 2.9067, 42.6948 ], [ 2.9069, 42.6948 ], [ 2.9069, 42.6948 ], [ 2.907, 42.6948 ], [ 2.9071, 42.6948 ], [ 2.9079, 42.6948 ], [ 2.908, 42.6948 ], [ 2.9082, 42.6948 ], [ 2.9084, 42.6946 ], [ 2.9085, 42.6946 ], [ 2.9091, 42.6943 ], [ 2.9091, 42.6943 ], [ 2.9091, 42.6943 ], [ 2.9092, 42.6943 ], [ 2.9097, 42.6945 ], [ 2.9099, 42.6945 ], [ 2.9099, 42.6945 ], [ 2.91, 42.6945 ], [ 2.91, 42.6945 ], [ 2.9104, 42.6943 ] ] ], "type": "Polygon" }, "id": "91", "properties": { "code_commune": "66136", "code_departement": "66", "code_qp": "QP066010", "commune_qp": "Perpignan", "nom_commune": "Perpignan", "nom_qp": "Quartier Champs De Mars" }, "type": "Feature" }, { "bbox": [ 3.8632, 43.6049, 3.8725, 43.609 ], "geometry": { "coordinates": [ [ [ 3.8669, 43.609 ], [ 3.8671, 43.6089 ], [ 3.8676, 43.6086 ], [ 3.8684, 43.6082 ], [ 3.8686, 43.6081 ], [ 3.8687, 43.6082 ], [ 3.8688, 43.6082 ], [ 3.869, 43.6085 ], [ 3.8685, 43.6086 ], [ 3.8687, 43.6088 ], [ 3.8689, 43.6088 ], [ 3.8688, 43.6087 ], [ 3.869, 43.6087 ], [ 3.8692, 43.6087 ], [ 3.8692, 43.6087 ], [ 3.8694, 43.6087 ], [ 3.8694, 43.6086 ], [ 3.8694, 43.6086 ], [ 3.8695, 43.6089 ], [ 3.8696, 43.6089 ], [ 3.8696, 43.609 ], [ 3.8697, 43.6089 ], [ 3.8696, 43.6088 ], [ 3.8696, 43.6088 ], [ 3.8698, 43.6087 ], [ 3.8698, 43.6087 ], [ 3.8699, 43.6087 ], [ 3.8698, 43.6087 ], [ 3.8701, 43.6086 ], [ 3.8701, 43.6086 ], [ 3.8701, 43.6085 ], [ 3.8703, 43.6085 ], [ 3.8703, 43.6085 ], [ 3.8704, 43.6085 ], [ 3.8705, 43.6085 ], [ 3.8706, 43.6085 ], [ 3.8707, 43.6085 ], [ 3.8707, 43.6085 ], [ 3.8709, 43.6085 ], [ 3.8709, 43.6085 ], [ 3.8713, 43.6085 ], [ 3.8713, 43.6084 ], [ 3.8716, 43.6084 ], [ 3.8716, 43.6085 ], [ 3.872, 43.6086 ], [ 3.8721, 43.6085 ], [ 3.8724, 43.6086 ], [ 3.8725, 43.6084 ], [ 3.8722, 43.6083 ], [ 3.8722, 43.6083 ], [ 3.8723, 43.6081 ], [ 3.8722, 43.6081 ], [ 3.872, 43.6082 ], [ 3.872, 43.6082 ], [ 3.8716, 43.6079 ], [ 3.8714, 43.6077 ], [ 3.8711, 43.6075 ], [ 3.8708, 43.6072 ], [ 3.8699, 43.6077 ], [ 3.8691, 43.6069 ], [ 3.8685, 43.6062 ], [ 3.868, 43.6064 ], [ 3.8679, 43.6063 ], [ 3.8677, 43.6062 ], [ 3.8677, 43.6062 ], [ 3.8676, 43.6061 ], [ 3.8675, 43.6061 ], [ 3.8674, 43.6061 ], [ 3.8673, 43.6062 ], [ 3.8672, 43.6059 ], [ 3.8671, 43.6058 ], [ 3.8661, 43.6052 ], [ 3.866, 43.6051 ], [ 3.8656, 43.605 ], [ 3.8654, 43.6049 ], [ 3.8653, 43.6049 ], [ 3.8652, 43.605 ], [ 3.8651, 43.605 ], [ 3.865, 43.605 ], [ 3.865, 43.6051 ], [ 3.8649, 43.6052 ], [ 3.8649, 43.6053 ], [ 3.8649, 43.6054 ], [ 3.8648, 43.6056 ], [ 3.8647, 43.6058 ], [ 3.8638, 43.6055 ], [ 3.8635, 43.6061 ], [ 3.8636, 43.6061 ], [ 3.8634, 43.6066 ], [ 3.8633, 43.6068 ], [ 3.8632, 43.6071 ], [ 3.8635, 43.6073 ], [ 3.8636, 43.6074 ], [ 3.8638, 43.6078 ], [ 3.8636, 43.6083 ], [ 3.8639, 43.6083 ], [ 3.864, 43.6085 ], [ 3.8642, 43.6085 ], [ 3.8661, 43.6085 ], [ 3.8667, 43.6085 ], [ 3.8667, 43.6086 ], [ 3.8667, 43.6086 ], [ 3.8667, 43.6087 ], [ 3.8668, 43.6087 ], [ 3.8668, 43.6087 ], [ 3.8669, 43.6087 ], [ 3.8669, 43.609 ] ] ], "type": "Polygon" }, "id": "92", "properties": { "code_commune": "34172", "code_departement": "34", "code_qp": "QP034010", "commune_qp": "Montpellier", "nom_commune": "Montpellier", "nom_qp": "Figuerolles" }, "type": "Feature" }, { "bbox": [ 2.2124, 43.0514, 2.2229, 43.0613 ], "geometry": { "coordinates": [ [ [ 2.2203, 43.0524 ], [ 2.2201, 43.0523 ], [ 2.2202, 43.052 ], [ 2.22, 43.0519 ], [ 2.2201, 43.0517 ], [ 2.2203, 43.0515 ], [ 2.2203, 43.0514 ], [ 2.2203, 43.0514 ], [ 2.2202, 43.0514 ], [ 2.22, 43.0514 ], [ 2.2198, 43.0515 ], [ 2.2196, 43.0516 ], [ 2.2194, 43.0518 ], [ 2.2192, 43.052 ], [ 2.2188, 43.0523 ], [ 2.2185, 43.0521 ], [ 2.2184, 43.0521 ], [ 2.2183, 43.0521 ], [ 2.2182, 43.0521 ], [ 2.2182, 43.0521 ], [ 2.2181, 43.0521 ], [ 2.218, 43.0521 ], [ 2.218, 43.0521 ], [ 2.2179, 43.0525 ], [ 2.2178, 43.0527 ], [ 2.2173, 43.0526 ], [ 2.2168, 43.0524 ], [ 2.2165, 43.0522 ], [ 2.2165, 43.0523 ], [ 2.2161, 43.0521 ], [ 2.2157, 43.0523 ], [ 2.2153, 43.0526 ], [ 2.2156, 43.0528 ], [ 2.2147, 43.0534 ], [ 2.2145, 43.0536 ], [ 2.2143, 43.0538 ], [ 2.2139, 43.0542 ], [ 2.2135, 43.0546 ], [ 2.2145, 43.0546 ], [ 2.2144, 43.0549 ], [ 2.2147, 43.055 ], [ 2.2148, 43.0549 ], [ 2.2151, 43.055 ], [ 2.2151, 43.0549 ], [ 2.2153, 43.055 ], [ 2.2155, 43.0547 ], [ 2.216, 43.0547 ], [ 2.2158, 43.055 ], [ 2.2157, 43.0551 ], [ 2.2154, 43.0555 ], [ 2.2153, 43.0559 ], [ 2.2147, 43.0563 ], [ 2.2137, 43.0561 ], [ 2.2141, 43.0554 ], [ 2.2134, 43.0551 ], [ 2.213, 43.0551 ], [ 2.2129, 43.0552 ], [ 2.2127, 43.0557 ], [ 2.2125, 43.056 ], [ 2.2124, 43.0563 ], [ 2.2124, 43.0565 ], [ 2.2129, 43.0564 ], [ 2.2134, 43.0562 ], [ 2.2135, 43.0567 ], [ 2.2137, 43.0569 ], [ 2.2138, 43.057 ], [ 2.2139, 43.057 ], [ 2.2141, 43.057 ], [ 2.2155, 43.0575 ], [ 2.2156, 43.0574 ], [ 2.2157, 43.0573 ], [ 2.2157, 43.0573 ], [ 2.2167, 43.0564 ], [ 2.217, 43.0561 ], [ 2.2177, 43.0554 ], [ 2.2187, 43.0558 ], [ 2.219, 43.0558 ], [ 2.2192, 43.0559 ], [ 2.2193, 43.0559 ], [ 2.2199, 43.0559 ], [ 2.2201, 43.0559 ], [ 2.2201, 43.0561 ], [ 2.22, 43.0567 ], [ 2.2205, 43.0567 ], [ 2.2205, 43.0569 ], [ 2.2205, 43.057 ], [ 2.2205, 43.057 ], [ 2.2207, 43.057 ], [ 2.2208, 43.0571 ], [ 2.221, 43.0571 ], [ 2.221, 43.0572 ], [ 2.2211, 43.0572 ], [ 2.2212, 43.0573 ], [ 2.2213, 43.0575 ], [ 2.2213, 43.0577 ], [ 2.2214, 43.0578 ], [ 2.2213, 43.0579 ], [ 2.2213, 43.0579 ], [ 2.2207, 43.0579 ], [ 2.2206, 43.0584 ], [ 2.22, 43.0584 ], [ 2.22, 43.0586 ], [ 2.2205, 43.0587 ], [ 2.2205, 43.0587 ], [ 2.2207, 43.0589 ], [ 2.2207, 43.059 ], [ 2.2206, 43.0592 ], [ 2.2206, 43.0592 ], [ 2.2207, 43.0593 ], [ 2.2208, 43.0593 ], [ 2.2208, 43.0596 ], [ 2.2207, 43.0596 ], [ 2.2203, 43.0596 ], [ 2.2197, 43.0597 ], [ 2.2186, 43.0598 ], [ 2.2178, 43.0599 ], [ 2.218, 43.0607 ], [ 2.2181, 43.0613 ], [ 2.2184, 43.0613 ], [ 2.2186, 43.0612 ], [ 2.219, 43.0611 ], [ 2.2193, 43.0611 ], [ 2.2198, 43.061 ], [ 2.2198, 43.0604 ], [ 2.2201, 43.0604 ], [ 2.22, 43.0601 ], [ 2.2212, 43.06 ], [ 2.2211, 43.0597 ], [ 2.2211, 43.0597 ], [ 2.2211, 43.0596 ], [ 2.2211, 43.0595 ], [ 2.2212, 43.0592 ], [ 2.2213, 43.0587 ], [ 2.2214, 43.0582 ], [ 2.2214, 43.058 ], [ 2.2214, 43.0579 ], [ 2.2215, 43.0578 ], [ 2.2219, 43.0578 ], [ 2.2223, 43.0578 ], [ 2.2223, 43.058 ], [ 2.2228, 43.0579 ], [ 2.2228, 43.0577 ], [ 2.2228, 43.0569 ], [ 2.2229, 43.0561 ], [ 2.2227, 43.0561 ], [ 2.2227, 43.0562 ], [ 2.2226, 43.0562 ], [ 2.2225, 43.0562 ], [ 2.2224, 43.0563 ], [ 2.2224, 43.0564 ], [ 2.2223, 43.0574 ], [ 2.2213, 43.0575 ], [ 2.2212, 43.0573 ], [ 2.2211, 43.0571 ], [ 2.2209, 43.057 ], [ 2.2209, 43.0569 ], [ 2.2209, 43.0568 ], [ 2.2208, 43.0567 ], [ 2.2205, 43.0562 ], [ 2.2203, 43.0559 ], [ 2.2201, 43.0557 ], [ 2.2202, 43.0553 ], [ 2.2203, 43.055 ], [ 2.2205, 43.055 ], [ 2.2207, 43.055 ], [ 2.2207, 43.055 ], [ 2.221, 43.0551 ], [ 2.2211, 43.0548 ], [ 2.2212, 43.0547 ], [ 2.2213, 43.0545 ], [ 2.2213, 43.0544 ], [ 2.2213, 43.0544 ], [ 2.2209, 43.0544 ], [ 2.2207, 43.0543 ], [ 2.2201, 43.0542 ], [ 2.219, 43.054 ], [ 2.2193, 43.0538 ], [ 2.2194, 43.0536 ], [ 2.2197, 43.0532 ], [ 2.22, 43.0529 ], [ 2.2203, 43.0524 ] ] ], "type": "Polygon" }, "id": "93", "properties": { "code_commune": "11206", "code_departement": "11", "code_qp": "QP011001", "commune_qp": "Limoux", "nom_commune": "Limoux", "nom_qp": "Quartier Aude" }, "type": "Feature" }, { "bbox": [ 4.6115, 44.1552, 4.6259, 44.1628 ], "geometry": { "coordinates": [ [ [ 4.6258, 44.1607 ], [ 4.6257, 44.1605 ], [ 4.6254, 44.1602 ], [ 4.6254, 44.1601 ], [ 4.6252, 44.16 ], [ 4.6251, 44.1599 ], [ 4.625, 44.1598 ], [ 4.6248, 44.1597 ], [ 4.6246, 44.1593 ], [ 4.6225, 44.1564 ], [ 4.6223, 44.1563 ], [ 4.6221, 44.156 ], [ 4.6219, 44.1559 ], [ 4.6218, 44.1558 ], [ 4.6216, 44.1557 ], [ 4.6208, 44.1557 ], [ 4.6192, 44.1556 ], [ 4.619, 44.1555 ], [ 4.618, 44.1555 ], [ 4.6177, 44.1554 ], [ 4.6175, 44.1554 ], [ 4.6173, 44.1554 ], [ 4.6171, 44.1553 ], [ 4.617, 44.1552 ], [ 4.6169, 44.1553 ], [ 4.6169, 44.1554 ], [ 4.6168, 44.1554 ], [ 4.6168, 44.1555 ], [ 4.6167, 44.1556 ], [ 4.6168, 44.1558 ], [ 4.6169, 44.1559 ], [ 4.617, 44.1561 ], [ 4.6172, 44.1564 ], [ 4.6169, 44.1565 ], [ 4.6165, 44.1566 ], [ 4.6161, 44.1566 ], [ 4.6157, 44.1561 ], [ 4.6154, 44.1557 ], [ 4.6153, 44.1556 ], [ 4.6153, 44.1556 ], [ 4.6153, 44.1555 ], [ 4.6144, 44.1557 ], [ 4.6145, 44.156 ], [ 4.6147, 44.1565 ], [ 4.6143, 44.1566 ], [ 4.614, 44.1566 ], [ 4.614, 44.1566 ], [ 4.614, 44.1567 ], [ 4.6141, 44.1568 ], [ 4.6145, 44.157 ], [ 4.6146, 44.1571 ], [ 4.6147, 44.1572 ], [ 4.6151, 44.1577 ], [ 4.6152, 44.1579 ], [ 4.6151, 44.1579 ], [ 4.6152, 44.1582 ], [ 4.6152, 44.1582 ], [ 4.6134, 44.1585 ], [ 4.6133, 44.1585 ], [ 4.6133, 44.1585 ], [ 4.6134, 44.1587 ], [ 4.6136, 44.159 ], [ 4.6139, 44.1597 ], [ 4.6137, 44.1598 ], [ 4.6129, 44.1598 ], [ 4.612, 44.16 ], [ 4.6116, 44.1601 ], [ 4.6116, 44.1601 ], [ 4.6115, 44.1602 ], [ 4.6115, 44.1604 ], [ 4.6116, 44.161 ], [ 4.6117, 44.1628 ], [ 4.6125, 44.1627 ], [ 4.6123, 44.1612 ], [ 4.6123, 44.16 ], [ 4.6124, 44.1599 ], [ 4.6129, 44.1599 ], [ 4.6138, 44.1598 ], [ 4.6139, 44.1597 ], [ 4.6136, 44.159 ], [ 4.6146, 44.159 ], [ 4.6147, 44.159 ], [ 4.6156, 44.1589 ], [ 4.6157, 44.1588 ], [ 4.6179, 44.1581 ], [ 4.618, 44.158 ], [ 4.618, 44.1582 ], [ 4.6181, 44.1583 ], [ 4.6182, 44.1585 ], [ 4.6184, 44.1587 ], [ 4.6186, 44.1589 ], [ 4.6189, 44.1594 ], [ 4.6194, 44.1592 ], [ 4.6195, 44.1595 ], [ 4.6196, 44.1595 ], [ 4.6197, 44.1595 ], [ 4.6198, 44.1598 ], [ 4.6197, 44.1598 ], [ 4.6197, 44.1602 ], [ 4.6206, 44.1602 ], [ 4.6208, 44.1602 ], [ 4.621, 44.1601 ], [ 4.6211, 44.1602 ], [ 4.6211, 44.1602 ], [ 4.6212, 44.1604 ], [ 4.6215, 44.1603 ], [ 4.6215, 44.1604 ], [ 4.6225, 44.1603 ], [ 4.6226, 44.1603 ], [ 4.6226, 44.1601 ], [ 4.6226, 44.1598 ], [ 4.623, 44.1598 ], [ 4.6234, 44.1598 ], [ 4.6235, 44.16 ], [ 4.6238, 44.1599 ], [ 4.624, 44.1602 ], [ 4.624, 44.1602 ], [ 4.6243, 44.1602 ], [ 4.6243, 44.1604 ], [ 4.6242, 44.1606 ], [ 4.6243, 44.1607 ], [ 4.6243, 44.1609 ], [ 4.6252, 44.1607 ], [ 4.6252, 44.1608 ], [ 4.6254, 44.1607 ], [ 4.6255, 44.161 ], [ 4.6256, 44.161 ], [ 4.6257, 44.1609 ], [ 4.6258, 44.1609 ], [ 4.6258, 44.1608 ], [ 4.6259, 44.1608 ], [ 4.6258, 44.1607 ] ] ], "type": "Polygon" }, "id": "94", "properties": { "code_commune": "30028", "code_departement": "30", "code_qp": "QP030010", "commune_qp": "Bagnols-sur-Cèze", "nom_commune": "Bagnols-sur-Cèze", "nom_qp": "Escanaux - Coronelle - Citadelle - Vigan Braquet" }, "type": "Feature" }, { "bbox": [ 4.4107, 44.0178, 4.4182, 44.0292 ], "geometry": { "coordinates": [ [ [ 4.4182, 44.0186 ], [ 4.418, 44.018 ], [ 4.4179, 44.0178 ], [ 4.4176, 44.0179 ], [ 4.4174, 44.0179 ], [ 4.4165, 44.0182 ], [ 4.4163, 44.0182 ], [ 4.4162, 44.0183 ], [ 4.416, 44.0183 ], [ 4.4159, 44.0183 ], [ 4.4159, 44.0183 ], [ 4.4158, 44.0183 ], [ 4.4155, 44.0184 ], [ 4.4152, 44.0186 ], [ 4.4146, 44.0187 ], [ 4.4145, 44.0188 ], [ 4.4144, 44.0188 ], [ 4.4138, 44.019 ], [ 4.4136, 44.0191 ], [ 4.4133, 44.0192 ], [ 4.4131, 44.0193 ], [ 4.4129, 44.0194 ], [ 4.4125, 44.0195 ], [ 4.4122, 44.0196 ], [ 4.4118, 44.0197 ], [ 4.4111, 44.02 ], [ 4.4113, 44.0204 ], [ 4.4115, 44.0208 ], [ 4.4117, 44.0212 ], [ 4.4122, 44.022 ], [ 4.4119, 44.0222 ], [ 4.4116, 44.0224 ], [ 4.4116, 44.0224 ], [ 4.4113, 44.0227 ], [ 4.4112, 44.0228 ], [ 4.411, 44.0229 ], [ 4.4108, 44.0233 ], [ 4.4108, 44.0234 ], [ 4.4107, 44.0239 ], [ 4.4107, 44.024 ], [ 4.4107, 44.0242 ], [ 4.4108, 44.0243 ], [ 4.4109, 44.0245 ], [ 4.4111, 44.0247 ], [ 4.4112, 44.0248 ], [ 4.4113, 44.0248 ], [ 4.412, 44.0251 ], [ 4.4121, 44.0252 ], [ 4.4122, 44.0252 ], [ 4.4123, 44.0253 ], [ 4.4126, 44.0253 ], [ 4.4126, 44.0254 ], [ 4.4126, 44.0254 ], [ 4.4126, 44.0254 ], [ 4.413, 44.0255 ], [ 4.4131, 44.0256 ], [ 4.4133, 44.0256 ], [ 4.4138, 44.0256 ], [ 4.4137, 44.0257 ], [ 4.4137, 44.0259 ], [ 4.4136, 44.0261 ], [ 4.4135, 44.0262 ], [ 4.4135, 44.0263 ], [ 4.4135, 44.0264 ], [ 4.4136, 44.0265 ], [ 4.4136, 44.0265 ], [ 4.4137, 44.0266 ], [ 4.4138, 44.0267 ], [ 4.4139, 44.0268 ], [ 4.4141, 44.0269 ], [ 4.4145, 44.027 ], [ 4.4144, 44.0271 ], [ 4.4145, 44.0272 ], [ 4.4147, 44.0274 ], [ 4.4149, 44.0276 ], [ 4.4151, 44.0278 ], [ 4.4157, 44.0287 ], [ 4.4158, 44.0288 ], [ 4.4159, 44.0288 ], [ 4.4161, 44.029 ], [ 4.4162, 44.0291 ], [ 4.4163, 44.0292 ], [ 4.417, 44.029 ], [ 4.4175, 44.0288 ], [ 4.4175, 44.0288 ], [ 4.4175, 44.0287 ], [ 4.4176, 44.0286 ], [ 4.4176, 44.0282 ], [ 4.4176, 44.0276 ], [ 4.4176, 44.0274 ], [ 4.4175, 44.0271 ], [ 4.4175, 44.027 ], [ 4.4175, 44.0268 ], [ 4.4174, 44.0267 ], [ 4.4173, 44.0263 ], [ 4.4173, 44.0262 ], [ 4.4173, 44.0261 ], [ 4.4172, 44.026 ], [ 4.4172, 44.0257 ], [ 4.4171, 44.0252 ], [ 4.4171, 44.0251 ], [ 4.417, 44.0249 ], [ 4.417, 44.0248 ], [ 4.4169, 44.0247 ], [ 4.4169, 44.0247 ], [ 4.4168, 44.0246 ], [ 4.4167, 44.0246 ], [ 4.4166, 44.0245 ], [ 4.4158, 44.0243 ], [ 4.4155, 44.024 ], [ 4.4153, 44.0239 ], [ 4.415, 44.0237 ], [ 4.4146, 44.0234 ], [ 4.4142, 44.0231 ], [ 4.4141, 44.023 ], [ 4.4147, 44.0215 ], [ 4.4149, 44.0211 ], [ 4.4152, 44.0202 ], [ 4.4155, 44.0194 ], [ 4.416, 44.0196 ], [ 4.4164, 44.0198 ], [ 4.4168, 44.0196 ], [ 4.4172, 44.0194 ], [ 4.4174, 44.0193 ], [ 4.4174, 44.0193 ], [ 4.4175, 44.0193 ], [ 4.4175, 44.0192 ], [ 4.4176, 44.0192 ], [ 4.4177, 44.0191 ], [ 4.4179, 44.0189 ], [ 4.4181, 44.0187 ], [ 4.4182, 44.0186 ] ] ], "type": "Polygon" }, "id": "95", "properties": { "code_commune": "30334", "code_departement": "30", "code_qp": "QP030018", "commune_qp": "Uzès", "nom_commune": "Uzès", "nom_qp": "Quartier Prioritaire D'Uzès" }, "type": "Feature" }, { "bbox": [ 2.1515, 43.9406, 2.1586, 43.9467 ], "geometry": { "coordinates": [ [ [ 2.1567, 43.9451 ], [ 2.1558, 43.9446 ], [ 2.1559, 43.9446 ], [ 2.1556, 43.9445 ], [ 2.1558, 43.9443 ], [ 2.1558, 43.9441 ], [ 2.1555, 43.9439 ], [ 2.156, 43.9436 ], [ 2.1562, 43.9436 ], [ 2.1564, 43.9437 ], [ 2.1565, 43.9438 ], [ 2.1566, 43.9438 ], [ 2.1567, 43.9438 ], [ 2.1569, 43.9438 ], [ 2.1571, 43.9439 ], [ 2.1573, 43.9439 ], [ 2.1575, 43.9438 ], [ 2.1576, 43.9438 ], [ 2.1579, 43.9438 ], [ 2.158, 43.9438 ], [ 2.1581, 43.9438 ], [ 2.1581, 43.9438 ], [ 2.1582, 43.9438 ], [ 2.1582, 43.9437 ], [ 2.1583, 43.9436 ], [ 2.1585, 43.9435 ], [ 2.1586, 43.9433 ], [ 2.1586, 43.9432 ], [ 2.1586, 43.9431 ], [ 2.1586, 43.943 ], [ 2.1586, 43.9428 ], [ 2.1586, 43.9426 ], [ 2.1585, 43.9422 ], [ 2.1584, 43.9419 ], [ 2.158, 43.9418 ], [ 2.1571, 43.9413 ], [ 2.157, 43.9413 ], [ 2.1569, 43.9413 ], [ 2.1569, 43.9413 ], [ 2.1565, 43.9411 ], [ 2.1564, 43.9411 ], [ 2.1563, 43.941 ], [ 2.1564, 43.941 ], [ 2.1562, 43.9409 ], [ 2.156, 43.9412 ], [ 2.1558, 43.9411 ], [ 2.1557, 43.9411 ], [ 2.1557, 43.9411 ], [ 2.1556, 43.9409 ], [ 2.1555, 43.9406 ], [ 2.1554, 43.9406 ], [ 2.1554, 43.9407 ], [ 2.1552, 43.9407 ], [ 2.1551, 43.9407 ], [ 2.155, 43.9407 ], [ 2.1542, 43.9407 ], [ 2.1542, 43.941 ], [ 2.1539, 43.941 ], [ 2.1537, 43.941 ], [ 2.1535, 43.941 ], [ 2.1533, 43.9411 ], [ 2.1532, 43.9412 ], [ 2.1531, 43.9413 ], [ 2.153, 43.9414 ], [ 2.1529, 43.9415 ], [ 2.1529, 43.9416 ], [ 2.1529, 43.9417 ], [ 2.1529, 43.9417 ], [ 2.1529, 43.9418 ], [ 2.1526, 43.942 ], [ 2.1523, 43.9423 ], [ 2.1521, 43.9423 ], [ 2.1521, 43.9424 ], [ 2.1519, 43.9424 ], [ 2.1518, 43.9425 ], [ 2.1517, 43.9425 ], [ 2.1515, 43.9425 ], [ 2.1517, 43.943 ], [ 2.1517, 43.9431 ], [ 2.1519, 43.9431 ], [ 2.153, 43.943 ], [ 2.1532, 43.943 ], [ 2.154, 43.9434 ], [ 2.1541, 43.9434 ], [ 2.1543, 43.9435 ], [ 2.154, 43.9438 ], [ 2.1543, 43.9439 ], [ 2.1541, 43.944 ], [ 2.154, 43.9441 ], [ 2.1539, 43.9442 ], [ 2.1538, 43.9444 ], [ 2.1538, 43.9445 ], [ 2.1537, 43.9446 ], [ 2.1537, 43.9447 ], [ 2.1536, 43.9448 ], [ 2.1536, 43.9452 ], [ 2.1535, 43.9455 ], [ 2.1535, 43.9456 ], [ 2.1535, 43.9457 ], [ 2.1536, 43.9458 ], [ 2.1536, 43.9459 ], [ 2.1537, 43.9461 ], [ 2.1538, 43.9462 ], [ 2.1539, 43.9463 ], [ 2.1541, 43.9463 ], [ 2.1546, 43.9466 ], [ 2.1549, 43.9467 ], [ 2.1552, 43.9464 ], [ 2.1553, 43.9464 ], [ 2.1554, 43.9465 ], [ 2.1554, 43.9462 ], [ 2.1556, 43.9462 ], [ 2.1556, 43.9462 ], [ 2.1557, 43.9462 ], [ 2.1558, 43.9462 ], [ 2.1559, 43.9462 ], [ 2.1559, 43.9461 ], [ 2.1562, 43.9458 ], [ 2.1564, 43.9458 ], [ 2.1565, 43.9456 ], [ 2.1563, 43.9456 ], [ 2.1564, 43.9455 ], [ 2.1565, 43.9453 ], [ 2.1567, 43.9451 ] ] ], "type": "Polygon" }, "id": "96", "properties": { "code_commune": "81004", "code_departement": "81", "code_qp": "QP081006", "commune_qp": "Albi", "nom_commune": "Albi", "nom_qp": "Cantepau" }, "type": "Feature" }, { "bbox": [ 2.2488, 43.6026, 2.2616, 43.6152 ], "geometry": { "coordinates": [ [ [ 2.255, 43.6138 ], [ 2.2548, 43.6142 ], [ 2.2547, 43.6144 ], [ 2.2546, 43.6145 ], [ 2.2544, 43.6147 ], [ 2.2543, 43.6148 ], [ 2.254, 43.615 ], [ 2.2543, 43.6152 ], [ 2.2545, 43.6151 ], [ 2.2549, 43.6149 ], [ 2.2552, 43.6148 ], [ 2.2551, 43.6145 ], [ 2.2558, 43.6144 ], [ 2.2562, 43.6135 ], [ 2.2563, 43.6135 ], [ 2.2565, 43.6133 ], [ 2.2562, 43.6132 ], [ 2.2563, 43.6131 ], [ 2.2562, 43.6131 ], [ 2.2563, 43.6129 ], [ 2.2566, 43.6129 ], [ 2.2567, 43.6129 ], [ 2.2568, 43.6129 ], [ 2.2569, 43.6129 ], [ 2.257, 43.6129 ], [ 2.257, 43.6128 ], [ 2.2571, 43.6128 ], [ 2.2571, 43.6127 ], [ 2.2571, 43.6127 ], [ 2.2572, 43.6125 ], [ 2.2573, 43.6124 ], [ 2.2574, 43.6123 ], [ 2.2575, 43.6122 ], [ 2.2577, 43.6121 ], [ 2.2579, 43.612 ], [ 2.2579, 43.6119 ], [ 2.2579, 43.6118 ], [ 2.258, 43.6107 ], [ 2.258, 43.6104 ], [ 2.258, 43.6103 ], [ 2.2579, 43.6103 ], [ 2.2567, 43.6103 ], [ 2.2567, 43.6103 ], [ 2.2565, 43.6103 ], [ 2.2564, 43.6103 ], [ 2.2563, 43.6102 ], [ 2.2562, 43.6102 ], [ 2.256, 43.6102 ], [ 2.2559, 43.6102 ], [ 2.256, 43.6097 ], [ 2.2561, 43.6089 ], [ 2.2561, 43.6089 ], [ 2.2564, 43.6088 ], [ 2.2565, 43.6088 ], [ 2.2564, 43.6087 ], [ 2.2564, 43.6086 ], [ 2.2565, 43.6086 ], [ 2.2565, 43.6085 ], [ 2.2568, 43.6084 ], [ 2.2569, 43.6084 ], [ 2.257, 43.6084 ], [ 2.2571, 43.6085 ], [ 2.2573, 43.6085 ], [ 2.2574, 43.6085 ], [ 2.2576, 43.6085 ], [ 2.2577, 43.6085 ], [ 2.2579, 43.6084 ], [ 2.258, 43.6081 ], [ 2.258, 43.6079 ], [ 2.2579, 43.6078 ], [ 2.2577, 43.6077 ], [ 2.2576, 43.6076 ], [ 2.2576, 43.6075 ], [ 2.2576, 43.6075 ], [ 2.2576, 43.6074 ], [ 2.2586, 43.6068 ], [ 2.2601, 43.606 ], [ 2.2605, 43.6058 ], [ 2.2611, 43.6054 ], [ 2.2613, 43.6052 ], [ 2.2614, 43.6052 ], [ 2.2615, 43.6051 ], [ 2.2616, 43.605 ], [ 2.2616, 43.6049 ], [ 2.2615, 43.6049 ], [ 2.2613, 43.6047 ], [ 2.2611, 43.6044 ], [ 2.2603, 43.6035 ], [ 2.2595, 43.6026 ], [ 2.259, 43.6029 ], [ 2.2583, 43.6032 ], [ 2.2589, 43.6038 ], [ 2.258, 43.6044 ], [ 2.2582, 43.6045 ], [ 2.257, 43.6049 ], [ 2.2556, 43.6053 ], [ 2.2558, 43.6058 ], [ 2.256, 43.6063 ], [ 2.2561, 43.6063 ], [ 2.2547, 43.6067 ], [ 2.254, 43.6061 ], [ 2.2537, 43.6063 ], [ 2.252, 43.6073 ], [ 2.2523, 43.6073 ], [ 2.2528, 43.6075 ], [ 2.2552, 43.608 ], [ 2.2551, 43.6082 ], [ 2.2551, 43.6082 ], [ 2.2551, 43.6082 ], [ 2.2554, 43.6084 ], [ 2.2554, 43.6086 ], [ 2.2553, 43.6086 ], [ 2.2549, 43.6087 ], [ 2.2547, 43.6087 ], [ 2.2545, 43.6087 ], [ 2.2539, 43.6087 ], [ 2.2538, 43.6096 ], [ 2.2538, 43.6098 ], [ 2.2531, 43.6096 ], [ 2.2529, 43.6098 ], [ 2.2512, 43.6096 ], [ 2.2515, 43.6099 ], [ 2.2505, 43.6104 ], [ 2.251, 43.611 ], [ 2.2525, 43.6102 ], [ 2.2526, 43.6101 ], [ 2.2529, 43.6099 ], [ 2.253, 43.6099 ], [ 2.2534, 43.6103 ], [ 2.2538, 43.6103 ], [ 2.2538, 43.6105 ], [ 2.2538, 43.6107 ], [ 2.2538, 43.6109 ], [ 2.2536, 43.611 ], [ 2.2524, 43.6116 ], [ 2.2536, 43.6119 ], [ 2.2536, 43.6119 ], [ 2.2534, 43.6123 ], [ 2.2535, 43.6123 ], [ 2.2533, 43.6127 ], [ 2.2533, 43.6128 ], [ 2.2522, 43.6131 ], [ 2.2523, 43.6134 ], [ 2.2517, 43.6135 ], [ 2.2513, 43.6136 ], [ 2.2513, 43.6137 ], [ 2.2514, 43.6138 ], [ 2.2504, 43.6141 ], [ 2.2502, 43.6139 ], [ 2.2502, 43.614 ], [ 2.2498, 43.6141 ], [ 2.2495, 43.6136 ], [ 2.2488, 43.6138 ], [ 2.2491, 43.6143 ], [ 2.2492, 43.6145 ], [ 2.2492, 43.6146 ], [ 2.2492, 43.6147 ], [ 2.2493, 43.6147 ], [ 2.2495, 43.6148 ], [ 2.2495, 43.6148 ], [ 2.2498, 43.6147 ], [ 2.2499, 43.6147 ], [ 2.2502, 43.6145 ], [ 2.2508, 43.6144 ], [ 2.2516, 43.6141 ], [ 2.2524, 43.6138 ], [ 2.2528, 43.6137 ], [ 2.2531, 43.6136 ], [ 2.2534, 43.6135 ], [ 2.2536, 43.6135 ], [ 2.2537, 43.6135 ], [ 2.255, 43.6138 ] ] ], "type": "Polygon" }, "id": "97", "properties": { "code_commune": "81065", "code_departement": "81", "code_qp": "QP081004", "commune_qp": "Castres", "nom_commune": "Castres", "nom_qp": "Aillot Bisséous Lardaillé" }, "type": "Feature" }, { "bbox": [ 1.4126, 43.5904, 1.4202, 43.595 ], "geometry": { "coordinates": [ [ [ 1.4184, 43.591 ], [ 1.4183, 43.5909 ], [ 1.4177, 43.5907 ], [ 1.4174, 43.5906 ], [ 1.4169, 43.5904 ], [ 1.4164, 43.5915 ], [ 1.4169, 43.5916 ], [ 1.4165, 43.5922 ], [ 1.4165, 43.5922 ], [ 1.416, 43.5931 ], [ 1.4159, 43.5931 ], [ 1.415, 43.593 ], [ 1.4151, 43.5927 ], [ 1.4153, 43.5924 ], [ 1.4151, 43.5923 ], [ 1.4142, 43.5921 ], [ 1.4141, 43.5929 ], [ 1.4141, 43.593 ], [ 1.414, 43.593 ], [ 1.414, 43.5934 ], [ 1.4135, 43.5933 ], [ 1.4131, 43.5933 ], [ 1.4128, 43.5939 ], [ 1.4128, 43.5939 ], [ 1.4126, 43.5944 ], [ 1.4128, 43.5945 ], [ 1.4129, 43.5945 ], [ 1.4153, 43.5949 ], [ 1.4153, 43.5949 ], [ 1.4155, 43.5949 ], [ 1.4155, 43.5949 ], [ 1.4156, 43.5949 ], [ 1.4158, 43.5941 ], [ 1.4163, 43.5942 ], [ 1.4163, 43.5943 ], [ 1.4178, 43.5944 ], [ 1.4179, 43.5941 ], [ 1.4192, 43.5942 ], [ 1.4193, 43.5949 ], [ 1.4199, 43.595 ], [ 1.4199, 43.5948 ], [ 1.42, 43.5948 ], [ 1.4202, 43.594 ], [ 1.4202, 43.594 ], [ 1.4196, 43.5941 ], [ 1.4199, 43.5932 ], [ 1.4197, 43.5931 ], [ 1.4197, 43.5931 ], [ 1.4195, 43.593 ], [ 1.4196, 43.593 ], [ 1.4196, 43.5929 ], [ 1.4194, 43.5928 ], [ 1.4194, 43.5928 ], [ 1.4193, 43.5927 ], [ 1.4193, 43.5927 ], [ 1.4189, 43.5927 ], [ 1.4188, 43.5927 ], [ 1.4187, 43.5927 ], [ 1.4187, 43.5927 ], [ 1.4178, 43.5929 ], [ 1.4175, 43.5928 ], [ 1.4176, 43.5925 ], [ 1.4176, 43.5924 ], [ 1.4175, 43.5924 ], [ 1.4176, 43.5922 ], [ 1.4177, 43.5915 ], [ 1.4178, 43.5915 ], [ 1.4185, 43.5914 ], [ 1.4185, 43.5911 ], [ 1.4184, 43.591 ] ] ], "type": "Polygon" }, "id": "98", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031008", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Arènes" }, "type": "Feature" }, { "bbox": [ 2.3607, 43.502, 2.3691, 43.5087 ], "geometry": { "coordinates": [ [ [ 2.3622, 43.5087 ], [ 2.3624, 43.5085 ], [ 2.3627, 43.5087 ], [ 2.3634, 43.508 ], [ 2.3639, 43.5075 ], [ 2.364, 43.5073 ], [ 2.3643, 43.507 ], [ 2.3643, 43.5069 ], [ 2.3646, 43.5068 ], [ 2.3647, 43.5069 ], [ 2.3653, 43.5069 ], [ 2.3668, 43.5069 ], [ 2.3668, 43.5072 ], [ 2.3668, 43.5083 ], [ 2.3673, 43.5083 ], [ 2.3673, 43.508 ], [ 2.3672, 43.508 ], [ 2.3673, 43.5069 ], [ 2.3675, 43.507 ], [ 2.3676, 43.507 ], [ 2.3677, 43.5064 ], [ 2.3677, 43.5059 ], [ 2.3669, 43.5059 ], [ 2.3669, 43.5054 ], [ 2.3669, 43.5054 ], [ 2.3669, 43.5053 ], [ 2.367, 43.5052 ], [ 2.3671, 43.5048 ], [ 2.3672, 43.5042 ], [ 2.3673, 43.5041 ], [ 2.3673, 43.5041 ], [ 2.3674, 43.504 ], [ 2.3676, 43.504 ], [ 2.3677, 43.5041 ], [ 2.3678, 43.5044 ], [ 2.3679, 43.5045 ], [ 2.3681, 43.5045 ], [ 2.3682, 43.5044 ], [ 2.3682, 43.5044 ], [ 2.3681, 43.5043 ], [ 2.3681, 43.5042 ], [ 2.3681, 43.5042 ], [ 2.3681, 43.504 ], [ 2.3682, 43.5039 ], [ 2.3683, 43.5038 ], [ 2.3684, 43.5037 ], [ 2.3683, 43.5037 ], [ 2.3681, 43.5036 ], [ 2.3686, 43.5032 ], [ 2.3691, 43.5028 ], [ 2.3686, 43.502 ], [ 2.3673, 43.5035 ], [ 2.3672, 43.5036 ], [ 2.3669, 43.5039 ], [ 2.3668, 43.5042 ], [ 2.3667, 43.5045 ], [ 2.3667, 43.5044 ], [ 2.3665, 43.5043 ], [ 2.3663, 43.5044 ], [ 2.366, 43.5042 ], [ 2.366, 43.5042 ], [ 2.3662, 43.5039 ], [ 2.3668, 43.5034 ], [ 2.3668, 43.5033 ], [ 2.3666, 43.5031 ], [ 2.3665, 43.5031 ], [ 2.3662, 43.5031 ], [ 2.3647, 43.5033 ], [ 2.3647, 43.5033 ], [ 2.3639, 43.5035 ], [ 2.3637, 43.5036 ], [ 2.3637, 43.5036 ], [ 2.3636, 43.5034 ], [ 2.3634, 43.5034 ], [ 2.3634, 43.5034 ], [ 2.3631, 43.5034 ], [ 2.363, 43.5033 ], [ 2.3629, 43.5034 ], [ 2.3626, 43.5035 ], [ 2.3626, 43.5034 ], [ 2.3625, 43.5034 ], [ 2.3624, 43.5034 ], [ 2.3622, 43.5033 ], [ 2.3608, 43.5042 ], [ 2.361, 43.5045 ], [ 2.363, 43.5051 ], [ 2.3632, 43.5048 ], [ 2.3635, 43.5048 ], [ 2.3636, 43.5048 ], [ 2.3638, 43.5053 ], [ 2.3639, 43.5055 ], [ 2.3632, 43.5056 ], [ 2.3623, 43.506 ], [ 2.3623, 43.506 ], [ 2.3623, 43.506 ], [ 2.3623, 43.5061 ], [ 2.3624, 43.5064 ], [ 2.3613, 43.5066 ], [ 2.3613, 43.5066 ], [ 2.3611, 43.5067 ], [ 2.3611, 43.5068 ], [ 2.3613, 43.507 ], [ 2.3607, 43.5077 ], [ 2.3611, 43.5079 ], [ 2.3618, 43.5082 ], [ 2.3617, 43.5084 ], [ 2.3622, 43.5087 ] ] ], "type": "Polygon" }, "id": "99", "properties": { "code_commune": "81021", "code_departement": "81", "code_qp": "QP081001", "commune_qp": "Aussillon", "nom_commune": "Aussillon", "nom_qp": "La Falgalarié" }, "type": "Feature" }, { "bbox": [ 0.0774, 43.2212, 0.0918, 43.2328 ], "geometry": { "coordinates": [ [ [ 0.0818, 43.2324 ], [ 0.0818, 43.2323 ], [ 0.0816, 43.2321 ], [ 0.0816, 43.2319 ], [ 0.0816, 43.2318 ], [ 0.0822, 43.2317 ], [ 0.0822, 43.2316 ], [ 0.0823, 43.2314 ], [ 0.0825, 43.2315 ], [ 0.0826, 43.2315 ], [ 0.083, 43.2306 ], [ 0.0828, 43.2305 ], [ 0.083, 43.23 ], [ 0.0834, 43.2301 ], [ 0.0843, 43.2304 ], [ 0.0847, 43.2305 ], [ 0.085, 43.2306 ], [ 0.0852, 43.2306 ], [ 0.0868, 43.231 ], [ 0.087, 43.2313 ], [ 0.0873, 43.2316 ], [ 0.0874, 43.2319 ], [ 0.0874, 43.232 ], [ 0.0875, 43.2322 ], [ 0.0904, 43.2328 ], [ 0.0905, 43.2328 ], [ 0.0906, 43.2327 ], [ 0.0908, 43.2322 ], [ 0.0912, 43.2317 ], [ 0.0915, 43.2311 ], [ 0.0894, 43.2309 ], [ 0.0895, 43.2307 ], [ 0.0892, 43.2307 ], [ 0.0892, 43.2309 ], [ 0.0876, 43.2306 ], [ 0.0878, 43.2298 ], [ 0.088, 43.2295 ], [ 0.088, 43.2293 ], [ 0.088, 43.2292 ], [ 0.0881, 43.2287 ], [ 0.0883, 43.2285 ], [ 0.0885, 43.2284 ], [ 0.0886, 43.2283 ], [ 0.0888, 43.228 ], [ 0.0892, 43.2273 ], [ 0.0895, 43.2268 ], [ 0.0897, 43.2263 ], [ 0.0898, 43.2261 ], [ 0.0898, 43.226 ], [ 0.09, 43.2255 ], [ 0.0901, 43.2253 ], [ 0.0903, 43.2251 ], [ 0.0904, 43.2248 ], [ 0.0905, 43.2245 ], [ 0.0906, 43.2243 ], [ 0.0906, 43.2243 ], [ 0.0908, 43.2239 ], [ 0.0908, 43.2239 ], [ 0.0909, 43.2238 ], [ 0.0909, 43.2238 ], [ 0.0909, 43.2237 ], [ 0.091, 43.2236 ], [ 0.0911, 43.2236 ], [ 0.0911, 43.2234 ], [ 0.0912, 43.2231 ], [ 0.0911, 43.223 ], [ 0.0911, 43.223 ], [ 0.091, 43.2229 ], [ 0.091, 43.2228 ], [ 0.0911, 43.2227 ], [ 0.0911, 43.2227 ], [ 0.0912, 43.2227 ], [ 0.0914, 43.2226 ], [ 0.0915, 43.2224 ], [ 0.0917, 43.2219 ], [ 0.0918, 43.2216 ], [ 0.0918, 43.2214 ], [ 0.0918, 43.2212 ], [ 0.0915, 43.2213 ], [ 0.0915, 43.2213 ], [ 0.091, 43.2214 ], [ 0.091, 43.2215 ], [ 0.0909, 43.2217 ], [ 0.0907, 43.2223 ], [ 0.0905, 43.2227 ], [ 0.0905, 43.2228 ], [ 0.0904, 43.2233 ], [ 0.0902, 43.2235 ], [ 0.0902, 43.2235 ], [ 0.0902, 43.2235 ], [ 0.09, 43.2239 ], [ 0.0897, 43.2245 ], [ 0.0897, 43.2245 ], [ 0.0894, 43.2251 ], [ 0.0891, 43.2257 ], [ 0.0889, 43.2264 ], [ 0.0888, 43.2267 ], [ 0.0884, 43.2267 ], [ 0.088, 43.2266 ], [ 0.0879, 43.2272 ], [ 0.0879, 43.2275 ], [ 0.0879, 43.2275 ], [ 0.0875, 43.2276 ], [ 0.0872, 43.2276 ], [ 0.0872, 43.2277 ], [ 0.0869, 43.2279 ], [ 0.0868, 43.2281 ], [ 0.0867, 43.2281 ], [ 0.0866, 43.2281 ], [ 0.0851, 43.228 ], [ 0.0844, 43.2283 ], [ 0.0841, 43.2279 ], [ 0.084, 43.2279 ], [ 0.0835, 43.2278 ], [ 0.083, 43.2288 ], [ 0.0827, 43.2288 ], [ 0.0821, 43.2289 ], [ 0.0811, 43.2289 ], [ 0.0804, 43.2289 ], [ 0.0804, 43.2279 ], [ 0.0804, 43.2279 ], [ 0.0804, 43.2276 ], [ 0.0803, 43.2276 ], [ 0.0799, 43.2276 ], [ 0.0799, 43.2275 ], [ 0.0799, 43.2274 ], [ 0.0799, 43.227 ], [ 0.0799, 43.2264 ], [ 0.0799, 43.2262 ], [ 0.0799, 43.2258 ], [ 0.0798, 43.2256 ], [ 0.0798, 43.2255 ], [ 0.0797, 43.2255 ], [ 0.0797, 43.2254 ], [ 0.0798, 43.2253 ], [ 0.0799, 43.2253 ], [ 0.08, 43.2253 ], [ 0.0802, 43.2251 ], [ 0.0804, 43.2249 ], [ 0.0809, 43.2244 ], [ 0.0811, 43.2242 ], [ 0.0812, 43.2243 ], [ 0.0813, 43.2242 ], [ 0.0813, 43.224 ], [ 0.0815, 43.2239 ], [ 0.0816, 43.2238 ], [ 0.0814, 43.2237 ], [ 0.0815, 43.2235 ], [ 0.0813, 43.2234 ], [ 0.0811, 43.2234 ], [ 0.0811, 43.2232 ], [ 0.0812, 43.223 ], [ 0.0812, 43.2229 ], [ 0.0802, 43.2227 ], [ 0.0797, 43.2229 ], [ 0.0796, 43.223 ], [ 0.0795, 43.223 ], [ 0.0794, 43.2231 ], [ 0.0792, 43.2236 ], [ 0.0789, 43.2235 ], [ 0.0786, 43.2236 ], [ 0.0782, 43.2235 ], [ 0.0781, 43.2239 ], [ 0.0782, 43.2239 ], [ 0.078, 43.2243 ], [ 0.078, 43.2244 ], [ 0.078, 43.2244 ], [ 0.078, 43.2246 ], [ 0.0779, 43.2246 ], [ 0.078, 43.2246 ], [ 0.078, 43.2247 ], [ 0.0782, 43.2247 ], [ 0.0782, 43.2249 ], [ 0.0784, 43.2249 ], [ 0.0786, 43.2249 ], [ 0.0784, 43.2252 ], [ 0.0784, 43.2252 ], [ 0.0784, 43.2253 ], [ 0.0783, 43.2254 ], [ 0.0779, 43.2257 ], [ 0.0777, 43.2259 ], [ 0.0776, 43.2263 ], [ 0.0778, 43.2263 ], [ 0.0776, 43.227 ], [ 0.0775, 43.2278 ], [ 0.0775, 43.2278 ], [ 0.0774, 43.2284 ], [ 0.0775, 43.2284 ], [ 0.0779, 43.2284 ], [ 0.0784, 43.2285 ], [ 0.0785, 43.2285 ], [ 0.0793, 43.2289 ], [ 0.0795, 43.2289 ], [ 0.0794, 43.2291 ], [ 0.0793, 43.2293 ], [ 0.0788, 43.2302 ], [ 0.0795, 43.2303 ], [ 0.0806, 43.2305 ], [ 0.0818, 43.2307 ], [ 0.0816, 43.2308 ], [ 0.0815, 43.2309 ], [ 0.0811, 43.2311 ], [ 0.0811, 43.2311 ], [ 0.081, 43.2311 ], [ 0.0809, 43.2311 ], [ 0.0808, 43.2318 ], [ 0.0807, 43.2318 ], [ 0.0797, 43.2319 ], [ 0.0798, 43.2326 ], [ 0.0807, 43.2325 ], [ 0.0813, 43.2325 ], [ 0.0817, 43.2324 ], [ 0.0818, 43.2324 ] ] ], "type": "Polygon" }, "id": "100", "properties": { "code_commune": "65440", "code_departement": "65", "code_qp": "QP065003", "commune_qp": "Tarbes", "nom_commune": "Séméac, Tarbes", "nom_qp": "Tarbes Est" }, "type": "Feature" }, { "bbox": [ 1.3353, 43.5363, 1.3406, 43.5391 ], "geometry": { "coordinates": [ [ [ 1.3353, 43.5369 ], [ 1.3354, 43.537 ], [ 1.3363, 43.5379 ], [ 1.3361, 43.538 ], [ 1.336, 43.5381 ], [ 1.3365, 43.5386 ], [ 1.3366, 43.5387 ], [ 1.3367, 43.5388 ], [ 1.3371, 43.5391 ], [ 1.3374, 43.5391 ], [ 1.3374, 43.5391 ], [ 1.3376, 43.5391 ], [ 1.3376, 43.5391 ], [ 1.3376, 43.539 ], [ 1.3381, 43.5391 ], [ 1.3383, 43.5391 ], [ 1.3387, 43.5389 ], [ 1.3386, 43.5388 ], [ 1.3388, 43.5388 ], [ 1.3391, 43.5386 ], [ 1.3392, 43.5388 ], [ 1.3394, 43.5388 ], [ 1.3395, 43.5388 ], [ 1.3397, 43.5387 ], [ 1.34, 43.5385 ], [ 1.3403, 43.5384 ], [ 1.3406, 43.5382 ], [ 1.3403, 43.5381 ], [ 1.3391, 43.5375 ], [ 1.3366, 43.5363 ], [ 1.3355, 43.5369 ], [ 1.3354, 43.5369 ], [ 1.3353, 43.5369 ] ] ], "type": "Polygon" }, "id": "101", "properties": { "code_commune": "31157", "code_departement": "31", "code_qp": "QP031017", "commune_qp": "Cugnaux", "nom_commune": "Cugnaux", "nom_qp": "Vivier Maçon" }, "type": "Feature" }, { "bbox": [ 1.3134, 43.6043, 1.3237, 43.6067 ], "geometry": { "coordinates": [ [ [ 1.3236, 43.6052 ], [ 1.3233, 43.6051 ], [ 1.3231, 43.6051 ], [ 1.3226, 43.6051 ], [ 1.3214, 43.605 ], [ 1.3196, 43.6048 ], [ 1.3174, 43.6046 ], [ 1.3162, 43.6045 ], [ 1.3153, 43.6045 ], [ 1.3134, 43.6043 ], [ 1.3137, 43.6046 ], [ 1.314, 43.605 ], [ 1.3147, 43.6047 ], [ 1.3149, 43.6047 ], [ 1.315, 43.6047 ], [ 1.3151, 43.6047 ], [ 1.3154, 43.6047 ], [ 1.3156, 43.605 ], [ 1.3162, 43.6048 ], [ 1.3162, 43.605 ], [ 1.3161, 43.6057 ], [ 1.3161, 43.6059 ], [ 1.3161, 43.6061 ], [ 1.3162, 43.6062 ], [ 1.3168, 43.6063 ], [ 1.3195, 43.6065 ], [ 1.3212, 43.6066 ], [ 1.322, 43.6067 ], [ 1.3224, 43.6067 ], [ 1.3233, 43.6067 ], [ 1.3234, 43.6067 ], [ 1.3235, 43.6067 ], [ 1.3235, 43.6066 ], [ 1.3235, 43.6065 ], [ 1.3235, 43.6062 ], [ 1.3236, 43.6058 ], [ 1.3236, 43.6056 ], [ 1.3237, 43.6054 ], [ 1.3236, 43.6052 ] ] ], "type": "Polygon" }, "id": "102", "properties": { "code_commune": "31149", "code_departement": "31", "code_qp": "QP031016", "commune_qp": "Colomiers", "nom_commune": "Colomiers", "nom_qp": "En Jacca" }, "type": "Feature" }, { "bbox": [ 1.4387, 43.6182, 1.446, 43.6219 ], "geometry": { "coordinates": [ [ [ 1.4416, 43.6184 ], [ 1.4409, 43.6185 ], [ 1.441, 43.6196 ], [ 1.4411, 43.62 ], [ 1.4411, 43.6201 ], [ 1.4401, 43.6205 ], [ 1.4399, 43.62 ], [ 1.4394, 43.6201 ], [ 1.4394, 43.62 ], [ 1.4387, 43.6201 ], [ 1.4388, 43.6204 ], [ 1.4388, 43.6204 ], [ 1.439, 43.621 ], [ 1.4397, 43.6208 ], [ 1.4397, 43.6208 ], [ 1.4401, 43.6219 ], [ 1.4406, 43.6217 ], [ 1.4401, 43.6206 ], [ 1.4412, 43.6202 ], [ 1.4413, 43.6201 ], [ 1.4421, 43.62 ], [ 1.4437, 43.6195 ], [ 1.446, 43.6188 ], [ 1.446, 43.6188 ], [ 1.4458, 43.6187 ], [ 1.4456, 43.6187 ], [ 1.4453, 43.6186 ], [ 1.4451, 43.6185 ], [ 1.4447, 43.6184 ], [ 1.4447, 43.6184 ], [ 1.4428, 43.6188 ], [ 1.4427, 43.6186 ], [ 1.4425, 43.6182 ], [ 1.4423, 43.6182 ], [ 1.4416, 43.6184 ] ] ], "type": "Polygon" }, "id": "103", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031018", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "Négreneys" }, "type": "Feature" }, { "bbox": [ 1.4672, 43.607, 1.4729, 43.6102 ], "geometry": { "coordinates": [ [ [ 1.4729, 43.6074 ], [ 1.4727, 43.6073 ], [ 1.4727, 43.6073 ], [ 1.4724, 43.6071 ], [ 1.4722, 43.607 ], [ 1.4712, 43.6072 ], [ 1.471, 43.6073 ], [ 1.4706, 43.6073 ], [ 1.4692, 43.6073 ], [ 1.4681, 43.6072 ], [ 1.4672, 43.6072 ], [ 1.4675, 43.6073 ], [ 1.4676, 43.6074 ], [ 1.4679, 43.6076 ], [ 1.4681, 43.6077 ], [ 1.4686, 43.6079 ], [ 1.4698, 43.6086 ], [ 1.4686, 43.6096 ], [ 1.4694, 43.6102 ], [ 1.4701, 43.6096 ], [ 1.4724, 43.6079 ], [ 1.4725, 43.6078 ], [ 1.4728, 43.6076 ], [ 1.4729, 43.6074 ] ] ], "type": "Polygon" }, "id": "104", "properties": { "code_commune": "31555", "code_departement": "31", "code_qp": "QP031019", "commune_qp": "Toulouse", "nom_commune": "Toulouse", "nom_qp": "La Gloire" }, "type": "Feature" } ], "type": "FeatureCollection" }, "hovertemplate": "%{hovertext}

Quartier Prioritaire=%{location}
Taux d'Activité des Femmes=%{customdata[0]}
Taux Total en Emploi Précaire=%{customdata[1]}
Taux de Femmes en Emploi Précaire=%{z}", "hovertext": [ "Pradettes", "Grand Mirail", "Arènes", "Bourbaki", "Empalot", "Les Izards - La Vache", "Cépière Beauregard", "Saint Exupéry", "Soupetard", "Rangueil", "Négreneys", "La Gloire" ], "locations": [ "Pradettes", "Grand Mirail", "Arènes", "Bourbaki", "Empalot", "Les Izards - La Vache", "Cépière Beauregard", "Saint Exupéry", "Soupetard", "Rangueil", "Négreneys", "La Gloire" ], "name": "", "subplot": "mapbox", "type": "choroplethmapbox", "z": [ 30.6, 24.8, 29, null, 29.2, 17.6, 22.2, 14.9, 16.2, 34.3, null, 14.7 ] } ], "layout": { "autosize": true, "coloraxis": { "colorbar": { "title": { "text": "Taux de Femmes en Emploi Précaire" } }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ] }, "legend": { "tracegroupgap": 0 }, "mapbox": { "center": { "lat": 43.6, "lon": 1.433333 }, "domain": { "x": [ 0, 1 ], "y": [ 0, 1 ] }, "style": "carto-positron", "zoom": 11.5 }, "margin": { "b": 0, "l": 0, "r": 0, "t": 25 }, "template": { "data": { "bar": [ { "error_x": { "color": "#2a3f5f" }, "error_y": { "color": "#2a3f5f" }, "marker": { "line": { "color": "#E5ECF6", "width": 0.5 }, "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "bar" } ], "barpolar": [ { "marker": { "line": { "color": "#E5ECF6", "width": 0.5 }, "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "barpolar" } ], "carpet": [ { "aaxis": { "endlinecolor": "#2a3f5f", "gridcolor": "white", "linecolor": "white", "minorgridcolor": "white", "startlinecolor": "#2a3f5f" }, "baxis": { "endlinecolor": "#2a3f5f", "gridcolor": "white", "linecolor": "white", "minorgridcolor": "white", "startlinecolor": "#2a3f5f" }, "type": "carpet" } ], "choropleth": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "choropleth" } ], "contour": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "contour" } ], "contourcarpet": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "contourcarpet" } ], "heatmap": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "heatmap" } ], "heatmapgl": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "heatmapgl" } ], "histogram": [ { "marker": { "pattern": { "fillmode": "overlay", "size": 10, "solidity": 0.2 } }, "type": "histogram" } ], "histogram2d": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "histogram2d" } ], "histogram2dcontour": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "histogram2dcontour" } ], "mesh3d": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "type": "mesh3d" } ], "parcoords": [ { "line": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "parcoords" } ], "pie": [ { "automargin": true, "type": "pie" } ], "scatter": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatter" } ], "scatter3d": [ { "line": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatter3d" } ], "scattercarpet": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattercarpet" } ], "scattergeo": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattergeo" } ], "scattergl": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattergl" } ], "scattermapbox": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scattermapbox" } ], "scatterpolar": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterpolar" } ], "scatterpolargl": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterpolargl" } ], "scatterternary": [ { "marker": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "type": "scatterternary" } ], "surface": [ { "colorbar": { "outlinewidth": 0, "ticks": "" }, "colorscale": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "type": "surface" } ], "table": [ { "cells": { "fill": { "color": "#EBF0F8" }, "line": { "color": "white" } }, "header": { "fill": { "color": "#C8D4E3" }, "line": { "color": "white" } }, "type": "table" } ] }, "layout": { "annotationdefaults": { "arrowcolor": "#2a3f5f", "arrowhead": 0, "arrowwidth": 1 }, "autotypenumbers": "strict", "coloraxis": { "colorbar": { "outlinewidth": 0, "ticks": "" } }, "colorscale": { "diverging": [ [ 0, "#8e0152" ], [ 0.1, "#c51b7d" ], [ 0.2, "#de77ae" ], [ 0.3, "#f1b6da" ], [ 0.4, "#fde0ef" ], [ 0.5, "#f7f7f7" ], [ 0.6, "#e6f5d0" ], [ 0.7, "#b8e186" ], [ 0.8, "#7fbc41" ], [ 0.9, "#4d9221" ], [ 1, "#276419" ] ], "sequential": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ], "sequentialminus": [ [ 0, "#0d0887" ], [ 0.1111111111111111, "#46039f" ], [ 0.2222222222222222, "#7201a8" ], [ 0.3333333333333333, "#9c179e" ], [ 0.4444444444444444, "#bd3786" ], [ 0.5555555555555556, "#d8576b" ], [ 0.6666666666666666, "#ed7953" ], [ 0.7777777777777778, "#fb9f3a" ], [ 0.8888888888888888, "#fdca26" ], [ 1, "#f0f921" ] ] }, "colorway": [ "#636efa", "#EF553B", "#00cc96", "#ab63fa", "#FFA15A", "#19d3f3", "#FF6692", "#B6E880", "#FF97FF", "#FECB52" ], "font": { "color": "#2a3f5f" }, "geo": { "bgcolor": "white", "lakecolor": "white", "landcolor": "#E5ECF6", "showlakes": true, "showland": true, "subunitcolor": "white" }, "hoverlabel": { "align": "left" }, "hovermode": "closest", "mapbox": { "style": "light" }, "paper_bgcolor": "white", "plot_bgcolor": "#E5ECF6", "polar": { "angularaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "bgcolor": "#E5ECF6", "radialaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" } }, "scene": { "xaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" }, "yaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" }, "zaxis": { "backgroundcolor": "#E5ECF6", "gridcolor": "white", "gridwidth": 2, "linecolor": "white", "showbackground": true, "ticks": "", "zerolinecolor": "white" } }, "shapedefaults": { "line": { "color": "#2a3f5f" } }, "ternary": { "aaxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "baxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" }, "bgcolor": "#E5ECF6", "caxis": { "gridcolor": "white", "linecolor": "white", "ticks": "" } }, "title": { "x": 0.05 }, "xaxis": { "automargin": true, "gridcolor": "white", "linecolor": "white", "ticks": "", "title": { "standoff": 15 }, "zerolinecolor": "white", "zerolinewidth": 2 }, "yaxis": { "automargin": true, "gridcolor": "white", "linecolor": "white", "ticks": "", "title": { "standoff": 15 }, "zerolinecolor": "white", "zerolinewidth": 2 } } }, "title": { "text": "Taux de Femmes en Emploi Précaire selon le Q.P - Commune de Toulouse" } } }, "image/png": "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", "text/html": [ "
" ] }, "metadata": {}, "output_type": "display_data" }, { "name": "stdout", "output_type": "stream", "text": [ "\n" ] } ], "source": [ "x = input(\"Quelle ville vous intéresse ? (Toulouse ou Castres) : \")\n", "\n", "\n", "if (x == \"toulouse\") or (x == \"Toulouse\") or (x == \"TOULOUSE\"):\n", " df_toulouse = df[df[\"nom_commune\"]==\"Toulouse\"]\n", " \n", " map_tx_tot_empl = tieks(df_toulouse, latitude=43.600000, longitude=1.433333,\n", " colored_var=\"tx_tot_empl\", title=f\"Taux d'Activité Total selon le Q.P - Commune de {x}\")\n", " \n", " map_tx_et_empl = tieks(df_toulouse, latitude=43.600000, longitude=1.433333,\n", " colored_var=\"tx_et_empl\", title=f\"Taux d'Activité des Etrangers selon le Q.P - Commune de {x}\")\n", " \n", " map_tx_et_eprec = tieks(df_toulouse, latitude=43.600000, longitude=1.433333,\n", " colored_var=\"tx_et_eprec\", title=f\"Taux d'Etrangers en Emploi Précaire selon le Q.P - Commune de {x}\")\n", " \n", " map_tx_f_eprec = tieks(df_toulouse, latitude=43.600000, longitude=1.433333,\n", " colored_var=\"tx_f_eprec\", title=f\"Taux de Femmes en Emploi Précaire selon le Q.P - Commune de {x}\")\n", " \n", " map_tx_tot_empl.show()\n", " print()\n", " map_tx_et_empl.show()\n", " print()\n", " map_tx_et_eprec.show()\n", " print()\n", " map_tx_f_eprec.show()\n", " print()\n", " \n", "elif (x == \"castres\") or (x == \"Castres\") or (x == \"CASTRES\"):\n", " df_castres = df[df[\"nom_commune\"]==\"Castres\"]\n", " x_map = tieks(df_castres, latitude=43.607, longitude=2.24, zoom=12.5,\n", " colored_var=\"tx_et_empl\", title=fr\"Taux d'activité des étrangers selon le QP - Commune de {x}\")\n", " x_map.show()\n", "\n", "elif (x == \"montpellier\") or (x == \"Montpellier\") or (x == \"MONTPELLIER\"):\n", " df_montpellier = df[df[\"nom_commune\"]==\"Montpellier\"]\n", " x_map = tieks(df_montpellier, latitude=43.6, longitude=3.8833,\n", " colored_var=\"tx_et_empl\", title=fr\"Taux d'activité des étrangers selon le QP - Commune de {x}\")\n", " x_map.show()\n", "\n", "elif (x == \"carcassonne\") or (x == \"Carcassonne\") or (x == \"CARCASSONNE\"):\n", " df_carcassonne = df[df[\"nom_commune\"]==\"Carcassonne\"]\n", " x_map = tieks(df_carcassonne, latitude=43.2166700, longitude=2.35, zoom=13,\n", " colored_var=\"tx_et_empl\", title=fr\"Taux d'activité des étrangers selon le QP - Commune de {x}\")\n", " x_map.show()\n", "\n", "else:\n", " print(\"T'es débile ma parole\")" ] }, { "cell_type": "markdown", "id": "8b28db3a", "metadata": {}, "source": [ "MAIN FUNCTION¶\n" ] }, { "cell_type": "code", "execution_count": 9, "id": "1cd18b6c", "metadata": {}, "outputs": [], "source": [ "# fig = px.choropleth_mapbox(df_toulouse, geojson=geojson, color=\"tx_et_empl\",\n", "# locations=\"nom_qp\", featureidkey=\"properties.nom_qp\",\n", "# center={\"lat\": 43.600000, \"lon\": 1.433333},\n", "# mapbox_style=\"carto-positron\", zoom=11.5,\n", "# hover_name=\"nom_qp\", hover_data=['tx_f_empl','tx_tot_empl'],\n", "# title=\"Taux d'activité des étrangers par QP\",\n", "# labels={'nom_qp':'Quartier Prioritaire', 'tx_f_empl':\"Taux d'activité des Femmes\",\n", "# \"tx_et_empl\": \"Taux d'activité des étrangers\", \"tx_tot_empl\":\"Taux d'activité Total\"}\n", "# )\n", "# # fig.update_layout(margin={\"r\":0,\"t\":25,\"l\":0,\"b\":0})" ] }, { "cell_type": "code", "execution_count": 10, "id": "04eff34a", "metadata": {}, "outputs": [ { "ename": "NameError", "evalue": "name 'df_toulouse' is not defined", "output_type": "error", "traceback": [ "\u001b[1;31m---------------------------------------------------------------------------\u001b[0m", "\u001b[1;31mNameError\u001b[0m Traceback (most recent call last)", "\u001b[1;32m~\\AppData\\Local\\Temp/ipykernel_8580/2977533336.py\u001b[0m in \u001b[0;36m\u001b[1;34m\u001b[0m\n\u001b[1;32m----> 1\u001b[1;33m \u001b[0mdf_toulouse\u001b[0m\u001b[1;33m.\u001b[0m\u001b[0mcolumns\u001b[0m\u001b[1;33m\u001b[0m\u001b[1;33m\u001b[0m\u001b[0m\n\u001b[0m", "\u001b[1;31mNameError\u001b[0m: name 'df_toulouse' is not defined" ] } ], "source": [ "df_toulouse.columns" ] }, { "cell_type": "code", "execution_count": null, "id": "73210f61-7a1c-483f-a50c-98766456234f", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": null, "id": "57a53658-f7c9-495a-827b-87cce0732f85", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": 5, "id": "f4d4f22c-1d3f-46ac-b151-7fb5166f9718", "metadata": {}, "outputs": [ { "ename": "NameError", "evalue": "name 'bplt' is not defined", "output_type": "error", "traceback": [ "\u001b[1;31m---------------------------------------------------------------------------\u001b[0m", "\u001b[1;31mNameError\u001b[0m Traceback (most recent call last)", "\u001b[1;32m~\\AppData\\Local\\Temp/ipykernel_8580/3181069122.py\u001b[0m in \u001b[0;36m\u001b[1;34m\u001b[0m\n\u001b[0;32m 1\u001b[0m \u001b[1;32mimport\u001b[0m \u001b[0mos\u001b[0m\u001b[1;33m\u001b[0m\u001b[1;33m\u001b[0m\u001b[0m\n\u001b[1;32m----> 2\u001b[1;33m \u001b[0mbplt\u001b[0m\u001b[1;33m.\u001b[0m\u001b[0moutput_file\u001b[0m\u001b[1;33m(\u001b[0m\u001b[1;34m\"example_bokeh.html\"\u001b[0m\u001b[1;33m)\u001b[0m\u001b[1;33m\u001b[0m\u001b[1;33m\u001b[0m\u001b[0m\n\u001b[0m\u001b[0;32m 3\u001b[0m \u001b[0mbplt\u001b[0m\u001b[1;33m.\u001b[0m\u001b[0msave\u001b[0m\u001b[1;33m(\u001b[0m\u001b[0mp\u001b[0m\u001b[1;33m)\u001b[0m\u001b[1;33m\u001b[0m\u001b[1;33m\u001b[0m\u001b[0m\n\u001b[0;32m 4\u001b[0m \u001b[0mprint\u001b[0m\u001b[1;33m(\u001b[0m\u001b[1;33m[\u001b[0m \u001b[0m_\u001b[0m \u001b[1;32mfor\u001b[0m \u001b[0m_\u001b[0m \u001b[1;32min\u001b[0m \u001b[0mos\u001b[0m\u001b[1;33m.\u001b[0m\u001b[0mlistdir\u001b[0m\u001b[1;33m(\u001b[0m\u001b[1;34m\".\"\u001b[0m\u001b[1;33m)\u001b[0m \u001b[1;32mif\u001b[0m \u001b[1;34m\"html\"\u001b[0m \u001b[1;32min\u001b[0m \u001b[0m_\u001b[0m \u001b[1;33m]\u001b[0m \u001b[1;33m)\u001b[0m\u001b[1;33m\u001b[0m\u001b[1;33m\u001b[0m\u001b[0m\n", "\u001b[1;31mNameError\u001b[0m: name 'bplt' is not defined" ] } ], "source": [ "import os\n", "bplt.output_file(\"example_bokeh.html\")\n", "bplt.save(p)\n", "print([ _ for _ in os.listdir(\".\") if \"html\" in _ ] )" ] }, { "cell_type": "code", "execution_count": null, "id": "fea218d4-f2b6-49e3-8103-c42e0acfa0bd", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": null, "id": "9e2e83f6-eef4-4b0d-9f0e-aaef28b850f7", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": null, "id": "8baa181d-5640-4a94-94ee-dab74d52419e", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": null, "id": "3c6d4cdc-0eed-4e73-b7b6-820185b30fdd", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": null, "id": "f420de44-d534-4bcb-a0a8-0986490984b3", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": null, "id": "bbf41831-c2e2-497a-8512-b35997c8d74b", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": null, "id": "e9180a99-2be3-4ba9-bf47-ab221af21e9a", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": null, "id": "29bd9e86-da5c-4f8e-bf4d-dc8481a343f1", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": null, "id": "667ff5e0-f386-4587-854b-f4bcb5d700c4", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "markdown", "id": "cad5e16c", "metadata": {}, "source": [ "API TEST" ] }, { "cell_type": "markdown", "id": "1369f62d", "metadata": {}, "source": [ "with dash" ] }, { "cell_type": "code", "execution_count": 3, "id": "34a92fe8", "metadata": {}, "outputs": [ { "ename": "NameError", "evalue": "name 'emploi_et' is not defined", "output_type": "error", "traceback": [ "\u001b[1;31m---------------------------------------------------------------------------\u001b[0m", "\u001b[1;31mNameError\u001b[0m Traceback (most recent call last)", "\u001b[1;32m~\\AppData\\Local\\Temp/ipykernel_8580/3610028305.py\u001b[0m in \u001b[0;36m\u001b[1;34m\u001b[0m\n\u001b[0;32m 12\u001b[0m \u001b[0mfig\u001b[0m\u001b[1;33m.\u001b[0m\u001b[0mupdate_layout\u001b[0m\u001b[1;33m(\u001b[0m\u001b[0mmargin\u001b[0m\u001b[1;33m=\u001b[0m\u001b[1;33m{\u001b[0m\u001b[1;34m\"r\"\u001b[0m\u001b[1;33m:\u001b[0m\u001b[1;36m0\u001b[0m\u001b[1;33m,\u001b[0m\u001b[1;34m\"t\"\u001b[0m\u001b[1;33m:\u001b[0m\u001b[1;36m25\u001b[0m\u001b[1;33m,\u001b[0m\u001b[1;34m\"l\"\u001b[0m\u001b[1;33m:\u001b[0m\u001b[1;36m0\u001b[0m\u001b[1;33m,\u001b[0m\u001b[1;34m\"b\"\u001b[0m\u001b[1;33m:\u001b[0m\u001b[1;36m0\u001b[0m\u001b[1;33m}\u001b[0m\u001b[1;33m)\u001b[0m\u001b[1;33m\u001b[0m\u001b[1;33m\u001b[0m\u001b[0m\n\u001b[0;32m 13\u001b[0m \u001b[1;32mreturn\u001b[0m \u001b[0mfig\u001b[0m\u001b[1;33m\u001b[0m\u001b[1;33m\u001b[0m\u001b[0m\n\u001b[1;32m---> 14\u001b[1;33m \u001b[0mfig\u001b[0m \u001b[1;33m=\u001b[0m \u001b[0mdisplay_choropleth\u001b[0m\u001b[1;33m(\u001b[0m\u001b[0memploi_et\u001b[0m\u001b[1;33m)\u001b[0m\u001b[1;33m\u001b[0m\u001b[1;33m\u001b[0m\u001b[0m\n\u001b[0m", "\u001b[1;31mNameError\u001b[0m: name 'emploi_et' is not defined" ] } ], "source": [ "def display_choropleth(emploi_et):\n", " fig = px.choropleth_mapbox(df_toulouse, geojson=geojson, color=\"tx_et_empl\",\n", " locations=\"nom_qp\", featureidkey=\"properties.nom_qp\",\n", " center={\"lat\": 43.600000, \"lon\": 1.433333},\n", " mapbox_style=\"carto-positron\", zoom=11.5,\n", " hover_name=\"nom_qp\", hover_data=['tx_f_empl','tx_tot_empl'],\n", " title=\"Taux d'activité des étrangers par QP\",\n", " labels={'nom_qp':'Quartier Prioritaire', 'tx_f_empl':\"Taux d'activité des Femmes\",\n", " \"tx_et_empl\": \"Taux d'activité des étrangers\", \"tx_tot_empl\":\"Taux d'activité Total\"}\n", " )\n", " fig.update_geos(fitbounds=\"locations\", visible=False)\n", " fig.update_layout(margin={\"r\":0,\"t\":25,\"l\":0,\"b\":0})\n", " return fig\n", "fig = display_choropleth(emploi_et)" ] }, { "cell_type": "code", "execution_count": 4, "id": "e7aaa703", "metadata": {}, "outputs": [ { "ename": "NameError", "evalue": "name 'JupyterDash' is not defined", "output_type": "error", "traceback": [ "\u001b[1;31m---------------------------------------------------------------------------\u001b[0m", "\u001b[1;31mNameError\u001b[0m Traceback (most recent call last)", "\u001b[1;32m~\\AppData\\Local\\Temp/ipykernel_8580/326626489.py\u001b[0m in \u001b[0;36m\u001b[1;34m\u001b[0m\n\u001b[1;32m----> 1\u001b[1;33m \u001b[0mJupyterDash\u001b[0m\u001b[1;33m.\u001b[0m\u001b[0minfer_jupyter_proxy_config\u001b[0m\u001b[1;33m(\u001b[0m\u001b[1;33m)\u001b[0m\u001b[1;33m\u001b[0m\u001b[1;33m\u001b[0m\u001b[0m\n\u001b[0m", "\u001b[1;31mNameError\u001b[0m: name 'JupyterDash' is not defined" ] } ], "source": [ "JupyterDash.infer_jupyter_proxy_config()" ] }, { "cell_type": "markdown", "id": "34cf6d39", "metadata": {}, "source": [ "When running in JupyterHub or Binder, call the infer_jupyter_config function to detect the proxy configuration." ] }, { "cell_type": "code", "execution_count": null, "id": "5ad6a39e", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": 55, "id": "6f63f515", "metadata": {}, "outputs": [ { "name": "stdout", "output_type": "stream", "text": [ "Requirement already satisfied: jupyter-dash in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (0.4.0)\n", "Requirement already satisfied: ansi2html in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from jupyter-dash) (1.6.0)\n", "Requirement already satisfied: requests in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from jupyter-dash) (2.25.1)\n", "Requirement already satisfied: retrying in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from jupyter-dash) (1.3.3)\n", "Requirement already satisfied: ipython in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from jupyter-dash) (7.22.0)\n", "Requirement already satisfied: flask in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from jupyter-dash) (1.1.2)\n", "Requirement already satisfied: ipykernel in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from jupyter-dash) (5.3.4)\n", "Requirement already satisfied: dash in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from jupyter-dash) (1.21.0)\n", "Requirement already satisfied: future in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash->jupyter-dash) (0.18.2)\n", "Requirement already satisfied: plotly in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash->jupyter-dash) (5.3.1)\n", "Requirement already satisfied: dash-html-components==1.1.4 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash->jupyter-dash) (1.1.4)\n", "Requirement already satisfied: flask-compress in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash->jupyter-dash) (0.0.0)\n", "Requirement already satisfied: dash-table==4.12.0 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash->jupyter-dash) (4.12.0)\n", "Requirement already satisfied: dash-core-components==1.17.1 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash->jupyter-dash) (1.17.1)\n", "Requirement already satisfied: Jinja2>=2.10.1 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from flask->jupyter-dash) (3.0.0)\n", "Requirement already satisfied: Werkzeug>=0.15 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from flask->jupyter-dash) (1.0.1)\n", "Requirement already satisfied: click>=5.1 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from flask->jupyter-dash) (7.1.2)\n", "Requirement already satisfied: itsdangerous>=0.24 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from flask->jupyter-dash) (2.0.1)\n", "Requirement already satisfied: MarkupSafe>=2.0.0rc2 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from Jinja2>=2.10.1->flask->jupyter-dash) (2.0.1)\n", "Requirement already satisfied: brotli in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from flask-compress->dash->jupyter-dash) (1.0.9)\n", "Requirement already satisfied: traitlets>=4.1.0 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from ipykernel->jupyter-dash) (5.0.5)\n", "Requirement already satisfied: tornado>=4.2 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from ipykernel->jupyter-dash) (6.1)\n", "Requirement already satisfied: jupyter-client in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from ipykernel->jupyter-dash) (6.1.12)\n", "Requirement already satisfied: pickleshare in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from ipython->jupyter-dash) (0.7.5)\n", "Requirement already satisfied: pygments in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from ipython->jupyter-dash) (2.9.0)\n", "Requirement already satisfied: colorama in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from ipython->jupyter-dash) (0.4.4)\n", "Requirement already satisfied: backcall in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from ipython->jupyter-dash) (0.2.0)\n", "Requirement already satisfied: setuptools>=18.5 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from ipython->jupyter-dash) (52.0.0.post20210125)\n", "Requirement already satisfied: decorator in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from ipython->jupyter-dash) (4.4.2)\n", "Requirement already satisfied: jedi>=0.16 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from ipython->jupyter-dash) (0.18.0)\n", "Requirement already satisfied: prompt-toolkit!=3.0.0,!=3.0.1,<3.1.0,>=2.0.0 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from ipython->jupyter-dash) (3.0.17)\n", "Requirement already satisfied: parso<0.9.0,>=0.8.0 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from jedi>=0.16->ipython->jupyter-dash) (0.8.2)\n", "Requirement already satisfied: wcwidth in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from prompt-toolkit!=3.0.0,!=3.0.1,<3.1.0,>=2.0.0->ipython->jupyter-dash) (0.2.5)\n", "Requirement already satisfied: ipython-genutils in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from traitlets>=4.1.0->ipykernel->jupyter-dash) (0.2.0)\n", "Requirement already satisfied: jupyter-core>=4.6.0 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from jupyter-client->ipykernel->jupyter-dash) (4.7.1)\n", "Requirement already satisfied: python-dateutil>=2.1 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from jupyter-client->ipykernel->jupyter-dash) (2.8.1)\n", "Requirement already satisfied: pyzmq>=13 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from jupyter-client->ipykernel->jupyter-dash) (20.0.0)\n", "Requirement already satisfied: pywin32>=1.0 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from jupyter-core>=4.6.0->jupyter-client->ipykernel->jupyter-dash) (227)\n", "Requirement already satisfied: six>=1.5 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from python-dateutil>=2.1->jupyter-client->ipykernel->jupyter-dash) (1.16.0)\n", "Requirement already satisfied: tenacity>=6.2.0 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from plotly->dash->jupyter-dash) (6.3.1)\n", "Requirement already satisfied: chardet<5,>=3.0.2 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from requests->jupyter-dash) (4.0.0)\n", "Requirement already satisfied: certifi>=2017.4.17 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from requests->jupyter-dash) (2021.5.30)\n", "Requirement already satisfied: idna<3,>=2.5 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from requests->jupyter-dash) (2.10)\n", "Requirement already satisfied: urllib3<1.27,>=1.21.1 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from requests->jupyter-dash) (1.26.4)\n" ] }, { "name": "stderr", "output_type": "stream", "text": [ "WARNING: Ignoring invalid distribution -umpy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -tatsmodels (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -cipy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -umpy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -tatsmodels (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -cipy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -umpy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -tatsmodels (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -cipy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -umpy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -tatsmodels (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -cipy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -umpy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -tatsmodels (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -cipy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n" ] }, { "name": "stdout", "output_type": "stream", "text": [ "Requirement already satisfied: dash_bootstrap_components in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (0.13.0)\n", "Requirement already satisfied: dash>=1.9.0 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash_bootstrap_components) (1.21.0)\n", "Requirement already satisfied: dash-html-components==1.1.4 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash>=1.9.0->dash_bootstrap_components) (1.1.4)\n", "Requirement already satisfied: dash-table==4.12.0 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash>=1.9.0->dash_bootstrap_components) (4.12.0)\n", "Requirement already satisfied: future in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash>=1.9.0->dash_bootstrap_components) (0.18.2)\n", "Requirement already satisfied: Flask>=1.0.4 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash>=1.9.0->dash_bootstrap_components) (1.1.2)\n", "Requirement already satisfied: dash-core-components==1.17.1 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash>=1.9.0->dash_bootstrap_components) (1.17.1)\n", "Requirement already satisfied: plotly in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash>=1.9.0->dash_bootstrap_components) (5.3.1)\n", "Requirement already satisfied: flask-compress in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from dash>=1.9.0->dash_bootstrap_components) (0.0.0)\n", "Requirement already satisfied: Werkzeug>=0.15 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from Flask>=1.0.4->dash>=1.9.0->dash_bootstrap_components) (1.0.1)\n", "Requirement already satisfied: click>=5.1 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from Flask>=1.0.4->dash>=1.9.0->dash_bootstrap_components) (7.1.2)\n", "Requirement already satisfied: itsdangerous>=0.24 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from Flask>=1.0.4->dash>=1.9.0->dash_bootstrap_components) (2.0.1)\n", "Requirement already satisfied: Jinja2>=2.10.1 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from Flask>=1.0.4->dash>=1.9.0->dash_bootstrap_components) (3.0.0)\n", "Requirement already satisfied: MarkupSafe>=2.0.0rc2 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from Jinja2>=2.10.1->Flask>=1.0.4->dash>=1.9.0->dash_bootstrap_components) (2.0.1)\n", "Requirement already satisfied: brotli in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from flask-compress->dash>=1.9.0->dash_bootstrap_components) (1.0.9)\n", "Requirement already satisfied: six in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from plotly->dash>=1.9.0->dash_bootstrap_components) (1.16.0)\n", "Requirement already satisfied: tenacity>=6.2.0 in c:\\users\\charlotte\\anaconda3\\lib\\site-packages (from plotly->dash>=1.9.0->dash_bootstrap_components) (6.3.1)\n" ] }, { "name": "stderr", "output_type": "stream", "text": [ "WARNING: Ignoring invalid distribution -umpy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -tatsmodels (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -cipy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -umpy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -tatsmodels (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -cipy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -umpy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -tatsmodels (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -cipy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -umpy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -tatsmodels (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -cipy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -umpy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -tatsmodels (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n", "WARNING: Ignoring invalid distribution -cipy (c:\\users\\charlotte\\anaconda3\\lib\\site-packages)\n" ] } ], "source": [ "!pip install jupyter-dash\n", "!pip install dash_bootstrap_components\n", "import dash\n", "import dash_core_components as dcc\n", "import dash_html_components as html\n", "from dash.dependencies import Input, Output\n", "import plotly.express as px\n", "import plotly.graph_objects as go\n", "import dash_table\n", "import dash_bootstrap_components as dbc\n", "\n", "# set the theme\n", "external_stylesheets = ['https://codepen.io/chriddyp/pen/bWLwgP.css']\n", "\n", "# create the app object\n", "app = JupyterDash(__name__, external_stylesheets = external_stylesheets)\n", "\n", "\n", "# Create server variable with Flask server object for use with gunicorn\n", "server = app.server\n", "\n", "\n", "# customize layout\n", "app.layout = html.Div([dbc.Container([dbc.Row([dbc.Col(html.H1(\"Taux d'emploi chez les étrangers \"), className = \"mb-2\")]),\n", " dbc.Row([dbc.Col(html.H6(children = 'Visualiser la géodémographie des quartiers prioritaires de Toulouse', className = \"mb-4\"))]),\n", " dbc.Row([dbc.Col(dbc.Card(html.H3(children = 'Dernière Mise à Jour', className = \"text-center text-light bg-dark\"), body = True, color = \"dark\"), className = \"mb_4\")]), dcc.Graph(id='choropleth', figure = fig)])])\n", "\n", "#@app.callback(dash.dependencies.Output('choropleth', 'figure'))" ] }, { "cell_type": "code", "execution_count": 57, "id": "6d066741", "metadata": {}, "outputs": [ { "name": "stdout", "output_type": "stream", "text": [ "Dash app running on http://127.0.0.1:8050/\n" ] } ], "source": [ "app.run_server()" ] }, { "cell_type": "code", "execution_count": 56, "id": "ca769606", "metadata": {}, "outputs": [ { "data": { "text/html": [ "\n", " \n", " " ], "text/plain": [ "" ] }, "metadata": {}, "output_type": "display_data" } ], "source": [ "app.run_server(mode=\"inline\")\n" ] }, { "cell_type": "code", "execution_count": null, "id": "a0191cf1-a590-436f-abeb-f3bc49d5bd58", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": null, "id": "6a8bf45a-8506-4bdd-9f9f-97c91921b90e", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": null, "id": "c703ba3f-f6f6-42da-84f8-219a246378e3", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": null, "id": "19197d01-2395-47f1-b4e9-b26f354c4a29", "metadata": {}, "outputs": [], "source": [] }, { "cell_type": "code", "execution_count": 3, "id": "2143af58-f78f-4772-a7cc-ae082326439e", "metadata": {}, "outputs": [ { "name": "stdout", "output_type": "stream", "text": [ "Note: you may need to restart the kernel to use updated packages.\n" ] }, { "name": "stderr", "output_type": "stream", "text": [ "La syntaxe du nom de fichier, de répertoire ou de volume est incorrecte.\n" ] } ], "source": [ "pip install Django==3.2.7\n" ] } ], "metadata": { "kernelspec": { "display_name": "Python 3 (ipykernel)", "language": "python", "name": "python3" }, "language_info": { "codemirror_mode": { "name": "ipython", "version": 3 }, "file_extension": ".py", "mimetype": "text/x-python", "name": "python", "nbconvert_exporter": "python", "pygments_lexer": "ipython3", "version": "3.7.11" } }, "nbformat": 4, "nbformat_minor": 5 }